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+This eBook, including all associated images, markup, improvements,
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+
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+Project Gutenberg (https://www.gutenberg.org) public repository for
+eBook #53161 (https://www.gutenberg.org/ebooks/53161)
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-Project Gutenberg's A View of Sir Isaac Newton's Philosophy, by Anonymous
-
-This eBook is for the use of anyone anywhere in the United States and most
-other parts of the world at no cost and with almost no restrictions
-whatsoever.  You may copy it, give it away or re-use it under the terms of
-the Project Gutenberg License included with this eBook or online at
-www.gutenberg.org.  If you are not located in the United States, you'll have
-to check the laws of the country where you are located before using this ebook.
-
-
-
-Title: A View of Sir Isaac Newton's Philosophy
-
-Author: Anonymous
-
-Release Date: September 28, 2016 [EBook #53161]
-
-Language: English
-
-Character set encoding: UTF-8
-
-*** START OF THIS PROJECT GUTENBERG EBOOK SIR ISAAC NEWTON'S PHILOSOPHY ***
-
-
-
-
-Produced by Giovanni Fini, Markus Brenner, Irma Spehar and
-the Online Distributed Proofreading Team at
-http://www.pgdp.net (This file was produced from images
-generously made available by The Internet Archive/Canadian
-Libraries)
-
-
-
-
-
-
-
-
-
-                         TRANSCRIBER’S NOTES:
-
-—Obvious print and punctuation errors were corrected.
-
-—Bold text has been rendered as =bold text=.
-
-—Spaced out text (gesperrt) has been rendered as ~spaced text~.
-
-—Superscript letters have been rendered as a^b and a^{bc}.
-
-
-
-
-                                   A
-                                ~VIEW~
-                                 ~OF~
-                        Sir ~_ISAAC NEWTON_~’s
-                              PHILOSOPHY.
-
-[Illustration]
-
-                             ~_LONDON_~:
-
-                     Printed by _S. PALMER_, 1728.
-
-[Illustration]
-
-  To the Noble and Right Honourable
-  SIR _ROBERT WALPOLE._
-
-_SIR,_
-
-I Take the liberty to send you this view of Sir ~ISAAC NEWTON’S~
-philosophy, which, if it were performed suitable to the dignity of the
-subject, might not be a present unworthy the acceptance of the greatest
-person. For his philosophy operations of nature, which for so many
-ages had imployed the curiosity of mankind; though no one before him
-was furnished with the strength of mind necessary to go any depth in
-this difficult search. However, I am encouraged to hope, that this
-attempt, imperfect as it is, to give our countrymen in general some
-conception of the labours of a person, who shall always be the boast
-of this nation, may be received with indulgence by one, under whose
-influence these kingdoms enjoy so much happiness. Indeed my admiration
-at the surprizing inventions of this great man, carries me to conceive
-of him as a person, who not only must raise the glory of the country,
-which gave him birth; but that he has even done honour to human nature,
-by having extended the greatest and most noble of our faculties,
-reason, to subjects, which, till he attempted them, appeared to be
-wholly beyond the reach of our limited capacities. And what can give us
-a more pleasing prospect of our own condition, than to see so exalted
-a proof of the strength of that faculty, whereon the conduct of our
-lives, and our happiness depends; our passions and all our motives to
-action being in such manner guided by our opinions, that where these
-are just, our whole behaviour will be praise-worthy? But why do I
-presume to detain you, SIR, with such reflections as these, who must
-have the fullest experience within your own mind, of the effects of
-right reason? For to what other source can be ascribed that amiable
-frankness and unreserved condescension among your friends, or that
-masculine perspicuity and strength of argument, whereby you draw the
-admiration of the publick, while you are engaged in the most important
-of all causes, the liberties of mankind?
-
-       *       *       *       *       *
-
-I humbly crave leave to make the only acknowledgement within my power,
-for the benefits, which I receive in common with the rest of my
-countrymen from these high talents, by subscribing my self
-
-  ~_SIR_~,
-  _Your most faithful_,
-  _and_
-  _Most humble Servant_,
-
-  ~HENRY PEMBERTON~.
-
-
-
-
-~PREFACE~.
-
-
-I _Drew up the following papers many years ago at the desire of some
-friends, who, upon my taking care of the late edition of Sir_ ~ISAAC
-NEWTON’S~ _Principia, perswaded me to make them publick. I laid hold
-of that opportunity, when my thoughts were afresh employed on this
-subject, to revise what I had formerly written. And I now send it
-abroad not without some hopes of answering these two ends. My first
-intention was to convey to such, as are not used to mathematical
-reasoning, some idea of the philosophy of a person, who has acquired
-an universal reputation, and rendered our nation famous for these
-speculations in the learned world. To which purpose I have avoided
-using terms of art as much as possible, and taken care to define such
-as I was obliged to use. Though this caution was the less necessary at
-present, since many of them are become familiar words to our language,
-from the great number of books wrote in it upon philosophical subjects,
-and the courses of experiments, that have of late years been given by
-several ingenious men. The other view I had, was to encourage such
-young gentlemen as have a turn for the mathematical sciences, to pursue
-those studies the more chearfully, in order to understand in our
-author himself the demonstrations of the things I here declare. And to
-facilitate their progress herein, I intend to proceed still farther in
-the explanation of Sir_ ~ISAAC NEWTON’S~ _philosophy. For as I have
-received very much pleasure from perusing his writings, I hope it is
-no illaudable ambition to endeavour the rendering them more easily
-understood, that greater numbers may enjoy the same satisfaction._
-
-_It will perhaps be expected, that I should say something particular
-of a person, to whom I must always acknowledge my self to be much
-obliged. What I have to declare on this head will be but short; for
-it was in the very last years of Sir_ ~ISAAC~_’s life, that I had the
-honour of his acquaintance. This happened on the following occasion.
-Mr._ Polenus, _a Professor in the University of_ Padua, _from a
-new experiment of his, thought the common opinion about the force
-of moving bodies was overturned, and the truth of Mr._ Libnitz_’s
-notion in that matter fully proved. The contrary of what Polenus had
-asserted I demonstrated in a paper, which Dr._ ~MEAD~, _who takes all
-opportunities of obliging his friends, was pleased to shew Sir_ ~ISAAC
-NEWTON~ _This was so well approved of by him, that he did me the honour
-to become a fellow-writer with me, by annexing to what I had written,
-a demonstration of his own drawn from another consideration. When I
-printed my discourse in the philosophical transactions, I put what Sir_
-~ISAAC~ _had written in a scholium by it self, that I might not seem to
-usurp what did not belong to me. But I concealed his name, not being
-then sufficiently acquainted with him to ask whether he was willing
-I might make use of it or not. In a little time after he engaged me
-to take care of the new edition he was about making if his Principia.
-This obliged me to be very frequently with him, and as he lived at some
-distance from me, a great number of letters passed between us on this
-account. When I had the honour of his conversation, I endeavoured to
-learn his thoughts upon mathematical subjects, and something historical
-concerning his inventions, that I had not been before acquainted
-with. I found, he had read fewer of the modern mathematicians, than
-one could have expected; but his own prodigious invention readily
-supplied him with what he might have an occasion for in the pursuit of
-any subject he undertook. I have often heard him censure the handling
-geometrical subjects by algebraic calculations; and his book of Algebra
-he called by the name of Universal Arithmetic, in opposition to the
-injudicious title of Geometry, which_ Des Cartes _had given to the
-treatise, wherein he shews, how the geometer may assist his invention
-by such kind of computations. He frequently praised_ Slusius, Barrow
-_and_ Huygens _for not being influenced by the false taste, which then
-began to prevail. He used to commend the laudable attempt of_ Hugo
-de Omerique _to restore the ancient analysis, and very much esteemed
-Apollonius’s book De sectione rationis for giving us a clearer notion
-of that analysis than we had before. Dr._ Barrow _may be esteemed as
-having shewn a compass of invention equal, if not superior to any of
-the moderns, our author only excepted; but Sir_ ~ISAAC NEWTON~ _has
-several times particularly recommended to me_ Huygens_’s stile and
-manner. He thought him the most elegant of any mathematical writer of
-modern times, and the most just imitator of the antients. Of their
-taste, and form of demonstration Sir_ ~ISAAC~ _always professed
-himself a great admirer: I have heard him even censure himself for
-not following them yet more closely than he did; and speak with
-regret of his mistake at the beginning of his mathematical studies,
-in applying himself to the works of_ Des Cartes _and other algebraic
-writers, before he had considered the elements of_ Euclide _with that
-attention, which so excellent a writer deserves. As to the history
-of his inventions, what relates to his discoveries of the methods of
-series and fluxions, and of his theory of light and colours, the world
-has been sufficiently informed of already. The first thoughts, which
-gave rise to his Principia, he had, when he retired from_ Cambridge
-_in 1666 on account of the plague. As he sat alone in a garden, he
-fell into a speculation on the power of gravity: that as this power
-is not found sensibly diminished at the remotest distance from the
-center of the earth, to which we can rise, neither at the tops of the
-loftiest buildings, nor even on the summits of the highest mountains;
-it appeared to him reasonable to conclude, that this power must extend
-much farther than was usually thought; why not as high as the moon,
-said he to himself? and if so, her motion must be influenced by it;
-perhaps she is retained in her orbit thereby. However, though the power
-of gravity is not sensibly weakened in the little change of distance,
-at which we can place our selves from the center of the earth; yet it
-is very possible, that so high as the moon this power may differ much
-in strength from what it is here. To make an estimate, what might be
-the degree of this diminution, he considered with himself, that if the
-moon be retained in her orbit by the force of gravity, no doubt the
-primary planets are carried round the sun by the like power. And by
-comparing the periods of the several planets with their distances from
-the sun, he found, that if any power like gravity held them in their
-courses, its strength must decrease in the duplicate proportion of the
-increase of distance. This be concluded by supposing them to move in
-perfect circles concentrical to the sun, from which the orbits of the
-greatest part of them do not much differ. Supposing therefore the power
-of gravity, when extended to the moon, to decrease in the same manner,
-he computed whether that force would be sufficient to keep the moon
-in her orbit. In this computation, being absent from books, he took
-the common estimate in use among geographers and our seamen, before_
-Norwood _had measured the earth, that 60 English miles were contained
-in one degree of latitude on the surface of the earth. But as this is
-a very faulty supposition, each degree containing about 69½ of our
-miles, his computation did not answer expectation; whence he concluded,
-that some other cause must at least join with the action of the power
-of gravity on the moon. On this account he laid aside for that time
-any farther thoughts upon this matter. But some years after, a letter
-which he received from Dr._ Hook, _put him on inquiring what was the
-real figure, in which a body let fall from any high place descends,
-taking the motion of the earth round its axis into consideration.
-Such a body, having the same motion, which by the revolution of the
-earth the place has whence it falls, is to be considered as projected
-forward and at the same time drawn down to the center of the earth.
-This gave occasion to his resuming his former thoughts concerning the
-moon; and_ Picart _in_ France _having lately measured the earth, by
-using his measures the moon appeared to be kept in her orbit purely by
-the power of gravity; and consequently, that this power decreases as
-you recede from the center of the earth in the manner our author had
-formerly conjectured. Upon this principle he found the line described
-by a falling body to be an ellipsis, the center of the earth being one
-focus. And the primary planets moving in such orbits round the sun, he
-had the satisfaction to see, that this inquiry, which he had undertaken
-merely out of curiosity, could be applied to the greatest purposes.
-Hereupon he composed near a dozen propositions relating to the motion
-of the primary planets about the sun. Several years after this, some
-discourse he had with Dr._ Halley, _who at Cambridge made him a
-visit, engaged Sir_ ~ISAAC NEWTON~ _to resume again the consideration
-of this subject; and gave occasion to his writing the treatise
-which he published under the title of mathematical principles of
-natural philosophy. This treatise, full of such a variety of profound
-inventions, was composed by him from scarce any other materials than
-the few propositions before mentioned, in the space of one year and an
-half._
-
-_Though his memory was much decayed, I found he perfectly understood
-his own writings, contrary to what I had frequently heard in discourse
-from many persons. This opinion of theirs might arise perhaps from his
-not being always ready at speaking on these subjects, when it might
-be expected he should. But as to this, it may be observed, that great
-genius’s are frequently liable to be absent, not only in relation to
-common life, but with regard to some of the parts of science they are
-the best informed of. Inventors seem to treasure up in their minds,
-what they have found out, after another manner than those do the same
-things, who have not this inventive faculty. The former, when they
-have occasion to produce their knowledge, are in some measure obliged
-immediately to investigate part of what they want. For this they are
-not equally fit at all times: so it has often happened, that such as
-retain things chiefly by means of a very strong memory, have appeared
-off hand more expert than the discoverers themselves._
-
-_As to the moral endowments of his mind, they were as much to be
-admired as his other talents. But this is a field I leave others to
-exspatiate in. I only touch upon what I experienced myself during
-the few years I was happy in his friendship. But this I immediately
-discovered in him, which at once both surprized and charmed me: Neither
-his extreme great age, nor his universal reputation had rendred him
-stiff in opinion, or in any degree elated. Of this I had occasion
-to have almost daily experience. The Remarks I continually sent him
-by letters on his Principia were received with the utmost goodness.
-These were so far from being any ways displeasing to him, that on
-the contrary it occasioned him to speak many kind things of me to my
-friends, and to honour me with a publick testimony of his good opinion.
-He also approved of the following treatise, a great part of which we
-read together. As many alterations were made in the late edition of
-his Principia, so there would have been many more if there had been
-a sufficient time. But whatever of this kind may be thought wanting,
-I shall endeavour to supply in my comment on that book. I had reason
-to believe he expected such a thing from me, and I intended to have
-published it in his life time, after I had printed the following
-discourse, and a mathematical treatise Sir_ ~ISAAC NEWTON~ _had written
-a long while ago, containing the first principles of fluxions, for I
-had prevailed on him to let that piece go abroad. I had examined all
-the calculations, and prepared part of the figures; but as the latter
-part of the treatise had never been finished, he was about letting me
-have other papers, in order to supply what was wanting. But his death
-put a stop to that design. As to my comment on the Principia, I intend
-there to demonstrate whatever Sir_ ~ISAAC NEWTON~ _has set down without
-express proof, and to explain all such expressions in his book, as
-I shall judge necessary. This comment I shall forthwith put to the
-press, joined to an english translation of his Principia, which I have
-had some time by me. A more particular account of my whole design has
-already been published in the new memoirs of literature for the month
-of march 1727._
-
-_I have presented my readers with a copy of verses on Sir_ ~ISAAC
-NEWTON~, _which I have just received from a young Gentleman, whom I am
-proud to reckon among the number of my dearest friends. If I had any
-apprehension that this piece of poetry stood in need of an apology,
-I should be desirous the reader might know, that the author is but
-sixteen years old, and was obliged to finish his composition in a very
-short space of time. But I shall only take the liberty to observe, that
-the boldness of the digressions will be best judged of by those who are
-acquainted with_ ~PINDAR~.
-
-
-
-
-                                   A
-                                ~POEM~
-                                  ON
-                         Sir ~_ISAAC NEWTON_~.
-
-
-  TO ~NEWTON~’s genius, and immortal fame
-  Th’ advent’rous muse with trembling pinion soars.
-  Thou, heav’nly truth, from thy seraphick throne
-  Look favourable down, do thou assist
-  My lab’ring thought, do thou inspire my song.
-  NEWTON, who first th’ almighty’s works display’d,
-  And smooth’d that mirror, in whose polish’d face
-  The great creator now conspicuous shines;
-  Who open’d nature’s adamantine gates,
-  And to our minds her secret powers expos’d;
-  NEWTON demands the muse; his sacred hand
-  Shall guide her infant steps; his sacred hand
-  Shall raise her to the Heliconian height,
-  Where, on its lofty top inthron’d, her head
-  Shall mingle with the Stars. Hail nature, hail,
-  O Goddess, handmaid of th’ ethereal power,
-  Now lift thy head, and to th’ admiring world
-  Shew thy long hidden beauty. Thee the wise
-  Of ancient fame, immortal ~PLATO~’s self,
-  The Stagyrite, and Syracusian sage,
-  From black obscurity’s abyss to raise,
-  (Drooping and mourning o’er thy wondrous works)
-  With vain inquiry sought. Like meteors these
-  In their dark age bright sons of wisdom shone:
-  But at thy ~NEWTON~ all their laurels fade,
-  They shrink from all the honours of their names.
-  So glimm’ring stars contract their feeble rays,
-  When the swift lustre of ~AURORA~’s face
-  Flows o’er the skies, and wraps the heav’ns in light.
-
-  THE Deity’s omnipotence, the cause,
-  Th’ original of things long lay unknown.
-  Alone the beauties prominent to sight
-  (Of the celestial power the outward form)
-  Drew praise and wonder from the gazing world.
-  As when the deluge overspread the earth,
-  Whilst yet the mountains only rear’d their heads
-  Above the surface of the wild expanse,
-  Whelm’d deep below the great foundations lay,
-  Till some kind angel at heav’n’s high command
-  Roul’d back the rising tides, and haughty floods,
-  And to the ocean thunder’d out his voice:
-  Quick all the swelling and imperious waves,
-  The foaming billows and obscuring surge,
-  Back to their channels and their ancient seats
-  Recoil affrighted: from the darksome main
-  Earth raises smiling, as new-born, her head,
-  And with fresh charms her lovely face arrays.
-  So his extensive thought accomplish’d first
-  The mighty task to drive th’ obstructing mists
-  Of ignorance away, beneath whose gloom
-  Th’ inshrouded majesty of Nature lay.
-  He drew the veil and swell’d the spreading scene.
-  How had the moon around th’ ethereal void
-  Rang’d, and eluded lab’ring mortals care,
-  Till his invention trac’d her secret steps,
-  While she inconstant with unsteady rein
-  Through endless mazes and meanders guides
-  In its unequal course her changing carr:
-  Whether behind the sun’s superior light
-  She hides the beauties of her radiant face,
-  Or, when conspicuous, smiles upon mankind,
-  Unveiling all her night-rejoicing charms.
-  When thus the silver-tressed moon dispels
-  The frowning horrors from the brow of night,
-  And with her splendors chears the sullen gloom,
-  While sable-mantled darkness with his veil
-  The visage of the fair horizon shades,
-  And over nature spreads his raven wings;
-  Let me upon some unfrequented green
-  While sleep sits heavy on the drowsy world,
-  Seek out some solitary peaceful cell,
-  Where darksome woods around their gloomy brows
-  Bow low, and ev’ry hill’s protended shade
-  Obscures the dusky vale, there silent dwell,
-  Where contemplation holds its still abode,
-  There trace the wide and pathless void of heav’n,
-  And count the stars that sparkle on its robe.
-  Or else in fancy’s wild’ring mazes lost
-  Upon the verdure see the fairy elves
-  Dance o’er their magick circles, or behold,
-  In thought enraptur’d with the ancient bards,
-  Medea’s baleful incantations draw
-  Down from her orb the paly queen of night.
-  But chiefly ~NEWTON~ let me soar with thee,
-  And while surveying all yon starry vault
-  With admiration I attentive gaze,
-  Thou shalt descend from thy celestial seat,
-  And waft aloft my high-aspiring mind,
-  Shalt shew me there how nature has ordain’d
-  Her fundamental laws, shalt lead my thought
-  Through all the wand’rings of th’ uncertain moon,
-  And teach me all her operating powers.
-  She and the sun with influence conjoint
-  Wield the huge axle of the whirling earth,
-  And from their just direction turn the poles,
-  Slow urging on the progress of the years.
-  The constellations seem to leave their seats,
-  And o’er the skies with solemn pace to move.
-  You, splendid rulers of the day and night,
-  The seas obey, at your resistless sway
-  Now they contract their waters, and expose
-  The dreary desart of old ocean’s reign.
-  The craggy rocks their horrid sides disclose;
-  Trembling the sailor views the dreadful scene,
-  And cautiously the threat’ning ruin shuns.
-  But where the shallow waters hide the sands,
-  There ravenous destruction lurks conceal’d,
-  There the ill-guided vessel falls a prey,
-  And all her numbers gorge his greedy jaws.
-  But quick returning see th’ impetuous tides
-  Back to th’ abandon’d shores impell the main.
-  Again the foaming seas extend their waves,
-  Again the rouling floods embrace the shoars,
-  And veil the horrours of the empty deep.
-  Thus the obsequious seas your power confess,
-  While from the surface healthful vapours rise
-  Plenteous throughout the atmosphere diffus’d,
-  Or to supply the mountain’s heads with springs,
-  Or fill the hanging clouds with needful rains,
-  That friendly streams, and kind refreshing show’rs
-  May gently lave the sun-burnt thirsty plains,
-  Or to replenish all the empty air
-  With wholsome moisture to increase the fruits
-  Of earth, and bless the labours of mankind.
-  O ~NEWTON~, whether flies thy mighty soul,
-  How shall the feeble muse pursue through all
-  The vast extent of thy unbounded thought,
-  That even seeks th’ unseen recesses dark
-  To penetrate of providence immense.
-  And thou the great dispenser of the world
-  Propitious, who with inspiration taught’st
-  Our greatest bard to send thy praises forth;
-  Thou, who gav’st ~NEWTON~ thought; who smil’dst serene,
-  When to its bounds he stretch’d his swelling soul;
-  Who still benignant ever blest his toil,
-  And deign’d to his enlight’ned mind t’ appear
-  Confess’d around th’ interminated world:
-  To me O thy divine infusion grant
-  (O thou in all so infinitely good)
-  That I may sing thy everlasting works,
-  Thy inexhausted store of providence,
-  In thought effulgent and resounding verse.
-  O could I spread the wond’rous theme around,
-  Where the wind cools the oriental world,
-  To the calm breezes of the Zephir’s breath,
-  To where the frozen hyperborean blasts.
-  To where the boist’rous tempest-leading south
-  From their deep hollow caves send forth their storms.
-  Thou still indulgent parent of mankind,
-  Left humid emanations should no more
-  Flow from the ocean, but dissolve away
-  Through the long series of revolving time;
-  And left the vital principle decay,
-  By which the air supplies the springs of life;
-  Thou hast the fiery visag’d comets form’d
-  With vivifying spirits all replete,
-  Which they abundant breathe about the void,
-  Renewing the prolifick soul of things.
-  No longer now on thee amaz’d we call,
-  No longer tremble at imagin’d ills,
-  When comets blaze tremendous from on high,
-  Or when extending wide their flaming trains
-  With hideous grasp the skies engirdle round,
-  And spread the terrors of their burning locks.
-  For these through orbits in the length’ning space
-  Of many tedious rouling years compleat
-  Around the sun move regularly on;
-  And with the planets in harmonious orbs,
-  And mystick periods their obeysance pay
-  To him majestick ruler of the skies
-  Upon his throne of circled glory fixt.
-  He or some god conspicuous to the view,
-  Or else the substitute of nature seems,
-  Guiding the courses of revolving worlds.
-  He taught great ~NEWTON~ the all-potent laws
-  Of gravitation, by whose simple power
-  The universe exists. Nor here the sage
-  Big with invention still renewing staid.
-  But O bright angel of the lamp of day,
-  How shall the muse display his greatest toil?
-  Let her plunge deep in Aganippe’s waves,
-  Or in Castalia’s ever-flowing stream,
-  That re-inspired she may sing to thee,
-  How ~NEWTON~ dar’d advent’rous to unbraid
-  The yellow tresses of thy shining hair.
-  Or didst thou gracious leave thy radiant sphere,
-  And to his hand thy lucid splendours give,
-  T’ unweave the light-diffusing wreath, and part
-  The blended glories of thy golden plumes?
-  He with laborious, and unerring care,
-  How different and imbodied colours form
-  Thy piercing light, with just distinction found.
-  He with quick sight pursu’d thy darting rays,
-  When penetrating to th’ obscure recess
-  Of solid matter, there perspicuous saw,
-  How in the texture of each body lay
-  The power that separates the different beams.
-  Hence over nature’s unadorned face
-  Thy bright diversifying rays dilate
-  Their various hues: and hence when vernal rains
-  Descending swift have burst the low’ring clouds,
-  Thy splendors through the dissipating mists
-  In its fair vesture of unnumber’d hues
-  Array the show’ry bow. At thy approach
-  The morning risen from her pearly couch
-  With rosy blushes decks her virgin cheek;
-  The ev’ning on the frontispiece of heav’n
-  His mantle spreads with many colours gay;
-  The mid-day skies in radiant azure clad,
-  The shining clouds, and silver vapours rob’d
-  In white transparent intermixt with gold,
-  With bright variety of splendor cloath
-  All the illuminated face above.
-  When hoary-headed winter back retires
-  To the chill’d pole, there solitary sits
-  Encompass’d round with winds and tempests bleak
-  In caverns of impenetrable ice,
-  And from behind the dissipated gloom
-  Like a new Venus from the parting surge
-  The gay-apparell’d spring advances on;
-  When thou in thy meridian brightness sitt’st,
-  And from thy throne pure emanations flow
-  Of glory bursting o’er the radiant skies:
-  Then let the muse Olympus’ top ascend,
-  And o’er Thessalia’s plain extend her view,
-  And count, O Tempe, all thy beauties o’er.
-  Mountains, whose summits grasp the pendant clouds,
-  Between their wood-invelop’d slopes embrace
-  The green-attired vallies. Every flow’r
-  Here in the pride of bounteous nature clad
-  Smiles on the bosom of th’ enamell’d meads.
-  Over the smiling lawn the silver floods
-  Of fair Peneus gently roul along,
-  While the reflected colours from the flow’rs,
-  And verdant borders pierce the lympid waves,
-  And paint with all their variegated hue
-  The yellow sands beneath. Smooth gliding on
-  The waters hasten to the neighbouring sea.
-  Still the pleas’d eye the floating plain pursues;
-  At length, in Neptune’s wide dominion lost,
-  Surveys the shining billows, that arise
-  Apparell’d each in Phœbus’ bright attire:
-  Or from a far some tall majestick ship,
-  Or the long hostile lines of threat’ning fleets,
-  Which o’er the bright uneven mirror sweep,
-  In dazling gold and waving purple deckt;
-  Such as of old, when haughty Athens power
-  Their hideous front, and terrible array
-  Against Pallene’s coast extended wide,
-  And with tremendous war and battel stern
-  The trembling walls of Potidæa shook.
-  Crested with pendants curling with the breeze
-  The upright masts high bristle in the air,
-  Aloft exalting proud their gilded heads.
-  The silver waves against the painted prows
-  Raise their resplendent bosoms, and impearl
-  The fair vermillion with their glist’ring drops:
-  And from on board the iron-cloathed host
-  Around the main a gleaming horrour casts;
-  Each flaming buckler like the mid-day sun,
-  Each plumed helmet like the silver moon,
-  Each moving gauntlet like the light’ning’s blaze,
-  And like a star each brazen pointed spear.
-  But lo the sacred high-erected fanes,
-  Fair citadels, and marble-crowned towers,
-  And sumptuous palaces of stately towns
-  Magnificent arise, upon their heads
-  Bearing on high a wreath of silver light.
-  But see my muse the high Pierian hill,
-  Behold its shaggy locks and airy top,
-  Up to the skies th’ imperious mountain heaves
-  The shining verdure of the nodding woods.
-  See where the silver Hippocrene flows,
-  Behold each glitt’ring rivulet, and rill
-  Through mazes wander down the green descent,
-  And sparkle through the interwoven trees.
-  Here rest a while and humble homage pay,
-  Here, where the sacred genius, that inspir’d
-  Sublime ~MÆONIDES~ and ~PINDAR’S~ breast,
-  His habitation once was fam’d to hold.
-  Here thou, O ~HOMER~, offer’dst up thy vows,
-  Thee, the kind muse ~CALLIOPÆA~ heard,
-  And led thee to the empyrean feats,
-  There manifested to thy hallow’d eyes
-  The deeds of gods; thee wise ~MINERVA~ taught
-  The wondrous art of knowing human kind;
-  Harmonious ~PHŒBUS~ tun’d thy heav’nly mind,
-  And swell’d to rapture each exalted sense;
-  Even ~MARS~ the dreadful battle-ruling god,
-  ~MARS~ taught thee war, and with his bloody hand
-  Instructed thine, when in thy sounding lines
-  We hear the rattling of Bellona’s carr,
-  The yell of discord, and the din of arms.
-  ~PINDAR~, when mounted on his fiery steed,
-  Soars to the sun, opposing eagle like
-  His eyes undazled to the fiercest rays.
-  He firmly seated, not like ~GLAUCUS’~ son,
-  Strides his swift-winged and fire-breathing horse,
-  And born aloft strikes with his ringing hoofs
-  The brazen vault of heav’n, superior there
-  Looks down upon the stars, whose radiant light
-  Illuminates innumerable worlds,
-  That through eternal orbits roul beneath.
-  But thou all hail immortalized son
-  Of harmony, all hail thou Thracian bard,
-  To whom ~APOLLO~ gave his tuneful lyre.
-  O might’st thou, ~ORPHEUS~, now again revive,
-  And ~NEWTON~ should inform thy list’ning ear
-  How the soft notes, and soul-inchanting strains
-  Of thy own lyre were on the wind convey’d.
-  He taught the muse, how sound progressive floats
-  Upon the waving particles of air,
-  When harmony in ever-pleasing strains,
-  Melodious melting at each lulling fall,
-  With soft alluring penetration steals
-  Through the enraptur’d ear to inmost thought,
-  And folds the senses in its silken bands.
-  So the sweet musick, which from ~ORPHEUS~’ touch
-  And fam’d ~AMPHION’S~, on the sounding string
-  Arose harmonious, gliding on the air,
-  Pierc’d the tough-bark’d and knotty-ribbed woods,
-  Into their saps soft inspiration breath’d
-  And taught attention to the stubborn oak.
-  Thus when great ~HENRY~, and brave ~MARLB’ROUGH~ led
-  Th’ imbattled numbers of ~BRITANNIA’S~ sons,
-  The trump, that swells th’ expanded cheek of fame,
-  That adds new vigour to the gen’rous youth,
-  And rouzes sluggish cowardize it self,
-  The trumpet with its Mars-inciting voice,
-  The winds broad breast impetuous sweeping o’er
-  Fill’d the big note of war. Th’ inspired host
-  With new-born ardor press the trembling ~GAUL~;
-  Nor greater throngs had reach’d eternal night,
-  Not if the fields of Agencourt had yawn’d
-  Exposing horrible the gulf of fate;
-  Or roaring Danube spread his arms abroad,
-  And overwhelm’d their legions with his floods.
-  But let the wand’ring muse at length return;
-  Nor yet, angelick genius of the sun,
-  In worthy lays her high-attempting song
-  Has blazon’d forth thy venerated name.
-  Then let her sweep the loud-resounding lyre
-  Again, again o’er each melodious string
-  Teach harmony to tremble with thy praise.
-  And still thine ear O favourable grant,
-  And she shall tell thee, that whatever charms,
-  Whatever beauties bloom on nature’s face,
-  Proceed from thy all-influencing light.
-  That when arising with tempestuous rage,
-  The North impetuous rides upon the clouds
-  Dispersing round the heav’ns obstructive gloom,
-  And with his dreaded prohibition stays
-  The kind effusion of thy genial beams;
-  Pale are the rubies on ~AURORA’S~ lips,
-  No more the roses blush upon her cheeks,
-  Black are Peneus’ streams and golden sands
-  In Tempe’s vale dull melancholy sits,
-  And every flower reclines its languid head.
-  By what high name shall I invoke thee, say,
-  Thou life-infusing deity, on thee
-  I call, and look propitious from on high,
-  While now to thee I offer up my prayer.
-  O had great ~NEWTON~, as he found the cause,
-  By which sound rouls thro’ th’ undulating air,
-  O had he, baffling times resistless power,
-  Discover’d what that subtle spirit is,
-  Or whatsoe’er diffusive else is spread
-  Over the wide-extended universe,
-  Which causes bodies to reflect the light,
-  And from their straight direction to divert
-  The rapid beams, that through their surface pierce.
-  But since embrac’d by th’ icy arms of age,
-  And his quick thought by times cold hand congeal’d,
-  Ev’n ~NEWTON~ left unknown this hidden power;
-  Thou from the race of human kind select
-  Some other worthy of an angel’s care,
-  With inspiration animate his breast,
-  And him instruct in these thy secret laws.
-  O let not ~NEWTON~, to whose spacious view,
-  Now unobstructed, all th’ extensive scenes
-  Of the ethereal ruler’s works arise;
-  When he beholds this earth he late adorn’d,
-  Let him not see philosophy in tears,
-  Like a fond mother solitary sit,
-  Lamenting him her dear, and only child.
-  But as the wise ~PYTHAGORAS~, and he,
-  Whose birth with pride the fam’d Abdera boasts,
-  With expectation having long survey’d
-  This spot their ancient seat, with joy beheld
-  Divine philosophy at length appear
-  In all her charms majestically fair,
-  Conducted by immortal ~NEWTON’S~ hand.
-  So may he see another sage arise,
-  That shall maintain her empire: then no more
-  Imperious ignorance with haughty sway
-  Shall stalk rapacious o’er the ravag’d globe:
-  Then thou, O ~NEWTON~, shalt protect these lines.
-  The humble tribute of the grateful muse;
-  Ne’er shall the sacrilegious hand despoil
-  Her laurel’d temples, whom his name preserves:
-  And were she equal to the mighty theme,
-  Futurity should wonder at her song;
-  Time should receive her with extended arms,
-  Seat her conspicuous in his rouling carr,
-  And bear her down to his extreamest bound.
-
-  ~FABLES~ with wonder tell how Terra’s sons
-  With iron force unloos’d the stubborn nerves
-  Of hills, and on the cloud-inshrouded top
-  Of Pelion Ossa pil’d. But if the vast
-  Gigantick deeds of savage strength demand
-  Astonishment from men, what then shalt thou,
-  O what expressive rapture of the soul,
-  When thou before us, ~NEWTON~, dost display
-  The labours of thy great excelling mind;
-  When thou unveilest all the wondrous scene,
-  The vast idea of th’ eternal king,
-  Not dreadful bearing in his angry arm
-  The thunder hanging o’er our trembling heads;
-  But with th’ effulgency of love replete,
-  And clad with power, which form’d th’ extensive heavens.
-  O happy he, whose enterprizing hand
-  Unbars the golden and relucid gates
-  Of th’ empyrean dome, where thou enthron’d
-  Philosophy art seated. Thou sustain’d
-  By the firm hand of everlasting truth
-  Despisest all the injuries of time;
-  Thou never know’st decay when all around,
-  Antiquity obscures her head. Behold
-  Th’ Egyptian towers, the Babylonian walls,
-  And Thebes with all her hundred gates of brass,
-  Behold them scatter’d like the dust abroad.
-  Whatever now is flourishing and proud,
-  Whatever shall, must know devouring age.
-  Euphrates’ stream, and seven-mouthed Nile,
-  And Danube, thou that from Germania’s soil
-  To the black Euxine’s far remoted shore,
-  O’er the wide bounds of mighty nations sweep’st
-  In thunder loud thy rapid floods along.
-  Ev’n you shall feel inexorable time;
-  To you the fatal day shall come; no more
-  Your torrents then shall shake the trembling ground,
-  No longer then to inundations swol’n
-  Th’ imperious waves the fertile pastures drench,
-  But shrunk within a narrow channel glide;
-  Or through the year’s reiterated course
-  When time himself grows old, your wond’rous streams
-  Lost ev’n to memory shall lie unknown
-  Beneath obscurity, and Chaos whelm’d,
-  But still thou sun illuminatest all
-  The azure regions round, thou guidest still
-  The orbits of the planetary spheres;
-  The moon still wanders o’er her changing course,
-  And still, O ~NEWTON~, shall thy name survive:
-  As long as nature’s hand directs the world,
-  When ev’ry dark obstruction shall retire,
-  And ev’ry secret yield its hidden store,
-  Which thee dim-sighted age forbad to see
-  Age that alone could stay thy rising soul.
-  And could mankind among the fixed stars,
-  E’en to th’ extremest bounds of knowledge reach,
-  To those unknown innumerable suns,
-  Whose light but glimmers from those distant worlds,
-  Ev’n to those utmost boundaries, those bars
-  That shut the entrance of th’ illumin’d space
-  Where angels only tread the vast unknown,
-  Thou ever should’st be seen immortal there:
-  In each new sphere, each new-appearing sun,
-  In farthest regions at the very verge
-  Of the wide universe should’st thou be seen.
-  And lo, th’ all-potent goddess ~NATURE~ takes
-  With her own hand thy great, thy just reward
-  Of immortality; aloft in air
-  See she displays, and with eternal grasp
-  Uprears the trophies of great ~NEWTON~’s fame.
-
-  R. GLOVER.
-
-  THE
-  ~CONTENTS.~
-
-  _INTRODUCTION concerning Sir_ ~ISAAC NEWTON~’_s
-  method of reasoning in philosophy_                      pag.    1
-
-
-  BOOK I.
-
-  ~CHAP. 1.~ _Of the laws of motion_
-  _The first law of motion proved_                           p.  29
-  _The second law of motion proved_                          p.  29
-  _The third law of motion proved_                           p.  31
-
-  ~CHAP. 2.~ _Further proofs of the laws of motion_
-  _The effects of percussion_                                p.  49
-  _The perpendicular descent of bodies_                      p.  55
-  _The oblique descent of bodies in a straight line_         p.  57
-  _The curvilinear descent of bodies_                        p.  58
-  _The perpendicular ascent of bodies_                       ibid.
-  _The oblique ascent of bodies_                             p.  59
-  _The power of gravity proportional to the quantity of
-      matter in each body_                                   p.  60
-  _The centre of gravity of bodies_                          p.  62
-  _The mechanical powers_                                    p.  69
-      _The lever_                                            p.  71
-      _The wheel and axis_                                   p.  77
-      _The pulley_                                           p.  80
-      _The wedge_                                            p.  83
-      _The screw_                                            ibid.
-      _The inclined plain_                                   p.  84
-    _The pendulum_                                           p.  86
-      _Vibrating in a circle_                                ibid.
-      _Vibrating in a cycloid_                               p.  91
-    _The line of swiftest descent_                           p.  93
-    _The centre of oscillation_                              p.  94
-    _Experiments upon the percussion of bodies made
-        by pendulums_                                        p.  98
-    _The centre of percussion_                               p. 100
-    _The motion of projectiles_                              p. 102
-    _The description of the conic sections_                  p. 106
-    _The difference between absolute and relative motion,
-        as also between absolute and relative time_          p. 112
-
-  ~CHAP. 3.~ _Of centripetal forces_                p. 117
-
-  ~CHAP. 4.~ _Of the resistance of fluids_          p. 143
-    _Bodies are resisted in the duplicate proportion of
-        their velocities_                                    p. 147
-    _Of elastic fluids and their resistance_                 p. 149
-    _How fluids may be rendered elastic_                     p. 150
-    _The degree of resistance in regard to the proportion
-        between the density of the body and of the fluid_
-      _In rare and uncompressed fluids_                      p. 153
-      _In compressed fluids_                                 p. 155
-    _The degree of resistance as it depends upon the figure
-        of bodies_
-      _In rare and uncompressed fluids_                      p. 155
-      _In compressed fluids_                                 p. 158
-
-
-  BOOK II.
-
-  ~CHAP. 1.~ _That the planets move in a space
-      empty of sensible matter_                              p. 161
-    _The system of the world described_                      p. 162
-    _The planets suffer no sensible resistance in their
-        motion_                                              p. 166
-    _They are not kept in motion by a fluid_                 p. 168
-    _That all space is not full of matter without vacancies_ p. 169
-
-  ~CHAP. 2.~ _Concerning the cause that keeps in
-        motion the primary planets_                          p. 171
-    _They are influenced by a centripetal power directed to
-        the sun_                                             p. 171
-    _The strength of this power is reciprocally in the
-        duplicate proportion of the distance_                 ibid.
-    _The cause of the irregularities in the motions of the
-        planets_                                             p. 175
-    _A correction of their motions_                          p. 178
-    _That the frame of the world is not eternal_             p. 180
-
-  ~CHAP. 3.~ _Of the motion of the moon and the other
-      secondary planets_
-    _That they are influenced by a centripetal force
-        directed toward their primary, as the primary are
-        influenced by the sun_                               p. 182
-    _That the power usually called gravity extends to
-        the moon_                                            p. 189
-    _That the sun acts on the secondary planets_             p. 190
-    _The variation of the moon_                              p. 193
-    _That the circuit of the moons orbit is increased by the
-        sun in the quarters, and diminished in the
-        conjunction and opposition_                          p. 198
-    _The distance of the moon from the earth in the quarters
-        and in the conjunction and opposition is altered by
-        the sun_                                             p. 200
-    _These irregularities in the moon’s motion varied by the
-        change of distance between the earth and sun_        p. 201
-    _The period of the moon round the earth and her distance
-        varied by the same means_                             ibid.
-    _The motion of the nodes and the inclination of the
-        moons orbit_                                         p. 202
-    _The motion of the apogeon and change of the
-        eccentricity_                                        p. 218
-    _The inequalities of the other secondary planets
-        deducible from these of the moon_                    p. 229
-
-
-  ~CHAP. 4.~ _Of comets_
-
-    _They are not meteors, nor placed totally without the
-        planetary system_                                    p. 230
-    _The sun acts on them in the same manner as on the
-        planets_                                             p. 231
-    _Their orbits are near to parabola’s_                    p. 233
-    _The comet that appeared at the end of the year 1680,
-        probably performs its period in 575 years, and
-        another comet in 75 years_                           p. 234
-    _Why the comets move in planes more different from
-        one another than the planets_                        p. 235
-    _The tails of comets_                                    p. 238
-    _The use of them_                                    p. 243 244
-    _The possible use of the comet it self_              p. 245 246
-
-  ~CHAP. 5.~ _Of the bodies of the sun and planets_
-
-    _That each of the heavenly bodies is endued with an
-        attractive power, and that the force of the same
-        body on others is proportional to the quantity of
-        matter in the body attracted_                        p. 247
-    _This proved in the earth_                               p. 248
-      _In the sun_                                           p. 250
-      _In the rest of the planets_                           p. 251
-    _That the attractive power is of the same nature in
-        the sun and in all the planets, and therefore is
-        the same with gravity_                               p. 252
-    _That the attractive power in each of these bodies is
-        proportional to the quantity of matter in the body
-        attracting_                                           ibid.
-    _That each particle of which the sun and planets are
-        composed is endued with an attracting power, the
-        strength of which is reciprocally in the duplicate
-        proportion of the distance_                          p. 257
-
-    _The power of gravity universally belongs to all matter_ p. 259
-
-    _The different weight of the same body upon the surface
-        of the sun, the earth, Jupiter and Saturn; the
-        respective densities of these bodies, and the
-        proportion between their diameters_                  p. 261
-
-  ~CHAP. 6.~ _Of the fluid parts of the planets_
-
-    _The manner in which fluids press_                       p. 264
-    _The motion of waves on the surface of water_            p. 269
-    _The motion of sound through the air_                    p. 270
-    _The velocity of sound_                                  p. 282
-    _Concerning the tides_                                   p. 283
-    _The figure of the earth_                                p. 296
-    _The effect of this figure upon the power of gravity_    p. 300
-    _The effect it has upon pendulums_                       p. 302
-    _Bodies descend perpendicularly to the surface of
-        the earth_                                           p. 304
-    _The axis of the earth changes its direction twice a
-        year, and twice a month_                             p. 313
-    _The figure of the secondary planets_                     ibid.
-
-
-  BOOK III.
-
-  ~CHAP. 1.~ _Concerning the cause of colours
-                       inherent in the light_
-
-    _The sun’s light is composed of rays of different
-        colours_                                             p. 318
-    _The refraction of light_                            p. 319 320
-    _Bodies appear of different colour by day-light, because
-        some reflect one kind of light more copiously than
-        the rest, and other bodies other kinds of light_     p. 329
-    _The effect of mixing rays of different colours_         p. 334
-
-  ~CHAP. 2.~ _Of the properties of bodies whereon their
-      colours depend._
-
-    _Light is not reflected by impinging against the solid
-        parts of bodies_                                     p. 339
-    _The particles which compose bodies are transparent_     p. 341
-    _Cause of opacity_                                       p. 342
-    _Why bodies in the open day-light have different
-        colours_                                             p. 344
-    _The great porosity of bodies considered_                p. 355
-
-  ~CHAP. 3.~ _Of the refraction, reflection, and
-      inflection of light._
-
-    _Rays of different colours are differently refracted_    p. 357
-    _The sine of the angle of incidence in each kind of rays
-        bears a given proportion to the sine of refraction_  p. 361
-    _The proportion between the refractive powers in
-        different bodies_                                    p. 366
-    _Unctuous bodies refract most in proportion to their
-        density_                                             p. 368
-    _The action between light and bodies is mutual_          p. 369
-    _Light has alternate fits of easy transmission and
-        reflection_                                          p. 371
-    _The fits found to return alternately many thousand
-        times_                                               p. 375
-    _Why bodies reflect part of the light incident upon them
-        and transmit another part_                            ibid.
-    _Sir_ ~ISAAC NEWTON~_’s conjecture
-        concerning the cause of this alternate reflection
-        and transmission of light_                           p. 376
-    _The inflection of light_                                p. 377
-
-  ~CHAP. 4.~ _Of optic glasses._
-
-    _How the rays of light are refracted by a spherical
-        surface of glass_                                    p. 378
-    _How they are refracted by two such surfaces_            p. 380
-    _How the image of objects is formed by a convex glass_   p. 381
-    _Why convex glasses help the sight in old age, and
-        concave glasses assist short-sighted people_         p. 383
-    _The manner in which vision is performed by the eye_     p. 385
-    _Of telescopes with two convex glasses_                  p. 386
-    _Of telescopes with four convex glasses_                 p. 388
-    _Of telescopes with one convex and one concave glass_     ibid.
-    _Of microscopes_                                         p. 389
-    _Of the imperfection of telescopes arising from the
-        different refrangibility of the light_               p. 390
-    _Of the reflecting telescope_                            p. 393
-
-  ~CHAP. 5.~ _Of the rainbow_
-    _Of the inner rainbow_                       p. 394 395 398 399
-    _Of the outter bow_                              p. 396 397 400
-    _Of a particular appearance in the inner rainbow_        p. 401
-    _Conclusion_                                             p. 405
-
-
-
-
-~ERRATA.~
-
- PAGE 25. line 4. read _In these Precepts._ p. 40. l. 24. for _I_
- read _K_. p. 53. l. penult. f. Æ. r. F. p. 82. l. ult. f. 40. r. 41.
- p. 83 l. ult. f. 43. r. 45. p. 91. l. 3. f. 48. r. 50. ibid. l. 25.
- for 49. r. 51. p. 92. l. 18. f. _A G F E._ r. _H G F C._ p. 96. l.
- 23. dele the comma after {⅓}. p. 140. l. 12. dele _and._ p. 144. l.
- 15. f. _threefold._ r. _two-fold._ p. 162. l. 25. f. {⅓}. r. {⅞}. p.
- 193. 1. 2. r. _always._ p. 199. l. penult. and p. 200. l. 3. 5. f. F.
- r. C. p. 201. l. 8. f. _ascends._ r._ must ascend._ ibid. l. 10. f.
- _it descends._ r. _descend._ p. 208. l. 14. f. _W T O._ r. _N T O._
- In _fig._ 110. draw a line from _I_ through _T_, till it meets the
- circle _A D C B_, where place _W._ p. 216. l. penult. f. _action._
- r. _motion._ p. 221. l. 23. f. _A F._ r. _A H._ p. 232. l. 23. after
- _invention_ put a full point. p. 253. l. penult. delete the comma
- after _remarkable_. p. 255. l. ult. f. _D E._ r. _B E._ p. 278. l.
- 17. f. ξ τ. r. ξ π. p. 299. l. 19 r. _the._ p. 361. l. 12. f. I. r.
- t. p. 369. l. 2, 3. r. _Pseudo-topaz._ p. 378. l. 12. f. _that._ r.
- _than._ p. 379. l. 15. f. _converge._ r. _diverge._ p. 384. l. 7. f.
- _optic-glass._ r. _optic-nerve._ p. 391. l. 18. r. _as 50 to 78._ p.
- 392. l. 18. after _telescope_ add _be about 100 feet long and the._ in
- _fig. 161._ f. δ put ε. p. 399. l. 8. r. A n, A x. &c. p. 400. 1. 19.
- r. A π, A ρ. A σ, A τ. A φ. p. 401. l. 14. r. _fig. 163._ The pages
- 374, 375, 376 are erroneously numbered 375, 376, 377; and the pages
- 382, 383 are numbered 381, 382.
-
-
-
-
-  A LIST of such of the
-  SUBSCRIBERS NAMES
-  As are come to the ~HAND~ of the
-  AUTHOR.
-
-  A
-
-  M_Onseigneur_ d’Aguesseau, _Chancelier de_ France
-  _Reverend_ Mr Abbot, _of_ Emanuel Coll. Camb.
-  _Capt._ George Abell
-  _The Hon. Sir_ John Anstruther, _Bar._
-  Thomas Abney, _Esq;_
-  Mr. Nathan Abraham
-  _Sir_ Arthur Acheson, Bart.
-  Mr William Adair
-  _Rev._ Mr John Adams, _Fellow of_ Sidney Coll. Cambridge
-  Mr William Adams
-  Mr George Adams
-  Mr William Adamson, _Scholar of_ Caius Coll. Camb.
-  Mr Samuel Adee, _Fell. of_ Corp.  Chr. Coll. Oxon
-  Mr Andrew Adlam
-  Mr John Adlam
-  Mr Stephen Ainsworth
-  Mrs Aiscot
-  Mr Robert Akenhead, _Bookseller at_ Newcastle _upon_ Tyne
-  S. B. Albinus, M. D. Anatom. _and_ Chirurg _in_ Acad. L. B. Prof.
-  George Aldridge, _M. D._
-  Mr George Algood
-  Mr Aliffe
-  Robert Allen, _Esq;_
-  Mr Zach. Allen
-  _Rev._ Mr Allerton, _Fellow of_ Sidney Coll. Cambridge
-  Mr St. Amand
-  Mr John Anns
-  Thomas Anson, _Esq;_
-  _Rev. Dr._ Christopher Anstey
-  Mr Isaac Antrabus
-  Mr Joshua Appleby
-  John Arbuthnot, _M. D._
-  William Archer, _Esq;_
-  Mr John Archer, _Merchant of_ Amsterdam
-  Thomas Archer, _Esq;_
-  _Coll._ John Armstrong, Surveyor-General _of_ His Majesty’s Ordnance
-  Mr Armytage
-  Mr Street Arnold, _Surgeon_
-  Mr Richard Arnold
-  Mr Ascough
-  Mr Charles Asgill
-  Richard Ash, _Esq; of_ Antigua
-  Mr Ash, _Fellow-Commoner of_ Jesus Coll. Cambridge
-  William Ashurst, _Esq; of_ Castle Henningham, Essex
-  Mr Thomas Ashurst
-  Mr Samuel Ashurst
-  Mr John Askew, _Merchant_
-  Mr Edward Athawes, _Merchant_
-  Mr Abraham Atkins
-  Mr Edward Kensey Atkins
-  Mr Ayerst
-  Mr Jonathan Ayleworth, _Jun._
-  Rowland Aynsworth, _Esq;_
-
-
-  B
-
-  _His Grace the Duke of_ Bedford
-  _Right Honourable the Marquis of_ Bowmont
-  _Right Hon. the Earl of_ Burlington
-  _Right Honourable Lord Viscount_ Bateman
-  _Rt. Rev. Ld. Bp. of_ Bath _and_ Wells
-  _Rt. Rev. Lord Bishop of_ Bristol
-  _Right Hon. Lord_ Bathurst
-  Richard Backwell, _Esq;_
-  Mr William Backshell, _Merch._
-  Edmund Backwell, _Gent._
-  _Sir_ Edmund Bacon
-  Richard Bagshaw, _of_ Oakes, _Esq;_
-  Tho. Bagshaw, _of_ Bakewell, _Esq;_
-  _Rev._ Mr. Bagshaw
-  _Sir_ Robert Baylis
-  _Honourable_ George Baillie, _Esq;_
-  Giles Bailly, _M. D. of_ Bristol
-  Mr Serjeant Baines
-  _Rev._ Mr. Samuel Baker, _Residen. of St._ Paul’s.
-  Mr George Baker
-  Mr Francis Baker
-  Mr Robert Baker
-  Mr John Bakewell
-  Anthony Balam, _Esq;_
-  Charles Bale, _M. D._
-  Mr Atwell, _Fellow of_ Exeter Coll. Oxon
-  Mr Savage Atwood
-  Mr John Atwood
-  Mr James Audley
-  _Sir_ Robert Austen, _Bart._
-  _Sir_ John Austen
-  Benjamin Avery, _L. L. D._
-  Mr Balgay
-  _Rev._ Mr Tho. Ball, _Prebendary of_ Chichester
-  Mr Pappillon Ball, _Merchant_
-  Mr Levy Ball
-  _Rev._ Mr Jacob Ball, _of_ Andover
-  _Rev._ Mr Edward Ballad, _of_ Trin. Coll. Cambridge
-  Mr Baller
-  John Bamber, _M. D._
-  _Rev._ Mr Banyer, _Fellow of_ Emanuel Coll. Cambridge
-  Mr Henry Banyer, _of_ Wisbech, _Surgeon_
-  Mr John Barber, _Apothecary in_ Coventry
-  Henry Steuart Barclay, _of_ Colairny, _Esq;_
-  _Rev._ Mr Barclay, _Canon of_ Windsor
-  Mr David Barclay
-  Mr Benjamin Barker, _Bookseller in_ London
-  ---- Barker, _Esq;_
-  Mr Francis Barkstead
-  _Rev._ Mr Barnard
-  Thomas Barrett, _Esq;_
-  Mr Barrett
-  Richard Barret, _M. D._
-  Mr Barrow, _Apothecary_
-  William Barrowby, _M. D._
-  Edward Barry, _M. D. of_ Corke
-  Mr Humphrey Bartholomew, _of_ University College, Oxon
-  Mr Benjamin Bartlett
-  Mr Henry Bartlett
-  Mr James Bartlett
-  Mr Newton Barton, _of_ Trinity College, Cambridge
-  _Rev._ Mr. Barton
-  William Barnsley, _Esq;_
-  Mr Samuel Bateman
-  Mr Thomas Bates
-  Peter Barhurst, _Esq;_
-  Mark Barr, _Esq;_
-  Thomas Bast, _Esq;_
-  Mr Batley, _Bookseller in_ London
-  Mr Christopher Batt, _jun._
-  Mr William Batt, _Apothecary_
-  Rev. Mr Battely, _M. A. Student of_ Christ Church, Oxon
-  Mr Edmund Baugh
-  _Rev._ Mr. Thomas Bayes
-  Edward Bayley, _M. D. of_ Havant
-  John Bayley, _M. D. of_ Chichester
-  Mr. Alexander Baynes, _Professor of Law in the University of_
-        Edinburgh
-  Mr Benjamin Beach
-  Thomas Beacon, _Esq;_
-  _Rev._ Mr Philip Bearcroft
-  Mr Thomas Bearcroft
-  Mr William Beachcroft
-  Richard Beard, _M. D. of_ Worcester
-  Mr Joseph Beasley
-  _Rev._ Mr Beats, _M. A. Fellow of_ Magdalen College, Cambridge
-  _Sir_ George Beaumont
-  John Beaumont, _Esq; of_ Clapham
-  William Beecher, _of_ Howberry, _Esq;_
-  Mr Michael Beecher
-  Mr Finney Beifield, _of the_ Inner-Temple
-  Mr Benjamin Bell
-  Mr Humphrey Bell
-  Mr Phineas Bell
-  Leonard Belt, _Gent._
-  William Benbow, _Esq;_
-  Mr Martin Bendall
-  Mr George Bennet, _of_ Cork, _Bookseller_
-  Rev. Mr Martin Benson, _Archdeacon of_ Berks
-  Samuel Benson, _Esq;_
-  William Benson, _Esq;_
-  Rev. Richard Bently, _D. D. Master of_ Trinity Coll. Cambridge
-  Thomas Bere, _Esq;_
-  _The Hon._ John Berkley, _Esq;_
-  Mr Maurice Berkley, sen. _Surgeon_
-  John Bernard, _Esq;_
-  Mr Charles Bernard
-  Hugh Bethell, _of_ Rise _in_ Yorkshire, _Esq;_
-  Hugh Bethell, _of_ Swindon _in_ Yorkshire, _Esq;_
-  Mr Silvanus Bevan, _Apothecary_
-  Mr Calverly Bewick, jun.
-  Henry Bigg, _B. D._ Warden _of_ New College, Oxon
-  _Sir_ William Billers
-  ---- Billers, _Esq;_
-  Mr John Billingsley
-  Mr George Binckes
-  _Rev._ Mr Birchinsha, _of_ Exeter College, Oxon
-  _Rev._ Mr Richard Biscoe
-  Mr Hawley Bishop, _Fellow of St._ John’s College, Oxon
-  _Dr_ Bird, _of_ Reading
-  Henry Blaake, _Esq;_
-  Mr Henry Blaake
-  _Rev._ Mr George Black
-  Steward Blacker, _Esq;_
-  William Blacker, _Esq;_
-  Rowland Blackman, _Esq;_
-  _Rev._ Mr Charles Blackmore, _of_ Worcester
-  _Rev_ Mr Blackwall, _of_ Emanuel College, Cambridge
-  Jonathan Blackwel, _Esq;_
-  James Blackwood, _Esq;_
-  Mr Thomas Blandford
-  Arthur Blaney, _Esq;_
-  Mr James Blew
-  Mr William Blizard
-  _Dr_ Blomer
-  Mr Henry Blunt
-  Mr Elias Bocket
-  Mr Thomas Bocking
-  Mr Charles Boehm, _Merchant_
-  Mr William Bogdani
-  Mr John Du Bois, _Merchant_
-  Mr Samuel Du Bois
-  Mr Joseph Bolton, of Londonderry, _Esq;_
-  Mr John Bond
-  John Bonithon, _M. A._
-  Mr James Bonwick, _Bookseller in_ London
-  Thomas Boone, _Esq;_
-  _Rev._ Mr Pennystone, _M. A._
-  Mrs Judith Booth
-  Thomas Bootle, _Esq;_
-  Thomas Borret, _Esq;_
-  Mr Benjamin Boss
-  _Dr_ Bostock
-  Henry Bosville, _Esq;_
-  Mr John Bosworth
-  _Dr_ George Boulton
-  _Hon._ Bourn _M. D. of_ Chesterfield
-  Mrs Catherine Bovey
-  Mr Humphrey Bowen
-  Mr Bower
-  John Bowes, _Esq;_
-  William Bowles, _Esq;_
-  Mr John Bowles
-  Mr Thomas Bowles
-  Mr Duvereux Bowly
-  Duddington Bradeel, _Esq;_
-  Rev. Mr James Bradley, _Professor of_ Astronomy, _in_ Oxford
-  Mr Job Bradley, _Bookseller in_ Chesterfield
-  _Rev._ Mr John Bradley
-  _Rev._ Mr Bradshaw, _Fellow of_ Jesus College, Cambridge
-  Mr Joseph Bradshaw
-  Mr Thomas Blackshaw
-  Mr Robert Bragge
-  Champion Bramfield, _Esq;_
-  Joseph Brand, _Esq;_
-  Mr Thomas Brancker
-  Mr Thomas Brand
-  Mr Braxton
-  _Capt._ David Braymer
-  _Rev_ Mr Charles Brent, _of_ Bristol
-  Mr William Brent
-  Mr Edmund Bret
-  John Brickdale, _Esq;_
-  _Rev._ Mr John Bridgen _A. M._
-  Abraham Bridges, _Esq;_
-  George Briggs, _Esq;_
-  John Bridges, _Esq;_
-  Brook Bridges, _Esq;_
-  Orlando Bridgman, _Esq;_
-  Mr Charles Bridgman
-  Mr William Bridgman, _of_ Trinity College, Cambridge
-  _Sir_ Humphrey Briggs, _Bart._
-  Robert Bristol, _Esq;_
-  Mr Joseph Broad
-  Peter Brooke, _of_ Meer, _Esq;_
-  Mr Jacob Brook
-  Mr Brooke, _of_ Oriel Coll. Oxon
-  Mr Thomas Brookes
-  Mr James Brooks
-  William Brooks, _Esq;_
-  _Rev._ Mr William Brooks
-  Stamp Brooksbank, _Esq;_
-  Mr Murdock Broomer
-  William Brown, _Esq;_
-  Mr Richard Brown, _of_ Norwich
-  Mr William Brown, _of_ Hull
-  Mrs Sarah Brown
-  Mr John Browne
-  Mr John Browning, _of_ Bristol
-  Mr John Browning
-  Noel Broxholme, _M. D._
-  William Bryan, _Esq;_
-  _Rev._ Mr Brydam
-  Christopher Buckle, _Esq;_
-  Samuel Buckley, _Esq;_
-  Mr Budgen
-  _Sir_ John Bull
-  Josiah Bullock, _of_ Faulkbourn-Hall, Essex, _Esq;_
-  _Rev._ Mr Richard Bullock
-  _Rev._ Mr Richard Bundy
-  Mr Alexander Bunyan
-  _Rev._ Mr D. Burges
-  Ebenezer Burgess, _Esq;_
-  Robert Burleston, _M. B._
-  Gilbert Burnet, _Esq;_
-  Thomas Burnet, _Esq;_
-  _Rev._ Mr Gilbert Burnet
-  _His Excellency_ Will. Burnet, _Esq;_ Governour _of_ New-York
-  Mr Trafford Burnston, _of_ Trin. College, Cambridge
-  Peter Burrel _Esq;_
-  John Burridge, _Esq;_
-  James Burrough, _Esq;_ Beadle _and Fellow of_ Caius Coll. Cambr.
-  Mr Benjamin Burroughs
-  Jeremiah Burroughs, _Esq;_
-  _Rev._ Mr Joseph Burroughs
-  Christopher Burrow, _Esq;_
-  James Burrow, _Esq;_
-  William Burrow, _A. M._
-  Francis Burton, _Esq;_
-  John Burton, _Esq;_
-  Samuel Burton, _of_ Dublin, _Esq;_
-  William Burton, _Esq;_
-  Mr Burton.
-  Richard Burton, _Esq;_
-  _Dr_ Simon Burton
-  _Rev._ Mr Thomas Burton, _M.A. Fellow of_ Caius College, Cambridge
-  John Bury, jun. _Esq;_
-  _Rev._ Mr Samuel Bury
-  Mr William Bush
-  _Rev._ Mr Samuel Butler
-  Mr Joseph Button, _of_ Newcastle _upon_ Tyne
-  _Hon._ Edward Byam, _Governour of_ Antigua
-  Mr Edward Byam, _Merchant_
-  Mr John Byrom
-  Mr Duncumb Bristow, _Merch._
-  Mr William Bradgate
-
-  C
-
-  _His Grace the_ Archbishop _of_ Canterbury
-  _Right Hon. the Lord_ Chancellor
-  _His Grace the_ Duke _of_ Chandois
-  _The Right Hon. the Earl of_ Carlisle
-  _Right Hon._ Earl Cowper
-  _Rt. Rev. Lord Bishop of_ Carlisle
-  _Rt. Rev. Lord Bishop of_ Chichester
-  _Rt. Rev. Lord Bish. of_ Clousert _in_ Ireland
-  _Rt. Rev, Lord Bishop of_ Cloyne
-  _Rt. Hon. Lord_ Clinton
-  _Rt. Hon. Lord_ Chetwynd
-  _Rt. Hon. Lord_ James Cavendish
-  _The Hon. Lord_ Cardross
-  _Rt. Hon. Lord_ Castlemain
-  _Right Hon. Lord St._ Clare
-  Cornelius Callaghan, _Esq;_
-  Mr Charles Callaghan
-  Felix Calvert, _of_ Allbury, _Esq;_
-  Peter Calvert, _of_ Hunsdown _in_ Hertfordshire, _Esq;_
-  Mr William Calvert _of_ Emanuel College, Cambridge
-  _Reverend_ Mr John Cambden
-  John Campbell, _of_ Stackpole-Court, _in the County of_ Pembroke,
-        _Esq;_
-  Mrs Campbell, _of_ Stackpole-Court
-  Mrs. Elizabeth Caper
-  Mr Dellillers Carbonel
-  Mr John Carleton
-  Mr Richard Carlton, _of_ Chesterfield
-  Mr Nathaniel Carpenter
-  Henry Carr, _Esq;_
-  John Carr, _Esq;_
-  John Carruthers, _Esq;_
-  _Rev. Dr._ George Carter, _Provost of_ Oriel College
-  Mr Samuel Carter
-  _Honourable_ Edward Carteret, _Esq;_
-  Robert Cartes, jun. _in_ Virginia, _Esq;_
-  Mr William Cartlich
-  James Maccartney, _Esq;_
-  Mr Cartwright, _of_ Ainho
-  Mr William Cartwright, _of_ Trinity College, Cambridge
-  _Reverend_ Mr William Cary, _of_ Bristol
-  Mr Lyndford Caryl
-  Mr John Case
-  Mr John Castle
-  _Reverend_ Mr Cattle
-  _Hon._ William Cayley, _Consul at_ Cadiz, _Esq;_
-  William Chambers, _Esq;_
-  Mr Nehemiah Champion
-  Mr Richard Champion
-  Matthew Chandler, _Esq;_
-  Mr George Channel
-  Mr Channing
-  Mr Joseph Chappell, _Attorney at_ Bristol
-  Mr Rice Charlton, _Apothecary at_ Bristol
-  St. John Charelton, _Esq;_
-  Mr Richard Charelton
-  Mr Thomas Chase, _of_ Lisbon, _Merchant_
-  Robert Chauncey, _M. D._
-  Mr Peter Chauvel
-  Patricius Chaworth, _of_ Ansley, _Esq;_
-  Pole Chaworth _of the_ Inner Temple, _Esq;_
-  Mr William Cheselden, _Surgeon to her Majesty_
-  James Chetham, _Esq;_
-  Mr James Chetham
-  Charles Child, A. B. _of_ Clare-Hall, _in_ Cambridge, _Esq;_
-  Mr Cholmely, _Gentleman Commoner of_ New-College, Oxon
-  Thomas Church, _Esq;_
-  _Reverend_ Mr St. Clair
-  _Reverend_ Mr Matthew Clarke
-  Mr William Clark
-  Bartholomew Clarke, _Esq;_
-  Charles Clarke, _of_ Lincolns-Inn, _Esq;_
-  George Clarke, _Esq;_
-  Samuel Clarke, _of the_ Inner-Temple, _Esq;_
-  _Reverend_ Mr Alured Clarke, _Prebendary of_ Winchester
-  _Rev._ John Clarke, _D. D. Dean of_ Sarum
-  Mr John Clark, _A. B. of_ Trinity College, Cambridge
-  Matthew Clarke, _M. D._
-  _Rev._ Mr Renb. Clarke, _Rector of_ Norton, Leicestershire
-  _Rev._ Mr Robert Clarke, _of_ Bristol
-  _Rev._ Samuel Clarke, _D. D._
-  Mr Thomas Clarke, _Merchant_
-  Mr Thomas Clarke
-  _Rev._ Mr Clarkson, _of_ Peter-House, Cambridge
-  Mr Richard Clay
-  William Clayton, _of_ Marden, _Esq;_
-  Samuel Clayton, _Esq;_
-  Mr William Clayton
-  Mr John Clayton
-  Mr Thomas Clegg
-  Mr Richard Clements, _of_ Oxford, _Bookseller_
-  Theophilus Clements, _Esq;_
-  Mr George Clifford, _jun. of_ Amsterdam
-  George Clitherow, _Esq;_
-  George Clive, _Esq;_
-  _Dr._ Clopton, _of_ Bury
-  Stephen Clutterbuck, _Esq;_
-  Henry Coape, _Esq;_
-  Mr Nathaniel Coatsworth
-  _Rev._ Dr. Cobden, _Chaplain to the Bishop of_ London
-  _Hon. Col._ John Codrington, _of_ Wraxall, Somersetshire
-  _Right Hon._ Marmaduke Coghill, _Esq;_
-  Francis Coghlan, _Esq;_
-  Sir Thomas Coke
-  Mr Charles Colborn
-  Benjamin Cole, _Gent._
-  Dr Edward Cole
-  Mr Christian Colebrandt
-  James Colebrooke, _Esq;_
-  Mr William Coleman, _Merchant_
-  Mr Edward Collet
-  Mrs Henrietta Collet
-  Mr John Collet
-  Mrs Mary Collett
-  Mr Samuel Collet
-  Mr Nathaniel Collier
-  Anthony Collins, _Esq;_
-  Thomas Collins, _of_ Greenwich, _M. D._
-  Mr Peter Collinson
-  Edward Colmore, _Fellow of_ Magdalen College, Oxon
-  _Rev._ Mr John Colson
-  Mrs Margaret Colstock, _of_ Chichester
-  _Capt._ John Colvil
-  Renè de la Combe, _Esq;_
-  _Rev._ Mr John Condor
-  John Conduit, _Esq;_
-  John Coningham, _M. D._
-  _His Excellency_ William Conolly, _one of the Lords Justices of_
-        Ireland
-  Mr Edward Constable, _of_ Reading
-  _Rev._ Mr Conybeare, _M. A._
-  _Rev._ Mr James Cook
-  Mr John Cooke
-  Mr Benjamin Cook
-  William Cook, _B L. of St._ John’s College, Oxon
-  James Cooke, _Esq;_
-  John Cooke, _Esq;_
-  Mr Thomas Cooke
-  Mr William Cooke, _Fellow of St._ John’s College, Oxon
-  _Rev._ Mr Cooper, _of_ North-Hall
-  Charles Cope, _Esq;_
-  _Rev._ Mr Barclay Cope
-  Mr John Copeland
-  John Copland, _M. B._
-  Godfrey Copley, _Esq;_
-  Sir Richard Corbet, _Bar._
-  _Rev._ Mr Francis Corbett
-  Mr Paul Corbett
-  Mr Thomas Corbet
-  Henry Cornelisen, _Esq;_
-  _Rev._ Mr John Cornish
-  Mrs Elizabeth Cornwall
-  Library _of_ Corpus Christi College, Cambridge
-  Mr William Cossley, _of_ Bristol, _Bookseller_
-  Mr Solomon du Costa
-  _Dr._ Henry Costard
-  _Dr._ Cotes, _of_ Pomfret
-  Caleb Cotesworth, _M. D._
-  Peter Cottingham, _Esq;_
-  Mr John Cottington
-  _Sir_ John Hinde Cotton
-  Mr James Coulter
-  George Courthop, _of_ Whiligh _in_ Sussex, _Esq;_
-  Mr Peter Courthope
-  Mr John Coussmaker, _jun._
-  Mr Henry Coward, _Merchant_
-  Anthony Ashley Cowper, _Esq;_
-  _The Hon._ Spencer Cowper, _Esq; One of the Justices of the Court of_
-        Common Pleas
-  Mr Edward Cowper
-  _Rev._ Mr John Cowper
-  _Sir_ Charles Cox
-  Samuel Cox, _Esq;_
-  Mr Cox, _of_ New Coll. Oxon
-  Mr Thomas Cox
-  Mr Thomas Cradock, _M. A._
-  _Rev._ Mr John Craig
-  _Rev._ Mr John Cranston, _Archdeacon of_ Cloghor
-  John Crafter, _Esq;_
-  Mr John Creech
-  James Creed, _Esq;_
-  _Rev._ Mr William Crery
-  John Crew, _of_ Crew Hall, _in_ Cheshire, _Esq;_
-  Thomas Crisp, _Esq;_
-  Mr Richard Crispe
-  _Rev._ Mr Samuel Cuswick
-  Tobias Croft, _of_ Trinity College, Cambridge
-  Mr John Crook
-  _Rev._ Dr Crosse, _Master of_ Katherine Hall
-  Christopher Crowe, _Esq;_
-  George Crowl, _Esq;_
-  _Hon._ Nathaniel Crump, _Esq; of_ Antigua
-  Mrs Mary Cudworth
-  Alexander Cunningham, _Esq;_
-  Henry Cunningham, _Esq;_
-  Mr Cunningham
-  Dr Curtis _of_ Sevenoak
-  Mr William Curtis
-  Henry Curwen, _Esq;_
-  Mr John Caswall, _of_ London, _Merchant_
-  _Dr_ Jacob de Castro Sarmento
-
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-  D
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-  _His Grace the Duke of_ Devonshire
-  _His Grace the Duke of_ Dorset
-  _Right Rev. Ld. Bishop of_ Durham
-  _Right Rev. Ld. Bishop of St._ David
-  _Right Hon. Lord_ Delaware
-  _Right Hon. Lord_ Digby
-  _Right Rev. Lord Bishop of_ Derry
-  _Right Rev. Lord Bishop of_ Donne
-  _Rt. Rev. Lord Bishop of_ Dromore
-  _Right Hon._ Dalhn, _Lord Chief Baron of_ Ireland
-  Mr Thomas Dade
-  _Capt._ John Dagge
-  Mr Timothy Dallowe
-  Mr James Danzey, _Surgeon_
-  _Rev. Dr_ Richard Daniel, _Dean of_ Armagh
-  Mr Danvers
-  _Sir_ Coniers Darcy, _Knight of the_ Bath
-  Mr Serjeant Darnel
-  Mr Joseph Dash
-  Peter Davall, _Esq;_
-  Henry Davenant, _Esq;_
-  Davies Davenport, _of the_ Inner-Temple, _Esq;_
-  _Sir_ Jermyn Davers, _Bart._
-  _Capt._ Thomas Davers
-  Alexander Davie, _Esq;_
-  _Rev. Dr._ Davies, _Master of_ Queen’s College, Cambridge
-  Mr John Davies, _of_ Christ-Church, Oxon
-  Mr Davies, _Attorney at Law_
-  Mr William Dawkins, _Merch._
-  Rowland Dawkin, _of_ Glamorganshire, _Esq;_
-  Mr John Dawson
-  Edward Dawson, _Esq;_
-  Mr Richard Dawson
-  William Dawsonne, _Esq;_
-  Thomas Day, _Esq;_
-  Mr John Day
-  Mr Nathaniel Day
-  Mr Deacon
-  Mr William Deane
-  Mr James Dearden, _of_ Trinity College, Cambridge
-  Sir Matthew Deckers, _Bart._
-  Edward Deering, _Esq;_
-  Simon Degge, _Esq;_
-  Mr Staunton Degge, _A. B. of_ Trinity Col. Cambridge
-  _Rev. Dr_ Patrick Delaney
-  Mr Delhammon
-  _Rev._ Mr Denne
-  Mr William Denne
-  _Capt._ Jonathan Dennis
-  Daniel Dering, _Esq;_
-  Jacob Desboverie, _Esq;_
-  Mr James Deverell, _Surgeon in_ Bristol
-  _Rev._ Mr John Diaper
-  Mr Rivers Dickenson
-  _Dr._ George Dickens, _of_ Liverpool
-  _Hon._ Edward Digby, _Esq;_
-  Mr Dillingham
-  Mr Thomas Dinely
-  Mr Samuel Disney, _of_ Bennet College, Cambridge
-  Robert Dixon, _Esq;_
-  Pierce Dodd, _M. D._
-  _Right Hon._ Geo. Doddinton, _Esq;_
-  _Rev. Sir_ John Dolben, _of_ Findon, _Bart._
-  Nehemiah Donellan, _Esq;_
-  Paul Doranda, _Esq;_
-  James Douglas, _M. D._
-  Mr Richard Dovey, _A. B. of_ Wadham College, Oxon
-  John Dowdal, _Esq;_
-  William Mac Dowell, _Esq;_
-  Mr Peter Downer
-  Mr James Downes
-  _Sir_ Francis Henry Drake, _Knt._
-  William Drake, _of_ Barnoldswick-Cotes, _Esq;_
-  Mr Rich. Drewett, _of_ Fareham
-  Mr Christopher Drisfield, _of_ Christ-Church, Oxon
-  Edmund Dris, _A. M. Fellow of_ Trinity Coll. Cambridge
-  George Drummond, _Esq; Lord Provost of_ Edenburgh
-  Mr Colin Drummond, _Professor of Philosophy in the University of_
-        Edinburgh
-  Henry Dry, _Esq;_
-  Richard Ducane _Esq;_
-  _Rev. Dr_ Paschal Ducasse, _Dean of_ Ferns
-  George Ducket, _Esq;_
-  Mr Daniel Dufresnay
-  Mr Thomas Dugdale
-  Mr Humphry Duncalfe, _Merchant_
-  Mr James Duncan
-  John Duncombe, _Esq;_
-  Mr William Duncombe
-  John Dundass, _jun. of_ Duddinstown, _Esq;_
-  William Dunstar, _Esq;_
-  James Dupont, _of_ Trinity Coll. Cambridge
-
-
-  E
-
-  _Right Rev. and Right Hon. Lord_ Erskine
-  Theophilus, _Lord Bishop of_ Elphin
-  Mr Thomas Eames
-  _Rev._ Mr. Jabez Earle
-  Mr William East
-  _Sir_ Peter Eaton
-  Mr John Eccleston
-  James Eckerfall, _Esq;_
-  —— Edgecumbe, _Esq;_
-  _Rev._ Mr Edgley
-  _Rev. Dr_ Edmundson, _President of_ St. John’s Coll. Cambridge
-  Arthur Edwards, _Esq;_
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-        Pleas._
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-  _Right Rev._ Josiah, _Lord Bishop of_ Fernes _and_ Loghlin
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-  _Monsieur_ S’ Gravesande, _Professor of_ Astronomy _and_ Experim.
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-  _Rev._ Mr Hales
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-        _in_ Ox. Savilian.
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-  Mr John Hamerse
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-  _The Rt. Hon. Lord Viscount_ Molesworth
-  _The Rt. Hon. Lord_ Mansel
-  _The Rt. Hon. Ld._ Micklethwait
-  _The Rt. Rev. Ld. Bishop of_ Meath
-  Mr Mace
-  Mr Joseph Macham, _Merchant_
-  Mr John Machin, _Professor of_ Astronomy _in_ Gresham College
-  Mr Mackay
-  Mr Mackelcan
-  William Mackinen, _of_ Antigua, _Esq_;
-  Mr Colin Mac Laurin, _Professor of the_ Mathematicks _in the
-        University of_ Edinburgh
-  Galatius Macmahon, _Esq_;
-  Mr Madox, _Apothecary_
-  _Rev._ Mr Isaac Madox, _Prebendary of_ Chichester
-  Henry Mainwaring, _of_ Over-Peover _in_ Cheshire, _Esq_;
-  Mr Robert Mainwaring, _of_ London, _Merchant_
-  _Capt._ John Maitland
-  Mr Cecil Malcher
-  Sydenham Mallhust, _Esq_;
-  Richard Malone, _Esq_;
-  Mr Thomas Malyn
-  Mr John Mann
-  Mr William Man
-  _Dr._ Manaton
-  Mr John Mande
-  _Dr._ Bernard Mandeville
-  Mr James Mandy
-  _Rev._ Mr Bellingham Manleveror, _M. A. Rector of_ Mahera
-  Isaac Manley, _Esq_;
-  Thomas Manley, _of the_ Inner-Temple, _Esq_;
-  Mr John Manley
-  Mr William Manley
-  Mr Benjamin Manning
-  Rawleigh Mansel, _Esq_;
-  Henry March, _Esq_;
-  Mr John Marke
-  _Sir_ George Markham
-  Mr John Markham, _Apothecary_
-  Mr William Markes
-  Mr James Markwick
-  _Hon._ Thomas Marley, _Esq; one of his Majesty’s Sollicitors general
-        of_ Ireland
-  _Rev._ Mr George Marley
-  Mr Benjamin Marriot, _of the Exchequer_
-  John Marsh, _Esq_;
-  Mr Samuel Marsh
-  Robert Marshall, _Esq; Recorder of_ Clonmell
-  _Rev._ Mr Henry Marshall
-  _Rev._ Nathaniel Marshall, _D. D. Canon of_ Windsor
-  Matthew Martin, _Esq_;
-  Thomas Martin, _Esq_;
-  Mr John Martin
-  Mr James Martin
-  Mr Josiah Martin
-  _Coll._ Samuel Martin, _of_ Antigua
-  John Mason, _Esq_;
-  Mr John Mason, _of_ Greenwich
-  Mr Charles Mason, _M. A. Fell.  of_ Trin. Coll. Cambridge
-  Mr Cornelius Mason
-  _Dr._ Richard Middleton Massey
-  Mr Masterman
-  Robert Mather, _of the_ Middle-Temple, _Esq_;
-  Mr William Mathews
-  Rev. Mr Mathew
-  Mr John Matthews
-  Mrs Hester Lumbroso de Mattos
-  _Rev. Dr._ Peter Maturin, _Dean of_ Killala
-  William Maubry, _Esq_;
-  Mr Gamaliel Maud
-  _Rev._ Mr Peter Maurice, _Treasurer of the Ch. of_ Bangor
-  Henry Maxwell, _Esq_;
-  John Maxwell, _jun. of_ Pollock, _Esq_;
-  _Rev._ Dr. Robert Maxwell, _of_ Fellow’s Hall, Ireland
-  Mr May
-  Mr Thomas Mayleigh
-  Thomas Maylin, _jun. Esq_;
-  _Hon._ Charles Maynard, _Esq_;
-  Thomas Maynard, _Esq_;
-  _Dr._ Richard Mayo
-  Mr Samuel Mayo
-  Samuel Mead, _Esq_;
-  Richard Mead, _M. D._
-  _Rev._ Mr Meadowcourt
-  _Rev._ Mr Richard Meadowcourt, _Fellow of_ Merton Coll. Oxon
-  Mr Mearson
-  Mr George Medcalfe
-  Mr David Medley, 3 Books
-  Charles Medlycott, _Esq;_
-  _Sir_ Robert Menzies, _of_ Weem, _Bart._
-  Mr Thomas Mercer, _Merchant_
-  John Merrill, _Esq;_
-  Mr Francis Merrit
-  _Dr._ Mertins
-  Mr John Henry Mertins
-  _Library of_ Merton College
-  Mr William Messe, Apothecary
-  Mr Metcalf
-  Mr Thomas Metcalf, _of_ Trinity Coll. Cambridge
-  Mr Abraham Meure, _of_ Leatherhead in Surrey
-  Mr John Mac Farlane
-  _Dr._ John Michel
-  _Dr._ Robert Michel, _of_ Blandford
-  Mr Robert Michell
-  Nathaniel Micklethwait, _Esq;_
-  Mr Jonathan Micklethwait, _Merchant_
-  Mr John Midford, _Merchant_
-  Mr Midgley
-  _Rev._ Mr Miller, 2 Books
-  _Rev._ Mr Milling, _of_ the Hague
-  _Rev._ Mr Benjamin Mills
-  _Rev._ Mr Henry Mills, _Rector of_ Meastham, _Head-Master of_
-        Croyden-School
-  Thomas Milner, _Esq;_
-  Charles Milner, _M. D._
-  Mr William Mingay
-  John Misaubin, _M. D._
-  Mrs Frances Mitchel
-  David Mitchell, _Esq;_
-  Mr John Mitton
-  Mr Abraham de Moivre
-  John Monchton, _Esq;_
-  Mr John Monk, _Apothecary_
-  J. Monro, _M. D._
-  _Sir_ William Monson, _Bart._
-  Edward Montagu, _Esq;_
-  Colonel John Montagu
-  _Rev._ John Montague, _Dean of_ Durham, _D. D._
-  Mr Francis Moor
-  Mr Jarvis Moore
-  Mr Richard Moore, _of_ Hull, 3 Books
-  Mr William Moore
-  _Sir_ Charles Mordaunt, _of_ Walton, _in_ Warwickshire
-  Mr Mordant, _Gentleman Commoner of_ New College, Oxon
-  Charles Morgan, _Esq;_
-  Francis Morgan, _Esq;_
-  Morgan Morgan, _Esq;_
-  _Rev._ Mr William Morland, _Fell. of_ Trin. Coll. Cambr. 2 Books
-  Thomas Morgan, _M. D._
-  Mr John Morgan, _of_ Bristol
-  Mr Benjamin Morgan, _High-Master of_ St. Paul’s-School
-  _Hon. Coll._ Val. Morris, _of_ Antigua
-  Mr Gael Morris
-  Mr John Morse, _of_ Bristol
-  Hon. Ducey Morton, _Esq;_
-  Mr Motte
-  Mr William Mount
-  _Coll._ Moyser
-  _Dr._ Edward Mullins
-  Mr Joseph Murden
-  Mr Mustapha
-  Robert Myddleton, _Esq;_
-  Robert Myhil, _Esq;_
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-  _His Grace the Duke of_ Newcastle
-  _Rt. Rev. Ld. Bishop of_ Norwich
-  Stephen Napleton, _M. D._
-  Mr Robert Nash, _M. A. Fellow of_ Wadham College, Oxon
-  Mr Theophilus Firmin Nash
-  _Dr._ David Natto
-  Mr Anthony Neal
-  Mr Henry Neal, _of_ Bristol
-  Hampson Nedham, _Esq; Gentleman Commoner of_ Christ Church Oxon
-  _Rev. Dr._ Newcome, _Senior-Fellow of St._ John’s College, Cambridge,
-        6 Books
-  _Rev._ Mr Richard Newcome
-  Mr Henry Newcome
-  Mr Newland
-  _Rev._ Mr John Newey, _Dean of_ Chichester
-  Mr Benjamin Newington, _M. A._
-  John Newington, _M. B. of_ Greenwich in Kent
-  Mr Samuel Newman
-  Mrs Anne Newnham
-  Mr Nathaniel Newnham, _sen._
-  Mr Nathaniel Newnham, _jun._
-  Mr Thomas Newnham
-  Mrs Catherine Newnham
-  _Sir_ Isaac Newton, 12 Books
-  _Sir_ Michael Newton
-  Mr Newton
-  William Nicholas, _Esq;_
-  John Nicholas, _Esq;_
-  John Niccol, _Esq;_
-  _General_ Nicholson
-  Mr Samuel Nicholson
-  John Nicholson, _M. A. Rector of_ Donaghmore
-  Mr Josias Nicholson, 3 Books
-  Mr James Nimmo, _Merchant of_ Edinburgh
-  David Nixon, _Esq;_
-  Mr George Noble
-  Stephen Noquiez, _Esq;_
-  Mr Thomas Norman, _Bookseller at_ Lewes
-  Mr Anthony Norris
-  Mr Henry Norris
-  _Rev._ Mr Edward Norton
-  Richard Nutley, _Esq;_
-  Mr John Nutt, _Merchant_
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-  _Right Hon. Lord_ Orrery
-  _Rev._ Mr John Oakes
-  Mr William Ockenden
-  Mr Elias Ockenden
-  Mr Oddie
-  Crew Offley, _Esq;_
-  Joseph Offley, _Esq;_
-  William Ogbourne, _Esq;_
-  _Sir_ William Ogbourne
-  James Oglethorp, _Esq;_
-  Mr William Okey
-  John Oldfield, _M. D._
-  Nathaniel Oldham, _Esq;_
-  William Oliver, _M. D. of_ Bath
-  John Olmins, _Esq;_
-  Arthur Onslow, _Esq;_
-  Paul Orchard, _Esq;_
-  Robert Ord, _Esq;_
-  John Orlebar, _Esq;_
-  _Rev._ Mr George Osborne
-  _Rev._ Mr John Henry Ott
-  Mr James Ottey
-  Mr Jan. Oudam, _Merchant at_ Rotterdam
-  Mr Overall
-  John Overbury, _Esq;_
-  Mr Charles Overing
-  Mr Thomas Owen
-  Charles Owsley, _Esq;_
-  Mr John Owen
-  Mr Thomas Oyles
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-  _Right Hon. Countess of_ Pembroke, 10 Books
-  _Right Hon. Lord_ Paisley
-  _Right Hon. Lady_ Paisley
-  _The Right Hon. Lord_ Parker
-  Christopher Pack, _M. D._
-  Mr Samuel Parker, _Merchant at_ Bristol
-  Mr Thomas Page, _Surgeon at_ Bristol
-  _Sir_ Gregory Page, _Bar._
-  William Palgrave, _M. D, Fellow of_ Caius Coll. Cambridge
-  William Pallister, _Esq;_
-  Thomas Palmer, _Esq;_
-  Samuel Palmer, _Esq;_
-  Henry Palmer, _Merchant_
-  Mr John Palmer, _of_ Coventry
-  Mr Samuel Palmer, _Surgeon_
-  William Parker, _Esq;_
-  Edmund Parker, _Gent._
-  _Rev._ Mr Henry Parker, _M. A._
-  Mr John Parker
-  Mr Samuel Parkes, _of Fort St._ George _in_ East-India
-  Mr Daniel Parminter
-  Mr Parolet, _Attorney_
-  _Rev._ Thomas Parn, _Fellow of_ Trin. Coll. Cambr. 2 Books
-  _Rev._ Mr Thomas Parne, _Fellow of_ Trin. Coll. Cambridge
-  _Rev._ Mr Henry Parratt, _M. A. Rector of_ Holywell _in_
-        Huntingtonshire
-  Thomas Parratt, _M. D._
-  Stannier Parrot, _Gent._
-  _Right Hon._ Benjamin Parry, _Esq;_
-  Mr Parry, _of_ Jesus Coll. Oxon _B. D._
-  Robert Paul, _of_ Gray’s-Inn, _Esq;_
-  Mr Josiah Paul, _Surgeon_
-  Mr Paulin
-  Robert Paunceforte, _Esq;_
-  Edward Pawlet, _of_ Hinton St. George, _Esq;_
-  Mr Henry Pawson, _of_ York, _Merchant_
-  Mr Payne
-  Mr Samuel Peach
-  Mr Marmaduke Peacock, _Merchant in_ Rotterdam
-  Flavell Peake, _Esq;_
-  _Capt._ Edward Pearce
-  _Rev._ Zachary Pearce, _D. D._
-  James Pearse, _Esq;_
-  Thomas Pearson, _Esq;_
-  John Peers, _Esq;_
-  Mr Samuel Pegg, _of St._ John’s College, Cambridge
-  Mr Peirce, _Surgeon at_ Bath
-  Mr Adam Peirce
-  Harry Pelham, _Esq;_
-  James Pelham, _Esq;_
-  Jeremy Pemberton, _of the_ Inner-Temple, _Esq;_
-  _Library of_ Pembroke-Hall, Camb.
-  Mr Thomas Penn
-  Philip Pendock, _Esq;_
-  Edward Pennant, _Esq;_
-  _Capt._ Philip Pennington
-  Mr Thomas Penny
-  Mr Henry Penton
-  Mr Francis Penwarne, _at_ Liskead _in_ Cornwall
-  _Rev._ Mr Thomas Penwarne
-  Mr John Percevall
-  _Rev._ Mr Edward Percevall
-  Mr Joseph Percevall
-  _Rev. Dr._ Perkins, _Prebend. of_ Ely
-  Mr Farewell Perry
-  Mr James Petit
-  Mr John Petit, _of_ Aldgate
-  Mr John Petit, _of_ Nicholas Lane
-  Mr John Petitt, _of_ Thames-Street
-  _Honourable Coll._ Pettit, _of_ Eltham _in_ Kent
-  Mr Henry Peyton, _of St._ John’s College, Cambridge
-  Daniel Phillips, _M. D._
-  John Phillips, _Esq;_
-  Thomas Phillips, _Esq;_
-  Mr Gravet Phillips
-  William Phillips, _of_ Swanzey, _Esq;_
-  Mr Buckley Phillips
-  John Phillipson, _Esq;_
-  William Phipps, _L. L. D._
-  Mr Thomas Phipps, _of_ Trinity College, Cambridge
-  _The_ Physiological _Library in the College of_ Edinburgh
-  Mr Pichard
-  Mr William Pickard
-  Mr John Pickering
-  Robert Pigott, _of_ Chesterton, _Esq;_
-  Mr Richard Pike
-  Henry Pinfield, _of_ Hampstead, _Esq;_
-  Charles Pinfold, _L. L. D._
-  _Rev._ Mr. Pit, _of_ Exeter College, Oxon
-  Mr Andrew Pitt
-  Mr Francis Place
-  Thomas Player, _Esq;_
-  _Rev._ Mr Plimly
-  Mr William Plomer
-  William Plummer, _Esq;_
-  Mr Richard Plumpton
-  John Plumptre, _Esq;_
-  Fitz-Williams Plumptre, _M. D._
-  Henry Plumptre, _M. D._
-  John Pollen, _Esq;_
-  Mr Joshua Pocock
-  Francis Pole, _of_ Park-Hall, _Esq;_
-  Mr Isaac Polock
-  Mr Benjamin Pomfret
-  Mr Thomas Pool, _Apothecary_
-  Alexander Pope, _Esq;_
-  Mr Arthur Pond
-  Mr Thomas Port
-  Mr John Porter
-  Mr Joseph Porter
-  Mr Thomas Potter, _of St._ John’s College, Oxon
-  Mr John Powel
-  ---- Powis, _Esq;_
-  Mr Daniel Powle
-  John Prat, _Esq;_
-  Mr James Pratt
-  Mr Joseph Pratt
-  Mr Samuel Pratt
-  Mr Preston, _City-Remembrancer_
-  Capt. John Price
-  _Rev._ Mr Samuel Price
-  Mr Nathaniel Primat
-  Dr. John Pringle
-  Thomas Prior, _Esq;_
-  Mr Henry Proctor, _Apothecary_
-  _Sir_ John Pryse, _of_ Newton Hill _in_ Montgomeryshire
-  Mr Thomas Purcas
-  Mr Robert Purse
-  Mr John Putland
-  George Pye, _M. D._
-  Samuel Pye, _M. D._
-  Mr Samuel Pye, _Surgeon at_ Bristol
-  Mr Edmund Pyle, _of_ Lynn
-  Mr John Pine, _Engraver_
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-  _His Grace the Duke of_ Queenborough
-  _Rev._ Mr. Question, _M. A. of_ Exeter College, Oxon
-  Jeremiah Quare, _Merchant_
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-  _His Grace the Duke of_ Richmond
-  _The Rt. Rev. Ld. Bishop of_ Raphoe
-  _The Rt. Hon. Lord_ John Russel
-  _Rev._ Mr Walter Rainstorp, _of_ Bristol
-  Mr John Ranby, _Surgeon_
-  _Rev._ Mr Rand
-  Mr Richard Randall
-  _Rev._ Mr Herbert Randolph, _M.A._
-  Moses Raper, _Esq;_
-  Matthew Raper, _Esq;_
-  Mr William Rastrick, _of_ Lynne
-  Mr Ratcliffe, _M. A. of_ Pembroke College, Oxon
-  _Rev._ Mr John Ratcliffe
-  Anthony Ravell, _Esq;_
-  Mr Richard Rawlins
-  Mr Robert Rawlinson _A. B. of_ Trinity College, Cambr.
-  Mr Walter Ray
-  _Coll._ Hugh Raymond
-  _Rt. Hon. Sir_ Robert Raymond, _Lord Chief Justice of the_
-        King’s-Bench
-  Mr Alexander Raymond
-  Samuel Read, _Esq;_
-  _Rev._ Mr James Read
-  Mr John Read, _Merchant_
-  Mr William Read, _Merchant_
-  Mr Samuel Read
-  Mrs Mary Reade
-  Mr Thomas Reddall
-  Mr Andrew Reid
-  Felix Renolds, _Esq;_
-  John Renton, _of_ Christ-Church, _Esq;_
-  Leonard Reresby, _Esq;_
-  Thomas Reve, _Esq;_
-  Mr Gabriel Reve
-  William Reeves, _Merch. of_ Bristol
-  Mr Richard Reynell, _Apothecary_
-  Mr John Reynolds
-  Mr Richard Ricards
-  John Rich, _of_ Bristol, _Esq;_
-  Francis Richards, _M. B._
-  _Rev._ Mr Escourt Richards, _Prebend. of_ Wells
-  _Rev._ Mr Richards, _Rector of_ Llanvyllin, _in_ Montgomeryshire
-  William Richardson, _of_ Smally _in_ Derbyshire, _Esq;_
-  Mr Richard Richardson
-  Mr Thomas Richardson, _Apothecary_
-  Edward Richier, _Esq;_
-  Dudley Rider, _Esq;_
-  Richard Rigby, _M. D._
-  Edward Riggs, _Esq;_
-  Thomas Ripley, _Esq. Comptroller of his Majesty’s Works_
-  _Sir_ Thomas Roberts, _Bart._
-  Richard Roberts, _Esq;_
-  _Capt._ John Roberts
-  Thomas Robinson, _Esq;_
-  Matthew Robinson, _Esq;_
-  Tancred Robinson, _M. D._
-  Nicholas Robinson, _M. D._
-  Christopher Robinson, _of_ Sheffield, _A. M._
-  Mr Henry Robinson
-  Mr William Robinson
-  Mrs Elizabeth Robinson
-  John Rochfort, _Esq;_
-  Mr Rodrigues
-  Mr Rocke
-  _Sir_ John Rodes, _Bart._
-  Mr Francis Rogers
-  _Rev._ Mr Sam. Rogers, _of_ Bristol
-  John Rogerson, _Esq; his Majesty’s General of_ Ireland
-  Edmund Rolfe, _Esq;_
-  Henry Roll, _Esq; Gent. Comm. of_ New College, Oxon
-  _Rev._ Mr Samuel Rolleston, _Fell. of_ Merton College, Oxon
-  Lancelot Rolleston, _of_ Wattnal, _Esq;_
-  Philip Ronayne, _Esq;_
-  _Rev._ Mr de la Roque
-  Mr Benjamin Rosewell, _jun._
-  Joseph Rothery, _M. A. Arch-Deacon of_ Derry
-  Guy Roussignac, _M. D._
-  Mr James Round
-  Mr William Roundell, _of_ Christ Church, Oxon
-  Mr Rouse, _Merchant_
-  Cuthbert Routh, _Esq;_
-  John Rowe, _Esq;_
-  Mr John Rowe
-  _Dr._ Rowel, _of_ Amsterdam
-  John Rudge, _Esq;_
-  Mr James Ruck
-  _Rev. Dr._ Rundle, _Prebendary of_ Durham
-  Mr John Rust
-  John Rustatt, _Gent._
-  Mr Zachias Ruth
-  William Rutty, _M. D. Secretary of the Royal Society_
-  Maltis Ryall, _Esq;_
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-  _His Grace the Duke of St._ Albans
-  _Rt. Hon. Earl of_ Sunderland
-  _Rt. Hon. Earl of_ Scarborough
-  _Rt. Rev. Ld. Bp. of_ Salisbury
-  _Rt. Rev. Lord Bishop of St._ Asaph
-  _Rt. Hon._ Thomas _Lord_ Southwell
-  _Rt. Hon. Lord_ Sidney
-  _Rt. Hon. Lord_ Shaftsbury
-  _The Rt. Hon. Lord_ Shelburn
-  _His Excellency Baron_ Sollenthal, _Envoy extraordinary from the King
-        of_ Denmark
-  Mrs Margarita Sabine
-  Mr Edward Sadler, 2 Books
-  Thomas Sadler, _of the_ Pell-Office, _Esq;_
-  _Rev._ Mr Joseph Sager, _Canon of the Church of_ Salisbury
-  Mr William Salkeld
-  Mr Robert Salter
-  _Lady_ Vanaker Sambrooke
-  Jer. Sambrooke, _Esq;_
-  John Sampson, _Esq;_
-  _Dr._ Samuda
-  Mr John Samwaies
-  Alexander Sanderland, _M. D._
-  Samuel Sanders, _Esq;_
-  William Sanders, _Esq;_
-  _Rev._ Mr Daniel Sanxey
-  John Sargent, _Esq;_
-  Mr Saunderson
-  Mr Charles Savage, _jun._
-  Mr John Savage
-  Mrs Mary Savage
-  _Rev._ Mr Samuel Savage
-  Mr William Savage
-  Jacob Sawbridge, _Esq;_
-  John Sawbridge, _Esq;_
-  Mr William Sawrey
-  Humphrey Sayer, _Esq;_
-  Exton Sayer, _L. L. D. Chanceller of_ Durham
-  _Rev._ Mr George Sayer, _Prebendary of_ Durham
-  Mr Thomas Sayer
-  Herm. Osterdyk Schacht, _M. D._ & _M. Theor. & Pratt, in Acad._ Lug.
-        Bat. Prof.
-  Meyer Schamberg, _M. D._
-  Mrs Schepers, _of_ Rotterdam
-  _Dr._ Scheutcher
-  Mr Thomas Scholes
-  Mr Edward Score, _of_ Exeter, _Bookseller_
-  Thomas Scot, of Essex, _Esq;_
-  Daniel Scott, _L. L. D._
-  _Rev._ Mr Scott, _Fellow of_ Winton College
-  Mr Richard Scrafton, _Surgeon_
-  Mr Flight Scurry, _Surgeon_
-  _Rev._ Mr Thomas Seeker
-  _Rev_ Mr Sedgwick
-  Mr Selwin
-  Mr Peter Serjeant
-  Mr John Serocol, _Merchant_
-  _Rev._ Mr Seward, _of_ Hereford
-  Mr Joseph Sewel
-  Mr Thomas Sewell
-  Mr Lancelot Shadwell
-  Mr Arthur Shallet
-  Mr Edmund Shallet, _Consul at_ Barcelona
-  Mr _Archdeacon_ Sharp
-  James Sharp, _jun. Surgeon_
-  _Rev._ Mr Thomas Sharp, _Arch-Deacon of_ Northumberland
-  Mr John Shaw, _jun._
-  Mr Joseph Shaw
-  Mr Sheafe
-  Mr Edw. Sheldon, _of_ Winstonly
-  Mr Shell
-  Mr Richard Shephard
-  Mr Shepherd _of_ Trinity Coll. Oxon
-  Mrs Mary Shepherd
-  Mr William Sheppard
-  _Rev._ Mr William Sherlock, _M. A._
-  William Sherrard, _L. L. D._
-  John Sherwin, _Esq;_
-  Mr Thomas Sherwood
-  Mr Thomas Shewell
-  Mr John Shipton, _Surgeon_
-  Mr John Shipton, _sen._
-  Mr John Shipton, _jun._
-  Francis Shipwith, _Esq, Fellow Comm. of_ Trinity Coll. Camb.
-  John Shish, _of_ Greenwich _in_ Kent, _Esq;_
-  Mr Abraham Shreighly
-  John Shore, _Esq;_
-  _Rev._ Mr Shove
-  Bartholomew Shower, _Esq;_
-  Mr Thomas Sibley, _jun._
-  Mr Jacob Silver, _Bookseller in_ Sandwich
-  Robert Simpson, _Esq; Beadle and Fellow of_ Caius Coll. Cambr.
-  Mr Robert Simpson _Professor of the_ Mathematicks _in the University
-        of_ Glascow
-  Henry Singleton, _Esq; Prime Sergeant of_ Ireland
-  _Rev._ Mr John Singleton
-  _Rev._ Mr Rowland Singleton
-  Mr Singleton, _Surgeon_
-  Mr Jonathan Sisson
-  Francis Sitwell, _of_ Renishaw, _Esq;_
-  Ralph Skerret, _D. D._
-  Thomas Skinner, _Esq;_
-  Mr John Skinner
-  Mr Samuel Skinner, _jun._
-  Mr John Skrimpshaw
-  Frederic Slare, _M. D._
-  Adam Slater, _of_ Chesterfield, _Surgeon_
-  _Sir_ Hans Sloane, _Bar._
-  William Sloane, _Esq;_
-  William Sloper, _Esq;_
-  William Sloper, _Esq, Fellow Commoner of_ Trin. Coll. Cambr.
-  _Dr._ Sloper, _Chancellor of the Diocese of_ Bristol
-  Mr Smart
-  Mr John Smibart
-  Robert Smith, _L. L. D. Professor of_ Astronomy _in the University of_
-        Cambridge, 22 Books
-  Robert Smith, _of_ Bristol, _Esq;_
-  William Smith, _of the_ Middle-Temple, _Esq;_
-  James Smith, _Esq;_
-  Morgan Smith, _Esq;_
-  _Rev._ Mr Smith, _of_ Stone _in the County of_ Bucks
-  John Smith, _Esq;_
-  Mr John Smith
-  Mr John Smith, _Surgeon in_ Coventry, 2 Books
-  Mr John Smith, _Surgeon in_ Chichester
-  Mr Allyn Smith
-  Mr Joshua Smith
-  Mr Joseph Smith
-  _Rev._ Mr Elisha Smith, _of_ Tid _St. Gyles’s, in the Isle of_ Ely
-  Mr Ward Smith
-  Mr Skinner Smith
-  _Rev._ Mr George Smyth
-  Mr Snablin
-  _Dr._ Snell, _of_ Norwich
-  Mr Samuel Snell
-  Mr William Snell
-  William Snelling, _Esq;_
-  William Sneyd, _Esq;_
-  Mr Ralph Snow
-  Mr Thomas Snow
-  Stephen Soame, _Esq; Fellow Commoner of_ Sidney Coll. Cambr.
-  Cockin Sole, _Esq;_
-  Joseph Somers, _Esq;_
-  Mr Edwin Sommers, _Merchant_
-  Mr Adam Soresby
-  Thomas Southby, _Esq;_
-  Sontley South, _Esq;_
-  Mr Sparrow
-  Mr Speke, _of_ Wadham Coll. Ox.
-  _Rev._ Mr Joseph Spence
-  Mr Abraham Spooner
-  _Sir_ Conrad Joachim Springel
-  Mr William Stammers
-  Mr Charles Stanhope
-  Mr Thomas Stanhope
-  _Sir_ John Stanley
-  George Stanley, _Esq;_
-  _Rev._ Dr. Stanley, _Dean of St._ Asaph
-  Mr John Stanly
-  Eaton Stannard, _Esq;_
-  Thomas Stansal, _Esq;_
-  Mr Samuel Stanton
-  Temple Stanyan, _Esq;_
-  Mrs Mary Stanyforth
-  _Rev._ Mr Thomas Starges, _Rector of_ Hadstock, Essex
-  Mr Benjamin Steel
-  Mr John Stebbing, _of St._ John’s College, Cambridge
-  Mr John Martis Stehelin, _Merch._
-  _Dr._ Steigerthal
-  Mr Stephens, _of_ Gloucester
-  Mr Joseph Stephens
-  _Sir_ James Steuart _of_ Gutters, _Bar._
-  Mr Robert Steuart, _Professor of_ Natural Philosophy, _in the
-        University of_ Edinburgh
-  _Rev._ Mr Stevens, _Fellow of_ Corp. Chr. Coll. Cambridge
-  Mr John Stevens, _of_ Trinity College, Oxon
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-
-[Illustration]
-
-
-
-
-INTRODUCTION.
-
-THE manner, in which Sir ~ISAAC NEWTON~ has published his philosophical
-discoveries, occasions them to lie very much concealed from all, who
-have not made the mathematics particularly their study. He once,
-indeed, intended to deliver, in a more familiar way, that part of
-his inventions, which relates to the system of the world; but upon
-farther consideration he altered his design. For as the nature of
-those discoveries made it impossible to prove them upon any other than
-geometrical principles; he apprehended, that those, who should not
-fully perceive the force of his arguments, would hardly be prevailed
-on to exchange their former sentiments for new opinions, so very
-different from what were commonly received[1]. He therefore chose
-rather to explain himself only to mathematical readers; and declined
-the attempting to instruct such in any of his principles, who, by
-not comprehending his method of reasoning, could not, at the first
-appearance of his discoveries, have been persuaded of their truth. But
-now, since Sir ~ISAAC NEWTON~’s doctrine has been fully established
-by the unanimous approbation of all, who are qualified to understand
-the same; it is without doubt to be wished, that the whole of his
-improvements in philosophy might be universally known. For this purpose
-therefore I drew up the following papers, to give a general notion
-of our great philosopher’s inventions to such, as are not prepared
-to read his own works, and yet might desire to be informed of the
-progress, he has made in natural knowledge; not doubting but there were
-many, besides those, whose turn of mind had led them into a course of
-mathematical studies, that would take great pleasure in tasting of this
-delightful fountain of science.
-
-2. IT is a just remark, which has been made upon the human mind, that
-nothing is more suitable to it, than the contemplation of truth; and
-that all men are moved with a strong desire after knowledge; esteeming
-it honourable to excel therein; and holding it, on the contrary,
-disgraceful to mistake, err, or be in any way deceived. And this
-sentiment is by nothing more fully illustrated, than by the inclination
-of men to gain an acquaintance with the operations of nature; which
-disposition to enquire after the causes of things is so general, that
-all men of letters, I believe, find themselves influenced by it. Nor
-is it difficult to assign a reason for this, if we consider only, that
-our desire after knowledge is an effect of that taste for the sublime
-and the beautiful in things, which chiefly constitutes the difference
-between the human life, and the life of brutes. These inferior animals
-partake with us of the pleasures, that immediately flow from the bodily
-senses and appetites; but our minds are furnished with a superior
-sense, by which we are capable of receiving various degrees of delight,
-where the creatures below us perceive no difference. Hence arises
-that pursuit of grace and elegance in our thoughts and actions, and
-in all things belonging to us, which principally creates imployment
-for the active mind of man. The thoughts of the human mind are too
-extensive to be confined only to the providing and enjoying of what
-is necessary for the support of our being. It is this taste, which
-has given rise to poetry, oratory, and every branch of literature and
-science. From hence we feel great pleasure in conceiving strongly, and
-in apprehending clearly, even where the passions are not concerned.
-Perspicuous reasoning appears not only beautiful; but, when set forth
-in its full strength and dignity, it partakes of the sublime, and not
-only pleases, but warms and elevates the soul. This is the source of
-our strong desire of knowledge; and the same taste for the sublime
-and the beautiful directs us to chuse particularly the productions of
-nature for the subject of our contemplation: our creator having so
-adapted our minds to the condition, wherein he has placed us, that all
-his visible works, before we inquire into their make, strike us with
-the most lively ideas of beauty and magnificence.
-
-3. BUT if there be so strong a passion in contemplative minds for
-natural philosophy; all such must certainly receive a particular
-pleasure in being informed of Sir ~ISAAC NEWTON~’s discoveries, who
-alone has been able to make any great advancements in the true course
-leading to natural knowledge: whereas this important subject had before
-been usually attempted with that negligence, as cannot be reflected
-on without surprize. Excepting a very few, who, by pursuing a more
-rational method, had gained a little true knowledge in some particular
-parts of nature; the writers in this science had generally treated of
-it after such a manner, as if they thought, that no degree of certainty
-was ever to be hoped for. The custom was to frame conjectures; and if
-upon comparing them with things, there appeared some kind of agreement,
-though very imperfect, it was held sufficient. Yet at the same time
-nothing less was undertaken than intire systems, and fathoming at once
-the greatest depths of nature; as if the secret causes of natural
-effects, contrived and framed by infinite wisdom, could be searched
-out by the slightest endeavours of our weak understandings. Whereas
-the only method, that can afford us any prospect of success in this
-difficult work, is to make our enquiries with the utmost caution, and
-by very slow degrees. And after our most diligent labour, the greatest
-part of nature will, no doubt, for ever remain beyond our reach.
-
-4. THIS neglect of the proper means to enlarge our knowledge, joined
-with the presumption to attempt, what was quite out of the power of our
-limited faculties, the Lord BACON judiciously observes to be the great
-obstruction to the progress of science[2]. Indeed that excellent person
-was the first, who expresly writ against this way of philosophizing;
-and he has laid open at large the absurdity of it in his admirable
-treatise, intitled NOVUM ORGANON SCIENTIARUM; and has there likewise
-described the true method, which ought to be followed.
-
-5. THERE are, saith he, but two methods, that can be taken in the
-pursuit of natural knowledge. One is to make a hasty transition
-from our first and slight observations on things to general axioms,
-and then to proceed upon those axioms, as certain and uncontestable
-principles, without farther examination. The other method; (which he
-observes to be the only true one, but to his time unattempted;) is to
-proceed cautiously, to advance step by step, reserving the most general
-principles for the last result of our inquiries[3]. Concerning the
-first of these two methods; where objections, which happen to appear
-against any such axioms taken up in haste, are evaded by some frivolous
-distinction, when the axiom it self ought rather to be corrected[4];
-he affirms, that the united endeavours of all ages cannot make it
-successful; because this original error in the first digestion of
-the mind (as he expresses himself) cannot afterwards be remedied[5]:
-whereby he would signify to us, that if we set out in a wrong way; no
-diligence or art, we can use, while we follow so erroneous a course,
-will ever bring us to our designed end. And doubtless it cannot prove
-otherwise; for in this spacious field of nature, if once we forsake
-the true path, we shall immediately lose our selves, and must for ever
-wander with uncertainty.
-
-6. THE impossibility of succeeding in so faulty a method of
-philosophizing his Lordship endeavours to prove from the many false
-notions and prejudices, to which the mind of man is exposed[6]. And
-since this judicious writer apprehends, that men are so exceeding
-liable to fall into these wrong tracts of thinking, as to incur great
-danger of being misled by them, even while they enter on the true
-course in pursuit of nature[7]; I trust, I shall be excused, if, by
-insisting a little particularly upon this argument, I endeavour to
-remove whatever prejudice of this kind, might possibly entangle the
-mind of any of my readers.
-
-7. HIS Lordship has reduced these prejudices and false modes of
-conception under four distinct heads[8].
-
-8. THE first head contains such, as we are subject to from the very
-condition of humanity, through the weakness both of our senses, and of
-the faculties of the mind[9]; seeing, as this author well observes, the
-subtilty of nature far exceeds the greatest subtilty of our senses or
-acutest reasonings[10]. One of the false modes of conception, which
-he mentions under this head, is the forming to our selves a fanciful
-simplicity and regularity in natural things. This he illustrates by
-the following instances; the conceiving the planets to move in perfect
-circles; the adding an orb of fire to the other three elements, and
-the supposing each of these to exceed the other in rarity, just in a
-decuple proportion[11]. And of the same nature is the assertion of
-~DES CARTES~, without any proof, that all things are made up
-of three kinds of matter only[12]. As also this opinion of another
-philosopher; that light, in passing through different mediums, was
-refracted, so as to proceed by that way, through which it would move
-more speedily, than through any other[13]. The second erroneous turn
-of mind, taken notice of by his Lordship under this head, is, that
-all men are in some degree prone to a fondness for any notions, which
-they have once imbibed; whereby they often wrest things to reconcile
-them to those notions, and neglect the consideration of whatever will
-not be brought to an agreement with them; just as those do, who are
-addicted to judicial astrology, to the observation of dreams, and to
-such-like superstitions; who carefully preserve the memory of every
-incident, which serves to confirm their prejudices, and let slip out of
-their minds all instances, that make against them[14]. There is also
-a farther impediment to true knowledge, mentioned under the same head
-by this noble writer, which is; that whereas, through the weakness
-and imperfection of our senses, many things are concealed. from us,
-which have the greatest effect in producing natural appearances; our
-minds are ordinarily most affected by that, which makes the strongest
-impression on our organs of sense; whereby we are apt to judge of
-the real importance of things in nature by a wrong measure[15]. So,
-because the figuration and the motion of bodies strike our senses more
-immediately than most of their other properties, DES CARTES and his
-followers will not allow any other explication of natural appearances,
-than from the figure and motion of the parts of matter. By which
-example we see how justly his Lordship observes this cause of error to
-be the greatest of any[16]; since it has given rise to a fundamental
-principle in a system of philosophy, that not long ago obtained almost
-an universal reputation.
-
-9. THESE are the chief branches of those obstructions to knowledge,
-which this author has reduced under his first head of false
-conceptions. The second head contains the errors, to which particular
-persons are more especially obnoxious[17]. One of these is the
-consequence of a preceding observation: that as we are exposed to be
-captivated by any opinions, which have once taken possession of our
-minds; so in particular, natural knowledge has been much corrupted by
-the strong attachment of men to some one part of science, of which
-they reputed themselves the inventers, or about which they have spent
-much of their time; and hence have been apt to conceive it to be of
-greater use in the study of natural philosophy than it was: like
-ARISTOTLE, who reduced his physics to logical disputations; and the
-chymists, who thought, that nature could be laid open only by the
-force of their fires[18]. Some again are wholly carried away by an
-excessive veneration for antiquity; others, by too great fondness
-for the moderns; few having their minds so well balanced, as neither
-to depreciate the merit of the ancients, nor yet to despise the real
-improvements of later times[19]. To this is added by his Lordship a
-difference in the genius of men, that some are most fitted to observe
-the similitude, there is in things, while others are more qualified to
-discern the particulars, wherein they disagree; both which dispositions
-of mind are useful: but to the prejudice of philosophy men are apt to
-run into excess in each; while one sort of genius dwells too much upon
-the gross and sum of things, and the other upon trifling minutenesses
-and shadowy distinctions[20].
-
-10. UNDER the third head of prejudices and false notions this writer
-considers such, as follow from the lax and indefinite use of words in
-ordinary discourse; which occasions great ambiguities and uncertainties
-in philosophical debates (as another eminent philosopher has since
-shewn more at large[21];) insomuch that this our author thinks a strict
-defining of terms to be scarce an infallible remedy against this
-inconvenience[22]. And perhaps he has no small reason on his side: for
-the common inaccurate sense of words, notwithstanding the limitations
-given them by definitions, will offer it self so constantly to the
-mind, as to require great caution and circumspection for us not to be
-deceived thereby. Of this we have a very eminent instance in the great
-disputes, that have been raised about the use of the word attraction in
-philosophy; of which we shall be obliged hereafter to make particular
-mention[23]. Words thus to be guarded against are of two kinds. Some
-are names of things, that are only imaginary[24]; such words are wholly
-to be rejected. But there are other terms, that allude to what is real,
-though their signification is confused[25]. And these latter must of
-necessity be continued in use; but their sense cleared up, and freed,
-as much as possible, from obscurity.
-
-11. THE last general head of these errors comprehends such, as follow
-from the various sects of false philosophies; which this author divides
-into three sorts, the sophistical, empirical, and superstitious[26]. By
-the first of these he means a philosophy built upon speculations only
-without experiments[27]; by the second, where experiments are blindly
-adhered to, without proper reasoning upon them[28]; and by the third,
-wrong opinions of nature fixed in mens minds either through false
-religions, or from misunderstanding the declarations of the true[29].
-
-12. THESE are the four principal canals, by which this judicious author
-thinks, that philosophical errors have flowed in upon us. And he
-rightly observes, that the faulty method of proceeding in philosophy,
-against which he writes[30], is so far from assisting us towards
-overcoming these prejudices; that he apprehends it rather suited to
-rivet them more firmly to the mind[31]. How great reason then has his
-Lordship to call this way of philosophizing the parent of error, and
-the bane of all knowledge[32]? For, indeed, what else but mistakes can
-so bold and presumptuous a treatment of nature produce? have we the
-wisdom necessary to frame a world, that we should think so easily,
-and with so slight a search to enter into the most secret springs of
-nature, and discover the original causes of things? what chimeras, what
-monsters has not this preposterous method brought forth? what schemes,
-or what hypothesis’s of the subtilest wits has not a stricter enquiry
-into nature not only overthrown, but manifested to be ridiculous and
-absurd? Every new improvement, which we make in this science, lets us
-see more and more the weakness of our guesses. Dr. HARVEY, by that
-one discovery of the circulation of the blood, has dissipated all the
-speculations and reasonings of many ages upon the animal oeconomy.
-ASELLIUS, by detecting the lacteal veins, shewed how little ground all
-physicians and philosophers had in conjecturing, that the nutritive
-part of the aliment was absorbed by the mouths of the veins spread
-upon the bowels: and then PECQUET, by finding out the thoracic duct,
-as evidently proved the vanity of the opinion, which was persisted in
-after the lacteal vessels were known, that the alimental juice was
-conveyed immediately to the liver, and there converted into blood.
-
-13. AS these things set forth the great absurdity of proceeding in
-philosophy on conjectures, by informing us how far the operations
-of nature are above our low conceptions; so on the other hand, such
-instances of success from a more judicious method shew us, that our
-bountiful maker has not left us wholly without means of delighting
-our selves in the contemplation of his wisdom. That by a just way of
-inquiry into nature, we could not fail of arriving at discoveries
-very remote from our apprehensions; the Lord ~BACON~ himself
-argues from the experience of mankind. If, says he, the force of guns
-should be described to any one ignorant of them, by their effects only,
-he might reasonably suppose, that those engines of destruction were
-only a more artificial composition, than he knew, of wheels and other
-mechanical powers: but it could never enter his thoughts, that their
-immense force should be owing to a peculiar substance, which would
-enkindle into so violent an explosion, as we experience in gunpowder:
-since he would no where see the least example of any such operation;
-except perhaps in earthquakes and thunder, which he would doubtless
-look upon as exalted powers of nature, greatly surpassing any art of
-man to imitate. In the same manner, if a stranger to the original
-of silk were shewn a garment made of it, he would be very far from
-imagining so strong a substance to be spun out of the bowels of a small
-worm; but must certainly believe it either a vegetable substance, like
-flax or cotton; or the natural covering of some animal, as wool is
-of sheep. Or had we been told, before the invention of the magnetic
-needle among us, that another people was in possession of a certain
-contrivance, by which they were inabled to discover the position of
-the heavens, with vastly more ease, than we could do; what could have
-been imagined more, than that they were provided with some fitter
-astronomical instrument for this purpose than we? That any stone should
-have so amazing a property, as we find in the magnet, must have been
-the remotest from our thoughts[33].
-
-14. BUT what surprizing advancements in the knowledge of nature may be
-made by pursuing the true course in philosophical inquiries; when those
-searches are conducted by a genius equal to so divine a work, will be
-best understood by considering Sir ~ISAAC NEWTON~ discoveries.
-That my’s reader may apprehend as just a notion of these, as can be
-conveyed to him, by the brief account, which I intend to lay before
-him; I have set apart this introduction for explaining, in the fullest
-manner I am able, the principles, whereon Sir ~ISAAC NEWTON~ proceeds.
-For without a clear conception of these, it is impossible to form any
-true idea of the singular excellence of the inventions of this great
-philosopher.
-
-15. THE principles then of this philosophy are; upon no consideration
-to indulge conjectures concerning the powers and laws of nature, but
-to make it our endeavour with all diligence to search out the real
-and true laws, by which the constitution of things is regulated. The
-philosopher’s first care must be to distinguish, what he sees to be
-within his power, from what is beyond his reach; to assume no greater
-degree of knowledge, than what he finds himself possessed of; but to
-advance by slow and cautious steps; to search gradually into natural
-causes; to secure to himself the knowledge of the most immediate cause
-of each appearance, before he extends his views farther to causes
-more remote. This is the method, in which philosophy ought to be
-cultivated; which does not pretend to so great things, as the more
-airy speculations; but will perform abundantly more: we shall not
-perhaps seem to the unskilful to know so much, but our real knowledge
-will be greater. And certainly it is no objection against this method,
-that some others promise, what is nearer to the extent of our wishes:
-since this, if it will not teach us all we could desire to be informed
-of, will however give us some true light into nature; which no other
-can do. Nor has the philosopher any reason to think his labour lost,
-when he finds himself stopt at the cause first discovered by him, or
-at any other more remote cause, short of the original: for if he has
-but sufficiently proved any one cause, he has entered so far into the
-real constitution of things, has laid a safe foundation for others to
-work upon, and has facilitated their endeavours in the search after
-yet more distant causes; and besides, in the mean time he may apply
-the knowledge of these intermediate causes to many useful purposes.
-Indeed the being able to make practical deductions from natural causes,
-constitutes the great distinction between the true philosophy and the
-false. Causes assumed upon conjecture, must be so loose and undefined,
-that nothing particular can be collected from them. But those causes,
-which are brought to light by a strict examination of things, will be
-more distinct. Hence it appears to have been no unuseful discovery,
-that the ascent of water in pumps is owing to the pressure of the
-air by its weight or spring; though the causes, which make the air
-gravitate, and render it elastic, be unknown: for notwithstanding
-we are ignorant of the original, whence these powers of the air are
-derived; yet we may receive much advantage from the bare knowledge of
-these powers. If we are but certain of the degree of force, wherewith
-they act, we shall know the extent of what is to be expected from
-them; we shall know the greatest height, to which it is possible by
-pumps to raise water; and shall thereby be prevented from making any
-useless efforts towards improving these instruments beyond the limits
-prescribed to them by nature; whereas without so much knowledge as
-this, we might probably have wasted in attempts of this kind much time
-and labour. How long did philosophers busy themselves to no purpose
-in endeavouring to perfect telescopes, by forming the glasses into
-some new figure; till Sir ~ISAAC NEWTON~ demonstrated, that
-the effects of telescopes were limited from another cause, than was
-supposed; which no alteration in the figure of the glasses could
-remedy? What method Sir ~ISAAC NEWTON~ himself has found for
-the improvement of telescopes shall be explained hereafter[34]. But
-at present I shall proceed to illustrate, by some farther instances,
-this distinguishing character of the true philosophy, which we have now
-under consideration. It was no trifling discovery, that the contraction
-of the muscles of animals puts their limbs in motion, though the
-original cause of that contraction remains a secret, and perhaps may
-always do so; for the knowledge of thus much only has given rise to
-many speculations upon the force and artificial disposition of the
-muscles, and has opened no narrow prospect into the animal fabrick.
-The finding out, that the nerves are great agents in this action,
-leads us yet nearer to the original cause, and yields us a wider
-view of the subject. And each of these steps affords us assistance
-towards restoring this animal motion, when impaired in our selves,
-by pointing out the seats of the injuries, to which it is obnoxious.
-To neglect all this, because we can hitherto advance no farther, is
-plainly ridiculous. It is confessed by all, that ~GALILEO~
-greatly improved philosophy, by shewing, as we shall relate hereafter,
-that the power in bodies, which we call gravity, occasions them to
-move downwards with a velocity equably accelerated[35]; and that when
-any body is thrown forwards, the same power obliges it to describe in
-its motion that line, which is called by geometers a parabola[36]:
-yet we are ignorant of the cause, which makes bodies gravitate. But
-although we are unacquainted with the spring, whence this power in
-nature is derived, nevertheless we can estimate its effects. When a
-body falls perpendicularly, it is known, how long time it takes in
-descending from any height whatever: and if it be thrown forwards,
-we know the real path, which it describes; we can determine in what
-direction, and with what degree of swiftness it must be projected,
-in order to its striking against any object desired; and we can also
-ascertain the very force, wherewith it will strike. Sir ~ISAAC
-NEWTON~ has farther taught, that this power of gravitation extends
-up to the moon, and causes that planet to gravitate as much towards
-the earth, as any of the bodies, which are familiar to us, would, if
-placed at the same distance[37]: he has proved likewise, that all
-the planets gravitate towards the sun, and towards one another; and
-that their respective motions follow from this gravitation. All this
-he has demonstrated upon indisputable geometrical principles, which
-cannot be rendered precarious for want of knowing what it is, which
-causes these bodies thus mutually to gravitate: any more than we can
-doubt of the propensity in all the bodies about us, to descend towards
-the earth; or can call in question the forementioned propositions
-of ~GALILEO~, which are built upon that principle. And as
-~GALILEO~ has shewn more fully, than was known before, what
-effects were produced in the motion of bodies by their gravitation
-towards the earth; so Sir ~ISAAC NEWTON~, by this his
-invention, has much advanced our knowledge in the celestial motions.
-By discovering that the moon gravitates towards the sun, as well as
-towards the earth; he has laid open those intricacies in the moon’s
-motion, which no astronomer, from observations only, could ever find
-out[38]: and one kind of heavenly bodies, the comets, have their motion
-now clearly ascertained; whereof we had before no true knowledge at
-all[39].
-
-16. DOUBTLESS it might be expected, that such surprizing success should
-have silenced, at once, every cavil. But we have seen the contrary.
-For because this philosophy professes modestly to keep within the
-extent of our faculties, and is ready to confess its imperfections,
-rather than to make any fruitless attempts to conceal them, by seeking
-to cover the defects in our knowledge with the vain ostentation of
-rash and groundless conjectures; hence has been taken an occasion
-to insinuate that we are led to miraculous causes, and the occult
-qualities of the schools.
-
-17. BUT the first of these accusations is very extraordinary. If by
-calling these causes miraculous nothing more is meant than only, that
-they often appear to us wonderful and surprizing, it is not easy
-to see what difficulty can be raised from thence; for the works of
-nature discover every where such proofs of the unbounded power, and
-the consummate wisdom of their author, that the more they are known,
-the more they will excite our admiration: and it is too manifest to
-be insisted on, that the common sense of the word miraculous can have
-no place here, when it implies what is above the ordinary course of
-things. The other imputation, that these causes are occult upon the
-account of our not perceiving what produces them, contains in it great
-ambiguity. That something relating to them lies hid, the followers
-of this philosophy are ready to acknowledge, nay desire it should be
-carefully remarked, as pointing out proper subjects for future inquiry.
-But this is very different from the proceeding of the schoolmen in
-the causes called by them occult. For as their occult qualities were
-understood to operate in a manner occult, and not apprehended by us; so
-they were obtruded upon us for such original and essential properties
-in bodies, as made it vain to seek any farther cause; and a greater
-power was attributed to them, than any natural appearances authorized.
-For instance, the rise of water in pumps was ascribed to a certain
-abhorrence of a vacuum, which they thought fit to assign to nature. And
-this was so far a true observation, that the water does move, contrary
-to its usual course, into the space, which otherwise would be left
-void of any sensible matter; and, that the procuring such a vacuity
-was the apparent cause of the water’s ascent. But while we were not in
-the least informed how this power, called an abhorrence of a vacuum,
-produced the visible effects; instead of making any advancement in the
-knowledge of nature, we only gave an artificial name to one of her
-operations: and when the speculation was pushed so beyond what any
-appearances required, as to have it concluded, that this abhorrence
-of a vacuum was a power inherent in all matter, and so unlimited as
-to render it impossible for a vacuum to exist at all; it then became
-a much greater absurdity, in being made the foundation of a most
-ridiculous manner of reasoning; as at length evidently appeared, when
-it came to be discovered, that this rise of the water followed only
-from the pressure of the air, and extended it self no farther, than
-the power of that cause. The scholastic stile in discoursing of these
-occult qualities, as if they were essential differences in the very
-substances, of which bodies consisted, was certainly very absurd; by
-reason it tended to discourage all farther inquiry. But no such ill
-consequences can follow from the considering of any natural causes,
-which confessedly are not traced up to their first original. How
-shall we ever come to the knowledge of the several original causes of
-things, otherwise than by storing up all intermediate causes which we
-can discover? Are all the original and essential properties of matter
-so very obvious, that none of them can escape our first view? This is
-not probable. It is much more likely, that, if some of the essential
-properties are discovered by our first observations, a stricter
-examination should bring more to light.
-
-
-18. BUT in order to clear up this point concerning the essential
-properties of matter, let us consider the subject a little distinctly.
-We are to conceive, that the matter, out of which the universe of
-things is formed, is furnished with certain qualities and powers,
-whereby it is rendered fit to answer the purposes, for which it was
-created. But every property, of which any particle of this matter is
-in it self possessed, and which is not barely the consequence of the
-union of this particle with other portions of matter, we may call an
-essential property: whereas all other qualities or attributes belonging
-to bodies, which depend on their particular frame and composition, are
-not essential to the matter, whereof such bodies are made; because
-the matter of these bodies will be deprived of those qualities, only
-by the dissolution of the body, without working any change in the
-original constitution of one single particle of this mass of matter.
-Extension we apprehend to be one of these essential properties, and
-impenetrability another. These two belong universally to all matter;
-and are the principal ingredients in the idea, which this word matter
-usually excites in the mind. Yet as the idea, marked by this name,
-is not purely the creature of our own understandings, but is taken
-for the representation of a certain substance without us; if we
-should discover, that every part of the substance, in which we find
-these two properties, should likewise be endowed universally with any
-other essential qualities; all these, from the time they come to our
-notice, must be united under our general idea of matter. How many
-such properties there are actually in all matter we know not; those,
-of which we are at present apprized, have been found out only by our
-observations on things; how many more a farther search may bring to
-light, no one can say; nor are we certain, that we are provided with
-sufficient methods of perception to discern them all. Therefore, since
-we have no other way of making discoveries in nature, but by gradual
-inquiries into the properties of bodies; our first step must be to
-admit without distinction all the properties, which we observe; and
-afterwards we must endeavour, as far as we are able, to distinguish
-between the qualities, wherewith the very substances themselves are
-indued, and those appearances, which result from the structure only of
-compound bodies. Some of the properties, which we observe in things,
-are the attributes of particular bodies only; others universally belong
-to all, that fall under our notice. Whether some of the qualities and
-powers of particular bodies, be derived from different kinds of matter
-entring their composition, cannot, in the present imperfect state
-of our knowledge, absolutely be decided; though we have not yet any
-reason to conclude, but that all the bodies, with which we converse,
-are framed out of the very same kind of matter, and that their
-distinct qualities are occasioned only by their structure; through
-the variety whereof the general powers of matter are caused to produce
-different effects. On the other hand, we should not hastily conclude,
-that whatever is found to appertain to all matter, which falls under
-our examination, must for that reason only be an essential property
-thereof, and not be derived from some unseen disposition in the frame
-of nature. Sir ~ISAAC NEWTON~ has found reason to conclude,
-that gravity is a property universally belonging to all the perceptible
-bodies in the universe, and to every particle of matter, whereof they
-are composed. But yet he no where asserts this property to be essential
-to matter. And he was so far from having any design of establishing
-it as such, that, on the contrary, he has given some hints worthy of
-himself at a cause for it[40]; and expresly says, that he proposed
-those hints to shew, that he had no such intention[41].
-
-19. IT appears from hence, that it is not easy to determine, what
-properties of bodies are essentially inherent in the matter, out of
-which they are made, and what depend upon their frame and composition.
-But certainly whatever properties are found to belong either to any
-particular systems of matter, or universally to all, must be considered
-in philosophy; because philosophy will be otherwise imperfect. Whether
-those properties can be deduced from some other appertaining to
-matter, either among those, which are already known, or among such as
-can be discovered by us, is afterwards to be sought for the farther
-improvement of our knowledge. But this inquiry cannot properly have
-place in the deliberation about admitting any property of matter or
-bodies into philosophy; for that purpose it is only to be considered,
-whether the existence of such a property has been justly proved or not.
-Therefore to decide what causes of things are rightly received into
-natural philosophy, requires only a distinct and clear conception of
-what kind of reasoning is to be allowed of as convincing, when we argue
-upon the works of nature.
-
-20. THE proofs in natural philosophy cannot be so absolutely
-conclusive, as in the mathematics. For the subjects of that science
-are purely the ideas of our own minds. They may be represented to our
-senses by material objects, but they are themselves the arbitrary
-productions of our own thoughts; so that as the mind can have a full
-and adequate knowledge of its own ideas, the reasoning in geometry
-can be rendered perfect. But in natural knowledge the subject of
-our contemplation is without us, and not so compleatly to be known:
-therefore our method of arguing must fall a little short of absolute
-perfection. It is only here required to steer a just course between
-the conjectural method of proceeding, against which I have so largely
-spoke; and demanding so rigorous a proof, as will reduce all philosophy
-to mere scepticism, and exclude all prospect of making any progress in
-the knowledge of nature.
-
-21. THE concessions, which are to be allowed in this science, are by
-Sir ~ISAAC NEWTON~ included under a very few simple precepts.
-
-22. THE first is, that more causes are not to be received into
-philosophy, than are sufficient to explain the appearances of nature.
-That this rule is approved of unanimously, is evident from those
-expressions so frequent among all philosophers, that nature does
-nothing in vain; and that a variety of means, where fewer would
-suffice, is needless. And certainly there is the highest reason
-for complying with this rule. For should we indulge the liberty of
-multiplying, without necessity, the causes of things, it would reduce
-all philosophy to mere uncertainty; since the only proof, which we can
-have, of the existence of a cause, is the necessity of it for producing
-known effects. Therefore where one cause is sufficient, if there really
-should in nature be two, which is in the last degree improbable, we can
-have no possible means of knowing it, and consequently ought not to
-take the liberty of imagining, that there are more than one.
-
-23. THE second precept is the direct consequence of the first, that to
-like effects are to be ascribed the same causes. For instance, that
-respiration in men and in brutes is brought about by the same means;
-that bodies descend to the earth here in EUROPE, and in AMERICA from
-the same principle; that the light of a culinary fire, and of the sun
-have the same manner of production; that the reflection of light is
-effected in the earth, and in the planets by the same power; and the
-like.
-
-24. THE third of these precepts has equally evident reason for it.
-It is only, that those qualities, which in the same body can neither
-be lessened nor increased, and which belong to all bodies that are
-in our power to make trial upon, ought to be accounted the universal
-properties of all bodies whatever.
-
-25. IN this precept is founded that method of arguing by induction,
-without which no progress could be made in natural philosophy. For as
-the qualities of bodies become known to us by experiments only; we
-have no other way of finding the properties of such bodies, as are
-out of our reach to experiment upon, but by drawing conclusions from
-those which fall under our examination. The only caution here required
-is, that the observations and experiments, we argue upon, be numerous
-enough, and that due regard be paid to all objections, that occur, as
-the Lord BACON very judiciously directs[42]. And this admonition is
-sufficiently complied with, when by virtue of this rule we ascribe
-impenetrability and extension to all bodies, though we have no sensible
-experiment, that affords a direct proof of any of the celestial bodies
-being impenetrable; nor that the fixed stars are so much as extended.
-For the more perfect our instruments are, whereby we attempt to find
-their visible magnitude, the less they appear; insomuch that all the
-sensible magnitude, which we observe in them, seems only to be an
-optical deception by the scattering of their light. However, I suppose
-no one will imagine they are without any magnitude, though their
-immense distance makes it undiscernable by us. After the same manner,
-if it can be proved, that all bodies here gravitate towards the earth,
-in proportion to the quantity of solid matter in each; and that the
-moon gravitates to the earth likewise, in proportion to the quantity
-of matter in it; and that the sea gravitates towards the moon, and
-all the planets towards each other; and that the very comets have the
-same gravitating faculty; we shall have as great reason to conclude by
-this rule, that all bodies gravitate towards each other. For indeed
-this rule will more strongly hold in this case, than in that of the
-impenetrability of bodies; because there will more instances be had of
-bodies gravitating, than of their being impenetrable.
-
-25. THIS is that method of induction, whereon all philosophy is
-founded; which our author farther inforces by this additional precept,
-that whatever is collected from this induction, ought to be received,
-notwithstanding any conjectural hypothesis to the contrary, till such
-times as it shall be contradicted or limited by farther observations on
-nature.
-
-[Illustration]
-
-[Illustration]
-
-
-
-
-  ~BOOK I.~
-  CONCERNING THE
-  MOTION of BODIES
-  IN GENERAL.
-
-
-  CHAP. I.
-  Of the LAWS of MOTION.
-
-HAVING thus explained Sir ~ISAAC NEWTON’s~ method of reasoning
-in philosophy, I shall now proceed to my intended account of his
-discoveries. These are contained in two treatises. In one of them, the
-MATHEMATICAL PRINCIPLES OF NATURAL PHILOSOPHY, his chief design is to
-shew by what laws the heavenly motions are regulated; in the other,
-his OPTICS, he discourses of the nature of light and colours, and of
-the action between light and bodies. This second treatise is wholly
-confined to the subject of light: except some conjectures proposed
-at the end concerning other parts of nature, which lie hitherto more
-concealed. In the other treatise our author was obliged to smooth the
-way to his principal intention, by explaining many things of a more
-general nature: for even some of the most simple properties of matter
-were scarce well established at that time. We may therefore reduce Sir
-~ISAAC NEWTON~’s doctrine under three general heads; and I
-shall accordingly divide my account into three books. In the first I
-shall speak of what he has delivered concerning the motion of bodies,
-without regard to any particular system of matter; in the second I
-shall treat of the heavenly motions; and the third shall be employed
-upon light.
-
-2. IN the first part of my design, we must begin with an account of the
-general laws of motion.
-
-3. THESE laws are some universal affections and properties of matter
-drawn from experience, which are made use of as axioms and evident
-principles in all our arguings upon the motion of bodies. For as it
-is the custom of geometers to assume in their demonstrations some
-propositions, without exhibiting the proof of them; so in philosophy,
-all our reasoning must be built upon some properties of matter, first
-admitted as principles whereon to argue. In geometry these axioms are
-thus assumed, on account of their being so evident as to make any
-proof in form needless. But in philosophy no properties of bodies can
-be in this manner received for self-evident; since it has been observed
-above, that we can conclude nothing concerning matter by any reasonings
-upon its nature and essence, but that we owe all the knowledge, we
-have thereof, to experience. Yet when our observations on matter have
-inform’d us of some of its properties, we may securely reason upon them
-in our farther inquiries into nature. And these laws of motion, of
-which I am here to speak, are found so universally to belong to bodies,
-that there is no motion known, which is not regulated by them. These
-are by Sir ~ISAAC NEWTON~ reduced to three[43].
-
-4. THE first law is, that all bodies have such an indifference to rest,
-or motion, that if once at rest they remain so, till disturbed by some
-power acting upon them: but if once put in motion, they persist in
-it; continuing to move right forwards perpetually, after the power,
-which gave the motion, is removed; and also preserving the same degree
-of velocity or quickness, as was first communicated, not stopping or
-remitting their course, till interrupted or otherwise disturbed by some
-new power impressed.
-
-5. THE second law of motion is, that the alteration of the state of
-any body, whether from rest to motion, or from motion to rest, or
-from one degree of motion to another, is always proportional to the
-force impressed. A body at rest, when acted upon by any power, yields
-to that power, moving in the same line, in which the power applied
-is directed; and moves with a less or greater degree of velocity,
-according to the degree of the power; so that twice the power shall
-communicate a double velocity, and three times the power a threefold
-velocity. If the body be moving, and the power impressed act upon the
-body in the direction of its motion, the body shall receive an addition
-to its motion, as great as the motion, into which that power would
-have put it from a state of rest; but if the power impressed upon a
-moving body act directly opposite to its former motion, that power
-shall then take away from the body’s motion, as much as in the other
-case it would have added to it. Lastly, if the power be impressed
-obliquely, there will arise an oblique motion differing more or less
-from the former direction, according as the new impression is greater
-or less. For example, if the body A (in fig. 1.) be moving in the
-direction A B, and when it is at the point A, a power be impressed upon
-it in the direction A C, the body shall from henceforth neither move
-in its first direction A B, nor in the direction of the adventitious
-power, but shall take a course as A D between them: and if the power
-last impressed be just equal to that, which first gave to the body
-its motion; the line A D shall pass in the middle between A B and A
-C, dividing the angle under B A C into two equal parts; but if the
-power last impressed be greater than the first, the line A D shall
-incline most to A C; whereas if the last impression be less than the
-first, the line A D shall incline most to A B. To be more particular,
-the situation of the line A D is always to be determined after this
-manner. Let A E be the space, which the body would have moved through
-in the line A B during any certain portion of time; provided that body,
-when at A, had received no second impulse. Suppose likewise, that A F
-is the part of the line A C, through which the body would have moved
-during an equal portion of time, if it had been at rest in A, when it
-received the impulse in the direction A C: then if from E be drawn a
-line parallel to, or equidistant from A C, and from F another line
-parallel to A B, those two lines will meet in the line A D.
-
-6. THE third and last of these laws of motion is, that when any body
-acts upon another, the action of that body upon the other is equalled
-by the contrary reaction of that other body upon the first.
-
-7. THESE laws of motion are abundantly confirmed by this, that all the
-deductions made from them, in relation to the motion of bodies, how
-complicated soever, are found to agree perfectly with observation. This
-shall be shewn more at large in the next chapter. But before we proceed
-to so diffusive a proof; I chuse here to point out those appearances of
-bodies, whereby the laws of motion are first suggested to us.
-
-8. DAILY observation makes it appear to us, that any body, which we
-once see at rest, never puts it self into fresh motion; but continues
-always in the same place, till removed by some power applied to it.
-
-9. AGAIN, whenever a body is once in motion, it continues in that
-motion some time after the moving power has quitted it, and it is left
-to it self. Now if the body continue to move but a single moment, after
-the moving power has left it, there can no reason be assigned, why it
-should ever stop without some external force. For it is plain, that
-this continuance of the motion is caused only by the body’s having
-already moved, the sole operation of the power upon the body being the
-putting it in motion; therefore that motion continued will equally be
-the cause of its farther motion, and so on without end. The only doubt
-that can remain, is, whether this motion communicated continues intire,
-after the power, that caused it, ceases to act; or whether it does not
-gradually languish and decrease. And this suspicion cannot be removed
-by a transient and slight observation on bodies, but will be fully
-cleared up by those more accurate proofs of the laws of motion, which
-are to be considered in the next chapter.
-
-10. LASTLY, bodies in motion appear to affect a straight course without
-any deviation, unless when disturbed by some adventitious power acting
-upon them. If a body be thrown perpendicularly upwards or downwards,
-it appears to continue in the same straight line during the whole time
-of its motion. If a body be thrown in any other direction, it is found
-to deviate from the line, in which it began to move, more and more
-continually towards the earth, whither it is directed by its weight:
-but since, when the weight of a body does not alter the direction of
-its motion, it always moves in a straight line, without doubt in this
-other case the body’s, declining from its first course is no more,
-than what is caused by its weight alone. As this appears at first
-sight to be unquestionable, so we shall have a very distinct proof
-thereof in the next chapter, where the oblique motion of bodies will be
-particularly considered.
-
-11. THUS we see how the first of the laws of motion agrees with
-what appears to us in moving bodies. But here occurs this farther
-consideration, that the real and absolute motion of any body is not
-visible to us: for we are our selves also in constant motion along with
-the earth whereon we dwell; insomuch that we perceive bodies to move
-so far only, as their motion is different from our own. When a body
-appears to us to lie at rest, in reality it only continues the motion,
-it has received, without putting forth any power to change that motion.
-If we throw a body in the course or direction, wherein we are carried
-our selves; so much motion as we seem to have given to the body, so
-much we have truly added to the motion, it had, while it appeared to us
-to be at rest. But if we impel a body the contrary way, although the
-body appears to us to have received by such an impulse as much motion,
-as when impelled the other way; yet in this case we have taken from the
-body so much real motion, as we seem to have given it. Thus the motion,
-which we see in bodies, is not their real motion, but only relative
-with respect to us; and the forementioned observations only shew us,
-that this first law of motion has place in this relative or apparent
-motion. However, though we cannot make any observation immediately on
-the absolute motion of bodies, yet by reasoning upon what we observe
-in visible motion, we can discover the properties and effects of real
-motion.
-
-12. WITH regard to this first law of motion, which is now under
-consideration, we may from the foregoing observations most truly
-collect, that bodies are disposed to continue in the absolute motion,
-which they have once received, without increasing or diminishing their
-velocity. When a body appears to us to lie at rest, it really preserves
-without change the motion, which it has in common with our selves:
-and when we put it into visible motion, and we see it continue that
-motion; this proves, that the body retains that degree of its absolute
-motion, into which it is put by our acting upon it: if we give it such
-an apparent motion, which adds to its real motion, it preserves that
-addition; and if our acting on the body takes off from its real motion,
-it continues afterwards to move with no more real motion, than we have
-left it.
-
-13. AGAIN, we do not observe in bodies any disposition or power within
-themselves to change the direction of their motion; and if they had any
-such power, it would easily be discovered. For suppose a body by the
-structure or disposition of its parts, or by any other circumstance in
-its make, was indued with a power of moving it self; this self-moving
-principle, which should be thus inherent in the body, and not depend on
-any thing external, must change the direction wherein it would act, as
-often as the position of the body was changed: so that for instance,
-if a body was lying before me in such a position, that the direction,
-wherein this principle disposes the body to move, was pointed directly
-from me; if I then gradually turned the body about, the direction
-of this self-moving principle would no longer be pointed directly
-from me, but would turn about along with the body. Now if any body,
-which appears to us at rest, were furnished with any such self-moving
-principle; from the body’s appearing without motion we must conclude,
-that this self-moving principle lies directed the same way as the
-earth is carrying the body; and such a body might immediately be put
-into visible motion only by turning it about in any degree, that this
-self-moving principle might receive a different direction.
-
-14. FROM these considerations it very plainly follows, that if a body
-were once absolutely at rest; not being furnished with any principle,
-whereby it could put it self into motion, it must for ever continue in
-the same place, till acted upon by something external: and also that
-when a body is put into motion, it has no power within it self to make
-any change in the direction of that motion; and consequently that the
-body must move on straight forward without declining any way whatever.
-But it has before been shewn, that bodies do not appear to have in
-themselves any power to change the velocity of their motion: therefore
-this first law of motion has been illustrated and confirmed, as much as
-can be from the transient observations, which have here been discoursed
-upon; and in the next chapter all this will be farther established by
-more correct observations.
-
-15. BUT I shall now pass to the second law of motion; wherein, when it
-is asserted, that the velocity, with which any body is moved by the
-action of a power upon it, is proportional to that power; the degree of
-power is supposed to be measured by the greatness of the body, which
-it can move with a given celerity. So that the sense of this law is,
-that if any body were put into motion with that degree of swiftness, as
-to pass in one hour the length of a thousand yards; the power, which
-would give the same degree of velocity to a body twice as great, would
-give this lesser body twice the velocity, causing it to describe in the
-same space of an hour two thousand yards. But by a body twice as great
-as another, I do not here mean simply of twice the bulk, but one that
-contains a double quantity of solid matter.
-
-16. WHY the power, which can move a body twice as great as another with
-the same degree of velocity, should be called twice as great as the
-power, which can give the lesser body the same velocity, is evident.
-For if we should suppose the greater body to be divided into two equal
-parts, each equal to the lesser body, each of these halves will require
-the same degree of power to move them with the velocity of the lesser
-body, as the lesser body it self requires; and therefore both those
-halves, or the whole greater body, will require the moving power to be
-doubled.
-
-17. THAT the moving power being in this sense doubled, should just
-double likewise the velocity of the same body, seems near as evident,
-if we consider, that the effect of the power applied must needs be
-the same, whether that power be applied to the body at once, or in
-parts. Suppose then the double power not applied to the body at
-once, but half of it first, and afterwards the other half; it is not
-conceivable for what reason the half last applied should come to have
-a different effect upon the body, from that which is applied first;
-as it must have, if the velocity of the body was not just doubled by
-the application of it. So far as experience can determine, we see
-nothing to favour such a supposition. We cannot indeed (by reason of
-the constant motion of the earth) make trial upon any body perfectly at
-rest, whereby to see whether a power applied in that case would have a
-different effect, from what it has, when the body is already moving;
-but we find no alteration in the effect of the same power on account of
-any difference there may be in the motion of the body, when the power
-is applied. The earth does not always carry bodies with the same degree
-of velocity; yet we find the visible effects of any power applied to
-the same body to be, at all times the very same: and a bale of goods,
-or other moveable body lying in a ship is as easily removed from place
-to place, while the ship is under sail, if its motion be steady, as
-when it is fixed at anchor.
-
-18. NOW this experience is alone sufficient to shew to us the whole of
-this law of motion.
-
-19. SINCE we find, that the same power will always produce the same
-change in the motion of any body, whether that body were before moving
-with a swifter or slower motion; the change wrought in the motion of
-a body depends only on the power applied to it, without any regard to
-the body’s former motion: and therefore the degree of motion, which the
-body already possesses, having no influence on the power applied to
-disturb its operation, the effects of the same power will not only be
-the same in all degrees of motion of the body; but we have likewise no
-reason to doubt, but that a body perfectly at rest would receive from
-any power as much motion, as would be equivalent to the effect of the
-same power applied to that body already in motion.
-
-20. AGAIN, suppose a body being at rest, any number of equal powers
-should be successively applied to it; pushing it forward from time to
-time in the same course or direction. Upon the application of the first
-power the body would begin to move; when the second power was applied,
-it appears from what has been said, that the motion of the body would
-become double; the third power would treble the motion of the body; and
-so on, till after the operation of the last power the motion of the
-body would be as many times the motion, which the first power gave it,
-as there are powers in number. and the effect of this number of powers
-will be always the same, without any regard to the space of time taken
-up in applying them: so that greater or lesser intervals between the
-application of each of these powers will produce no difference at all
-in their effects. Since therefore the distance of time between the
-action of each power is of no consequence; without doubt the effect
-will still be the same, though the powers should all be applied at
-the very same instant; or although a single power should be applied
-equal in strength to the collective force of all these powers. Hence
-it plainly follows, that the degree of motion, into which any body
-will be put out of a state of rest by any power, will be proportional
-to that power. A double power will give twice the velocity, a treble
-power three times the velocity, and so on. The foregoing reasoning will
-equally take place, though the body were not supposed to be at rest,
-when the powers began to be applied to it; provided the direction, in
-which the powers were applied, either conspired with the action of
-the body, or was directly opposite to it. Therefore if any power be
-applied to a moving body, and act upon the body either in the direction
-wherewith the body moves, so as to accelerate the body; or if it act
-directly opposite to the motion of the body, so as to retard it: in
-both these cases the change of motion will be proportional to the
-power applied; nay, the augmentation of the motion in one case, and
-the diminution thereof in the other, will be equal to that degree of
-motion, into which the same power would put the body, had it been at
-rest, when the power was applied.
-
-21. FARTHER, a power may be so applied to a moving body, as to act
-obliquely to the motion of the body. And the effects of such an oblique
-motion may be deduced from this observation; that as all bodies are
-continually moving along with the earth, we see that the visible
-effects of the same power are always the same, in whatever direction
-the power acts: and therefore the visible effects of any power upon
-a body, which seems only to be at rest, is always to appearance the
-same as the real effect would be upon a body truly at rest. Now
-suppose a body were moving along the line A B (in fig. 2.) and the eye
-accompanied it with an equal motion in the line C D equidistant from A
-B; so that when the body is at A, the eye shall be at C, and when the
-body is advanced to E in the line A B, the eye shall be advanced to F
-in the line C D, the distances A E and C F being equal. It is evident,
-that here the body will appear to the eye to be at rest; and the line
-F E G drawn from the eye through the body shall seem to the eye to be
-immoveable; though as the body and eye move forward together, this
-line shall really also move; so that when the body shall be advanced
-to H and the eye to K, the line F E G shall be transferred into the
-situation K H L, this line K H L being equidistant from F E G. Now
-if the body when at E were to receive an impulse in the direction of
-the line F E G; while the eye is moving on from F to K and carrying
-along with it the line F E G, the body will appear to the eye to move
-along this line F E G: for this is what has just now been said; that
-while bodies are moving along with the earth, and the spectator’s eye
-partakes of the same motion, the effect of any power upon the body
-will appear to be what it would really have been, had the body been
-truly at rest, when the power was applied. From hence it follows, that
-when the eye is advanced to K, the body will appear somewhere in the
-line K H L. Suppose it appear in M; then it is manifest, from what has
-been premised at the beginning of this paragraph, that the distance H
-M is equal to what the body would have run upon the line E G, during
-the time, wherein the eye has passed from F to K, provided that the
-body had been at rest, when acted upon in E. If it be farther asked,
-after what manner the body has moved from E to M? I answer, through a
-straight line; for it has been shewn above in the explication of the
-first law of motion, that a moving body, from the time it is left to it
-self, will proceed on in one continued straight line.
-
-22. IF E N be taken equal to H M and N M be drawn; since H M is
-equidistant from E N, N M will be equidistant from E H. Therefore the
-effect of any power upon a moving body, when that power acts obliquely
-to the motion of the body, is to be determined in this manner. Suppose
-the body is moving along the straight line A E B, if when the body is
-come to E, a power gives it an impulse in the direction of the line E
-G, to find what course the body will afterwards take we must proceed
-thus. Take in E B any length E H, and in E G take such a length E N,
-that if the body had been at rest in E, the power applied to it would
-have caused it to move over E N in the same space of time, as it would
-have employed in passing over E H, if the power had not acted at all
-upon it. Then draw H L equidistant from E G, and N M equidistant from
-E B. After this, if a line be drawn from E to the point M, where these
-two lines meet, the line E M will be the course into which the body
-will be put by the action of the power upon it at E.
-
-23. A MATHEMATICAL reader would here expect in some particulars more
-regular demonstrations; but as I do not at present address my self to
-such, so I hope, what I have now written will render my meaning evident
-enough to those, who are unacquainted with that kind of reasoning.
-
-24. NOW as we have been shewing, that some actual force is necessary
-either to put bodies out of a state of rest into motion, or to change
-the motion, which they have once received; it is proper here to
-observe, that this quality in bodies, whereby they preserve their
-present state, with regard to motion or rest, till some active force
-disturb them, is called the ~VIS INERTIAE~ of matter: and
-by this property, matter, sluggish and unactive of it self, retains
-all the power impressed upon it, and cannot be made to cease from
-action, but by the opposition of as great a power, as that which first
-moved it. By the degree of this ~VIS INERTIAE~, or power of
-inactivity, as we shall henceforth call it, we primarily judge of the
-quantity of solid matter in each body; for as this quality is inherent
-in all the bodies, upon which we can make any trial, we conclude it to
-be a property essential to all matter; and as we yet know no reason
-to suppose, that bodies are composed of different kinds of matter, we
-rather presume, that the matter of all bodies is the same; and that
-the degree of this power of inactivity is in every body proportional
-to the quantity of the solid matter in it. But although we have no
-absolute proof, that all the matter in the universe is uniform, and
-possesses this power of inactivity in the same degree; yet we can with
-certainty compare together the different degrees of this power of
-inactivity in different bodies. Particularly this power is proportional
-to the weight of bodies, as Sir ~ISAAC NEWTON~ has demonstrated[44].
-However, notwithstanding that this power of inactivity in any body can
-be more certainly known, than the quantity of solid matter in it; yet
-since there is no reason to suspect that one is not proportional to
-the other, we shall hereafter speak without hesitation of the quantity
-of matter in bodies, as the measure of the degree of their power of
-inactivity.
-
-25. THIS being established, we may now compare the effects of the
-same power upon different bodies, as hitherto we have shewn the
-effects of different powers upon the same body. And here if we limit
-the word motion to the peculiar sense given to it in philosophy, we
-may comprehend all that is to be said upon this head under one short
-precept; that the same power, to whatever body it is applied, will
-always produce the same degree of motion. But here motion does not
-signify the degree of celerity or velocity with which a body moves,
-in which sense only we have hitherto used it; but it is made use of
-particularly in philosophy to signify the force with which a body
-moves: as if two bodies A and B being in motion, twice the force
-would be required to stop A as to stop B, the motion of A would be
-esteemed double the motion of B. In moving bodies, these two things are
-carefully to be distinguished; their velocity or celerity, which is
-measured by the space they pass through during any determinate portion
-of time; and the quantity of their motion, or the force, with which
-they will press against any resistance. Which force, when different
-bodies move with the same velocity, is proportional to the quantity of
-solid matter in the bodies; but if the bodies are equal, this force is
-proportional to their respective velocities, and in other cases it is
-proportional both to the quantity of solid matter in the body, and also
-to its velocity. To instance in two bodies A and B: if A be twice as
-great as B, and they have both the same velocity, the motion of A shall
-be double the motion of B; and if the bodies be equal, and the velocity
-of A be twice that of B, the motion of A shall likewise be double that
-of B; but if A be twice as large as B, and move twice as swift, the
-motion of A will be four times the motion of B; and lastly, if A be
-twice as large as B, and move but half as fast, the degree of their
-motion shall be the same.
-
-26. THIS is the particular sense given to the word motion by
-philosophers, and in this sense of the word the same power always
-produces the same quantity or degree of motion. If the same power act
-upon two bodies A and B, the velocities, it shall give to each of them,
-shall be so adjusted to the respective bodies, that the same degree
-of motion shall be produced in each. If A be twice as great as B, its
-velocity shall be half that of B; if A has three times as much solid
-matter as B, the velocity of A shall be one third of the velocity of B;
-and generally the velocity given to A shall bear the same proportion to
-the velocity given to B, as the quantity of solid matter contained in
-the body B bears to the quantity of solid matter contained in A.
-
-27. THE reason of all this is evident from what has gone before. If
-a power were applied to B, which should bear the same proportion to
-the power applied to A, as the body B bears to A, the bodies B and
-A would both receive the same velocity; and the velocity, which B
-will receive from this power, will bear the same proportion to the
-velocity, which it would receive from the action of the power applied
-to A, as the former of these powers bears to the latter: that is, the
-velocity, which A receives from the power applied to it, will bear
-to the velocity, which B would receive from the same power, the same
-proportion as the body B bears to A.
-
-28. FROM hence we may now pass to the third law of motion, where
-this distinction between the velocity of a body and its whole motion
-is farther necessary to be regarded, as shall immediately be shewn;
-after having first illustrated the meaning of this law by a familiar
-instance. If a stone or other load be drawn by a horse; the load
-re-acts upon the horse, as much as the horse acts upon the load; for
-the harness, which is strained between them, presses against the horse
-as much as against the load; and the progressive motion of the horse
-forward is hindred as much by the load, as the motion of the load is
-promoted by the endeavour of the horse: that is, if the horse put forth
-the same strength, when loosened from the load, he would move himself
-forwards with greater swiftness in proportion to the difference between
-the weight of his own body and the weight of himself and load together.
-
-29. THIS instance will afford some general notion of the meaning of
-this law. But to proceed to a more philosophical explication: if a body
-in motion strike against another at rest, let the body striking be
-ever so small, yet shall it communicate some degree of motion to the
-body it strikes against, though the less that body be in comparison
-of that it impinges upon, and the less the velocity is, with which
-it moves, the smaller will be the motion communicated. But whatever
-degree of motion it gives to the resting body, the same it shall lose
-it self. This is the necessary consequence of the forementioned power
-of inactivity in matter. For suppose the two bodies equal, it is
-evident from the time they meet, both the bodies are to be moved by the
-single motion of the first; therefore the body in motion by means of
-its power of inactivity retaining the motion first given it, strikes
-upon the other with the same force, wherewith it was acted upon it
-self: but now both the bodies being to be moved by that force, which
-before moved one only, the ensuing velocity will be the same, as if the
-power, which was applied to one of the bodies, and put it into motion,
-had been applied to both; whence it appears, that they will proceed
-forwards, with half the velocity, which the body first in motion had:
-that is, the body first moved will have lost half its motion, and the
-other will have gained exactly as much. This rule is just, provided
-the bodies keep contiguous after meeting; as they would always do, if
-it were not for a certain cause that often intervenes, and which must
-now be explained. Bodies upon striking against each other, suffer an
-alteration in their figure, having their parts pressed inwards by the
-stroke, which for the most part recoil again afterwards, the bodies
-endeavouring to recover their former shape. This power, whereby bodies
-are inabled to regain their first figure, is usually called their
-elasticity, and when it acts, it forces the bodies from each other,
-and causes them to separate. Now the effect of this elasticity in the
-present case is such, that if the bodies are perfectly elastic, so
-as to recoil with as great a force as they are bent with, that they
-recover their figure in the same space of time, as has been taken up
-in the alteration made in it by their compression together; then this
-power will separate the bodies as swiftly, as they before approached,
-and acting upon both equally, upon the body first in motion contrary
-to the direction in which it moves, and upon the other as much in the
-direction of its motion, it will take from the first, and add to the
-other equal degrees of velocity: so that the power being strong enough
-to separate them with as great a velocity, as they approached with, the
-first will be quite stopt, and that which was at rest, will receive all
-the motion of the other. If the bodies are elastic in a less degree,
-the first will not lose all its motion, nor will the other acquire
-the motion of the first, but fall as much short of it, as the other
-retains. For this rule is never deviated from, that though the degree
-of elasticity determines how much more than half its velocity the body
-first in motion shall lose; yet in every case the loss in the motion
-of this body shall be transferred to the other, that other body always
-receiving by the stroke as much motion, as is taken from the first.
-
-30. This is the case of a body striking directly against an equal body
-at rest, and the reasoning here used is fully confirmed by experience.
-There are many other cases of bodies impinging against one another: but
-the mention of these shall be reserved to the next chapter, where we
-intend to be more particular and diffusive in the proof of these laws
-of motion, than we have been here.
-
-
-
-
-CHAP. II.
-
-Farther proofs of the LAWS OF MOTION.
-
-
-HAVING in the preceding chapter deduced the three laws of motion,
-delivered by our great philosopher, from the most obvious observations,
-that suggest them to us; I now intend to give more particular proofs
-of them, by recounting some of the discoveries which have been made in
-philosophy before Sir Isaac Newton. For as they were all collected by
-reasoning upon those laws; so the conformity of these discoveries to
-experience makes them so many proofs of the truth of the principles,
-from which they were derived.
-
-2. LET us begin with the subject, which concluded the last chapter.
-Although the body in motion be not equal to the body at rest, on which
-it strikes; yet the motion after the stroke is to be estimated in the
-same manner as above. Let A (in fig. 3.) be a body in motion towards
-another body B lying at rest. When A is arrived at B, it cannot proceed
-farther without putting B into motion; and what motion it gives to
-B, it must lose it self, that the whole degree of motion of A and B
-together, if neither of the bodies be elastic, shall be equal, after
-the meeting of the bodies, to the single motion of A before the stroke.
-Therefore, from what has been said above, it is manifest, that as soon
-as the two bodies are met, they will move on together with a velocity,
-which will bear the same proportion to the original velocity of A, as
-the body A bears to the sum of both the bodies.
-
-3. IF the bodies are elastic, so that they shall separate after the
-stroke, A must lose a greater part of its motion, and the subsequent
-motion of B will be augmented by this elasticity, as much as the motion
-of A is diminished by it. The elasticity acting equally between both
-the bodies, it will communicate to each the same degree of motion; that
-is, it will separate the bodies by taking from the body A and adding
-to the body B different degrees of velocity, so proportioned to their
-respective quantities of matter, that the degree of motion, wherewith
-A separates from B, shall be equal to the degree of motion, wherewith
-B separates from A. It follows therefore, that the velocity taken from
-A by the elasticity bears to the velocity, which the same elasticity
-adds to B, the same proportion, as B bears to A: consequently the
-velocity, which the elasticity takes from A, will bear the same
-proportion to the whole velocity, wherewith this elasticity causes the
-two bodies to separate from each other, as the body B bears to the sum
-of the two bodies A and B; and the velocity, which is added to B by the
-elasticity, bears to the velocity, wherewith the bodies separate, the
-same proportion, as the body A bears to the sum of the two bodies A
-and B. Thus is found, how much the elasticity takes from the velocity
-of A, and adds to the velocity of B; provided the degree of elasticity
-be known, whereby to determine the whole velocity wherewith the bodies
-separate from each other after the stroke[45].
-
-4. AFTER this manner is determined in every case the result of a body
-in motion striking against another at rest. The same principles will
-also determine the effects, when both bodies are in motion.
-
-5. LET two equal bodies move against each other with equal swiftness.
-Then the force, with which each of them presses forwards, being equal
-when they strike; each pressing in its own direction with the same
-energy, neither shall surmount the other, but both be stopt, if they
-be not elastic: for if they be elastic, they shall from thence recover
-new motion, and recede from each other, as swiftly as they met, if they
-be perfectly elastic; but more slowly, if less so. In the same manner,
-if two bodies of unequal bigness strike against each other, and their
-velocities be so related, that the velocity of the lesser body shall
-exceed the velocity of the greater in the same proportion, as the
-greater body exceeds the lesser (for instance, if one body contains
-twice the solid matter as the other, and moves but half as fast) two
-such bodies will entirely suppress each other’s motion, and remain from
-the time of their meeting fixed; if, as before, they are not elastic:
-but, if they are so in the highest degree, they shall recede again,
-each with the same velocity, wherewith they met. For this elastic
-power, as in the preceding case, shall renew their motion, and pressing
-equally upon both, shall give the same motion to both; that is, shall
-cause the velocity, which the lesser body receives, to bear the same
-proportion to the velocity, which the greater receives, as the greater
-body bears to the lesser: so that the velocities shall bear the same
-proportion to each other after the stroke, as before. Therefore if the
-bodies, by being perfectly elastic, have the sum of their velocities
-after the stroke equal to the sum of their velocities before the
-stroke, each body after the stroke will receive its first velocity.
-And the same proportion will hold likewise between the velocities,
-wherewith they go off, though they are elastic but in a less degree;
-only then the velocity of each will be less in proportion to the defect
-of elasticity.
-
-6. IF the velocities, wherewith the bodies meet, are not in the
-proportion here supposed; but if one of the bodies, as A, has a swifter
-velocity in comparison to the velocity of the other; then the effect
-of this excess of velocity in the body A must be joined to the effect
-now mentioned, after the manner of this following example. Let A be
-twice as great as B, and move with the same swiftness as B. Here A
-moves with twice that degree of swiftness, which would answer to the
-forementioned proportion. For A being double to B, if it moved but
-with half the swiftness, wherewith B advances, it has been just now
-shewn, that the two bodies upon meeting would stop, if they were not
-elastic; and if they were elastic, that they would each recoil, so as
-to cause A to return with half the velocity, wherewith B would return.
-But it is evident from hence, that B by encountring A will annul half
-its velocity, if the bodies be not elastic; and the future motion of
-the bodies will be the same, as if A had advanced against B at rest
-with half the velocity here assigned to it. If the bodies be elastic,
-the velocity of A and B after the stroke may be thus discovered. As
-the two bodies advance against each other, the velocity, with which
-they meet, is made up of the velocities of both bodies added together.
-After the stroke their elasticity will separate them again. The degree
-of elasticity will determine what proportion the velocity, wherewith
-they separate, must bear to that, wherewith they meet. Divide this
-velocity, with which the bodies separate into two parts, that one of
-the parts bear to the other the same proportion, as the body A bears to
-B; and ascribe the lesser part to the greater body A, and the greater
-part of the velocity to the lesser body B. Then take the part ascribed
-to A from the common velocity, which A and B would have had after the
-stroke, if they had not been elastic; and add the part ascribed to B to
-the same common velocity. By this means the true velocities of A and B
-after the stroke will be made known.
-
-7. IF the bodies are perfectly elastic, the great ~HUYGENS~
-has laid down this rule for finding their motion after concourse[46].
-Any straight line C D (in fig. 4, 5.) being drawn, let it be divided
-in E, that C E bear the same proportion to E D, as the swiftness of A
-bore to the swiftness of B before the stroke. Let the same line C D be
-also divided in F, that C F bear the same proportion to F D, as the
-body B bears to the body A. Then F G being taken equal to F E, if the
-point G falls within the line C D, both the bodies shall recoil after
-the stroke, and the velocity, wherewith the body A shall return, will
-bear the same proportion to the velocity, wherewith B shall return, as
-G C bears to G D; but if the point G falls without the line C D, then
-the bodies after their concourse shall both proceed to move the same
-way, and the velocity of A shall bear to the velocity of B the same
-proportion, that G C bears to G D, as before.
-
-8. IF the body B had stood still, and received the impulse of the other
-body A upon it; the effect has been already explained in the case, when
-the bodies are not elastic. And when they are elastic, the result of
-their collision is found by combining the effect of the elasticity with
-the other effect, in the same manner as in the last case.
-
-9. WHEN the bodies are perfectly elastic, the rule of
-~HUYGENS~[47] here is to divide the line C D (fig. 6.) in E as
-before, and to take E G equal to E D. And by these points thus found,
-the motion of each body after the stroke is determined, as before.
-
-10. IN the next place, suppose the bodies A and B were both moving the
-same way, but A with a swifter motion, so as to overtake B, and strike
-against it. The effect of the percussion or stroke, when the bodies are
-not elastic, is discovered by finding the common motion, which the two
-bodies would have after the stroke, if B were at rest, and A were to
-advance against it with a velocity equal to the excess of the present
-velocity of A above the velocity of B; and by adding to this common
-velocity thus found the velocity of B.
-
-11. IF the bodies are elastic, the effect of the elasticity is to be
-united with this other, as in the former cases.
-
-12. WHEN the bodies are perfectly elastic, the rule of HUYGENS[48] in
-this case is to prolong C D (fig. 7.) and to take in it thus prolonged
-C E in the same proportion to E D, as the greater velocity of A bears
-to the lesser velocity of B; after which F G being taken equal to F E,
-the velocities of the two bodies after the stroke will be determined,
-as in the two preceding cases.
-
-13. THUS I have given the sum of what has been written concerning the
-effects of percussion, when two bodies freely in motion strike directly
-against each other; and the results here set down, as the consequence
-of our reasoning from the laws of motion, answer most exactly to
-experience. A particular set of experiments has been invented to make
-trial of these effects of percussion with the greatest exactness. But
-I must defer these experiments, till I have explained the nature of
-pendulums[49]. I shall therefore now proceed to describe some of the
-appearances, which are caused in bodies from the influence of the power
-of gravity united with the general laws of motion; among which the
-motion of the pendulum will be included.
-
-14. THE most simple of these appearances is, when bodies fall down
-merely by their weight. In this case the body increases continually
-its velocity, during the whole time of its fall, and that in the very
-same proportion as the time increases. For the power of gravity acts
-constantly on the body with the same degree of strength: and it has
-been observed above in the first law of motion, that a body being once
-in motion will perpetually preserve that motion without the continuance
-of any external influence upon it: therefore, after a body has been
-once put in motion by the force of gravity, the body would continue
-that motion, though the power of gravity should cease to act any
-farther upon it; but, if the power of gravity continues still to draw
-the body down, fresh degrees of motion must continually be added to
-the body; and the power of gravity acting at all times with the same
-strength, equal degrees of motion will constantly be added in equal
-portions of time.
-
-15. THIS conclusion is not indeed absolutely true: for we shall find
-hereafter[50], that the power of gravity is not of the same strength at
-all distances from the center of the earth. But nothing of this is in
-the least sensible in any distance, to which we can convey bodies. The
-weight of bodies is the very same to sense upon the highest towers or
-mountains, as upon the level ground; so that in all the observations
-we can make, the forementioned proportion between the velocity of a
-falling body and the time, in which it has been descending, obtains
-without any the least perceptible difference.
-
-16. FROM hence it follows, that the space, through which a body falls,
-is not proportional to the time of the fall; for since the body
-increases its velocity, a greater space will be passed over in the same
-portion of time at the latter part of the fall, than at the beginning.
-Suppose a body let fall from the point A (in fig. 8.) were to descend
-from A to B in any portion of time; then if in an equal portion of time
-it were to proceed from B to C; I say, the space B C is greater than A
-B; so that the time of the fall from A to C being double the time of
-the fall from A to B, A C shall be more than double of A B.
-
-17. THE geometers have proved, that the spaces, through which bodies
-fall thus by their weight, are just in a duplicate or two-fold
-proportion of the times, in which the body has been falling. That is,
-if we were to take the line D E in the same proportion to A B, as the
-time, which the body has imployed in falling from A to C, bears to the
-time of the fall from A to B; then A C will be to D E in the same
-proportion. In particular, if the time of the fall through A C be twice
-the time of the fall through A B; then D E will be twice A B, and A C
-twice D E; or A C four times A B. But if the time of the fall through
-A C had been thrice the time of the fall through A B; D E would have
-been treble of A B, and A C treble of D E; that is, A C would have been
-equal to nine times A B.
-
-18. IF a body fall obliquely, it will approach the ground by slower
-degrees, than when it falls perpendicularly. Suppose two lines A B, A
-C (in fig. 9.) were drawn, one perpendicular, and the other oblique to
-the ground D E: then if a body were to descend in the slanting line
-A C; because the power of gravity draws the body directly downwards,
-if the line A C supports the body from falling in that manner, it
-must take off part of the effect of the power of gravity; so that
-in the time, which would have been sufficient for the body to have
-fallen through the whole perpendicular line A B, the body shall not
-have passed in the line A C a length equal to A B; consequently the
-line A C being longer than A B, the body shall most certainly take up
-more time in passing through A C, than it would have done in falling
-perpendicularly down through A B.
-
-19. THE geometers demonstrate, that the time, in which the body
-will descend through the oblique straight line A C, bears the same
-proportion to the time of its descent through the perpendicular A B,
-as the line it self A C bears to A B. And in respect to the velocity,
-which the body will have acquired in the point C, they likewise
-prove, that the length of the time imployed in the descent through A
-C so compensates the diminution of the influence of gravity from the
-obliquity of this line, that though the force of the power of gravity
-on the body is opposed by the obliquity of the line A C, yet the time
-of the body’s descent shall be so much prolonged, that the body shall
-acquire the very same velocity in the point C, as it would have got at
-the point B by falling perpendicularly down.
-
-20. IF a body were to descend in a crooked line, the time of its
-descent cannot be determined in so simple a manner; but the same
-property, in relation to the velocity, is demonstrated to take place in
-all cases: that is, in whatever line the body descends, the velocity
-will always be answerable to the perpendicular height, from which the
-body has fell. For instance, suppose the body A (in fig. 10.) were hung
-by a string to the pin B. If this body were let fall, till it came to
-the point C perpendicularly under B, it will have moved from A to C in
-the arch of a circle. Then the horizontal line A D being drawn, the
-velocity of the body in C will be the same, as if it had fallen from
-the point D directly down to C.
-
-21. IF a body be thrown perpendicularly upward with any force, the
-velocity, wherewith the body ascends, shall continually diminish,
-till at length it be wholly taken away; and from that time the body
-will begin to fall down again, and pass over a second time in its
-descent the line, wherein it ascended; falling through this line with
-an increasing velocity in such a manner, that in every point thereof,
-through which it falls, it shall have the very same velocity, as it
-had in the same place, when it ascended; and consequently shall come
-down into the place, whence it first ascended, with the velocity which
-was at first given to it. Thus if a body were thrown perpendicularly
-up in the line A B (in fig. II.) with such a force, as that it should
-stop at the point B, and there begin to fall again; when it shall have
-arrived in its descent to any point as C in this line, it shall there
-have the same velocity, as that wherewith it passed by this point C
-in its ascent; and at the point A it shall have gained as great a
-velocity, as that wherewith it was first thrown upwards. As this is
-demonstrated by the geometrical writers; so, I think, it will appear
-evident, by considering only, that while the body descends, the power
-of gravity must act over again, in an inverted order, all the influence
-it had on the body in its ascent; so as to give again to the body the
-same degrees of velocity, which it had taken away before.
-
-22. AFTER the same manner, if the body were thrown upwards in the
-oblique straight line C A (in fig. 9.) from the point C, with such a
-degree of velocity as just to reach the point A; it shall by its own
-weight return again through the line A C by the same degrees, as it
-ascended.
-
-23. AND lastly, if a body were thrown with any velocity in a line
-continually incurvated upwards, the like effect will be produced upon
-its return to the point, whence it was thrown. Suppose for instance,
-the body A (in fig. 12.) were hung by a string A B. Then if this body
-be impelled any way, it must move in the arch of a circle. Let it
-receive such an impulse, as shall cause it to move in the arch A C; and
-let this impulse be of such strength, that the body may be carried from
-A as far as D, before its motion is overcome by its weight: I say here,
-that the body forthwith returning from D, shall come again into the
-point A with the same velocity, as that wherewith it began to move.
-
-24. IT will be proper in this place to observe concerning the power of
-gravity, that its force upon any body does not at all depend upon the
-shape of the body; but that it continues constantly the same without
-any variation in the same body, whatever change be made in the figure
-of the body: and if the body be divided into any number of pieces,
-all those pieces shall weigh just the same, as they did, when united
-together in one body: and if the body be of a uniform contexture,
-the weight of each piece will be proportional to its bulk. This has
-given reason to conclude, that the power of gravity acts upon bodies
-in proportion to the quantity of matter in them. Whence it should
-follow, that all bodies must fall from equal heights in the same space
-of time. And as we evidently see the contrary in feathers and such
-like substances, which fall very slowly in comparison of more solid
-bodies; it is reasonable to suppose, that some other cause concurs to
-make so manifest a difference. This cause has been found by particular
-experiments to be the air. The experiments for this purpose are made
-thus. They set up a very tall hollow glass; within which near the top
-they lodge a feather and some very ponderous body, usually a piece
-of gold, this metal being the most weighty of any body known to us.
-This glass they empty of the air contained within it, and by moving a
-wire, which passes through the top of the glass, they let the feather
-and the heavy body fall together; and it is always found, that as the
-two bodies begin to descend at the same time, so they accompany each
-other in the fall, and come to the bottom at the very same instant,
-as near as the eye can judge. Thus, as far as this experiment can be
-depended on, it is certain, that the effect of the power of gravity
-upon each body is proportional to the quantity of solid matter, or
-to the power of inactivity in each body. For in the limited sense,
-which we have given above to the word motion, it has been shown, that
-the same force gives to all bodies the same degree of motion, and
-different forces communicate different degrees of motion proportional
-to the respective powers[51]. In this case, if the power of gravity
-were to act equally upon the feather, and upon the more solid body,
-the solid body would descend so much slower than the feather, as to
-have no greater degree of motion than the feather: but as both bodies
-descend with equal swiftness, the degree of motion in the solid body is
-greater than in the feather, bearing the same proportion to it, as the
-quantity of matter in the solid body to the quantity of matter in the
-feather. Therefore the effect of gravity on the solid body is greater
-than on the feather, in proportion to the greater degree of motion
-communicated; that is, the effect of the power of gravity on the solid
-body bears the same proportion to its effect on the feather, as the
-quantity of matter in the solid body bears to the quantity of matter
-in the feather. Thus it is the proper deduction from this experiment,
-that the power of gravity acts not on the surface of bodies only, but
-penetrates the bodies themselves most intimately, and operates alike
-on every particle of matter in them. But as the great quickness, with
-which the bodies fall, leaves it something uncertain, whether they do
-descend absolutely in the same time, or only so nearly together, that
-the difference in their swift motion is not discernable to the eye;
-this property of the power of gravity, which has here been deduced from
-this experiment, is farther confirmed by pendulums, whose motion is
-such, that a very minute difference would become sufficiently sensible.
-This will be farther discoursed on in another place[52]; but here I
-shall make use of the principle now laid down to explain the nature of
-what is called the center of gravity in bodies.
-
-25. THE center of gravity is that point, by which if a body be
-suspended, it shall hang at rest in any situation. In a globe of a
-uniform texture the center of gravity is the same with the center of
-the globe; for as the parts of the globe on every side of its center
-are similarly disposed, and the power of gravity acts alike on every
-part; it is evident, that the parts of the globe on each side of the
-center are drawn with equal force, and therefore neither side can
-yield to the other; but the globe, if supported at its center, must
-of necessity hang at rest. In like manner, if two equal bodies A and
-B (in fig. 13.) be hung at the extremities of an inflexible rod C D,
-which should have no weight; these bodies, if the rod be supported at
-its middle E, shall equiponderate; and the rod remain without motion.
-For the bodies being equal and at the same distance from the point of
-support E, the power of gravity will act upon each with equal strength,
-and in all respects under the same circumstances; therefore the weight
-of one cannot overcome the weight of the other. The weight of A can no
-more surmount the weight of B, than the weight of B can surmount the
-weight of A. Again, suppose a body as A B (in fig. 14.) of a uniform
-texture in the form of a roller, or as it is more usually called a
-cylinder, lying horizontally. If a straight line be drawn between C and
-D, the centers of the extreme circles of this cylinder; and if this
-straight line, commonly called the axis of the cylinder, be divided
-into two equal parts in E: this point E will be the center of gravity
-of the cylinder. The cylinder being a uniform figure, the parts on each
-side of the point E are equal, and situated in a perfectly similar
-manner; therefore this cylinder, if supported at the point E, must hang
-at rest, for the same reason as the inflexible rod above-mentioned
-will remain without motion, when suspended at its middle point. And it
-is evident, that the force applied to the point E, which would uphold
-the cylinder, must be equal to the cylinder’s weight. Now suppose two
-cylinders of equal thickness A B and C D to be joined together at C B,
-so that the two axis’s E F, and F G lie in one straight line. Let the
-axis E F be divided into two equal parts at H, and the axis F G into
-two equal parts at I. Then because the cylinder A B would be upheld
-at rest by a power applied in H equal to the weight of this cylinder,
-and the cylinder C D would likewise be upheld by a power applied in I
-equal to the weight of this cylinder; the whole cylinder A D will be
-supported by these two powers: but the whole cylinder may likewise be
-supported by a power applied to K, the middle point of the whole axis
-E G, provided that power be equal to the weight of the whole cylinder.
-It is evident therefore, that this power applied in K will produce the
-same effect, as the two other powers applied in H and I. It is farther
-to be observed, that H K is equal to half F G, and K I equal to half
-E F; for E K being equal to half E G, and E H equal to half E F, the
-remainder H K must be equal to half the remainder F G; so likewise G
-K being equal to half G E, and G I equal to half G F, the remainder I
-K must be equal to half the remainder E F. It follows therefore, that
-H K bears the same proportion to K I, as F G bears to E F. Besides,
-I believe, my readers will perceive, and it is demonstrated in form
-by the geometers, that the whole body of the cylinder C D bears the
-same proportion to the whole body of the cylinder A B, as the axis F G
-bears to the axis E F[53]. But hence it follows, that in the two powers
-applied at H and I, the power applied at H bears the same proportion to
-the power applied at I, as K I bears to K H. Now suppose two strings
-H L and I M extended upwards, one from the point H and the other from
-I, and to be laid hold on by two powers, one strong enough to hold up
-the cylinder A B, and the other of strength sufficient to support the
-cylinder C D. Here as these two powers uphold the whole cylinder, and
-therefore produce an effect, equal to what would have been produced
-by a power applied to the point K of sufficient force to sustain the
-whole cylinder: it is manifest, that if the cylinder be taken away,
-the axis only being left, and from the point K a string, as K N, be
-extended, which shall be drawn down by a power equivalent to the weight
-of the cylinder, this power shall act against the other two powers, as
-much as the cylinder acted against them; and consequently these three
-powers shall be upon a balance, and hold the axis H I fixed between
-them. But if these three powers preserve a mutual balance, the two
-powers applied to the strings H L and I M are a balance to each other;
-the power applied to the string H L bearing the same proportion to
-the power applied to the string I M, as the distance I K bears to the
-distance K H. Hence it farther appears, that if an inflexible rod A B
-(in fig. 15.) be suspended by any point C not in the middle thereof;
-and if at A the end of the shorter arm be hung a weight, and at B
-the end of the longer arm be also hung a weight less than the other,
-and that the greater of these weights bears to the lesser the same
-proportion, as the longer arm of the rod bears to the shorter; then
-these two weights will equiponderate: for a power applied at C equal to
-both these weights will support without motion the rod thus charged;
-since here nothing is changed from the preceding case but the situation
-of the powers, which are now placed on the contrary sides of the line,
-to which they are fixed. Also for the same reason, if two weights A
-and B (in fig. 16.) were connected together by an inflexible rod C D,
-drawn from C the center of gravity of A to D the center of gravity of
-B; and if the rod C D were to be so divided in E, that the part D E
-bear the same proportion to the other part C E, as the weight A bears
-to the weight B: then this rod being supported at E will uphold the
-weights, and keep them at rest without motion. This point E, by which
-the two bodies A and B will be supported, is called their common center
-of gravity. And if a greater number of bodies were joined together,
-the point, by which they could all be supported, is called the common
-center of gravity of them all. Suppose (in fig. 17.) there were three
-bodies A, B, C, whose respective centers of gravity were joined by the
-three lines D E, D F, E F: the line D E being so divided in G, that D
-G bear the same proportion to G E, as B bears to A; G is the center
-of gravity common to the two bodies A and B; that is, a power equal
-to the weight of both the bodies applied to G would support them, and
-the point G is pressed as much by the two weights A and B, as it would
-be, if they were both hung together at that point. Therefore, if a
-line be drawn from G to F, and divided in H, so that G H bear the same
-proportion to H F, as the weight C bears to both the weights A and
-B, the point H will be the common center of gravity of all the three
-weights; for H would be their common center of gravity, if both the
-weights A and B were hung together at G, and the point G is pressed as
-much by them in their present situation, as it would be in that case.
-In the same manner from the common center of these three weights, you
-might proceed to find the common center, if a fourth weight were added,
-and by a gradual progress might find the common center of gravity
-belonging to any number of weights whatever.
-
-26. AS all this is the obvious consequence of the proposition laid down
-for assigning the common center of gravity of any two weights, by the
-same proposition the center of gravity of all figures is found. In a
-triangle, as A B C (in fig. 18.) the center of gravity lies in the line
-drawn from the middle point of any one of the sides to the opposite
-angle, as the line B D is drawn from D the middle of the line A C to
-the opposite angle B[54]; so that if from the middle of either of the
-other sides, as from the point E in the side A B, a line be drawn, as
-E C, to the opposite angle; the point F, where this line crosses the
-other line B D, will be the center of gravity of the triangle[55].
-Likewise D F is equal to half F B, and E F equal to half F C[56]. In a
-hemisphere, as A B C (fig. 19.) if from D the center of the base the
-line D B be erected perpendicular to that base, and this line be so
-divided in E, that D E be equal to three fifths of B E, the point E is
-the center of gravity of the hemisphere[57].
-
-27. IT will be of use to observe concerning the center of gravity of
-bodies; that since a power applied to this center alone can support
-a body against the power of gravity, and hold it fixed at rest; the
-effect of the power of gravity on a body is the same, as if that whole
-power were to exert itself on the center of gravity only. Whence it
-follows, that, when the power of gravity acts on a body suspended by
-any point, if the body is so suspended, that the center of gravity
-of the body can descend; the power of gravity will give motion to
-that body, otherwise not: or if a number of bodies are so connected
-together, that, when any one is put into motion, the rest shall, by
-the manner of their being joined, receive such motion, as shall keep
-their common center of gravity at rest; then the power of gravity
-shall not be able to produce any motion in these bodies, but in all
-other cases it will. Thus, if the body A B (in fig. 20, 21.) whose
-center of gravity is C, be hung on the point A, and the center C be
-perpendicularly under A (as in fig. 20.) the weight of the body will
-hold it still without motion, because the center C cannot descend any
-lower. But if the body be removed into any other situation, where the
-center C is not perpendicularly under A (as in fig. 21.) the body by
-its weight will be put into motion towards the perpendicular situation
-of its center of gravity. Also if two bodies A, B (in fig. 22.) be
-joined together by the rod C D lying in an horizontal situation, and
-be supported at the point E; if this point be the center of gravity
-common to the two bodies, their weight will not put them into motion;
-but if this point E is not their common center of gravity, the bodies
-will move; that part of the rod C D descending, in which the common
-center of gravity is found. So in like manner, if these two bodies were
-connected together by any more complex contrivance; yet if one of
-the bodies cannot move without so moving the other, that their common
-center of gravity shall rest, the weight of the bodies will not put
-them in motion, otherwise it will.
-
-28. I SHALL proceed in the next place to speak of the mechanical
-powers. These are certain instruments or machines, contrived for the
-moving great weights with small force; and their effects are all
-deducible from the observation we have just been making. They are
-usually reckoned in number five; the lever, the wheel and axis, the
-pulley, the wedge, and the screw; to which some add the inclined
-plane. As these instruments have been of very ancient use, so the
-celebrated ~ARCHIMEDES~ seems to have been the first, who discovered
-the true reason of their effects. This, I think, may be collected
-from what is related of him, that some expressions, which he used to
-denote the unlimited force of these instruments, were received as very
-extraordinary paradoxes: whereas to those, who had understood the cause
-of their great force, no expressions of that kind could have appeared
-surprizing.
-
-29. ALL the effects of these powers may be judged of by this one rule,
-that, when two weights are applied to any of these instruments, the
-weights will equiponderate, if, when put into motion, their velocities
-will be reciprocally proportional to their respective weights. And what
-is said of weights, must of necessity be equally understood of any
-other forces equivalent to weights, such as the force of a man’s arm,
-a stream of water, or the like.
-
-30. BUT to comprehend the meaning of this rule, the reader must know,
-what is to be understood by reciprocal proportion; which I shall now
-endeavour to explain, as distinctly as I can; for I shall be obliged
-very frequently to make use of this term. When any two things are so
-related, that one increases in the same proportion as the other, they
-are directly proportional. So if any number of men can perform in a
-determined space of time a certain quantity of any work, suppose drain
-a fish-pond, or the like; and twice the number of men can perform twice
-the quantity of the same work, in the same time; and three times the
-number of men can perform as soon thrice the work; here the number
-of men and the quantity of the work are directly proportional. On
-the other hand, when two things are so related, that one decreases
-in the same proportion, as the other increases, they are said to be
-reciprocally proportional. Thus if twice the number of men can perform
-the same work in half the time, and three times the number of men can
-finish the same in a third part of the time; then the number of men
-and the time are reciprocally proportional. We shewed above[58] how to
-find the common center of gravity of two bodies, there the distances of
-that common center from the centers of gravity of the two bodies are
-reciprocally proportional to the respective bodies. For C E in fig. 16.
-being in the same proportion to E D, as B bears to A; C E is so much
-greater in proportion than E D, as A is less in proportion than B.
-
-31. NOW this being understood, the reason of the rule here stated will
-easily appear. For if these two bodies were put in motion, while the
-point E rested, the velocity, wherewith A would move, would bear the
-same proportion to the velocity, wherewith B would move, as E C bears
-to E D. The velocity therefore of each body, when the common center of
-gravity rests, is reciprocally proportional to the body. But we have
-shewn above[59], that if two bodies are so connected together, that the
-putting them in motion will not move their common center of gravity;
-the weight of those bodies will not produce in them any motion.
-Therefore in any of these mechanical engines, if, when the bodies are
-put into motion, their velocities are reciprocally proportional to
-their respective weights, whereby the common center of gravity would
-remain at rest; the bodies will not receive any motion from their
-weight, that is, they will equiponderate. But this perhaps will be yet
-more clearly conceived by the particular description of each mechanical
-power.
-
-32. THE lever was first named above. This is a bar made use of to
-sustain and move great weights. The bar is applied in one part to
-some strong support; as the bar A B (in fig. 23, 24.) is applied at
-the point C to the support D. In some other part of the bar, as E, is
-applied the weight to be sustained or moved; and in a third place, as
-F, is applied another weight or equivalent force, which is to sustain
-or move the weight at E. Now here, if, when the level should be put in
-motion, and turned upon the point C, the velocity, wherewith the point
-F would move, bears the same proportion to the velocity, wherewith the
-point E would move, as the weight at E bears to the weight or force at
-F; then the lever thus charged will have no propensity to move either
-way. If the weight or other force at F be not so great as to bear this
-proportion, the weight at E will not be sustained; but if the force at
-F be greater than this, the weight at E will be surmounted. This is
-evident from what has been said above[60], when the forces at E and F
-are placed (as in fig. 23.) on different sides of the support D. It
-will appear also equally manifest in the other case, by continuing
-the bar B C in fig. 24. on the other side of the support D, till C G
-be equal to C F, and by hanging at G a weight equivalent to the power
-at F; for then, if the power at F were removed, the two weights at G
-and E would counterpoize each other, as in the former case: and it is
-evident, that the point F will be lifted up by the weight at G with the
-same degree of force, as by the other power applied to F; since, if the
-weight at E were removed, a weight hung at F equal to that at G would
-balance the lever, the distances C G and C F being equal.
-
-33. IF the two weights, or other powers, applied to the lever do
-not counterbalance each other; a third power may be applied in any
-place proposed of the lever, which shall hold the whole in a just
-counterpoize. Suppose (in fig. 25.) the two powers at E and F did not
-equiponderate, and it were required to apply a third power to the point
-G, that might be sufficient to balance the lever. Find what power in
-F would just counterbalance the power in E; then if the difference
-between this power and that, which is actually applied at F, bear the
-same proportion to the third power to be applied at G, as the distance
-C G bears to C F; the lever will be counterpoized by the help of this
-third power, if it be so applied as to act the same way with the power
-in F, when that power is too small to counterbalance the power in E;
-but otherwise the power in G must be so applied, as to act against the
-power in F. In like manner, if a lever were charged with three, or any
-greater number of weights or other powers, which did not counterpoize
-each other, another power might be applied in any place proposed,
-which should bring the whole to a just balance. And what is here said
-concerning a plurality of powers, may be equally applied to all the
-following cases.
-
-34. IF the lever should consist of two arms making an angle at the
-point C (as in fig. 26.) yet if the forces are applied perpendicularly
-to each arm, the same proportion will hold between the forces applied,
-and the distances of the center, whereon the lever rests, from the
-points to which they are applied. That is, the weight at E will be to
-the force in F in the same proportion, as C F bears to C E.
-
-35. BUT whenever the forces applied to the lever act obliquely to the
-arm, to which they are applied (as in fig. 27.) then the strength of
-the forces is to be estimated by lines let fall from the center of
-the lever to the directions, wherein the forces act. To balance the
-levers in fig. 27, the weight or other force at F will bear the same
-proportion to the weight at E, as the distance C E bears to C G the
-perpendicular let fall from the point C upon the line, which denotes
-the direction wherein the force applied to F acts: for here, if the
-lever be put into motion, the power applied to F will begin to move in
-the direction of the line F G; and therefore its first motion will be
-the same, as the motion of the point G.
-
-36. WHEN two weights hang upon a lever, and the point, by which the
-lever is supported, is placed in the middle between the two weights,
-that the arms of the lever are both of equal length; then this lever is
-particularly called a balance; and equal weights equiponderate as in
-common scales. When the point of support is not equally distant from
-both weights, it constitutes that instrument for weighing, which is
-called a steelyard. Though both in common scales, and the steelyard,
-the point, on which the beam is hung, is not usually placed just in the
-same straight line with the points, that hold the weights, but rather
-a little above (as in fig. 28.) where the lines drawn from the point
-C, whereon the beam is suspended, to the points E and F, on which the
-weights are hung, do not make absolutely one continued line. If the
-three points E, C, and F were in one straight line, those weights,
-which equiponderated, when the beam hung horizontally, would also
-equiponderate in any other situation.
-
-[Illustration]
-
-But we see in these instruments, when they are charged with weights,
-which equiponderate with the beam hanging horizontally; that, if
-the beam be inclined either way, the weight most elevated surmounts
-the other, and descends, causing the beam to swing, till by degrees
-it recovers its horizontal position. This effect arises from the
-forementioned structure: for by this structure these instruments are
-levers composed of two arms, which make an angle at the point of
-support (as in fig. 29, 30.) the first of which represents the case
-of the common balance, the second the case of the steelyard. In the
-first, where C E and C F are equal, equal weights hung at E and F will
-equiponderate, when the points E and F are in an horizontal situation.
-Suppose the lines E G and F H to be perpendicular to the horizon, then
-they will denote the directions, wherein the forces applied to E and
-F act. Therefore the proportion between the weights at E and F, which
-shall equiponderate, are to be judged of by perpendiculars, as C I, C
-K, let fall from C upon E G and F H: so that the weights being equal,
-the lines C I, C K, must be equal also, when the weights equiponderate.
-But I believe my readers will easily see, that since C E and C F are
-equal, the lines C I and C K will be equal, when the points E and F are
-horizontally situated.
-
-37. IF this lever be set into any other position (as in fig. 31.) then
-the weight, which is raised highest, will outweigh the other. Here,
-if the point F be raised higher than E, the perpendicular C K will be
-longer than C I: and therefore the weights would equiponderate, if
-the weight at F were less than the weight at E. But the weight at
-F is equal to that at E; therefore is greater, than is necessary to
-counterbalance the weight at E, and consequently will outweigh it, and
-draw the beam of the lever down.
-
-38. IN like manner in the case of the steelyard (fig. 32.) if the
-weights at E and F are so proportioned, as to equiponderate, when the
-points E and F are horizontally situated; then in any other situation
-of this lever the weight, which is raised highest, will preponderate.
-That is, if in the horizontal situation of the points E and F the
-weight at F bears the same proportion to the weight at E, as C I bears
-to C K; then, if the point F be raised higher than E (as in fig. 32.)
-the weight at F shall bear a greater proportion to the weight at E,
-than C I bears to C K.
-
-39. FARTHER a lever may be hung upon an axis, and then the two arms
-of the lever need not be continuous, but fixed to different parts of
-this axis; as in fig. 33, where the axis A B is supported by its two
-extremities A and B. To this axis one arm of the lever is fixed at the
-point C, the other at the point D. Now here, if a weight be hung at E,
-the extremity of that arm, which is fixed to the axis at the point C;
-and another weight be hung at F, the extremity of the arm, which is
-fixed on the axis at D; then these weights will equiponderate, when the
-weight at E bears the same proportion to the weight at F, as the arm D
-F bears to C E.
-
-40. THIS is the case, if both the arms are perpendicular to the axis,
-and lie (as the geometers express themselves) in the same plane; or, in
-other words, if the arms are so fixed perpendicularly upon the axis,
-that, when one of them lies horizontally, the other shall also be
-horizontal. If either arm stand not perpendicular to the axis; then, in
-determining the proportion between the weights, instead of the length
-of that arm, you must use the perpendicular let fall upon the axis from
-the extremity of that arm. If the arms are not so fixed as to become
-horizontal, at the same time; the method of assigning the proportion
-between the weights is analogous to that made use of above in levers,
-which make an angle at the point, whereon they are supported.
-
-41. FROM this case of the lever hung on an axis, it is easy to make a
-transition to another mechanical power, the wheel and axis.
-
-42. THIS instrument is a wheel fixed on a roller, the roller being
-supported at each extremity so as to turn round freely with the wheel,
-in the manner represented in fig. 34, where A B is the wheel, C D the
-roller, and E F its two supports. Now suppose a weight G hung by a cord
-wound round the roller, and another weight H hung by a cord wound about
-the wheel the contrary way: that these weights may support each other,
-the weight H must bear the same proportion to the weight G, as the
-thickness of the roller bears to the diameter of the wheel.
-
-43. SUPPOSE the line _k l_ to be drawn through the middle of the
-roller; and from the place of the roller, where the cord, on which the
-weight G hangs, begins to leave the roller, as at _m_, let the line_
-m n_ be drawn perpendicularly to _k l_; and from the point, where
-the cord holding the weight H begins to leave the wheel, as at _o_,
-let the line _o p_ be drawn perpendicular to _k l_. This being done,
-the two lines _o p_ and _m n_ represent two arms of a lever fixed on
-the axis _k l_; consequently the weight H will bear to the weight G
-the same proportion, as _m n_ bears to _o p_. But _m n_ bears the
-same proportion to _o p_, as the thickness of the roller bears to the
-diameter of the wheel; for _m n_ is half the thickness of the roller,
-and _o p_ half the diameter of the wheel.
-
-44. IF the wheel be put into motion, and turned once round, that the
-cord, on which the weight G hangs, be wound once more round the axis;
-then at the same time the cord, whereon the weight H hangs, will be
-wound off from the wheel one circuit. Therefore the velocity of the
-weight G will bear the same proportion to the velocity of the weight H,
-as the circumference of the roller to the circumference of the wheel.
-But the circumference of the roller bears the same proportion to the
-circumference of the wheel, as the thickness of the roller bears to
-the diameter of the wheel, consequently the velocity of the weight
-G bears to the velocity of the weight H the same proportion, as the
-thickness of the roller bears to the diameter of the wheel, which is
-the proportion that the weight H bears to the weight G. Therefore as
-before in the lever, so here also the general rule laid down above is
-verified, that the weights equiponderate, when their velocities would
-be reciprocally proportional to their respective weights.
-
-45. IN like manner, if on the same axis two wheels of different sizes
-are fixed (as in fig. 35.) and a weight hung on each; the weights will
-equiponderate, if the weight hung on the greater wheel bear the same
-proportion to the weight hung on the lesser, as the diameter of the
-lesser wheel bears to the diameter of the greater.
-
-46. IT is usual to join many wheels together in the same frame, which
-by the means of certain teeth, formed in the circumference of each
-wheel, shall communicate motion to each other. A machine of this nature
-is represented in fig. 36. Here A B C is a winch, upon which is fixed
-a small wheel D indented with teeth, which move in the like teeth of
-a larger wheel E F fixed on the axis G H. Let this axis carry another
-wheel I, which shall move in like manner a greater wheel K L fixed on
-the axis M N. Let this axis carry another small wheel O, which after
-the same manner shall turn about a larger wheel P Q fixed on the roller
-R S, on which a cord shall be wound, that holds a weight, as T. Now
-the proportion required between the weight T and a power applied to
-the winch at A sufficient to support the weight, will most easily be
-estimated, by computing the proportion, which the velocity of the point
-A would bear to the velocity of the weight. If the winch be turned
-round, the point A will describe a circle as A V. Suppose the wheel E F
-to have ten times the number of teeth, as the wheel D; then the winch
-must turn round ten times to carry the wheel E F once round. If wheel K
-L has also ten times the number of teeth, as I, the wheel I must turn
-round ten times to carry the wheel K L once round; and consequently
-the winch A B C must turn round an hundred times to turn the wheel K L
-once round. Lastly, if the wheel P Q has ten times the number of teeth,
-as the wheel O, the winch must turn about one thousand times in order
-to turn the wheel P Q, or the roller R S once round. Therefore here
-the point A must have gone over the circle A V a thousand times, in
-order to lift the weight T through a space equal to the circumference
-of the roller R S: whence it follows, that the power applied at A will
-balance the weight T, if it bear the same proportion to it, as the
-circumference of the roller to one thousand times the circle A V; or
-the same proportion as half the thickness of the roller bears to one
-thousand times A B.
-
-47. I SHALL now explain the effect of the pulley. Let a weight hang by
-a pulley, as in fig. 37. Here it is evident, that the power A, by which
-the weight B is supported, must be equal to the weight; for the cord C
-D is equally strained between them; and if the weight B move, the power
-A must move with equal velocity. The pulley E has no other effect, than
-to permit the power A to act in another direction, than it must have
-done, if it had been directly applied to support the weight without the
-intervention of any such instrument.
-
-48. AGAIN, let a weight be supported, as in fig. 38; where the weight
-A is fixed to the pulley B, and the cord, by which the weight is
-upheld, is annexed by one extremity to a hook C, and at the other end
-is held by the power D. Here the weight is supported by a cord doubled;
-insomuch that although the cord were not strong enough to hold the
-weight single, yet being thus doubled it might support it. If the
-end of the cord held by the power D were hung on the hook C, as well
-as the other end; then, when both ends of the cord were tied to the
-hook, it is evident, that the hook would bear the whole weight; and
-each end of the string would bear against the hook with the force of
-half the weight only, seeing both ends together bear with the force of
-the whole. Hence it is evident, that, when the power D holds one end
-of the weight, the force, which it must exert to support the weight,
-must be equal to just half the weight. And the same proportion between
-the weight and power might be collected from comparing the respective
-velocities, with which they would move; for it is evident, that the
-power must move through a space equal to twice the distance of the
-pulley from the hook, in order to lift the pulley up to the hook.
-
-49. IT is equally easy to estimate the effect, when many pulleys are
-combined together, as in fig. 39, 40; in the first of which the under
-set of pulleys, and consequently the weight is held by six strings; and
-in the latter figure by five: therefore in the first of these figures
-the power to support the weight, must be one sixth part only of the
-weight, and in the latter figure the power must be one fifth part.
-
-50. THERE are two other ways of supporting a weight by pulleys, which I
-shall particularly consider.
-
-51. ONE of these ways is represented in fig. 41. Here the weight being
-connected to the pulley B, a power equal to half the weight A would
-support the pulley C, if applied immediately to it. Therefore the
-pulley C is drawn down with a force equal to half the weight A. But if
-the pulley D were to be immediately supported by half the force, with
-which the pulley C is drawn down, this pulley D will uphold the pulley
-C; so that if the pulley D be upheld with a force equal to one fourth
-part of the weight A, that force will support the weight. But, for the
-same reason as before, if the power in E be equal to half the force
-necessary to uphold the pulley D; this pulley, and consequently the
-weight A, will be upheld: therefore, if the power in E be one eighth
-part of the weight A, it will support the weight.
-
-52. ANOTHER way of applying pulleys to a weight is represented in fig.
-42. To explain the effect of pulleys thus applied, it will be proper to
-consider different weights hanging, as in fig. 43. Here, if the power
-and weights balance each other, the power A is equal to the weight B;
-the weight C is equal to twice the power A, or the weight B; and for
-the same reason the weight D is equal to twice the weight C, or equal
-to four times the power A. It is evident therefore, that all the three
-weights B, C, D together are equal to seven times the power A. But if
-these three weights were joined in one, they would produce the case of
-fig. 40: so that in that figure the weight A, where there are three
-pulleys, is seven times the power B. If there had been but two pulleys,
-the weight would have been three times the power; and if there had been
-four pulleys, the weight would have been fifteen times the power.
-
-53. THE wedge is next to be considered. The form of this instrument is
-sufficiently known. When it is put under any weight (as in fig. 44.)
-the force, with which the wedge will lift the weight, when drove under
-it by a blow upon the end A B, will bear the same proportion to the
-force, wherewith the blow would act on the weight, if directly applied
-to it; as the velocity, which the wedge receives from the blow, bears
-to the velocity, wherewith the weight is lifted by the wedge.
-
-54. THE screw is the fifth mechanical power. There are two ways of
-applying this instrument. Sometimes it is screwed into a hole, as
-in fig. 45, where the screw A B is screwed through the plank C D.
-Sometimes the screw is applied to the teeth of a wheel, as in fig. 46,
-where the thread of the screw A B turns in the teeth of a wheel C D. In
-both these cases, if a bar, as A E, be fixed to the end A of the screw;
-the force, wherewith the end B of the screw in fig. 45 is forced down,
-and the force, wherewith the teeth of the wheel C D in fig. 44 are
-held, bears the same proportion to the power applied to the end E of
-the bar; as the velocity, wherewith the end E will move, when the screw
-is turned, bears to the velocity, wherewith the end B of the screw in
-fig. 43, or the teeth of the wheel C D in fig. 46, will be moved.
-
-55. THE inclined plane affords also a means of raising a weight with
-less force, than what is equal to the weight it self. Suppose it were
-required to raise the globe A (in fig. 47.) from the ground B C up
-to the point, whose perpendicular height from the ground is E D. If
-this globe be drawn along the slant D F, less force will be required
-to raise it, than if it were lifted directly up. Here if the force
-applied to the globe bear the same proportion only to its weight, as
-E D bears to F D, it will be sufficient to hold up the globe; and
-therefore any addition to that force will put it in motion, and draw
-it up; unless the globe, by pressing against the plane, whereon it
-lies, adhere in some degree to the plane. This indeed it must always
-do more or less, since no plane can be made so absolutely smooth as
-to have no inequalities at all; nor yet so infinitely hard, as not to
-yield in the least to the pressure of the weight. Therefore the globe
-cannot be laid on such a plane, whereon it will slide with perfect
-freedom, but they must in some measure rub against each other; and this
-friction will make it necessary to imploy a certain degree of force
-more, than what is necessary to support the globe, in order to give
-it any motion. But as all the mechanical powers are subject in some
-degree or other to the like impediment from friction; I shall here
-only shew what force would be necessary to sustain the globe, if it
-could lie upon the plane without causing any friction at all. And I
-say, that if the globe were drawn by the cord G H, lying parallel to
-the plane D F; and the force, wherewith the cord is pulled, bear the
-same proportion to the weight of the globe, as E D bears to D F; this
-force will sustain the globe. In order to the making proof of this, let
-the cord G H be continued on, and turned over the pulley I, and let
-the weight K be hung to it. Now I say, if this weight bears the same
-proportion to the globe A, as D E bears to D F, the weight will support
-the globe. I think it is very manifest, that the center of the globe A
-will lie in one continued line with the cord H G. Let L be the center
-of the globe, and M the center of gravity of the weight K. In the first
-place let the weight hang so, that a line drawn from L to M shall lie
-horizontally; and I say, if the globe be moved either up or down the
-plane D F, the weight will so move along with it, that the center of
-gravity common to both the weights shall continue in this line L M, and
-therefore shall in no case descend. To prove this more fully, I shall
-depart a little from the method of this treatise, and make use of a
-mathematical proportion or two: but they are such, as any person, who
-has read ~EUCLID’S ELEMENTS~, will fully comprehend; and are
-in themselves so evident, that, I believe, my readers, who are wholly
-strangers to geometrical writings, will make no difficulty of admitting
-them. This being premised, let the globe be moved up, till its center
-be at G, then will M the center of gravity of the weight K be sunk to
-N; so that M N shall be equal to G L. Draw N G crossing the line M L
-in O; then I say, that O is the common center of gravity of the two
-weights in this their new situation. Let G P be drawn perpendicular to
-M L; then G L will bear the same proportion to G P, as D F bears to D
-E; and M N being equal to G L, M N will bear the same proportion to G
-P, as D F bears to D E. But N O bears the same proportion to O G, as
-M N bears to G P; consequently N O will bear the same proportion to
-O G, as D F bears to D E. In the last place, the weight of the globe
-A bears the same proportion to the other weight K, as D F bears to D
-E; therefore N O bears the same proportion to O G, as the weight of
-the globe A bears to the weight K. Whence it follows, that, when the
-center of the globe A is in G, and the center of gravity of the weight
-K is in N, O will be the center of gravity common to both the weights.
-After the same manner, if the globe had been caused to descend, the
-common center of gravity would have been found in this line M L. Since
-therefore no motion of the globe either way will make the common center
-of gravity descend, it is manifest, from what has been said above, that
-the weights A and K counterpoize each other.
-
-56. I SHALL now consider the case of pendulums. A pendulum is made
-by hanging a weight to a line, so that it may swing backwards and
-forwards. This motion the geometers have very carefully considered,
-because it is the most commodious instrument of any for the exact
-measurement of time.
-
-57. I HAVE observed already[61], that if a body hanging perpendicularly
-by a string, as the body A (in fig. 48.) hangs by the string A B, be
-put so into motion, as to be made to ascend up the circular arch A C;
-then as soon as it has arrived at the highest point, to which the
-motion, that the body has received, will carry it; it will immediately
-begin to descend, and at A will receive again as great a degree of
-motion, as it had at first. This motion therefore will carry the
-body up the arch A D, as high as it ascended before in the arch A C.
-Consequently in its return through the arch D A it will acquire again
-at A its original velocity, and advance a second time up the arch
-A C as high as at first; by this means continuing without end its
-reciprocal motion. It is true indeed, that in fact every pendulum,
-which we can put in motion, will gradually lessen its swing, and
-at length stop, unless there be some power constantly applied to
-it, whereby its motion shall be renewed; but this arises from the
-resistance, which the body meets with both from the air, and the string
-by which it is hung: for as the air will give some obstruction to the
-progress of the body moving through it; so also the string, whereon the
-body hangs, will be a farther impediment; for this string must either
-slide on the pin, whereon it hangs, or it must bend to the motion of
-the weight; in the first there must be some degree of friction, and
-in the latter the string will make some resistance to its inflection.
-However, if all resistance could be removed, the motion of a pendulum
-would be perpetual.
-
-58. BUT to proceed, the first property, I shall take notice of in this
-motion, is, that the greater arch the pendulous body moves through, the
-greater time it takes up: though the length of time does not increase
-in so great a proportion as the arch. Thus if C D be a greater arch,
-and E F a lesser, where C A is equal to A D, and E A equal to A F;
-the body, when it swings through the greater arch C D, shall take up
-in its swing from C to D a longer time than in swinging from E to F,
-when it moves only in that lesser arch; or the time in which the body
-let fall from C will descend through the arch C A is greater than the
-time, in which it will descend through the arch E A, when let fall from
-E. But the first of these times will not hold the same proportion to
-the latter, as the first arch C A bears to the other arch E A; which
-will appear thus. Let C G and E H be two horizontal lines. It has been
-remarked above[62], that the body in falling through the arch C A will
-acquire as great a velocity at the point A, as it would have gained by
-falling directly down through G A; and in falling through the arch E A
-it will acquire in the point A only that velocity, which it would have
-got in falling through H A. Therefore, when the body descends through
-the greater arch C A, it shall gain a greater velocity, than when it
-passes only through the lesser; so that this greater velocity will in
-some degree compensate the greater length of the arch.
-
-59. THE increase of velocity, which the body acquires in falling from
-a greater height, has such an effect, that, if straight lines be drawn
-from A to C and E, the body would fall through the longer straight
-line C A just in the same time, as through the shorter straight line
-E A. This is demonstrated by the geometers, who prove, that if any
-circle, as A B C D (fig. 49.) be placed in a perpendicular situation;
-a body shall fall obliquely through every line, as A B drawn from the
-lowest point A in the circle to any other point in the circumference
-just in the same time, as would be imployed by the body in falling
-perpendicularly down through the diameter C A. But the time in which
-the body will descend through the arch, is different from the time,
-which it would take up in falling through the line A B.
-
-60. IT has been thought by some, that because in very small arches this
-correspondent straight line differs but little from the arch itself;
-therefore the descent through this straight line would be performed
-in such small arches nearly in the same time as through the arches
-themselves: so that if a pendulum were to swing in small arches,
-half the time of a single swing would be nearly equal to the time,
-in which a body would fall perpendicularly through twice the length
-of the pendulum. That is, the whole time of the swing, according to
-this opinion, will be four fold the time required for the body to fall
-through half the length of the pendulum; because the time of the body’s
-falling down twice the length of the pendulum is half the time required
-for the fall through one quarter of this space, that is through half
-the pendulum’s length. However there is here a mistake; for the whole
-time of the swing, when the pendulum moves through small arches, bears
-to the time required for a body to fall down through half the length of
-the pendulum very nearly the same proportion, as the circumference of a
-circle bears to its diameter; that is very nearly the proportion of 355
-to 113, or little more than the proportion of 3 to 1. If the pendulum
-takes so great a swing, as to pass over an arch equal to one sixth part
-of the whole circumference of the circle, it will swing 115 times,
-while it ought according to this proportion to have swung 117 times; so
-that, when it swings in so large an arch, it loses something less than
-two swings in an hundred. If it swing through 1/10 only of the circle,
-it shall not lose above one vibration in 160. If it swing in 1/20 of
-the circle, it shall lose about one vibration in 690. If its swing be
-confined to 1/40 of the whole circle, it shall lose very little more
-than one swing in 2600. And if it take no greater a swing than through
-1/60 of the whole circle, it shall not lose one swing in 5800.
-
-61. NOW it follows from hence, that, when pendulums swing in small
-arches, there is very nearly a constant proportion observed between
-the time of their swing, and the time, in which a body would fall
-perpendicularly down through half their length. And we have declared
-above, that the spaces, through which bodies fall, are in a two fold
-proportion of the times, which they take up in falling[63]. Therefore
-in pendulums of different lengths, swinging through small arches, the
-lengths of the pendulums are in a two fold or duplicate proportion of
-the times, they take in swinging; so that a pendulum of four times the
-length of another shall take up twice the time in each swing, one of
-nine times the length will make one swing only for three swings of the
-shorter, and so on.
-
-62. THIS proportion in the swings of different pendulums not only holds
-in small arches; but in large ones also, provided they be such, as the
-geometers call similar; that is, if the arches bear the same proportion
-to the whole circumferences of their respective circles. Suppose (in
-fig. 48.) A B, C D to be two pendulums. Let the arch E F be described
-by the motion of the pendulum A B, and the arch G H be described by
-the pendulum C D; and let the arch E F bear the same proportion to the
-whole circumference, which would be formed by turning the pendulum A
-B quite round about the point A, as the arch G H bears to the whole
-circumference, that would be formed by turning the pendulum C D quite
-round the point C. Then I say, the proportion, which the length of the
-pendulum A B bears to the length of the pendulum C D, will be two fold
-of the proportion, which the time taken up in the description of the
-arch E F bears to the time employed in the description of the arch G H.
-
-63. THUS pendulums, which swing in very small arches, are nearly an
-equal measure of time. But as they are not such an equal measure to
-geometrical exactness; the mathematicians have found out a method of
-causing a pendulum so to swing, that, if its motion were not obstructed
-by any resistance, it would always perform each swing in the same time,
-whether it moved through a greater, or a lesser space. This was first
-discovered by the great ~HUYGENS~, and is as follows. Upon the
-straight line A B (in fig. 49.) let the circle C D E be so placed, as
-to touch the straight line in the point C. Then let this circle roll
-along upon the straight line A B, as a coach-wheel rolls along upon
-the ground. It is evident, that, as soon as ever the circle begins to
-move, the point C in the circle will be lifted off from the straight
-line A B; and in the motion of the circle will describe a crooked
-course, which is represented by the line C F G H. Here the part C H of
-the straight line included between the two extremities C and H of the
-line C F G H will be equal to the whole circumference of the circle C D
-E; and if C H be divided into two equal parts at the point I, and the
-straight line I K be drawn perpendicular to C H, this line I K will
-be equal to the diameter of the circle C D E. Now in this line if a
-body were to be let fall from the point H, and were to be carried by
-its weight down the line H G K, as far as the point K, which is the
-lowest point of the line C F G H; and if from any other point G a body
-were to be let fall in the same manner; this body, which falls from
-G, will take just the same time in coming to K, as the body takes up,
-which falls from H. Therefore if a pendulum can be so hung, that the
-ball shall move in the line A G F E, all its swings, whether long or
-short, will be performed in the same time; for the time, in which the
-ball will descend to the point K, is always half the time of the whole
-swing. But the ball of a pendulum will be made to swing in this line by
-the following means. Let K I (in fig. 52.) be prolonged upwards to L,
-till I L is equal to I K. Then let the line L M H equal and like to K
-H be applied, as in the figure between the points L and H, so that the
-point which in this line L M H answers to the point H in the line K H
-shall be applied to the point L, and the point answering to the point
-K shall be applied to the point H. Also let such another line L N C be
-applied between L and C in the same manner. This preparation being
-made; if a pendulum be hung at the point L of such a length, that the
-ball thereof shall reach to K; and if the string shall continually bend
-against the lines H M L and L N C, as the pendulum swings to and fro;
-by this means the ball shall constantly keep in the line C K H.
-
-64. NOW in this pendulum, as all the swings, whether long or short,
-will be performed in the same time; so the time of each will exactly
-bear the same proportion to the time required for a body to fall
-perpendicularly down, through half the length of the pendulum, that is
-from I to K, as the circumference of a circle bears to its diameter.
-
-65. IT may from hence be understood in some measure, why, when
-pendulums swing in circular arches, the times of their swings are
-nearly equal, if the arches are small, though those arches be of very
-unequal lengths; for if with the semidiameter L K the circular arch O
-K P be described, this arch in the lower part of it will differ very
-little from the line C K H.
-
-66. IT may not be amiss here to remark, that a body will fall in this
-line C K H (fig. 53.) from C to any other point, as Q or R in a shorter
-space of time, than if it moved through the straight line drawn from
-C to the other point; or through any other line whatever, that can be
-drawn between these two points.
-
-67. BUT as I have observed, that the time, which a pendulum takes in
-swinging, depends upon its length; I shall now say something concerning
-the way, in which this length of the pendulum is to be estimated. If
-the whole ball of the pendulum could be crouded into one point, this
-length, by which the motion of the pendulum is to be computed, would
-be the length of the string or rod. But the ball of the pendulum must
-have a sensible magnitude, and the several parts of this ball will not
-move with the same degree of swiftness; for those parts, which are
-farthest from the point, whereon the pendulum is suspended, must move
-with the greatest velocity. Therefore to know the time in which the
-pendulum swings, it is necessary to find that point of the ball, which
-moves with the same degree of velocity, as if the whole ball were to be
-contracted into that point.
-
-68. THIS point is not the center of gravity, as I shall now endeavour
-to shew. Suppose the pendulum A B (in fig. 54.) composed of an
-inflexible rod A C and ball C B, to be fixed on the point A, and lifted
-up into an horizontal situation. Here if the rod were not fixed to the
-point A, the body C B would descend directly with the whole force of
-its weight; and each part of the body would move down with the same
-degree of swiftness. But when the rod is fixed at the point A, the
-body must fall after another manner; for the parts of the body must
-move with different degrees of velocity, the parts more remote from A
-descending with a swifter motion, than the parts nearer to A; so that
-the body will receive a kind of rolling motion while it descends. But
-it has been observed above, that the effect of gravity upon any body
-is the same, as if the whole force were exerted on the body’s center of
-gravity[64].
-
-[Illustration]
-
-Since therefore the power of gravity in drawing down the body must also
-communicate to it the rolling motion just described; it seems evident,
-that the center of gravity of the body cannot be drawn down as swiftly,
-as when the power of gravity has no other effect to produce on the
-body, than merely to draw it downward. If therefore the whole matter of
-the body C B could be crouded into its center of gravity, so that being
-united into one point, this rolling motion here mentioned might give
-no hindrance to its descent; this center would descend faster, than it
-can now do. And the point, which now descends as fast, as if the whole
-matter or the body C B were crouded into it, will be farther removed
-from the point A, than the center of gravity of the body C B.
-
-69. AGAIN, suppose the pendulum A B (in fig. 55.) to hang obliquely.
-Here the power of gravity will operate less upon the ball of the
-pendulum, than before: but the line D E being drawn so, as to stand
-perpendicular to the rod A C of the pendulum; the force of gravity
-upon the body C B, now it is in this situation, will produce the same
-effect, as if the body were to glide down an inclined plane in the
-position of D E. But here the motion of the body, when the rod is fixed
-to the point A, will not be equal to the uninterrupted descent of the
-body down this plane; for the body will here also receive the same
-kind of rotation in its motion, as before; so that the motion of the
-center of gravity will in like manner be retarded; and the point, which
-here descends with that degree of swiftness, which the body would have,
-if not hindered by being fixed to the point A; that is, the point,
-which descends as fast, as if the whole body were crouded into it, will
-be as far removed from the point A, as before.
-
-70. THIS point, by which the length of the pendulum is to be estimated,
-is called the center of oscillation. And the mathematicians have laid
-down general directions, whereby to find this center in all bodies. If
-the globe A B (in fig. 56.) be hung by the string C D, whose weight
-need not be regarded, the center of oscillation is found thus. Let the
-straight line drawn from C to D be continued through the globe to F.
-That it will pass through the center of the globe is evident. Suppose E
-to be this center of the globe; and take the line G of such a length,
-that it shall bear the same proportion to E D, as E D bears to E C.
-Then E H being made equal to ⅖ of G, the point H shall be the center of
-oscillation[65]. If the weight of the rod C D is too considerable to
-be neglected, divide C D (fig. 57) in I, that D I be equal to ⅓, part
-of C D; and take K in the same proportion to C I, as the weight of the
-globe A B to the weight of the rod C D. Then having found H, the center
-of oscillation of the globe, as before, divide I K in I, so that I L
-shall bear the same proportion to L H, as the line C H bears to K; and
-L shall be the center of oscillation of the whole pendulum.
-
-71. THIS computation is made upon supposition, that the center of
-oscillation of the rod C D, if that were to swing alone without any
-other weight annexed, would be the point I. And this point would be
-the true center of oscillation, so far as the thickness of the rod is
-not to be regarded. If any one chuses to take into consideration the
-thickness of the rod, he must place the center of oscillation thereof
-so much below the point I, that eight times the distance of the center
-from the point I shall bear the same proportion to the thickness of the
-rod, as the thickness of the rod bears to its length C D[66].
-
-72. IT has been observed above, that when a pendulum swings in an
-arch of a circle, as here in fig. 58, the pendulum A B swings in the
-circular arch C D; if you draw an horizontal line, as E F, from the
-place whence the pendulum is let fall, to the line A G, which is
-perpendicular to the horizon: then the velocity, which the pendulum
-will acquire in coming to the point G, will be the same, as any body
-would acquire in falling directly down from F to G. Now this is to be
-understood of the circular arch, which is described by the center of
-oscillation of the pendulum. I shall here farther observe, that if the
-straight line E G be drawn from the point, whence the pendulum falls,
-to the lowest point of the arch; in the same or in equal pendulums the
-velocity, which the pendulum acquires in G, is proportional to this
-line: that is, if the pendulum, after it has descended from E to G, be
-taken back to H, and let fall from thence, and the line H G be drawn;
-the velocity, which the pendulum shall acquire in G by its descent from
-H, shall bear the same proportion to the velocity, which it acquires
-in falling from E to G, as the straight line H G bears to the straight
-line E G.
-
-73. WE may now proceed to those experiments upon the percussion of
-bodies, which I observed above might be made with pendulums. This
-expedient for examining the effects of percussion was first proposed
-by our late great architect Sir ~CHRISTOPHER WREN~. And it
-is as follows. Two balls, as A and B (in fig. 59.) either equal or
-unequal, are hung by two strings from two points C and D, so that, when
-the balls hang down without motion, they shall just touch each other,
-and the strings be parallel. Here if one of these balls be removed to
-any distance from its perpendicular situation, and then let fall to
-descend and strike against the other; by the last preceding paragraph
-it will be known, with what velocity this ball shall return into its
-first perpendicular situation, and consequently with what force it
-shall strike against the other ball; and by the height to which this
-other ball ascends after the stroke, the velocity communicated to this
-ball will be discovered. For instance, let the ball A be taken up to
-E, and from thence be let fall to strike against B, passing over in
-its descent the circular arch E F. By this impulse let B fly up to G,
-moving through the circular arch H G. Then E I and G K being drawn
-horizontally, the ball A will strike against B with the velocity,
-which it would acquire in falling directly down from I; and the ball
-B has received a velocity, wherewith, if it had been thrown directly
-upward, it would have ascended up to K. Likewise if straight lines be
-drawn from E to F and from H to G, the velocity of A, wherewith it
-strikes, will bear the same proportion to the velocity, which B has
-received by the blow, as the straight line E F bears to the straight
-line H G. In the same manner by noting the place to which A ascends
-after the stroke, its remaining velocity may be compared with that,
-wherewith it struck against B. Thus may be experimented the effects of
-the body A striking against B at rest. If both the bodies are lifted
-up, and so let fall as to meet and impinge against each other just upon
-the coming of both into their perpendicular situation; by observing
-the places into which they move after the stroke, the effects of their
-percussion in all these cases may be found in the same manner as before.
-
-74. SIR ~ISAAC NEWTON~ has described these experiments;
-and has shewn how to improve them to a greater exactness by making
-allowance for the resistance, which the air gives to the motion of the
-balls[67]. But as this resistance is exceeding small, and the manner
-of allowing for it is delivered by himself in very plain terms, I need
-not enlarge upon it here. I shall rather speak to a discovery, which
-he made by these experiments upon the elasticity of bodies. It has
-been explained above[68], that when two bodies strike, if they be not
-elastic, they remain contiguous after the stroke; but that if they
-are elastic, they separate, and that the degree of their elasticity
-determines the proportion between the celerity wherewith they separate,
-and the celerity wherewith they meet. Now our author found, that the
-degree of elasticity appeared in the same bodies always the same, with
-whatever degree of force they struck; that is, the celerity wherewith
-they separated, always bore the same proportion to the celerity
-wherewith they met: so that the elastic power in all the bodies, he
-made trial upon, exerted it self in one constant proportion to the
-compressing force. Our author made trial with balls of wool bound up
-very compact, and found the celerity with which they receded, to bear
-about the proportion of 5 to 9 to the celerity wherewith they met; and
-in steel he found nearly the same proportion; in cork the elasticity
-was something less; but in glass much greater; for the celerity,
-wherewith balls of that material separated after percussion, he found
-to bear the proportion of 15 to 16 to the celerity wherewith they
-met[69].
-
-75. I SHALL finish my discourse on pendulums, with this farther
-observation only, that the center of oscillation is also the center
-of another force. If a body be fixed to any point, and being put in
-motion turns round it; the body, if uninterrupted by the power of
-gravity or any other means, will continue perpetually to move about
-with the same equable motion. Now the force, with which such a body
-moves, is all united in the point, which in relation to the power of
-gravity is called the center of oscillation. Let the cylinder A B C D
-(in fig. 60.) whose axis is E F, be fixed to the point E. And supposing
-the point E to be that on which the cylinder is suspended, let the
-center of oscillation be found in the axis E F, as has been explained
-above[70]. Let G be that center: then I say, that the force, wherewith
-this cylinder turns round the point E, is so united in the point G,
-that a sufficient force applied in that point shall stop the motion of
-the cylinder, in such a manner, that the cylinder should immediately
-remain without motion, though it were to be loosened from the point E
-at the same instant, that the impediment was applied to G: whereas, if
-this impediment had been applied to any other point of the axis, the
-cylinder would turn upon the point, where the impediment was applied.
-If the impediment had been applied between E and G, the cylinder would
-so turn on the point, where the impediment was applied, that the end
-B C would continue to move on the same way it moved before along with
-the whole cylinder; but if the impediment were applied to the axis
-farther off from E than G, the end A D of the cylinder would start out
-of its present place that way in which the cylinder moved. From this
-property of the center of oscillation, it is also called the center of
-percussion. That excellent mathematician, Dr. BROOK TAYLOR, has farther
-improved this doctrine concerning the center of percussion, by shewing,
-that if through this point G a line, as G H I, be drawn perpendicular
-to E F, and lying in the course of the body’s motion; a sufficient
-power applied to any point of this line will have the same effect, as
-the like power applied to G[71]: so that as we before shewed the center
-of percussion within the body on its axis; by this means we may find
-this center on the surface of the body also, for it will be where this
-line H I crosses that surface.
-
-76. I SHALL now proceed to the last kind of motion, to be treated on
-in this place, and shew what line the power of gravity will cause a
-body to describe, when it is thrown forwards by any force. This was
-first discovered by the great ~GALILEO~, and is the principle,
-upon which engineers should direct the shot of great guns. But as in
-this case bodies describe in their motion one of those lines, which in
-geometry are called conic sections; it is necessary here to premise a
-description of those lines. In which I shall be the more particular,
-because the knowledge of them is not only necessary for the present
-purpose, but will be also required hereafter in some of the principal
-parts of this treatise.
-
-77. THE first lines considered by the ancient geometers were the
-straight line and the circle. Of these they composed various figures,
-of which they demonstrated many properties, and resolved divers
-problems concerning them. These problems they attempted always to
-resolve by the describing straight lines and circles. For instance, let
-a square A B C D (fig. 61.) be proposed, and let it be required to make
-another square in any assigned proportion to this. Prolong one side,
-as D A, of this square to E, till A E bear the same proportion to A D,
-as the new square is to bear to the square A C. If the opposite side B
-C of the square A C be also prolonged to F, till B F be equal to A E,
-and E F be afterwards drawn, I suppose my readers will easily conceive,
-that the figure A B F E will bear to the square A B C D the same
-proportion, as the line A E bears to the line A D. Therefore the figure
-A B F E will be equal to the new square, which is to be found, but is
-not it self a square, because the side A E is not of the same length
-with the side E F. But to find a square equal to the figure A B F E
-you must proceed thus. Divide the line D E into two equal parts in the
-point G, and to the center G with the interval G D describe the circle
-D H E I; then prolong the line A B, till it meets the circle in K; and
-make the square A K L M, which square will be equal to the figure A B F
-E, and bear to the square A B C D the same proportion, as the line A E
-bears to A D.
-
-78. I SHALL not proceed to the proof of this, having only here set it
-down as a specimen of the method of resolving geometrical problems
-by the description of straight lines and circles. But there are some
-problems, which cannot be resolved by drawing straight lines or circles
-upon a plane. For the management therefore of these they took into
-consideration solid figures, and of the solid figures they found that,
-which is called a cone, to be the most useful.
-
-79. A CONE is thus defined by EUCLIDE in his elements of geometry[72].
-If to the straight line A B (in fig. 62.) another straight line, as A
-C, be drawn perpendicular, and the two extremities B and C be joined by
-a third straight line composing the triangle A C B (for so every figure
-is called, which is included under three straight lines) then the two
-points A and B being held fixed, as two centers, and the triangle A C B
-being turned round upon the line A B, as on an axis; the line A C will
-describe a circle, and the figure A C B will describe a cone, of the
-form represented by the figure B C D E F (fig. 63.) in which the circle
-C D E F is usually called the base of the cone, and B the vertex.
-
-80. NOW by this figure may several problems be resolved, which cannot
-by the simple description of straight lines and circles upon a plane.
-Suppose for instance, it were required to make a cube, which should
-bear any assigned proportion to some other cube named. I need not here
-inform my readers, that a cube is the figure of a dye. This problem
-was much celebrated among the ancients, and was once inforced by the
-command of an oracle. This problem may be performed by a cone thus.
-First make a cone from a triangle, whose side A C shall be half the
-length of the side B C Then on the plane A B C D (fig. 64.) let the
-line E F be exhibited equal in length to the side of the cube proposed;
-and let the line F G be drawn perpendicular to E F, and of such a
-length, that it bear the same proportion to E F, as the cube to be
-sought is required to bear to the cube proposed. Through the points E,
-F, and G let the circle F H I be described. Then let the line E F be
-prolonged beyond F to K, that F K be equal to F E, and let the triangle
-F K L, having all its sides F K, K L, L F equal to each other, be hung
-down perpendicularly from the plane A B C D. After this, let another
-plane M N O P be extended through the point L, so as to be equidistant
-from the former plane A B C D, and in this plane let the line Q L R
-be drawn so, as to be equidistant from the line E F K. All this being
-thus prepared, let such a cone, as was above directed to be made, be so
-applied to the plane M N O P, that it touch this plane upon the line
-Q R, and that the vertex of the cone be applied to the point L. This
-cone, by cutting through the first plane A B C D, will cross the circle
-F H I before described. And if from the point S, where the surface of
-this cone intersects the circle, the line S T be drawn so, as to be
-equidistant from the line E F; the line F T will be equal to the side
-of the cube sought: that is, if there be two cubes or dyes formed, the
-side of one being equal to E F, and the side of the other equal to F T;
-the former of these cubes shall bear the same proportion to the latter,
-as the line E F bears to F G.
-
-81. INDEED this placing a cone to cut through a plane is not a
-practicable method of resolving problems. But when the geometers had
-discovered this use of the cone, they applied themselves to consider
-the nature of the lines, which will be produced by the intersection
-of the surface of a cone and a plane; whereby they might be enabled
-both to reduce these kinds of solutions to practice, and also to render
-their demonstrations concise and elegant.
-
-82. WHENEVER the plane, which cuts the cone, is equidistant from
-another plane, that touches the cone on the side; (which is the case of
-the present figure;) the line, wherein the plane cuts the surface of
-the cone, is called a parabola. But if the plane, which cuts the cone,
-be so inclined to this other, that it will pass quite through the cone
-(as in fig. 65.) such a plane by cutting the cone produces the figure
-called an ellipsis, in which we shall hereafter shew the earth and
-other planets to move round the sun. If the plane, which cuts the cone,
-recline the other way (as in fig. 66.) so as not to be parallel to any
-plane, whereon the cone can lie, nor yet to cut quite through the cone;
-such a plane shall produce in the cone a third kind of line, which
-is called an hyperbola. But it is the first of these lines named the
-parabola, wherein bodies, that are thrown obliquely, will be carried
-by the force of gravity; as I shall here proceed to shew, after having
-first directed my readers how to describe this sort of line upon a
-plane, by which the form of it may be seen.
-
-83. TO any straight line A B (fig. 67.) let a straight ruler C D be
-so applied, as to stand against it perpendicularly. Upon the edge of
-this ruler let another ruler E F be so placed, as to move along upon
-the edge of the first ruler C D, and keep always perpendicular to it.
-This being so disposed, let any point, as G, be taken in the line A B,
-and let a string equal in length to the ruler E F be fastened by one
-end to the point G, and by the other to the extremity F of the ruler E
-F. Then if the string be held down to the ruler E F by a pin H, as is
-represented in the figure; the point of this pin, while the ruler E F
-moves on the ruler C D, shall describe the line I K L, which will be
-one part of the curve line, whose description we were here to teach:
-and by applying the rulers in the like manner on the other side of
-the line A B, we may describe the other part I M of this line. If the
-distance C G be equal to half the line E F in fig. 64, the line M I L
-will be that very line, wherein the plane A B C D in that figure cuts
-the cone.
-
-84. THE line A I is called the axis of the parabola M I L, and the
-point G is called the focus.
-
-85. NOW by comparing the effects of gravity upon falling bodies, with
-what is demonstrated of this figure by the geometers, it is proved,
-that every body thrown obliquely is carried forward in one of these
-lines, the axis whereof is perpendicular to the horizon.
-
-86. THE geometers demonstrate, that if a line be drawn to touch a
-parabola in any point, as the line A B (in fig. 68.) touches the
-parabola C D, whose axis is Y Z, in the point E; and several lines F
-G, H I, K L be drawn parallel to the axis of the parabola: then the
-line F G will be to H I in the duplicate proportion of E F to E H,
-and F G to K L in the duplicate proportion of E F to E K; likewise
-H I to K L in the duplicate proportion of E H to E K. What is to be
-understood by duplicate or two-fold proportion, has been already
-explained[73]. Accordingly I mean here, that if the line M be taken to
-bear the same proportion to E H, as E H bears to E F, H I will bear
-the same proportion to F G, as M bears to E F; and if the line N bears
-the same proportion to E K, as E K bears to E F, K L will bear the
-same proportion to F G, as N bears to E F; or if the line O bear the
-same proportion to E K, as E K bears to E H, K L will bear the same
-proportion to H I, as O bears to E H.
-
-87. THIS property is essential to the parabola, being so connected with
-the nature of the figure, that every line possessing this property is
-to be called by this name.
-
-88. NOW suppose a body to be thrown from the point A (in fig. 69.)
-towards B in the direction of the line A B. This body, if left to
-it self, would move on with a uniform motion through this line A B.
-Suppose the eye of a spectator to be placed at the point C just under
-the point A; and let us imagine the earth to be so put into motion
-along with the body, as to carry the spectator’s eye along the line C D
-parallel to A B; and that the eye would move on with the same velocity,
-wherewith the body would proceed in the line A B, if it were to be
-left to move without any disturbance from its gravitation towards the
-earth. In this case if the body moved on without being drawn towards
-the earth, it would appear to the spectator to be at rest. But if the
-power of gravity exerted it self on the body, it would appear to the
-spectator to fall directly down. Suppose at the distance of time,
-wherein the body by its own progressive motion would have moved from A
-to E, it should appear to the spectator to have fallen through a length
-equal to E F: then the body at the end of this time will actually have
-arrived at the point F. If in the space of time, wherein the body
-would have moved by its progressive motion from A to G, it would have
-appeared to the spectator to have fallen down the space G H: then the
-body at the end of this greater interval of time will be arrived at
-the point H. Now if the line A F H I be that, through which the body
-actually passes; from what has here been said, it will follow, that
-this line is one of those, which I have been describing under the name
-of the parabola. For the distances E F, G H, through which the body
-is seen to fall, will increase in the duplicate proportion of the
-times[74]; but the lines A E, A G will be proportional to the times
-wherein they would have been described by the single progressive motion
-of the body: therefore the lines E F, G H will be in the duplicate
-proportion of the lines A F, A G; and the line A F H I possesses the
-property of the parabola.
-
-89. IF the earth be not supposed to move along with the body, the
-case will be a little different. For the body being constantly drawn
-directly towards the center of the earth, the body in its motion will
-be drawn in a direction a little oblique to that, wherein it would be
-drawn by the earth in motion, as before supposed. But the distance to
-the center of the earth bears so vast a proportion to the greatest
-length, to which we can throw bodies, that this obliquity does not
-merit any regard. From the sequel of this discourse it may indeed
-be collected, what line the body being thrown thus would be found
-to describe, allowance being made for this obliquity of the earth’s
-action[75]. This is the discovery of Sir IS. NEWTON; but has no use in
-this place. Here it is abundantly sufficient to consider the body as
-moving in a parabola.
-
-90. THE line, which a projected body describes, being thus known,
-practical methods have been deduced from hence for directing the
-shot of great guns to strike any object desired. This work was first
-attempted by ~GALILEO~, and soon after farther improved by
-his scholar ~TORRICELLI~; but has lately been rendred more
-complete by the great Mr. ~COTES~, whose immature death is an
-unspeakable loss to mathematical learning. If it be required to throw
-a body from the point A (in fig. 70.) so as to strike the point B;
-through the points A, B draw the straight line C D, and erect the line
-A E perpendicular to the horizon, and of four times the height, from
-which a body must fall to acquire the velocity, wherewith the body is
-intended to be thrown. Through the points A and E describe a circle,
-that shall touch the line C D in the point A. Then from the point
-B draw the line B F perpendicular to the horizon, intersecting the
-circle in the points G and H. This being done, if the body be projected
-directly towards either of these points G or H, it shall fall upon
-the point B; but with this difference, that, if it be thrown in the
-direction A G, it shall sooner arrive at B, than if it were projected
-in the direction A H. When the body is projected in the direction A
-G; the time, it will take up in arriving at B, will bear the same
-proportion to the time, wherein it would fall down through one fourth
-part of A E, as A G bears to half A E. But when the body is thrown in
-the direction of A H, the time of its passing to B will bear the same
-proportion to the time, wherein it would fall through one fourth part
-of A E, as A H bears to half A E.
-
-91. IF the line A I be drawn so as to divide the angle under E A D in
-the middle, and the line I K be drawn perpendicular to the horizon;
-this line will touch the circle in the point I, and if the body be
-thrown in the direction A I, it will fall upon the point K: and this
-point K is the farthest point in the line A D, which the body can be
-made to strike, without increasing its velocity.
-
-92. THE velocity, wherewith the body every where moves, may be found
-thus. Suppose the body to move in the parabola A B (fig. 71.) Erect A
-C perpendicular to the horizon, and equal to the height, from which a
-body must fall to acquire the velocity, wherewith the body sets out
-from A. If you take any points as D and E in the parabola, and draw
-D F and E G parallel to the horizon; the velocity of the body in D
-will be equal to what a body will acquire in falling down by its own
-weight through C F, and in E the velocity will be the same, as would
-be acquired in falling through C G. Thus the body moves slowest at
-the highest point H of the parabola; and at equal distances from this
-point will move with equal swiftness, and descend from that highest
-point through the line H B altogether like to the line A H in which it
-ascended; abating only the resistance of the air, which is not here
-considered. If the line H I be drawn from the highest point H parallel
-to the horizon, A I will be equal to ¼ of B G in fig. 70, when the body
-is projected in the direction A G, and equal to ¼ of B H, when the body
-is thrown in the direction A H provided A D be drawn horizontally.
-
-93. THUS I have recounted the principal discoveries, which had been
-made concerning the motion of bodies by Sir ~ISAAC NEWTON~’S
-predecessors; all these discoveries, by being found to agree with
-experience, contributing to establish the laws of motion, from whence
-they were deduced. I shall therefore here finish what I had to say
-upon those laws; and conclude this chapter with a few words concerning
-the distinction which ought to be made between absolute and relative
-motion. For some have thought fit to confound them together; because
-they observe the laws of motion to take place here on the earth, which
-is in motion, after the same manner as if it were at rest. But Sir
-~ISAAC NEWTON~ has been careful to distinguish between the
-relative and absolute consideration both of motion and time[76]. The
-astronomers anciently found it necessary to make this distinction in
-time. Time considered in it self passes on equably without relation to
-any thing external, being the proper measure of the continuance and
-duration of all things. But it is most frequently conceived of by us
-under a relative view to some succession in sensible things, of which
-we take cognizance. The succession of the thoughts in our own minds
-is that, from whence we receive our first idea of time, but is a very
-uncertain measure thereof; for the thoughts of some men flow on much
-more swiftly, than the thoughts of others; nor does the same person
-think equally quick at all times. The motions of the heavenly bodies
-are more regular; and the eminent division of time into night and day,
-made by the sun, leads us to measure our time by the motion of that
-luminary: nor do we in the affairs of life concern our selves with any
-inequality, which there may be in that motion; but the space of time
-which comprehends a day and night is rather supposed to be always the
-same. However astronomers anciently found these spaces of time not to
-be always of the same length, and have taught how to compute their
-differences. Now the time, when so equated as to be rendered perfectly
-equal, is the true measure of duration, the other not. And therefore
-this latter, which is absolutely true time, differs from the other,
-which is only apparent. And as we ordinarily make no distinction
-between apparent time, as measured by the sun, and the true; so we
-often do not distinguish in our usual discourse between the real, and
-the apparent or relative motion of bodies; but use the same words for
-one, as we should for the other. Though all things about us are really
-in motion with the earth; as this motion is not visible, we speak of
-the motion of every thing we see, as if our selves and the earth stood
-still. And even in other cases, where we discern the motion of bodies,
-we often speak of them not in relation to the whole motion we see, but
-with regard to other bodies, to which they are contiguous. If any body
-were lying on a table; when that table shall be carried along, we say
-the body rests upon the table, or perhaps absolutely, that the body is
-at rest. However philosophers must not reject all distinction between
-true and apparent motions, any more than astronomers do the distinction
-between true and vulgar time; for there is as real a difference between
-them, as will appear by the following consideration. Suppose all the
-bodies of the universe to have their courses stopped, and reduced to
-perfect rest. Then suppose their present motions to be again restored;
-this cannot be done without an actual impression made upon some of them
-at least. If any of them be left untouched, they will retain their
-former state, that is, still remain at rest; but the other bodies,
-which are wrought upon, will have changed their former state of rest,
-for the contrary state of motion. Let us now suppose the bodies left
-at rest to be annihilated, this will make no alteration in the state
-of the moving bodies; but the effect of the impression, which was made
-upon them, will still subsist. This shews the motion they received to
-be an absolute thing, and to have no necessary dependence upon the
-relation which the body said to be in motion has to any other body[77].
-
-94. BESIDES absolute and relative motion are distinguishable by their
-Effects. One effect of motion is, that bodies, when moved round any
-center or axis, acquire a certain power, by which they forcibly
-press themselves from that center or axis of motion. As when a body
-is whirled about in a sling, the body presses against the sling, and
-is ready to fly out as soon as liberty is given it. And this power
-is proportional to the true, not relative motion of the body round
-such a center or axis. Of this Sir ~ISAAC NEWTON~ gives the following
-instance[78]. If a pail or such like vessel near full of water be
-suspended by a string of sufficient length, and be turned about till
-the string be hard twisted. If then as soon as the vessel and water
-in it are become still and at rest, the vessel be nimbly turned about
-the contrary way the string was twisted, the vessel by the strings
-untwisting it self shall continue its motion a long time. And when the
-vessel first begins to turn, the water in it shall receive little or
-nothing of the motion of the vessel, but by degrees shall receive a
-communication of motion, till at last it shall move round as swiftly
-as the vessel it self. Now the definition of motion, which ~DES
-CARTES~ has given us upon this principle of making all motion
-meerly relative, is this: that motion, is a removal of any body from
-its vicinity to other bodies, which were in immediate contact with
-it, and are considered as at rest[79]. And if this be compared with
-what he soon after says, that there is nothing real or positive in the
-body moved, for the sake of which we ascribe motion to it, which is
-not to be found as well in the contiguous bodies, which are considered
-as at rest[80]; it will follow from thence, that we may consider the
-vessel as at rest and the water as moving in it: and the water in
-respect of the vessel has the greatest motion, when the vessel first
-begins to turn, and loses this relative motion more and more, till
-at length it quite ceases. But now, when the vessel first begins to
-turn, the surface of the water remains smooth and flat, as before the
-vessel began to move; but as the motion of the vessel communicates by
-degrees motion to the water, the surface of the water will be observed
-to change, the water subsiding in the middle and rising at the edges:
-which elevation of the water is caused by the parts of it pressing from
-the axis, they move about; and therefore this force of receding from
-the axis of motion depends not upon the relative motion of the water
-within the vessel, but on its absolute motion; for it is least, when
-that relative motion is greatest, and greatest, when that relative
-motion is least, or none at all.
-
-95. THUS the true cause of what appears in the surface of this water
-cannot be assigned, without considering the water’s motion within the
-vessel. So also in the system of the world, in order to find out the
-cause of the planetary motions, we must know more of the real motions,
-which belong to each planet, than is absolutely necessary for the uses
-of astronomy. If the astronomer should suppose the earth to stand
-still, he could ascribe such motions to the celestial bodies, as should
-answer all the appearances; though he would not account for them in so
-simple a manner, as by attributing motion to the earth. But the motion
-of the earth must of necessity be considered, before the real causes,
-which actuate the planetary system, can be discovered.
-
-
-
-
-CHAP. III.
-
-Of CENTRIPETAL FORCES.
-
-
-WE have just been describing in the preceding chapter the effects
-produced on a body in motion, from its being continually acted upon
-by a power always equal in strength, and operating in parallel
-directions[81]. But bodies may be acted upon by powers, which in
-different places shall have different degrees of force, and whose
-several directions shall be variously inclined to each other. The most
-simple of these in respect to direction is, when the power is pointed
-constantly to one center. This is truly the case of that power, whose
-effects we described in the foregoing chapter; though the center of
-that power is so far removed, that the subject then before us is most
-conveniently to be considered in the light, wherein we have placed it:
-But Sir ISAAC NEWTON has considered very particularly this other case
-of powers, which are constantly directed to the same center. It is upon
-this foundation, that all his discoveries in the system of the world
-are raised. And therefore, as this subject bears so very great a share
-in the philosophy, of which I am discoursing, I think it proper in this
-place to take a short view of some of the general effects of these
-powers, before we come to apply them particularly to the system of the
-world.
-
-2. THESE powers or forces are by Sir ~ISAAC NEWTON~ called centripetal;
-and their first effect is to cause the body, on which they act, to quit
-the straight course, wherein it would proceed if undisturbed, and to
-describe an incurvated line, which shall always be bent towards the
-center of the force. It is not necessary, that such a power should
-cause the body to approach that center. The body may continue to
-recede from the center of the power, notwithstanding its being drawn
-by the power; but this property must always belong to its motion, that
-the line, in which it moves, will continually be concave towards the
-center, to which the power is directed. Suppose A (in fig. 72.) to be
-the center of a force. Let a body in B be moving in the direction of
-the straight line B C, in which line it would continue to move, if
-undisturbed; but being attracted by the centripetal force towards A,
-the body must necessarily depart from this line B C, and being drawn
-into the curve line B D, must pass between the lines A B and B C. It is
-evident therefore, that the body in B being gradually turned off from
-the straight line B C, it will at first be convex toward the line B C,
-and consequently concave towards the point A: for these centripetal
-powers are supposed to be in strength proportional to the power of
-gravity, and, like that, not to be able after the manner of an impulse
-to turn the body sensibly out of its course into a different one in
-an instant, but to take up some space of time in producing a visible
-effect. That the curve will always continue to have its concavity
-towards A may thus appear. In the line B C near to B take any point as
-E, from which the line E F G may be so drawn, as to touch the curve
-line B D in some point as F. Now when the body is come to F, if the
-centripetal power were immediately to be suspended, the body would no
-longer continue to move in a curve line, but being left to it self
-would forthwith reassume a straight course; and that straight course
-would be in the line F G: for that line is in the direction of the
-body’s motion at the point F. But the centripetal force continuing its
-energy, the body will be gradually drawn from this line F G so as to
-keep in the line F D, and make that line near the point F to be convex
-toward F G, and concave toward A. After the same manner the body may be
-followed on in its course through the line B D, and every part of that
-line be shewn to be concave toward the point A.
-
-3. THIS then is the constant character belonging to those motions,
-which are carried on by centripetal forces; that the line, wherein the
-body moves, is throughout concave towards the center of the force. In
-respect to the successive distances of the body from the center there
-is no general rule to be laid down; for the distance of the body from
-the center may either increase, or decrease, or even keep always the
-same. The point A (in fig. 73.) being the center of a centripetal
-force, let a body at B set out in the direction of the straight line B
-C perpendicular to the line A B drawn from A to B. It will be easily
-conceived, that there is no other point in the line B C so near to A,
-as the point B; that A B is the shortest of all the lines, which can
-be drawn from A to any part of the line B C; all other lines, as A D,
-or A E, drawn from A to the line B C being longer than A B. Hence it
-follows, that the body setting out from B, if it moved in the line B
-C, it would recede more and more from the point A. Now as the operation
-of a centripetal force is to draw a body towards the center of the
-force: if such a force act upon a resting body, it must necessarily put
-that body so into motion, as to cause it to move towards the center
-of the force: if the body were of it self moving towards that center,
-the centripetal force would accelerate that motion, and cause it to
-move faster down: but if the body were in such a motion, as being left
-to itself it would recede from this center, it is not necessary, that
-the action of a centripetal power upon it should immediately compel
-the body to approach the center, from which it would otherwise have
-receded; the centripetal power is not without effect, if it cause the
-body to recede more slowly from that center, than otherwise it would
-have done. Thus in the case before us, the smallest centripetal power,
-if it act on the body, will force it out of the line B C, and cause it
-to pass in a bent line between B C and the point A, as has been before
-explained. When the body, for instance, has advanced to the line A D,
-the effect of the centripetal force discovers it self by having removed
-the body out of the line B C, and brought it to cross the line A D
-somewhere between A and D: suppose at F. Now A D being longer than A B,
-A F may also be longer than A B. The centripetal power may indeed be
-so strong, that A F shall be shorter than A B; or it may be so evenly
-balanced with the progressive motion of the body, that A F and A B
-shall be just equal: and in this last case, when the centripetal force
-is of that strength, as constantly to draw the body as much toward the
-center, as the progressive motion would carry it off, the body will
-describe a circle about the center A, this center of the force being
-also the center of the circle.
-
-4. IF the body, instead of setting out in the line B C perpendicular
-to A B, had set out in another line B G more inclined towards the
-line A B, moving in the curve line B H; then as the body, if it were
-to continue its motion in the line B G, would for some time approach
-the center A; the centripetal force would cause it to make greater
-advances toward that center. But if the body were to set out in the
-line B I reclined the other way from the perpendicular B C, and were to
-be drawn by the centripetal force into the curve line B K; the body,
-notwithstanding any centripetal force, would for some time recede from
-the center; since some part at least of the curve line B K lies between
-the line B I and the perpendicular B C.
-
-5. THUS far we have explained such effects, as attend every centripetal
-force. But as these forces may be very different in regard to the
-different degrees of strength, wherewith they act upon bodies in
-different places; I shall now proceed to make mention in general of
-some of the differences attending these centripetal motions.
-
-6. TO reassume the consideration of the last mentioned case. Suppose a
-centripetal power directed toward the point A (in fig. 74.) to act on
-a body in B, which is moving in the direction of the straight line B
-C, the line B C reclining off from A B. If from A the straight lines A
-D, A E, A F are drawn at pleasure to the line C B; the line C B being
-prolonged beyond B to G, it appears that A D is inclined to the line
-G C more obliquely, than A B is inclined to it, A E is inclined more
-obliquely than A D, and A F more than A E. To speak more correctly, the
-angle under A D G is less than that under A B G, the angle under A E G
-less than that under A D G, and the angle under A F G less than that
-under A E G. Now suppose the body to move in the curve line B H I K.
-Then it is here likewise evident, that the line B H I K being concave
-towards A, and convex towards the line B C, it is more and more turned
-off from the line B C; so that in the point H the line A H will be less
-obliquely inclined to the curve line B H I K, than the same line A H
-D is inclined to B C at the point D; at the point I the inclination
-of the line A I to the curve line will be more different from the
-inclination of the same line A I E to the line B C, at the point E;
-and in the points K and F the difference of inclination will be still
-greater; and in both the inclination at the curve will be less oblique,
-than at the straight line B C. But the straight line A B is less
-obliquely inclined to B G, than A D is inclined towards D G: therefore
-although the line A H be less obliquely inclined towards the curve H B,
-than the same line A H D is inclined towards D G; yet it is possible,
-that the inclination at H may be more oblique, than the inclination at
-B. The inclination at H may indeed be less oblique than the other, or
-they may be both the same. This depends upon the degree of strength,
-wherewith the centripetal force exerts it self, during the passage of
-the body from B to H. After the same manner the inclinations at I and K
-depend entirely on the degree of strength, wherewith the centripetal
-force acts on the body in its passage from H to K: if the centripetal
-force be weak enough, the lines A H and A I drawn from the center A to
-the body at H and at I shall be more obliquely inclined to the curve,
-than the line A B is inclined towards B G. The centripetal force may
-be of that strength as to render all these inclinations equal, or if
-stronger, the inclinations at I and K will be less oblique than at
-B. Sir ~ISAAC NEWTON~ has particularly shewn, that if the
-centripetal power decreases after a certain manner with the increase
-of distance, a body may describe such a curve line, that all the
-lines drawn from the center to the body shall be equally inclined to
-that curve line.[82] But I do not here enter into any particulars, my
-present intention being only to shew, that it is possible for a body to
-be acted upon by a force continually drawing it down towards a center,
-and yet that the body shall continue to recede from that center; for
-here as long as the lines A H, A I, &c drawn from the center A to the
-body do not become less oblique to the curve, in which the body moves;
-so long shall those lines perpetually increase, and consequently the
-body shall more and more recede from the center.
-
-7. BUT we may observe farther, that if the centripetal power, while
-the body increases its distance from the center, retain sufficient
-strength to make the lines drawn from the center to the body to become
-at length less oblique to the curve; then if this diminution of the
-obliquity continue, till at last the line drawn from the center to
-the body shall cease to be obliquely inclined to the curve, and shall
-become perpendicular thereto; from this instant the body shall no
-longer recede from the center, but in its following motion it shall
-again descend, and shall describe a curve line in all respects like to
-that, which it has described already; provided the centripetal power,
-every where at the same distance from the center, acts with the same
-strength. So we observed in the preceding chapter, that, when the
-motion of a projectile became parallel to the horizon, the projectile
-no longer ascended, but forthwith directed its course downwards,
-descending in a line altogether like that, wherein it had before
-ascended[83].
-
-8. THIS return of the body may be proved by the following proposition:
-that if the body in any place, suppose at I, were to be stopt, and
-be thrown directly backward with the velocity, wherewith it was
-moving forward in that point I; then the body, by the action of the
-centripetal force upon it, would move back again over the path I H B,
-in which it had before advanced forward, and would arrive again at the
-point B in the same space of time, as was taken up in its passage from
-B to I; the velocity of the body at its return to the point B being
-the same, as that wherewith it first set out from that point. To give
-a full demonstration of this proposition, would require that use of
-mathematics, which I here purpose to avoid; but, I believe, it will
-appear in great measure evident from the following considerations.
-
-9. SUPPOSE (in fig. 75.) that a body were carried after the following
-manner through the bent figure A B C D E F, composed of the straight
-lines A B, B C, C D, D E, E F. First let it be moving in the line A B,
-from A towards B, with any uniform velocity. At B let the body receive
-an impulse directed toward some point, as G, taken within the concavity
-of the figure. Now whereas this body, when once moving in the straight
-line A B, will continue to move on in this line, so long as it shall be
-left to it self; but being disturbed at the point B in its motion by
-the impulse, which there acts upon it, it will be turned out of this
-line A B into some other straight line, wherein it will afterwards
-continue to move, as long as it shall be left to itself. Therefore
-let this impulse have strength sufficient to turn the body into the
-line B C. Then let the body move on undisturbed from B to C, but at C
-let it receive another impulse pointed toward the same point G, and
-of sufficient strength to turn the body into the line C D. At D let a
-third impulse, directed like the rest to the point G, turn the body
-into the line D E. And at E let another impulse, directed likewise to
-the point G, turn the body into the line E F. Now, I say, if the body
-while moving in the line E F be stopt, and turned back again in this
-line with the same velocity, as that wherewith it was moving forward in
-this line; then by the repetition of the former impulse at E the body
-will be turned into the line E D, and move in it from E to D with the
-same velocity as before it moved with from D to E; by the repetition of
-the impulse at D, when the body shall have returned to that point, it
-will be turned into the line D C; and by the repetition of the other
-impulses at C and B the body will be brought back again into the line
-B A, with the velocity, wherewith it first moved in that line.
-
-10. THIS I prove as follows. Let D E and F E be continued beyond E. In
-D E thus continued take at pleasure the length E H, and let H I be so
-drawn, as to be equidistant from the line G E. Then, by what has been
-written upon the second law of motion[84], it follows, that after the
-impulse on the body in E it will move through E I in the same time, as
-it would have imployed in moving from E to H, with the velocity which
-it had in the line D E. In F E prolonged take E K equal to E I, and
-draw K L equidistant from G E. Then, because the body is thrown back in
-the line F E with the same velocity as that wherewith it went forward
-in that line; if, when the body was returned to E, it were permitted
-to go straight on, it would pass through E K in the same time, as it
-took up in passing through E I, when it went forward in the line E F.
-But, if at the body’s return to the point E, such an impulse directed
-toward the point D were to be given it, whereby it should be turned
-into the line D E; I say, that the impulse necessary to produce this
-effect must be equal to that, which turned the body out of the line D E
-into E F; and that the velocity, with which the body will return into
-the line E D, is the same, as that wherewith it before moved through
-this line from D to E. Because E K is equal to E I, and K L and H I,
-being each equidistant from G E, are by consequence equidistant from
-each other; it follows, that the two triangular figures I E H and K
-E L are altogether like and equal to each other. If I were writing to
-mathematicians, I might refer them to some proportions in the elements
-of EUCLID for the proof of this[85] but as I do not here address my
-self to such, so I think this assertion will be evident enough without
-a proof in form; at least I must desire my readers to receive it as a
-proposition true in geometry. But these two triangular figures being
-altogether like each other and equal; as E K is equal to E I, so E L is
-equal to E H, and K L equal to H I. Now the body after its return to
-E being turned out of the line F E into E D by an impulse acting upon
-it in E, after the manner above expressed; the body will receive such
-a velocity by this impulse, as will carry it through E L in the same
-time, as it would have imployed in passing through E K, if it had gone
-on in that line undisturbed. And it has already been observed, that the
-time, in which the body would pass over E K with the velocity wherewith
-it returns, is equal to the time it took up in going forward from E to
-I; that is, equal to the time, in which it would have gone through E H
-with the velocity, wherewith it moved from D to E. Therefore the time,
-in which the body will pass through E L after its return into the line
-E D, is the same, as would have been taken up by the body in passing
-through E H with the velocity, wherewith the body first moved in the
-line D E. Since therefore E L and E H are equal, the body returns into
-the line D E with the velocity, which it had before in that line. Again
-I say, the second impulse in E is equal to the first. By what has
-been said on the second law of motion concerning the effect of oblique
-impulses[86], it will be understood, that the impulse in E, whereby
-the body was turned out of the line D E into the line E F, is of such
-strength, that if the body had been at rest, when this impulse had
-acted upon it, this impulse would have communicated so much motion to
-the body, as would have carried it through a length equal to H I, in
-the time wherein the body would have passed from E to H, or in the time
-wherein it passed from E to I. In the same manner, on the return of the
-body, the impulse in E, whereby the body is turned out of the line F
-E into E D, is of such strength, that if it had acted on the body at
-rest, it would have caused the body to move through a length equal to
-K L, in the same time, as the body would imploy in passing through E K
-with the velocity, wherewith it returns in the line F E. Therefore the
-second impulse, had it acted on the body at rest, would have caused it
-to move through a length equal to K L in the same space of time, as
-would be taken up by the body in passing through a length equal to H I,
-were the first impulse to act on the body when at rest. That is, the
-effects of the first and second impulse on the body when at rest would
-be the same; for K L and H I are equal: consequently the second impulse
-is equal to the first.
-
-11. THUS if the body be returned through F E with the velocity,
-wherewith it moved forward; we have shewn how by the repetition of the
-impulse, which acted on it at E, the body will return again into the
-line D E with the velocity, which it had before in that line. By the
-same process of reasoning it may be proved, that, when the body is
-returned back to D, the impulse, which before acted on the body at that
-point, will throw the body into the line D C with the velocity, which
-it first had in that line; and the other impulses being successively
-repeated, the body will at length be brought back again into the line B
-A with the velocity, wherewith it set out in that line.
-
-12. THUS these impulses, by acting over again in an inverted order
-all their operation on the body, bring it back again through the
-path, in which it had proceeded forward. And this obtains equally,
-whatever be the number of the straight lines, whereof this curve
-figure is composed. Now by a method of reasoning, which Sir ~ISAAC
-NEWTON~ makes great use of, and which he introduced into geometry,
-thereby greatly inriching that science[87]; we might make a transition
-from this figure composed of a number of straight lines to a figure
-of one continued curvature, and from a number of separate impulses
-repeated at distinct intervals to a continual centripetal force, and
-shew, that, because what has been here advanced holds universally
-true, whatever be the number of straight lines, whereof the curve
-figure A C F is composed, and howsoever frequently the impulses at
-the angles of this figure are repeated; therefore the same will still
-remain true, although this figure should be converted into one of a
-continued curvature, and these distinct impulses should be changed
-into a continual centripetal force. But as the explaining this method
-of reasoning is foreign to my present design; so I hope my readers,
-after what has been said, will find no difficulty in receiving the
-proposition laid down above: that, if the body, which has moved through
-the curve line B H I (in fig. 74.) from B to I, when it is come to I,
-be thrown directly back with the same velocity as that, wherewith it
-proceeded forward, the centripetal force, by acting over again all its
-operation on the body, shall bring the body back again in the line I H
-B: and as the motion of the body in its course from B to I was every
-where in such a manner oblique to the line drawn from the center to
-the body, that the centripetal power acted in some degree against the
-body’s motion, and gradually diminished it; so in the return of the
-body, the centripetal power will every where draw the body forward, and
-accelerate its motion by the same degrees, as before it retarded it.
-
-13. THIS being agreed, suppose the body in K to have the line A K no
-longer obliquely inclined to its motion. In this case, if the body
-be turned back, in the manner we have been considering, it must be
-directed back perpendicularly to A K. But if it had proceeded forward,
-it would likewise have moved in a direction perpendicular to A K;
-consequently, whether it move from this point K backward or forward, it
-must describe the same kind of course. Therefore since by being turned
-back it will go over again the line K I H B; if it be permitted to go
-forward, the line K L, which it shall describe, will be altogether
-similar to the line K H B.
-
-14. IN like manner we may determine the nature of the motion, if
-the line, wherein the body sets out, be inclined (as in fig. 76.)
-down toward the line B A drawn between the body and the center. If
-the centripetal power so much increases in strength, as the body
-approaches, that it can bend the path, in which the body moves, to
-that degree, as to cause all the lines as A H, A I, A K to remain no
-less oblique to the motion of the body, than A B is oblique to B C;
-the body shall continually more and more approach the center. But if
-the centripetal power increases in so much less a degree, as to permit
-the line drawn from the center to the body, as it accompanies the
-body in its motion, at length to become more and more erect to the
-curve wherein the body moves, and in the end, suppose at K, to become
-perpendicular thereto; from that time the body shall rise again. This
-is evident from what has been said above; because for the very same
-reason here also the body shall proceed from the point K to describe a
-line altogether similar to the line, in which it has moved from B to K.
-Thus, as it was observed of the pendulum in the preceding chapter[88],
-that all the time it approaches towards being perpendicular to the
-horizon, it more and more descends; but, as soon as it is come into
-that perpendicular situation, it immediately rises again by the same
-degrees, as it descended by before: so here the body more and more
-approaches the center all the time it is moving from B to K; but thence
-forward it rises from the center again by the same degrees, as it
-approached by before.
-
-15. IF (in fig. 77.) the line B C be perpendicular to A B; then it has
-been observed above[89], that the centripetal power may be so balanced
-with the progressive motion of the body, that the body may keep moving
-round the center A constantly at the same distance; as a body does,
-when whirled about any point, to which it is tyed by a string. If the
-centripetal power be too weak to produce this effect, the motion of
-the body will presently become oblique to the line drawn from itself
-to the center, after the manner of the first of the two cases, which
-we have been considering. If the centripetal power be stronger, than
-what is required to carry the body in a circle, the motion of the body
-will presently fall in with the second of the cases, we have been
-considering.
-
-16. IF the centripetal power so change with the change of distance,
-that the body, after its motion has become oblique to the line drawn
-from itself to the center, shall again become perpendicular thereto;
-which we have shewn to be possible in both the cases treated of
-above; then the body shall in its subsequent motion return again to
-the distance of A B, and from that distance take a course similar
-to the former: and thus, if the body move in a space free from all
-resistance, which has been here all along supposed; it shall continue
-in a perpetual motion about the center, descending and ascending
-alternately therefrom. If the body setting out from B (in fig. 78.) in
-the line B C perpendicular to A B, describe the line B D E, which in D
-shall be oblique to the line A D, but in E shall again become erect to
-A E drawn from the body in E to the center A; then from this point E
-the body shall describe the line E F G altogether like to the line B D
-E, and at G shall be at the same distance from A, as it was at B. But
-likewise the line A G shall be erect to the body’s motion. Therefore
-the body shall proceed to describe from G the line G H I altogether
-similar to the line G F E, and at I have the same distance from the
-center, as it had at E; and also have the line A I erect to its motion:
-so that its following motion must be in the line I K L similar to I H
-G, and the distance A L equal to A G. Thus the body will go on in a
-perpetual round without ceasing, alternately inlarging and contracting
-its distance from the center.
-
-[Illustration]
-
-17. IF it so happen, that the point E fall upon the line B A continued
-beyond A; then the point G will fall on B, I on E, and L also on B;
-so that the body will describe in this case a simple curve line round
-the center A, like the line B D E F in fig. 79, in which it will
-continually revolve from B to E and from E to B without end.
-
-18. IF A E in fig. 78 should happen to be perpendicular to A B, in this
-case also a simple line will be described; for the point G will fall on
-the line B A prolonged beyond A, the point I on the line A E prolonged
-beyond A, and the point L on B: so that the body will describe a line
-like the curve line B E G I in fig. 80, in which the opposite points B
-and G are equally distant from A, and the opposite points E and I are
-also equally distant from the same point A.
-
-19. IN other cases the line described will have a more complex figure.
-
-20. THUS we have endeavoured to shew how a body, while it is constantly
-attracted towards a center, may notwithstanding by its progressive
-motion keep it self from falling down to that center; but describe
-about it an endless circuit, sometimes approaching toward that center,
-and at other times as much receding from the same.
-
-21. BUT here we have supposed, that the centripetal power is of equal
-strength every where at the same distance from the center. And this is
-the case of that centripetal power, which will hereafter be shewn to be
-the cause, that keeps the planets in their courses. But a body may be
-kept on in a perpetual circuit round a center, although the centripetal
-power have not this property. Indeed a body may by a centripetal
-force be kept moving in any curve line whatever, that shall have its
-concavity turned every where towards the center of the force.
-
-22. TO make this evident I shall first propose the case of a body
-moving through the incurvated figure A B C D E (in fig. 81.) which is
-composed of the straight lines A B, B C, C D, D E, and E A; the motion
-being carried on in the following manner. Let the body first move in
-the line A B with any uniform velocity. When it is arrived at the point
-B, let it receive an impulse directed toward any point F taken within
-the figure; and let the impulse be of that strength as to turn the body
-out of the line A B into the line B C. The body after this impulse,
-while left to itself, will continue moving in the line B C. At C let
-the body receive another impulse directed towards the same point F, of
-such strength, as to turn the body from the line B C into the line C D.
-At D let the body by another impulse, directed likewise to the point F,
-be turned out of the line C D into D E. And at E let another impulse,
-directed toward the point F, turn the body from the line D E into E
-A. Thus we see how a body may be carried through the figure A B C D E
-by certain impulses directed always toward the same center, only by
-their acting on the body at proper intervals, and with due degrees of
-strength.
-
-23. BUT farther, when the body is come to the point A, if it there
-receive another impulse directed like the rest toward the point F, and
-of such a degree of strength as to turn the body into the line A B,
-wherein it first moved; I say that the body shall return into this line
-with the same velocity, as it had at first.
-
-24. LET A B be prolonged beyond B at pleasure, suppose to G; and from G
-let G H be drawn, which if produced should always continue equidistant
-from B F, or, according to the more usual phrase, let G H be drawn
-parallel to B F. Then it appears, from what has been said upon the
-second law of motion[90], that in the time, wherein the body would have
-moved from B to G, had it not received a new impulse in B, by the means
-of that impulse it will have acquired a velocity, which will carry it
-from B to H. After the same manner, if C I be taken equal to B H,
-and I K be drawn equidistant from or parallel to C F; the body will
-have moved from C to K with the velocity, which it has in the line C
-D, in the same time, as it would have employed in moving from C to I
-with the velocity, it had in the line B C. Therefore since C I and B
-H are equal, the body will move through C K in the same time, as it
-would have taken up in moving from B to G with the original velocity,
-wherewith it moved through the line A B. Again, D L being taken equal
-to C K and L M drawn parallel to D F; for the same reason as before the
-body will move through D M with the velocity, which it has in the line
-D E, in the same time, as it would imploy in moving through B G with
-its original velocity. In the last place, if E N be taken equal to D M,
-and N O be drawn parallel to E F; likewise if A P be taken equal to E
-O, and P Q be drawn parallel to A F: then the body with the velocity,
-wherewith it returns into the line A B, will pass through A Q in the
-same time, as it would have imployed in passing through B G with its
-original velocity. Now as all this follows directly from what has above
-been delivered, concerning the effect of oblique impulses impressed
-upon bodies in motion; so we must here observe farther, that it can be
-proved by geometry, that A Q will always be equal to E G. The proof of
-this I am obliged, from the nature of my present design, to omit; but
-this geometrical proportion being granted, it follows, that the body
-has returned into the line A B with the velocity, which it had, when
-it first moved in that line; for the velocity, with which it returns
-into the line A B, will carry it over the line A Q in the same time, as
-would have been taken up in its passing over an equal line B G with
-the original velocity.
-
-25. THUS we have found, how a body may be carried round the figure A
-B C D E by the action of certain impulses upon it which should all be
-pointed toward one center. And we likewise see, that when the body is
-brought back again to the point, whence it first set out; if it there
-meet with an impulse sufficient to turn it again into the line, wherein
-it moved at first, its original velocity will be again restored; and by
-the repetition of the same impulses, the body will be carried again in
-the same round. Therefore if these impulses, which act on the body at
-the points B, C, D, E, and A, continue always the same, the body will
-make round this figure innumerable revolutions.
-
-26. THE proof, which we have here made use of, holds the same in any
-number of straight lines, whereof the figure A B D should be composed;
-and therefore by the method of reasoning referred to above[91] we are
-to conclude, that what has here been said upon this rectilinear figure,
-will remain true, if this figure were changed into one of a continued
-curvature, and instead of distinct impulses acting by intervals at the
-angles of this figure, we had a continual centripetal force. We have
-therefore shewn, that a body may be carried round in any curve figure
-A B C ( fig. 82.) which shall every where be concave towards any one
-point as D, by the continual action of a centripetal power directed to
-that point, and when it is returned to the point, from whence it set
-out, it shall recover again the velocity, with which it departed from
-that point. It is not indeed always necessary, that it should return
-again into its first course; for the curve line may have some such
-figure as the line A B C D B E in fig. 83. In this curve line, if the
-body set out from B in the direction B F, and moved through the line B
-C D, till it returned to B; here the body would not enter again into
-the line B C D, because the two parts B D and B C of the curve line
-make an angle at the point B: so that the centripetal power, which at
-the point B could turn the body from the line B F into the curve, will
-not be able to turn the body into the line B C from the direction, in
-which it returns to the point B; a forceable impulse must be given the
-body in the point B to produce that effect.
-
-27. IF at the point B, whence the body sets out, the curve line return
-into it self (as in fig. 82;) then the body, upon its arrival again at
-B, may return into its former course, and thus make an endless circuit
-about the center of the centripetal power.
-
-28. WHAT has here been said, I hope, will in some measure enable my
-readers to form a just idea of the nature of these centripetal motions.
-
-29. I HAVE not attempted to shew, how to find particularly, what kind
-of centripetal force is necessary to carry a body in any curve line
-proposed. This is to be deduced from the degree of curvature, which
-the figure has in each point of it, and requires a long and complex
-mathematical reasoning. However I shall speak a little to the first
-proportion, which Sir ~ISAAC NEWTON~ lays down for this
-purpose. By this proposition, when a body is found moving in a curve
-line, it may be known, whether the body be kept in its course by a
-power always pointed toward the same center; and if it be so, where
-that center is placed. The proposition is this: that if a line be drawn
-from some fixed point to the body, and remaining by one extream united
-to that point, it be carried round along with the body; then, if the
-power, whereby the body is kept in its course, be always pointed to
-this fixed point as a center, this line will move over equal spaces in
-equal portions of time. Suppose a body were moving through the curve
-line A B C D (in fig. 84.) and passed over the arches A B, B C, C D
-in equal portions of time; then if a point, as E, can be found, from
-whence the line E A being drawn to the body in A, and accompanying the
-body in its motion, it shall make the spaces E A B, E B C, and E C D
-equal, over which it passes, while the body describes the arches A B, B
-C, and C D: and if this hold the same in all other arches, both great
-and small, of the curve line A B C D, that these spaces are always
-equal, where the times are equal; then is the body kept in this line by
-a power always pointed to E as a center.
-
-30. THE principle, upon which Sir ~ISAAC NEWTON~ has
-demonstrated this, requires but small skill in geometry to comprehend.
-I shall therefore take the liberty to close the present chapter with
-an explication of it; because such an example will give the clearest
-notion of our author’s method of applying mathematical reasoning to
-these philosophical subjects.
-
-31. HE reasons thus. Suppose a body set out from the point A (in fig.
-85.) to move in the straight line A B; and after it had moved for some
-time in that line, it were to receive an impulse directed to some point
-as C. Let it receive that impulse at D; and thereby be turned into the
-line D E; and let the body after this impulse take the same length of
-time in passing from D to E, as it imployed in the passing from A to
-D. Then the straight lines C A, C D, and C E being drawn, Sir ~ISAAC
-NEWTON~ proves, that the and triangular spaces C A D and C D E are
-equal. This he does in the following manner.
-
-32. LET E F be drawn parallel to C D. Then, from what has been said
-upon the second law of motion[92], it is evident, that since the
-body was moving in the line A B, when it received the impulse in the
-direction D C; it will have moved after that impulse through the line
-D E in the same time, as it would have taken up in moving through D
-F, provided it had received no disturbance in D. But the time of the
-body’s moving from D to E is supposed to be equal to the time of its
-moving through A D; therefore the time, which the body would have
-imployed in moving through D F, had it not been disturbed in D, is
-equal to the time, wherein it moved through A D: consequently D F is
-equal in length to A D; for if the body had gone on to move through
-the line A B without interruption, it would have moved through all
-parts thereof with the same velocity, and have passed over equal parts
-of that line in equal portions of time. Now C F being drawn, since
-A D and D F are equal, the triangular space C D F is equal to the
-triangular space C A D. Farther, the line E F being parallel to C D, it
-is proved by EUCLID, that the triangle C E D is equal to the triangle C
-F D[93]: therefore the triangle C E D is equal to the triangle C A D.
-
-33. AFTER the same manner, if the body receive at E another impulse
-directed toward the point C, and be turned by that impulse into the
-line E G; if it move afterwards from E to G in the same space of time,
-as was taken up by its motion from D to E, or from A to D; then C G
-being drawn, the triangle C E G is equal to C D E. A third impulse at
-G directed as the two former to C, whereby the body shall be turned
-into the line G H, will have also the like effect with the rest. If the
-body move over G H in the same time, as it took up in moving over E
-G, the triangle C G H will be equal to the triangle C E G. Lastly, if
-the body at H be turned by a fresh impulse directed toward C into the
-line H I, and at I by another impulse directed also to C be turned into
-the line I K; and if the body move over each of the lines H I, and I K
-in the same time, as it imployed in moving over each of the preceding
-lines A D, D E, E G, and G H: then each of the triangles C H I, and C
-I K will be equal to each of the preceding. Likewise as the time, in
-which the body moves over A D E, is equal to the time of its moving
-over E G H, and to the time of its moving over H I K; the space C A D
-E will be equal to the space C E G H, and to the space C H I K. In the
-same manner as the time, in which the body moved over A D E G is equal
-to the time of its moving over G H I K, so the space C A D E G will be
-equal to the space C G H I K.
-
-34. FROM this principle Sir ~ISAAC NEWTON~ demonstrates the proposition
-mentioned above, by that method of arguing introduced by him into
-geometry, whereof we have before taken notice[94], by making according
-to the principles of that method a transition from this incurvated
-figure composed of straight lines, to a figure of continued curvature;
-and by shewing, that since equal spaces are described in equal times
-in this present figure composed of straight lines, the same relation
-between the spaces described and the times of their description will
-also have place in a figure of one continued curvature. He also deduces
-from this proposition the reverse of it; and proves, that whenever
-equal spaces are continually described; the body is acted upon by
-a centripetal force directed to the center, at which the spaces
-terminate.
-
-
-
-
-CHAP. IV.
-
-Of the RESISTANCE of FLUIDS.
-
-
-BEFORE the cause can be discovered, which keeps the planets in motion,
-it is necessary first to know, whether the space, wherein they move, is
-empty and void, or filled with any quantity of matter. It has been a
-prevailing opinion, that all space contains in it matter of some kind
-or other; so that where no sensible matter is found, there was yet a
-subtle fluid substance by which the space was filled up; even so as
-to make an absolute plenitude. In order to examine this opinion, Sir
-~ISAAC NEWTON~ has largely considered the effects of fluids upon bodies
-moving in them.
-
-2. THESE effects he has reduced under these three heads. In the
-first place he shews how to determine in what manner the resistance,
-which bodies suffer, when moving in a fluid, gradually increases in
-proportion to the space, they describe in any fluid; to the velocity,
-with which they describe it; and to the time they have been in motion.
-Under the second head he considers what degree of resistance different
-bodies moving in the same fluid undergo, according to the different
-proportion between the density of the fluid and the density of the
-body. The densities of bodies, whether fluid or solid, are measured by
-the quantity of matter, which is comprehended under the same magnitude;
-that body being the most dense or compact, which under the same bulk
-contains the greatest quantity of solid matter, or which weighs most,
-the weight of every body being observed above to be proportional
-to the quantity of matter in it[95]. Thus water is more dense than
-cork or wood, iron more dense than water, and gold than iron. The
-third particular Sir ~IS. NEWTON~ considers concerning the
-resistance of fluids is the influence, which the diversity of figure in
-the resisted body has upon its resistance.
-
-3. FOR the more perfect illustration of the first of these heads, he
-distinctly shews the relation between all the particulars specified
-upon three different suppositions. The first is, that the same body
-be resisted more or less in the simple proportion to its velocity; so
-that if its velocity be doubled, its resistance shall become threefold.
-The second is of the resistance increasing in the duplicate proportion
-of the velocity; so that, if the velocity of a body be doubled, its
-resistance shall be rendered four times; and if the velocity be
-trebled, nine times as great as at first. But what is to be understood
-by duplicate proportion has been already explained[96]. The third
-supposition is, that the resistance increases partly in the single
-proportion of the velocity, and partly in the duplicate proportion
-thereof.
-
-4. IN all these suppositions, bodies are considered under two respects,
-either as moving, and opposing themselves against the fluid by
-that power alone, which is essential to them, of resisting to the
-change of their state from rest to motion, or from motion to rest,
-which we have above called their power of inactivity; or else, as
-descending or ascending, and so having the power of gravity combined
-with that other power. Thus our author has shewn in all those three
-suppositions, in what manner bodies are resisted in an uniform fluid,
-when they move with the aforesaid progressive motion[97]; and what the
-resistance is, when they ascend or descend perpendicularly[98]. And
-if a body ascend or descend obliquely, and the resistance be singly
-proportional to the velocity, it is shewn how the body is resisted in
-a fluid of an uniform density, and what line it will describe[99],
-which is determined by the measurement of the hyperbola, and appears
-to be no other than that line, first considered in particular by Dr.
-~BARROW~[100], which is now commonly known by the name of the
-logarithmical curve. In the supposition that the resistance increases
-in the duplicate proportion of the velocity, our author has not given
-us the line which would be described in an uniform fluid; but has
-instead thereof discussed a problem, which is in some sort the reverse;
-to find the density of the fluid at all altitudes, by which any given
-curve line may be described; which problem is so treated by him, as
-to be applicable to any kind of resistance whatever[101]. But here
-not unmindful of practice, he shews that a body in a fluid of uniform
-density, like the air, will describe a line, which approaches towards
-an hyperbola; that is, its motion will be nearer to that curve line
-than to the parabola. And consequent upon this remark, he shews how to
-determine this hyperbola by experiment, and briefly resolves the chief
-of those problems relating to projectiles, which are in use in the art
-of gunnery, in this curve[102]; as ~TORRICELLI~ and others
-have done in the parabola[103], whose inventions have been explained at
-large above[104].
-
-5. OUR author has also handled distinctly that particular sort of
-motion, which is described by pendulums[105]; and has likewise
-considered some few cases of bodies moving in resisting fluids round a
-center, to which they are impelled by a centripetal force, in order to
-give an idea of those kinds of motions[106].
-
-6. THE treating of the resistance of pendulums has given him
-an opportunity of inserting into another part of his work some
-speculations upon the motions of them without resistance, which have
-a very peculiar elegance; where in he treats of them as moved by a
-gravitation acting in the law, which he shews to belong to the earth
-below its surface[107]; performing in this kind of gravitation, where
-the force is proportional to the distance from the center, all that
-HUYGENS had before done in the common supposition of its being uniform,
-and acting in parallel lines[108].
-
-7. HUYGENS at the end of his treatise of the cause of gravity[109]
-informs us, that he likewise had carried his speculations on the
-first of these suppositions, of the resistance in fluids being
-proportional to the velocity of the body, as far as our author. But
-finding by experiment that the second was more conformable to nature,
-he afterwards made some progress in that, till he was stopt, by not
-being able to execute to his wish what related to the perpendicular
-descent of bodies; not observing that the measurement of the curve
-line, he made use of to explain it by, depended on the hyperbola.
-Which oversight may well be pardoned in that great man, considering
-that our author had not been pleased at that time to communicate to
-the publick his admirable discourse of the QUADRATURE or MEASUREMENT
-OF CURVE LINES, with which he has since obliged the world: for without
-the use of that treatise, it is I think no injury even to our author’s
-unparalleled abilities to believe, it would not have been easy for
-himself to have succeeded so happily in this and many other parts of
-his writings.
-
-8. WHAT HUYGENS found by experiment, that bodies were in reality
-resisted in the duplicate proportion of their velocity, agrees with the
-reasoning of our author[110], who distinguishes the resistance, which
-fluids give to bodies by the tenacity of their parts, and the friction
-between them and the body, from that, which arises from the power of
-inactivity, with which the constituent particles of fluids are endued
-like all other portions of matter, by which power the particles of
-fluids like other bodies make resistance against being put into motion.
-
-9. THE resistance, which arises from the friction of the body
-against the parts of the fluid, must be very inconsiderable; and the
-resistance, which follows from the tenacity of the parts of fluids, is
-not usually very great, and does not depend much upon the velocity of
-the body in the fluid; for as the parts of the fluid adhere together
-with a certain degree of force, the resistance, which the body receives
-from thence, cannot much depend upon the velocity, with which the body
-moves; but like the power of gravity, its effect must be proportional
-to the time of its acting. This the reader may find farther explained
-by Sir ~ISAAC NEWTON~ himself in the postscript to a discourse
-published by me in THE PHILOSOPHICAL TRANSACTIONS, N^o 371. The
-principal resistance, which most fluids give to bodies, arises from the
-power of inactivity in the parts of the fluids, and this depends upon
-the velocity, with which the body moves, on a double account. In the
-first place, the quantity of the fluid moved out of place by the moving
-body in any determinate space of time is proportional to the velocity,
-wherewith the body moves; and in the next place, the velocity with
-which each particle of the fluid is moved, will also be proportional
-to the velocity of the body: therefore since the resistance, which
-any body makes against being put into motion, is proportional both
-to the quantity of matter moved and the velocity it is moved with;
-the resistance, which a fluid gives on this account, will be doubly
-increased with the increase of the velocity in the moving body; that
-is, the resistance will be in a two-fold or duplicate proportion of the
-velocity, wherewith the body moves through the fluid.
-
-10. FARTHER it is most manifest, that this latter kind of resistance
-increasing with the increase of velocity, even in a greater degree than
-the velocity it self increases, the swifter the body moves, the less
-proportion the other species of resistance will bear to this: nay that
-this part of the resistance may be so much augmented by a due increase
-of velocity, till the former resistances shall bear a less proportion
-to this, than any that might be assigned. And indeed experience shews,
-that no other resistance, than what arises from the power of inactivity
-in the parts of the fluid, is of moment, when the body moves with any
-considerable swiftness.
-
-11. THERE is besides these yet another species of resistance, found
-only in such fluids, as, like our air, are elastic. Elasticity belongs
-to no fluid known to us beside the air. By this property any quantity
-of air may be contracted into a less space by a forcible pressure, and
-as soon as the compressing power is removed, it will spring out again
-to its former dimensions. The air we breath is held to its present
-density by the weight of the air above us. And as this incumbent
-weight, by the motion of the winds, or other causes, is frequently
-varied (which appears by the barometer;) so when this weight is
-greatest, we breath a more dense air than at other times. To what
-degree the air would expand it self by its spring, if all pressure
-were removed, is not known, nor yet into how narrow a compass it is
-capable of being compressed. Mr. BOYLE found it by experiment capable
-both of expansion and compression to such a degree, that he could cause
-a quantity of air to expand it self over a space some hundred thousand
-times greater, than the space to which he could confine the same
-quantity[111]. But I shall treat more fully of this spring in the air
-hereafter[112]. I am now only to consider what resistance to the motion
-of bodies arises from it.
-
-12. BUT before our author shews in what manner this cause of resistance
-operates, he proposes a method, by which fluids may be rendered
-elastic, demonstrating that if their particles be provided with a power
-of repelling each other, which shall exert it self with degrees of
-strength reciprocally proportional to the distances between the centers
-of the particles; that then such fluids will observe the same rule in
-being compressed, as our air does, which is this, that the space, into
-which it yields upon compression, is reciprocally proportional to the
-compressing weight[113]. The term reciprocally proportional has been
-explained above[114]. And if the centrifugal force of the particles
-acted by other laws, such fluids would yield in a different manner to
-compression[115].
-
-13. WHETHER the particles of the air be endued with such a power,
-by which they can act upon each other out of contact, our author
-does not determine, but leaves that to future examination, and to
-be discussed by philosophers. Only he takes occasion from hence to
-consider the resistance in elastic fluids, under this notion; making
-remarks, as he passes along, upon the differences, which will arise,
-if their elasticity be derived from any other fountain[116]. And this,
-I think, must be confessed to be done by him with great judgment;
-for this is far the most reasonable account, which has been given of
-this surprizing power, as must without doubt be freely acknowledged
-by any one, who in the least considers the insufficiency of all the
-other conjectures, which have been framed; and also how little reason
-there is to deny to bodies other powers, by which they may act upon
-each other at a distance, as well as that of gravity; which we shall
-hereafter shew to be a property universally belonging to all the bodies
-of the universe, and to all their parts[117]. Nay we actually find
-in the loadstone a very apparent repelling, as well as an attractive
-power. But of this more in the conclusion of this discourse.
-
-14. BY these steps our author leads the way to explain the resistance,
-which the air and such like fluids will give to bodies by their
-elasticity; which resistance he explains thus. If the elastic power
-of the fluid were to be varied so, as to be always in the duplicate
-proportion of the velocity of the resisted body, it is shewn that
-then the resistance derived from the elasticity, would increase in
-the duplicate proportion of the velocity; in so much that the whole
-resistance would be in that proportion, excepting only that small
-part, which arises from the friction between the body and the parts
-of the fluid. From whence it follows, that because the elastic power
-of the same fluid does in truth continue the same, if the velocity of
-the moving body be diminished, the resistance from the elasticity, and
-therefore the whole resistance, will decrease in a less proportion,
-than the duplicate of the velocity; and if the velocity be increased,
-the resistance from the elasticity will increase in a less proportion,
-than the duplicate of the velocity, that is in a less proportion, than
-the resistance made by the power of inactivity of the parts of the
-fluid. And from this foundation is raised the proof of a property of
-this resistance, given by the elasticity in common with the others from
-the tenacity and friction of the parts of the fluid; that the velocity
-may be increased, till this resistance from the fluid’s elasticity
-shall bear no considerable proportion to that, which is produced by the
-power of inactivity thereof[118]. From whence our author draws this
-conclusion; that the resistance of a body, which moves very swiftly in
-an elastic fluid, is near the same, as if the fluid were not elastic;
-provided the elasticity arises from the centrifugal power of the
-parts of the medium, as before explained, especially if the velocity
-be so great, that this centrifugal power shall want time to exert it
-self[119]. But it is to be observed, that in the proof of all this our
-author proceeds upon the supposition of this centrifugal power in the
-parts of the fluid; but if the elasticity be caused by the expansion
-of the parts in the manner of wool compressed, and such like bodies,
-by which the parts of the fluid will be in some measure entangled
-together, and their motion be obstructed, the fluid will be in a manner
-tenacious, and give a resistance upon that account over and above what
-depends upon its elasticity only[120]; and the resistance derived from
-that cause is to be judged of in the manner before set down.
-
-15. IT is now time to pass to the second part of this theory; which
-is to assign the measure of resistance, according to the proportion
-between the density of the body and the density of the fluid. What
-is here to be understood by the word density has been explained
-above[121]. For this purpose as our author before considered two
-distinct cases of bodies moving in mediums; one when they opposed
-themselves to the fluid by their power of inactivity only, and another
-when by ascending or descending their weight was combined with that
-other power: so likewise, the fluids themselves are to be regarded
-under a double capacity; either as having their parts at rest, and
-disposed freely without restraint, or as being compressed together by
-their own weight, or any other cause.
-
-16. IN the first case, if the parts of the fluid be wholly disingaged
-from one another, so that each particle is at liberty to move all ways
-without any impediment, it is shewn, that if a globe move in such
-a fluid, and the globe and particles of the fluid are endued with
-perfect elasticity; so that as the globe impinges upon the particles
-of it, they shall bound off and separate themselves from the globe,
-with the same velocity, with which the globe strikes upon them; then
-the resistance, which the globe moving with any known velocity suffers,
-is to be thus determined. From the velocity of the globe, the time,
-wherein it would move over two third parts of its own diameter with
-that velocity, will be known. And such proportion as the density of the
-fluid bears to the density of the globe, the same the resistance given
-to the globe will bear to the force, which acting, like the power of
-gravity, on the globe without intermission during the space of time now
-mentioned, would generate in the globe the same degree of motion, as
-that wherewith it moves in the fluid[122]. But if neither the globe nor
-the particles of the fluid be elastic, so that the particles, when the
-globe strikes against them, do not rebound from it, then the resistance
-will be but half so much[123]. Again, if the particles of the fluid and
-the globe are imperfectly elastic, so that the particles will spring
-from the globe with part only of that velocity wherewith the globe
-impinges upon them; then the resistance will be a mean between the two
-preceding cases, approaching nearer to the first or second, according
-as the elasticity is more or less[124].
-
-17. THE elasticity, which is here ascribed to the particles of the
-fluid, is not that power of repelling one another, when out of
-contact, by which, as has before been mentioned, the whole fluid may be
-rendred elastic; but such an elasticity only, as many solid bodies have
-of recovering their figure, whenever any forcible change is made in it,
-by the impulse of another body or otherwise. Which elasticity has been
-explained above at large[125].
-
-18. THIS is the case of discontinued fluids, where the body, by
-pressing against their particles, drives them before itself, while
-the space behind the body is left empty. But in fluids which are
-compressed, so that the parts of them removed out of place by the body
-resisted immediately retire behind the body, and fill that space, which
-in the other case is left vacant, the resistance is still less; for a
-globe in such a fluid which shall be free from all elasticity, will
-be resisted but half as much as the least resistance in the former
-case[126]. But by elasticity I now mean that power, which renders
-the whole fluid so; of which if the compressed fluid be possessed,
-in the manner of the air, then the resistance will be greater than
-by the foregoing rule; for the fluid being capable in some degree
-of condensation, it will resemble so far the case of uncompressed
-fluids[127]. But, as has been before related, this difference is most
-considerable in slow motions.
-
-19. IN the next place our author is particular in determining the
-degrees of resistance accompanying bodies of different figures; which
-is the last of the three heads, we divided the whole discourse of
-resistance into. And in this disquisition he finds a very surprizing
-and unthought of difference, between free and compressed fluids.
-He proves, that in the former kind, a globe suffers but half the
-resistance, which the cylinder, that circumscribes the globe, will
-do, if it move in the direction of its axis[128]. But in the latter
-he proves, that the globe and cylinder are resisted alike[129]. And
-in general, that let the shape of bodies be ever so different, yet if
-the greatest sections of the bodies perpendicular to the axis of their
-motion be equal, the bodies will be resisted equally[130].
-
-20. PURSUANT to the difference found between the resistance of the
-globe and cylinder in rare and uncompressed fluids, our author gives us
-the result of some other inquiries of the same nature. Thus of all the
-frustums of a cone, that can be described upon the same base and with
-the same altitude, he shews how to find that, which of all others will
-be the least resisted, when moving in the direction of its axis[131].
-And from hence he draws an easy method of altering the figure of any
-spheroidical solid, so that its capacity may be enlarged, and yet the
-resistance of it diminished[132]: a note which he thinks may not be
-useless to ship-wrights. He concludes with determining the solid, which
-will be resisted the least that is possible, in these discontinued
-fluids[133].
-
-21. THAT I may here be understood by readers unacquainted with
-mathematical terms, I shall explain what I mean by a frustum of a cone,
-and a spheroidical solid. A cone has been defined above. A frustum is
-what remains, when part of the cone next the vertex is cut away by a
-section parallel to the base of the cone, as in fig. 86. A spheroid is
-produced from an ellipsis, as a sphere or globe is made from a circle.
-If a circle turn round on its diameter, it describes by its motion a
-sphere; so if an ellipsis (which figure has been defined above, and
-will be more fully explained hereafter[134]) be turned round either
-upon the longest or shortest line, that can be drawn through the middle
-of it, there will be described a kind of oblong or flat sphere, as
-in fig. 87. Both these figures are called spheroids, and any solid
-resembling these I here call spheroidical.
-
-22. IF it should be asked, how the method of altering spheroidical
-bodies, here mentioned, can contribute to the facilitating a ship’s
-motion, when I just above affirmed, that the figure of bodies, which
-move in a compressed fluid not elastic, has no relation to the
-augmentation or diminution of the resistance; the reply is, that what
-was there spoken relates to bodies deep immerged into such fluids, but
-not of those, which swim upon the surface of them; for in this latter
-case the fluid, by the appulse of the anterior parts of the body, is
-raised above the level of the surface, and behind the body is sunk
-somewhat below; so that by this inequality in the superficies of
-the fluid, that part of it, which at the head of the body is higher
-than the fluid behind, will resist in some measure after the manner
-of discontinued fluids[135], analogous to what was before observed to
-happen in the air through its elasticity, though the body be surrounded
-on every side by it[136]. And as far as the power of these causes
-extends, the figure of the moving body affects its resistance; for
-it is evident, that the figure, which presses least directly against
-the parts of the fluid, and so raises least the surface of a fluid
-not elastic, and least compresses one that is elastic, will be least
-resisted.
-
-23. THE way of collecting the difference of the resistance in rare
-fluids, which arises from the diversity of figure, is by considering
-the different effect of the particles of the fluid upon the body moving
-against them, according to the different obliquity of the several
-parts of the body upon which they respectively strike; as it is known,
-that any body impinging against a plane obliquely, strikes with a less
-force, than if it fell upon it perpendicularly; and the greater the
-obliquity is, the weaker is the force. And it is the same thing, if the
-body be at rest, and the plane move against it[137].
-
-24. THAT there is no connexion between the figure of a body and its
-resistance in compressed fluids, is proved thus. Suppose A B C D (in
-fig. 88.) to be a canal, having such a fluid, water for instance,
-running through it with an equable velocity; and let any body E, by
-being placed in the axis of the canal, hinder the passage of the water.
-It is evident, that the figure of the fore part of this body will have
-little influence in obstructing the water’s motion, but the whole
-impediment will arise from the space taken up by the body, by which it
-diminishes the bore of the canal, and straightens the passage of the
-water[138]. But proportional to the obstruction of the water’s motion,
-will be the force of the water upon the body E[139]. Now suppose both
-orifices of the canal to be closed, and the water in it to remain at
-rest; the body E to move, so that the parts of the water may pass by
-it with the same degree of velocity, as they did before; it is beyond
-contradiction, that the pressure of the water upon the body, that
-is, the resistance it gives to its motion, will remain the same; and
-therefore will have little connexion with the figure of the body[140].
-
-25. BY a method of reasoning drawn from the same fountain is determined
-the measure of resistance these compressed fluids give to bodies, in
-reference to the proportion between the density of the body and that of
-the fluid. This shall be explained particularly in my comment on Sir
-~IS. NEWTON~’s mathematical principles of natural philosophy;
-but is not a proper subject to be insisted on farther in this place.
-
-26. WE have now gone through all the parts of this theory. There
-remains nothing more, but in few words to mention the experiments,
-which our author has made, both with bodies falling perpendicularly
-through water, and the air[141], and with pendulums[142]: all which
-agree with the theory. In the case of falling bodies, the times
-of their fall determined by the theory come out the same, as by
-observation, to a surprizing exactness; in the pendulums, the rod, by
-which the ball of the pendulum hangs, suffers resistance as well as the
-ball, and the motion of the ball being reciprocal, it communicates such
-a motion to the fluid, as increases the resistance, but the deviation
-from the theory is no more, than what may reasonably follow from these
-causes.
-
-27. BY this theory of the resistance of fluids, and these experiments,
-our author decides the question so long agitated among natural
-philosophers, whether all space is absolutely full of matter. The
-Aristotelians and Cartesians both assert this plenitude; the Atomists
-have maintained the contrary. Our author has chose to determine this
-question by his theory of resistance, as shall be explained in the
-following chapter.
-
-[Illustration]
-
-[Illustration]
-
-
-
-
-  ~BOOK II.~
-  CONCERNING THE
-  SYSTEM of the WORLD.
-
-
-
-
-CHAP. I.
-
-That the Planets move in a space empty of all sensible matter.
-
-
-I HAVE now gone through the first part of my design, and have
-explained, as far as the nature of my undertaking would permit, what
-Sir ~ISAAC NEWTON~ has delivered in general concerning the motion
-of bodies. It follows now to speak of the discoveries, he has made
-in the system of the world; and to shew from him what cause keeps
-the heavenly bodies in their courses. But it will be necessary for
-the use of such, as are not skilled in astronomy, to premise a brief
-description of the planetary system.
-
-2. THIS system is disposed in the following manner. In the middle is
-placed the sun. About him six globes continually roll. These are the
-primary planets; that which is nearest to the sun is called Mercury,
-the next Venus, next to this is our earth, the next beyond is Mars,
-after him Jupiter, and the outermost of all Saturn. Besides these there
-are discovered in this system ten other bodies, which move about some
-of these primary planets in the same manner, as they move round the
-sun. These are called secondary planets. The most conspicuous of them
-is the moon, which moves round our earth; four bodies move in like
-manner round Jupiter; and five round Saturn. Those which move about
-Jupiter and Saturn, are usually called satellites; and cannot any of
-them be seen without a telescope. It is not impossible, but there may
-be more secondary planets, beside these; though our instruments have
-not yet discovered any other. This disposition of the planetary or
-solar system is represented in fig. 89.
-
-3. THE same planet is not always equally distant from the sun. But
-the middle distance of Mercury is between ⅕ and ⅖ of the distance of
-the earth from the sun; Venus is distant from the sun almost ¾ of the
-distance of the earth; the middle distance of Mars is something more
-than half as much again, as the distance of the earth; Jupiter’s
-middle distance exceeds five times the distance of the earth, by
-between ⅕ and 1/6 part of this distance; Saturn’s middle distance is
-scarce more than 9½ times the distance between the earth and sun; but
-the middle distance between the earth and sun is about 217⅛ times the
-sun’s semidiameter.
-
-[Illustration]
-
-4. ALL these planets move one way, from west to east; and of the
-primary planets the most remote is longest in finishing its course
-round the sun. The period of Saturn falls short only sixteen days of 29
-years and a half. The period of Jupiter is twelve years wanting about
-50 days. The period of Mars falls short of two years by about 43 days.
-The revolution of the earth constitutes the year. Venus performs her
-period in about 224½ days, and Mercury in about 88 days.
-
-5. THE course of each planet lies throughout in one plane or flat
-surface, in which the sun is placed; but they do not all move in the
-same plane, though the different planes, in which they move, cross each
-other in very small angles. They all cross each other in lines, which
-pass through the sun; because the sun lies in the plane of each orbit.
-This inclination of the several orbits to each other is represented in
-fig. 90. The line, in which the plane of any orbit crosses the plane of
-the earth’s motion, is called the line of the nodes of that orbit.
-
-6. EACH planet moves round the sun in the line, which we have mentioned
-above[143] under the name of ellipsis; which I shall here shew more
-particularly how to describe. I have there said how it is produced in
-the cone. I shall now shew how to form it upon a plane. Fix upon any
-plane two pins, as at A and B in fig. 91. To these tye a string A C B
-of any length. Then apply a third pin D so to the string, as to hold
-it strained; and in that manner carrying this pin about, the point of
-it will describe an ellipsis. If through the points A, B the straight
-line E A B F be drawn, to be terminated at the ellipsis in the points
-E and F, this is the longest line of any, that can be drawn within the
-figure, and is called the greater axis of the ellipsis. The line G H,
-drawn perpendicular to this axis E F, so as to pass through the middle
-of it, is called the lesser axis. The two points A and B are called
-focus’s. Now each planet moves round the sun in a line of this kind, so
-that the sun is found in one focus. Suppose A to be the place of the
-sun. Then E is the point, wherein the planet will be nearest of all to
-the sun, and at F it will be most remote. The point E is called the
-perihelion of the planet, and F the aphelion. In G and H the planet is
-said to be in its middle or mean distance; because the distance A G or
-A H is truly the middle between A E the least, and A F the greatest
-distance. In fig. 92. is represented how the greater axis of each orbit
-is situated in respect of the rest. The proportion between the greatest
-and least distances of the planet from the sun is very different in the
-different planets.
-
-[Illustration]
-
-In Saturn the proportion of the greatest distance to the least is
-something less, than the proportion of 9 to 8, but much nearer to
-this, than to the proportion of 10 to 9. In Jupiter this proportion
-is a little greater, than that of 11 to 10. In Mars it exceeds the
-proportion of 6 to 5. In the earth it is about the proportion of 30 to
-29. In Venus it is near to that of 70 to 69. And in Mercury it comes
-not a great deal short of the proportion of 3 to 2.
-
-[Illustration]
-
-7. EACH of these planets so moves through its ellipsis, that the line
-drawn from the sun to the planet, by accompanying the planet in its
-motion, will describe about the sun equal spaces in equal times, after
-the manner spoke of in the chapter of centripetal forces[144]. There is
-also a certain relation between the greater axis’s of these ellipsis’s,
-and the times, in which the planets perform their revolutions through
-them. Which relation may be expressed thus. Let the period of one
-planet be denoted by the letter A, the greater axis of its orbit by
-D; let the period of another planet be denoted by B, and the greater
-axis of this planet’s orbit by E. Then if C be taken to bear the same
-proportion to B, as B bears to A; likewise if F be taken to bear the
-same proportion to E, as E bears to D; and G taken to bear the same
-proportion likewise to F, as E bears to D; then A shall bear the same
-proportion to C, as D bears to G.
-
-8. THE secondary planets move round their respective primary, much
-in the same manner as the primary do round the sun. But the motions
-of these shall be more fully explained hereafter[145]. And there is,
-besides the planets, another sort of bodies, which in all probability
-move round the sun; I mean the comets. The farther description of which
-bodies I also leave to the place, where they are to be particularly
-treated on[146].
-
-9. FAR without this system the fixed stars are placed. These are all so
-remote from us, that we seem almost incapable of contriving any means
-to estimate their distance. Their number is exceeding great. Besides
-two or three thousand, which we see with the naked eye, telescopes open
-to our view vast numbers; and the farther improved these instruments
-are, we still discover more and more. Without doubt these are luminous
-globes, like our sun, and ranged through the wide extent of space; each
-of which, it is to be supposed, perform the same office, as our sun,
-affording light and heat to certain planets moving about them. But
-these conjectures are not to be pursued in this place.
-
-10. I SHALL therefore now proceed to the particular design of this
-chapter, and shew, that there is no sensible matter lodged in the space
-where the planets move.
-
-11. THAT they suffer no sensible resistance from any such matter, is
-evident from the agreement between the observations of astronomers in
-different ages, with regard to the time, in which the planets have
-been found to perform their periods. But it was the opinion of DES
-CARTES[147], that the planets might be kept in their courses by the
-means of a fluid matter, which continually circulating round should
-carry the planets along with it. There is one appearance that may seem
-to favour this opinion; which is, that the sun turns round its own
-axis the same way, as the planets move. The earth also turns round its
-axis the same way, as the moon moves round the earth. And the planet
-Jupiter turns upon its axis the same way, as his satellites revolve
-round him. It might therefore be supposed, that if the whole planetary
-region were filled with a fluid matter, the sun, by turning round on
-its own axis, might communicate motion first to that part of the fluid,
-which was contiguous, and by degrees propagate the like motion to the
-parts more remote. After the same manner the earth might communicate
-motion to this fluid, to a distance sufficient to carry round the moon,
-and Jupiter communicate the like to the distance of its satellites.
-Sir ~ISAAC NEWTON~ has particularly examined what might be
-the result of such a motion as this[148]; and he finds, that the
-velocities, with which the parts of this fluid will move in different
-distances from the center of the motion, will not agree with the motion
-observed in different planets: for instance, that the time of one
-intire circulation of the fluid, wherein Jupiter should swim, would
-bear a greater proportion to the time of one intire circulation of the
-fluid, where the earth is; than the period of Jupiter bears to the
-period of the earth. But he also proves[149], that the planet cannot
-circulate in such a fluid, so as to keep long in the same course,
-unless the planet and the contiguous fluid are of the same density,
-and the planet be carried along with the same degree of motion, as
-the fluid. There is also another remark made upon this motion by
-our author; which is, that some vivifying force will be continually
-necessary at the center of the motion[150]. The sun in particular, by
-communicating motion to the ambient fluid, will lose from it self as
-much motion, as it imparts to the fluid; unless some acting principle
-reside in the sun to renew its motion continually. If the fluid be
-infinite, this gradual loss of motion would continue till the whole
-should stop[151]; and if the fluid were limited, this loss of motion
-would continue, till there would remain no swifter a revolution in the
-sun, than in the utmost part of the fluid; so that the whole would turn
-together about the axis of the sun, like one solid globe[152].
-
-12. IT is farther to be observed, that as the planets do not move in
-perfect circles round the sun; there is a greater distance between
-their orbits in some places, than in others. For instance, the distance
-between the orbit of Mars and Venus is near half as great again in one
-part of their orbits, as in the opposite place. Now here the fluid,
-in which the earth should swim, must move with a less rapid motion,
-where there is this greater interval between the contiguous orbits; but
-on the contrary, where the space is straitest, the earth moves more
-slowly, than where it is widest[153].
-
-13. FARTHER, if this our globe of earth swam in a fluid of equal
-density with the earth it self, that is, in a fluid more dense than
-water; all bodies put in motion here upon the earth’s surface must
-suffer a great resistance from it; where as, by Sir ~ISAAC
-NEWTON~’s experiments mentioned in the preceding chapter, bodies,
-that fell perpendicularly down through the air, felt about 1/860 part
-only of the resistance, which bodies suffered that fell in like manner
-through water.
-
-14. Sir ~ISAAC NEWTON~ applies these experiments yet farther,
-and examines by them the general question concerning the absolute
-plenitude of space. According to the Aristotelians, all space was
-full without any the least vacuities whatever. DESCARTES embraced the
-same opinion, and therefore supposed a subtile fluid matter, which
-should pervade all bodies, and adequately fill up their pores. The
-Atomical philosophers, who suppose all bodies both fluid and solid to
-be composed of very minute but solid atoms, assert that no fluid, how
-subtile soever the particles or atoms whereof it is composed should be,
-can ever cause an absolute plenitude; because it is impossible that
-any body can pass through the fluid without putting the particles of
-it into such a motion, as to separate them, at least in part, from one
-another, and so perpetually to cause small vacuities; by which these
-Atomists endeavour to prove, that a vacuum, or some space empty of
-all matter, is absolutely necessary to be in nature. Sir ~ISAAC
-NEWTON~ objects against the filling of space with such a subtile
-fluid, that all bodies in motion must be unmeasurably resisted by a
-fluid so dense, as absolutely to fill up all the space, through which
-it is spread. And lest it should be thought, that this objection might
-be evaded by ascribing to this fluid such very minute and smooth parts,
-as might remove all adhesion or friction between them, whereby all
-resistance would be lost, which this fluid might otherwise give to
-bodies moving in it; Sir ~ISAAC NEWTON~ proves, in the manner
-above related, that fluids resist from the power of inactivity of their
-particles; and that water and the air resist almost entirely on this
-account: so that in this subtile fluid, however minute and lubricated
-the particles, which compose it, might be; yet if the whole fluid was
-as dense as water, it would resist very near as much as water does; and
-whereas such a fluid, whose parts are absolutely close together without
-any intervening spaces, must be a great deal more dense than water,
-it must resist more than water in proportion to its greater density;
-unless we will suppose the matter, of which this fluid is composed, not
-to be endued with the same degree of inactivity as other matter. But if
-you deprive any substance of the property so universally belonging to
-all other matter, without impropriety of speech it can scarce be called
-by this name.
-
-15. Sir ~ISAAC NEWTON~ made also an experiment to try
-in particular, whether the internal parts of bodies suffered any
-resistance. And the result did indeed appear to favour some small
-degree of resistance; but so very little, as to leave it doubtful,
-whether the effect did not arise from some other latent cause[154].
-
-
-
-
-CHAP. II.
-
-Concerning the cause, which keeps in motion the primary planets.
-
-
-SINCE the planets move in a void space and are free from resistance;
-they, like all other bodies, when once in motion, would move on in a
-straight line without end, if left to themselves. And it is now to be
-explained what kind of action upon them carries them round the sun.
-Here I shall treat of the primary planets only, and discourse of the
-secondary apart in the next chapter. It has been just now declared,
-that these primary planets move so about the sun, that a line extended
-from the sun to the planet, will, by accompanying the planet in its
-motion, pass over equal spaces in equal portions of time[155]. And
-this one property in the motion of the planets proves, that they are
-continually acted on by a power directed perpetually to the sun as a
-center. This therefore is one property of the cause, which keeps the
-planets in their courses, that it is a centripetal power, whose center
-is the sun.
-
-2. AGAIN, in the chapter upon centripetal forces[156] it was observ’d,
-that if the strength of the centripetal power was suitably accommodated
-every where to the motion of any body round a center, the body might
-be carried in any bent line whatever, whose concavity should be every
-where turned towards the center of the force. It was farther remarked,
-that the strength of the centripetal force, in each place, was to be
-collected from the nature of the line, wherein the body moved[157].
-Now since each planet moves in an ellipsis, and the sun is placed in
-one focus; Sir ~ISAAC NEWTON~ deduces from hence, that the
-strength of this power is reciprocally in the duplicate proportion of
-the distance from the sun. This is deduced from the properties, which
-the geometers have discovered in the ellipsis. The process of the
-reasoning is not proper to be enlarged upon here; but I shall endeavour
-to explain what is meant by the reciprocal duplicate proportion. Each
-of the terms reciprocal proportion, and duplicate proportion, has been
-already defined[158]. Their sense when thus united is as follows.
-Suppose the planet moved in the orbit A B C (in fig. 93.) about the sun
-in S. Then, when it is said, that the centripetal power, which acts on
-the planet in A, bears to the power acting on it in B a proportion,
-which is the reciprocal of the duplicate proportion of the distance S
-A to the distance S B; it is meant that the power in A bears to the
-power in B the duplicate of the proportion of the distance S B to the
-distance S A. The reciprocal duplicate proportion may be explained
-also by numbers as follows. Suppose several distances to bear to each
-other proportions expressed by the numbers 1, 2, 3, 4, 5; that is, let
-the second distance be double the first, the third be three times,
-the fourth four times, and the fifth five times as great as the
-first. Multiply each of these numbers by it self, and 1 multiplied by
-1 produces still 1, 2 multiplied by 2 produces 4, 3 by 3 makes 9, 4
-by 4 makes 16, and 5 by 5 gives 25. This being done, the fractions ¼,
-1/9, 1/16, 1/25, will respectively express the proportion, which the
-centripetal power in each of the following distances bears to the power
-at the first distance: for in the second distance, which is double the
-first, the centripetal power will be one fourth part only of the power
-at the first distance; at the third distance the power will be one
-ninth part only of the first power; at the fourth distance, the power
-will be but one sixteenth part of the first; and at the fifth distance,
-one twenty fifth part of the first power.
-
-3. THUS is found the proportion, in which this centripetal power
-decreases, as the distance from the sun increases, within the compass
-of one planet’s motion. How it comes to pass, that the planet can be
-carried about the sun by this centripetal power in a continual round,
-sometimes rising from the sun, then descending again as low, and from
-thence be carried up again as far remote as before, alternately rising
-and falling without end; appears from what has been written above
-concerning centripetal forces: for the orbits of the planets resemble
-in shape the curve line proposed in § 17 of the chapter on these
-forces[159].
-
-4. BUT farther, in order to know whether this centripetal force
-extends in the same proportion throughout, and consequently whether
-all the planets are influenced by the very same power, our author
-proceeds thus. He inquires what relation there ought to be between
-the periods of the different planets, provided they were acted
-upon by the same power decreasing throughout in the forementioned
-proportion; and he finds, that the period of each in this case would
-have that very relation to the greater axis of its orbit, as I have
-declared above[160] to be found in the planets by the observations
-of astronomers. And this puts it beyond question, that the different
-planets are pressed towards the sun, in the same proportion to their
-distances, as one planet is in its several distances. And thence in the
-last place it is justly concluded, that there is such a power acting
-towards the sun in the foresaid proportion at all distances from it.
-
-5. THIS power, when referred to the planets, our author calls
-centripetal, when to the sun attractive; he gives it likewise the
-name of gravity, because he finds it to be of the same nature with
-that power of gravity, which is observed in our earth, as will appear
-hereafter[161]. By all these names he designs only to signify a power
-endued with the properties before mentioned; but by no means would he
-have it understood, as if these names referred any way to the cause of
-it. In particular in one place where he uses the name of attraction, he
-cautions us expressly against implying any thing but a power directing
-a body to a center without any reference to the cause of it, whether
-residing in that center, or arising from any external impulse[162].
-
-6. BUT now, in these demonstrations some very minute inequalities in
-the motion of the planets are neglected; which is done with a great
-deal of judgment; for whatever be their cause, the effects are very
-inconsiderable, they being so exceeding small, that some astronomers
-have thought fit wholly to pass them by[163]. However the excellency
-of this philosophy, when in the hands of so great a geometer as our
-author, is such, that it is able to trace the least variations of
-things up to their causes. The only inequalities, which have been
-observed common to all the planets, are the motion of the aphelion and
-the nodes. The transverse axis of each orbit does not always remain
-fixed, but moves about the sun with a very slow progressive motion:
-nor do the planets keep constantly the same plane, but change them,
-and the lines in which those planes intersect each other by insensible
-degrees. The first of these inequalities, which is the motion of the
-aphelion, may be accounted for, by supposing the gravitation of the
-planets towards the sun to differ a little from the forementioned
-reciprocal duplicate proportion of the distances; but the second,
-which is the motion of the nodes, cannot be accounted for by any
-power directed towards the sun; for no such can give the planet any
-lateral impulse to divert it from the plane of its motion into any new
-plane, but of necessity must be derived from some other center. Where
-that power is lodged, remains to be discovered. Now it is proved, as
-shall be explained in the following chapter, that the three primary
-planets Saturn, Jupiter, and the earth, which have satellites revolving
-about them, are endued with a power of causing bodies, in particular
-those satellites, to gravitate towards them with a force, which is
-reciprocally in the duplicate proportion of their distances; and the
-planets are in all respects, in which they come under our examination,
-so similar and alike, that there is no reason to question, but they
-have all the same property. Though it be sufficient for the present
-purpose to have it proved of Jupiter and Saturn only; for these
-planets contain much greater quantities of matter than the rest, and
-proportionally exceed the others in power[164]. But the influence of
-these two planets being allowed, it is evident how the planets come to
-shift continually their planes: for each of the planets moving in a
-different plane, the action of Jupiter and Saturn upon the rest will
-be oblique to the planes of their motion; and therefore will gradually
-draw them into new ones. The same action of these two planets upon
-the rest will cause likewise a progressive motion of the aphelion; so
-that there will be no necessity of having recourse to the other cause
-for this motion, which was before hinted at[165]; viz, the gravitation
-of the planets towards the sun differing from the exact reciprocal
-duplicate proportion of the distances. And in the last place, the
-action of Jupiter and Saturn upon each other will produce in their
-motions the same inequalities, as their joint action produces in the
-rest. All this is effected in the same manner, as the sun produces the
-same kind of inequalities and many others in the motion of the moon and
-the other secondary planets; and therefore will be best apprehended by
-what shall be said in the next chapter. Those other irregularities in
-the motion of the secondary planets have place likewise here; but are
-too minute to be observable: because they are produced and rectified
-alternately, for the most part in the time of a single revolution;
-whereas the motion of the aphelion and nodes, which continually
-increase, become sensible in a long series of years. Yet some of these
-other inequalities are discernible in Jupiter and Saturn, in Saturn
-chiefly; for when Jupiter, who moves faster than Saturn, approaches
-near to a conjunction with him, his action upon Saturn will a little
-retard the motion of that planet, and by the reciprocal action of
-Saturn he will himself be accelerated. After conjunction, Jupiter will
-again accelerate Saturn, and be likewise retarded in the same degree,
-as before the first was retarded and the latter accelerated. Whatever
-inequalities besides are produced in the motion of Saturn by the action
-of Jupiter upon that planet, will be sufficiently rectified, by placing
-the focus of Saturn’s ellipsis, which should otherwise be in the sun,
-in the common center of gravity of the sun and Jupiter. And all the
-inequalities in the motion of Jupiter, caused by Saturn’s action upon
-him, are much less considerable than the irregularities of Saturn’s
-motion[166].
-
-7. THIS one principle therefore of the planets having a power, as well
-as the sun, to cause bodies to gravitate towards them, which is proved
-by the motion of the secondary planets to obtain in fact, explains
-all the irregularities relating to the planets ever observed by
-astronomers.
-
-8. Sir ~ISAAC NEWTON~ after this proceeds to make an
-improvement in astronomy by applying this theory to the farther
-correction of their motions. For as we have here observed the planets
-to possess a principle of gravitation, as well as the sun; so it will
-be explained at large hereafter, that the third law of motion, which
-makes action and reaction equal, is to be applied in this case[167];
-and that the sun does not only attract each planet, but is it self
-also attracted by them; the force, wherewith the planet is acted on,
-bearing to the force, wherewith the sun it self is acted on at the same
-time, the proportion, which the quantity of matter in the sun bears
-to the quantity of matter in the planet. From the action between the
-sun and planet being thus mutual Sir ISAAC NEWTON proves that the sun
-and planet will describe about their common center of gravity similar
-ellipsis’s; and then that the transverse axis of the ellipsis described
-thus about the moveable sun, will bear to the transverse axis of the
-ellipsis, which would be described about the sun at rest in the same
-time, the same proportion as the quantity of solid matter in the sun
-and planet together bears to the first of two mean proportionals
-between this quantity and the quantity of matter in the sun only[168].
-
-9. ABOVE, where I shewed how to find a cube, that should bear any
-proportion to another cube[169], the lines F T and T S are two mean
-proportionals between E F and F G; and counting from E F, F T is called
-the first, and F S the second of those means. In numbers these mean
-proportionals are thus found.
-
-[Illustration]
-
-Suppose A and B two numbers, and it be required to find C the first,
-and D the second of the two mean proportionals between them. First
-multiply A by it self, and the product multiply by B; then C will be
-the number which in arithmetic is called the cubic root of this last
-product; that is, the number C being multiplied by it self, and the
-product again multiplied by the same number C, will produce the product
-above mentioned. In like manner D is the cubic root of the product
-of B multiplied by it self, and the produce of that multiplication
-multiplied again by A.
-
-10. IT will be asked, perhaps, how this correction can be admitted,
-when the cause of the motions of the planets was before found by
-supposing the sun the center of the power, which acted upon them: for
-according to the present correction this power appears rather to be
-directed to their common center of gravity. But whereas the sun was
-at first concluded to be the center, to which the power acting on the
-planets was directed, because the spaces described round the sun in
-equal times were found to be equal; so Sir ~ISAAC NEWTON~
-proves, that if the sun and planet move round their common center of
-gravity, yet to an eye placed in the planet, the spaces, which will
-appear to be described about the sun, will have the same relation to
-the times of their description, as the real spaces would have, if the
-sun were at rest[170]. I farther asserted, that, supposing the planets
-to move round the sun at rest, and to be attracted by a power, which
-every where should act with degrees of strength reciprocally in the
-duplicate proportion of the distances; then the periods of the planets
-must observe the same relation to their distances, as astronomers find
-them to do. But here it must not be supposed, that the observations of
-astronomers absolutely agree without any the least difference; and the
-present correction will not cause a deviation from any one astronomer’s
-observations, so much as they differ from one another. For in Jupiter,
-where this correction is greatest, it hardly amounts to the 3000^{th}
-part of the whole axis.
-
-11. UPON this head I think it not improper to mention a reflection made
-by our excellent author upon these small inequalities in the planets
-motions; which contains under it a very strong philosophical argument
-against the eternity of the world. It is this, that these inequalities
-must continually increase by slow degrees, till they render at length
-the present frame of nature unfit for the purposes, it now serves[171].
-And a more convincing proof cannot be desired against the present
-constitution’s having existed from eternity than this, that a certain
-period of years will bring it to an end. I am aware this thought of
-our author has been represented even as impious, and as no less than
-casting a reflection upon the wisdom of the author of nature, for
-framing a perishable work. But I think so bold an assertion ought to
-have been made with singular caution. For if this remark upon the
-increasing irregularities of the heavenly motions be true in fact,
-as it really is, the imputation must return upon the asserter, that
-this does detract from the divine wisdom. Certainly we cannot pretend
-to know all the omniscient Creator’s purposes in making this world,
-and therefore cannot undertake to determine how long he designed it
-should last. And it is sufficient, if it endure the time intended by
-the author. The body of every animal shews the unlimited wisdom of its
-author no less, nay in many respects more, than the larger frame of
-nature; and yet we see, they are all designed to last but a small space
-of time.
-
-12. THERE need nothing more be said of the primary planets; the motions
-of the secondary shall be next considered.
-
-
-
-
-CHAP. III.
-
-Of the motion of the MOON and the other SECONDARY PLANETS.
-
-
-THE excellency of this philosophy sufficiently appears from its
-extending in the manner, which has been related, to the minutest
-circumstances of the primary planets motions; which nevertheless
-bears no proportion to the vast success of it in the motions of the
-secondary; for it not only accounts for all the irregularities, by
-which their motions were known to be disturbed, but has discovered
-others so complicated, that astronomers were never able to distinguish
-them, and reduce them under proper heads; but these were only to be
-found out from their causes, which this philosophy has brought to
-light, and has shewn the dependence of these inequalities upon such
-causes in so perfect a manner, that we not only learn from thence in
-general, what those inequalities are, but are able to compute the
-degree of them. Of this Sir ~IS. NEWTON~ has given several
-specimens, and has moreover found means to reduce the moon’s motion so
-completely to rule, that he has framed a theory, from which the place
-of that planet may at all times be computed, very nearly or altogether
-as exactly, as the places of the primary planets themselves, which is
-much beyond what the greatest astronomers could ever effect.
-
-2. THE first thing demonstrated of these secondary planets is, that
-they are drawn towards their respective primary in the same manner
-as the primary planets are attracted by the sun. That each secondary
-planet is kept in its orbit by a power pointed towards the center of
-the primary planet, about which the secondary revolves; and that the
-power, by which the secondaries of the same primary are influenced,
-bears the same relation to the distance from the primary, as the power,
-by which the primary planets are guided, does in regard to the distance
-from the sun[172]. This is proved in the satellites of Jupiter and
-Saturn, because they move in circles, as far as we can observe, about
-their respective primary with an equable course, the respective primary
-being the center of each orbit: and by comparing the times, in which
-the different satellites of the same primary perform their periods,
-they are found to observe the same relation to the distances from
-their primary, as the primary planets observe in respect of their mean
-distances from the sun[173]. Here these bodies moving in circles with
-an equable motion, each satellite passes over equal parts of its orbit
-in equal portions of time; consequently the line drawn from the center
-of the orbit, that is, from the primary planet, to the satellite, will
-pass over equal spaces along with the satellite in equal portions of
-time; which proves the power, by which each satellite is held in its
-orbit, to be pointed towards the primary as a center[174]. It is also
-manifest that the centripetal power, which carries a body in a circle
-concentrical with the power, acts upon the body at all times with the
-same strength. But Sir ~ISAAC NEWTON~ demonstrates that, when
-bodies are carried in different circles by centripetal powers directed
-to the centers of those circles, then, the degrees of strength of
-those powers are to be compared by considering the relation between
-the times, in which the bodies perform their periods through those
-circles[175]; and in particular he shews, that if the periodical times
-bear that relation, which I have just now asserted the satellites
-of the same primary to observe; then the centripetal powers are
-reciprocally in the duplicate proportion of the semidiameters of the
-circles, or in that proportion to the distances of the bodies from the
-centers[176]. Hence it follows that in the planets Jupiter and Saturn,
-the centripetal power in each decreases with the increase of distance,
-in the same proportion as the centripetal power appertaining to the
-sun decreases with the increase of distance. I do not here mean that
-this proportion of the centripetal powers holds between the power of
-Jupiter at any distance compared with the power of Saturn at any other
-distance; but only in the change of strength of the power belonging to
-the same planet at different distances from him. Moreover what is here
-discovered of the planets Jupiter and Saturn by means of the different
-satellites, which revolve round each of them, appears in the earth by
-the moon alone; because she is found to move round the earth in an
-ellipsis after the same manner as the primary planets do about the sun;
-excepting only some small irregularities in her motion, the cause of
-which will be particularly explained in what follows, whereby it will
-appear, that they are no objection against the earth’s acting on the
-moon in the same manner as the sun acts on the primary planets; that
-is, as the other primary planets Jupiter and Saturn act upon their
-satellites. Certainly since these irregularities can be otherwise
-accounted for, we ought not to depart from that rule of induction so
-necessary in philosophy, that to like bodies like properties are to
-be attributed, where no reason to the contrary appears. We cannot
-therefore but ascribe to the earth the same kind of action upon the
-moon, as the other primary planets Jupiter and Saturn have upon their
-satellites; which is known to be very exactly in the proportion
-assigned by the method of comparing the periodical times and distances
-of all the satellites which move about the same planet; this abundantly
-compensating our not being near enough to observe the exact figure of
-their orbits. For if the little deviation of the moon’s orbit orbit
-from a true permanent ellipsis arose from the action of the earth upon
-the moon not being in the exact reciprocal duplicate proportion of the
-distance, were another moon to revolve about the earth, the proportion
-between the periodical times of this new moon, and the present,
-would discover the deviation from the mentioned proportion much more
-manifestly.
-
-3. BY the number of satellites, which move round Jupiter and Saturn,
-the power of each of these planets is measured in a great diversity
-of distance; for the distance of the outermost satellite in each of
-these planets exceeds several times the distance of the innermost. In
-Jupiter the astronomers have usually placed the innermost satellite
-at a distance from the center of that planet equal to about 5⅔ of
-the semidiameters of Jupiter’s body, and this satellite performs its
-revolution in about 1 day 18½ hours. The next satellite, which revolves
-round Jupiter in about 3 days 13⅕ hours, they place at the distance
-from Jupiter of about 9 of that planet’s semidiameters. To the third
-satellite, which performs its period nearly in 7 days 3¾ hours, they
-assign the distance of about 14⅖ semidiameters. But the outermost
-satellite they remove to 25⅓ semidiameters, and this satellite makes
-its period in about 16 days 16½ hours[177]. In Saturn there is still
-a greater diversity in the distance of the several satellites. By the
-observations of the late ~CASSINI~, a celebrated astronomer
-in France, who first discovered all these satellites, except one known
-before, the innermost is distant about 4½ of Saturn’s semidiameters
-from his center, and revolves round in about 1 day 21⅓ hours. The next
-satellite is distant about 5¾ semidiameters, and makes its period in
-about 2 days 17⅔ hours. The third is removed to the distance of about
-8 semidiameters, and performs its revolution in near 4 days 12½ hours.
-The fourth satellite discovered first by the great HUYGENS, is near
-18⅔ semidiameters, and moves round Saturn in about 15 days 22⅔ hours.
-The outermost is distant 56 semidiameters, and makes its revolution in
-about 79 days 7⅘ hours[178]. Besides these satellites, there belongs
-to the planet Saturn another body of a very singular kind. This is a
-shining, broad, and flat ring, which encompasses the planet round.
-The diameter of the outermost verge of this ring is more than double
-the diameter of Saturn. ~HUYGENS~, who first described this
-ring, makes the whole diameter thereof to bear to the diameter of
-Saturn the proportion of 9 to 4. The late reverend Mr. POUND makes the
-proportion something greater, viz. that of 7 to 3. The distances of the
-satellites of this planet Saturn are compared by ~CASSINI~ to
-the diameter of the ring. His numbers I have reduced to those above,
-according to Mr. POUND’s proportion between the diameters of Saturn and
-of his ring. As this ring appears to adhere no where to Saturn, so the
-distance of Saturn from the inner edge of the ring seems rather greater
-than the breadth of the ring. The distances, which have here been
-given, of the several satellites, both for Jupiter and Saturn, may be
-more depended on in relation to the proportion, which those belonging
-to the same primary planet bear one to another, than in respect to the
-very numbers, that have been here set down, by reason of the difficulty
-there is in measuring to the greatest exactness the diameters of the
-primary planets; as will be explained hereafter, when we come to treat
-of telescopes[179]. By the observations of the forementioned Mr. POUND,
-in Jupiter the distance of the innermost satellite should rather be
-about 6 semidiameters, of the second 9-½, of the third 15, and of
-the outermost 26⅔[180]; and in Saturn the distance of the innermost
-satellite 4 semidiameters, of the next 6¼, of the third 8¾, of the
-fourth 20⅓, and of the fifth 59[181]. However the proportion between
-the distances of the satellites in the same primary is the only thing
-necessary to the point we are here upon.
-
-4. BUT moreover the force, wherewith the earth acts in different
-distances, is confirmed from the following consideration, yet more
-expresly than by the preceding analogical reasoning. It will appear,
-that if the power of the earth, by which it retains the moon in her
-orbit, be supposed to act at all distances between the earth and moon,
-according to the forementioned rule; this power will be sufficient to
-produce upon bodies, near the surface of the earth, all the effects
-ascribed to the principle of gravity. This is discovered by the
-following method. Let A (in fig. 94.) represent the earth, B the moon,
-B C D the moon’s orbit, which differs little from a circle, of which A
-is the center. If the moon in B were left to it self to move with the
-velocity, it has in the point B, it would leave the orbit, and proceed
-right forward in the line B E, which touches the orbit in B. Suppose
-the moon would upon this condition move from B to E in the space of
-one minute of time. By the action of the earth upon the moon, whereby
-it is retained in its orbit, the moon will really be found at the end
-of this minute in the point F, from whence a straight line drawn to A
-shall make the space B F A in the circle equal to the triangular space
-B E A; so that the moon in the time wherein it would have moved from
-B to E, if left to it self, has been impelled towards the earth from
-E to F. And when the time of the moon’s passing from B to F is small,
-as here it is only one minute, the distance between E and F scarce
-differs from the space, through which the moon would descend in the
-same time, if it were to fall directly down from B toward A without any
-other motion. A B the distance of the earth and moon is about 60 of the
-earth’s semidiameters, and the moon completes her revolution round the
-earth in about 27 days 7 hours and 43 minutes: therefore the space E F
-will here be found by computation to be about 16⅛ feet. Consequently,
-if the power, by which the moon is retained in its orbit, be near the
-surface of the earth greater, than at the distance of the moon in the
-duplicate proportion of that distance; the number of feet, a body would
-descend near the surface of the earth by the action of this power upon
-it in one minute of time, would be equal to 16⅛ multiplied twice into
-the number 60, that is, equal to 58050. But how fast bodies fall near
-the surface of the earth may be known by the pendulum[182]; and by the
-exactest experiments they are found to descend the space of 16⅛ feet in
-a second of time; and the spaces described by falling bodies being in
-the duplicate proportion of the times of their fall[183], the number of
-feet, a body would describe in its fall near the surface of the earth
-in one minute of time, will be equal to 16⅛ twice multiplied by 60, the
-same as would be caused by the power which acts upon the moon.
-
-5. IN this computation the earth is supposed to be at rest, whereas
-it would have been more exact to have supposed it to move, as well
-as the moon, about their common center of gravity; as will easily be
-understood, by what has been said in the preceding chapter, where it
-was shewn, that the sun is subjected to the like motion about the
-common center of gravity of it self and the planets. The action of
-the sun upon the moon, which is to be explain’d in what follows, is
-likewise here neglected: and Sir ISAAC NEWTON shews, if you take in
-both these considerations, the present computation will best agree
-to a somewhat greater distance of the moon and earth, viz. to 60½
-semidiameters of the earth, which distance is more conformable to
-astronomical observations.
-
-6. THESE computations afford an additional proof, that the action of
-the earth observes the same proportion to the distance, which is here
-contended for. Before I said, it was reasonable to conclude so by
-induction from the planets Jupiter and Saturn; because they act in
-that manner. But now the same thing will be evident by drawing no other
-consequence from what is seen in those planets, than that the power,
-by which the primary planets act on their secondary, is extended from
-the primary through the whole interval between, so that it would act in
-every part of the intermediate space. In Jupiter and Saturn this power
-is so far from being confined to a small extent of distance, that it
-not only reaches to several satellites at very different distances, but
-also from one planet to the other, nay even through the whole planetary
-system[184]. Consequently there is no appearance of reason, why this
-power should not act at all distances, even at the very surfaces of
-these planets as well as farther off. But from hence it follows, that
-the power, which retains the moon in her orbit, is the same, as causes
-bodies near the surface of the earth to gravitate. For since the
-power, by which the earth acts on the moon, will cause bodies near the
-surface of the earth to descend with all the velocity they are found
-to do, it is certain no other power can act upon them besides; because
-if it did, they must of necessity descend swifter. Now from all this
-it is at length very evident, that the power in the earth, which we
-call gravity, extends up to the moon, and decreases in the duplicate
-proportion of the increase of the distance from the earth.
-
-7. THIS finishes the discoveries made in the action of the primary
-planets upon their secondary. The next thing to be shewn is, that the
-sun acts upon them likewise: for this purpose it is to be observed,
-that if to the motion of the satellite, whereby it would be carried
-round its primary at rest, be superadded the same motion both in
-regard to velocity and direction, as the primary it self has, it will
-describe about the primary the same orbit, with as great regularity,
-as if the primary was indeed at rest. The cause of this is that law
-of motion, which makes a body near the surface of the earth, when let
-fall, to descend perpendicularly, though the earth be in so swift a
-motion, that if the falling body did not partake of it, its descent
-would be remarkably oblique; and that a body projected describes in
-the most regular manner the same parabola, whether projected in the
-direction, in which the earth moves, or in the opposite direction, if
-the projecting force be the same[185]. From this we learn, that if the
-satellite moved about its primary with perfect regularity, besides its
-motion about the primary, it would participate of all the motion of its
-primary; have the same progressive velocity, with which the primary
-is carried about the sun; and be impelled with the same velocity as
-the primary towards the sun, in a direction parallel to that impulse
-of its primary. And on the contrary, the want of either of these,
-in particular of the impulse towards the sun, will occasion great
-inequalities in the motion of the secondary planet. The inequalities,
-which would arise from the absence of this impulse towards the sun are
-so great, that by the regularity, which appears in the motion of the
-secondary planets, it is proved, that the sun communicates, the same
-velocity to them by its action, as it gives to their primary at the
-same distance. For Sir ~ISAAC NEWTON~ informs us, that upon
-examination he found, that if any of the satellites of Jupiter were
-attracted by the sun more or less, than Jupiter himself at the same
-distance, the orbit of that satellite, instead of being concentrical to
-Jupiter, must have its center at a greater or less distance, than the
-center of Jupiter from the sun, nearly in the subduplicate proportion
-of the difference between the sun’s action upon the satellite, and upon
-Jupiter; and therefore if any satellite were attracted by the sun but
-1/1000 part more or less, than Jupiter is at the same distance, the
-center of the orbit of that satellite would be distant from the center
-of Jupiter no less than a fifth part of the distance of the outermost
-satellite from Jupiter[186]; which is almost the whole distance of the
-innermost satellite. By the like argument the satellites of Saturn
-gravitate towards the sun, as much as Saturn it self at the same
-distance; and the moon as much as the earth.
-
-8. THUS is proved, that the sun acts upon the secondary planets, as
-much as upon the primary at the same distance: but it was found in the
-last chapter, that the action of the sun upon bodies is reciprocally
-in the duplicate proportion of the distance; therefore the secondary
-planets being sometimes nearer to the sun than the primary, and
-sometimes more remote, they are not alway acted upon in the same degree
-with their primary, but when nearer to the sun, are attracted more,
-and when farther distant, are attracted less. Hence arise various
-inequalities in the motion of the secondary planets[187].
-
-9. SOME of these inequalities would take place, though the moon, if
-undisturbed by the sun, would have moved in a circle concentrical
-to the earth, and in the plane of the earth’s motion; others depend
-on the elliptical figure, and the oblique situation of the moon’s
-orbit. One of the first kind is, that the moon is caused so to move,
-as not to describe equal spaces in equal times, but is continually
-accelerated, as she passes from the quarter to the new or full, and is
-retarded again by the like degrees in returning from the new and full
-to the next quarter. Here we consider not so much the absolute, as the
-apparent motion of the moon in respect to us.
-
-10. THE principles of astronomy teach how to distinguish these two
-motions. Let S (in fig. 95.) represent the sun, A the earth moving
-in its orbit B C, D E F G the moon’s orbit, the place of the moon H.
-Suppose the earth to have moved from A to I. Because it has been shewn,
-that the moon partakes of all the progressive motion of the earth;
-and likewise that the sun attracts both the earth and moon equally,
-when they are at the same distance from it, or that the mean action
-of the sun upon the moon is equal to its action upon the earth: we
-must therefore consider the earth as carrying about with it the moon’s
-orbit; so that when the earth is removed from A to I, the moon’s orbit
-shall likewise be removed from its former situation into that denoted
-by K L M N. But now the earth being in I, if the moon were found in O,
-so that O I should be parallel to H A, though the moon would really
-have moved from H to O, yet it would not have appeared to a spectator
-upon the earth to have moved at all, because the earth has moved as
-much it self; so that the moon would still appear in the same place
-with respect to the fixed stars. But if the moon be observed in P, it
-will then appear to have moved, its apparent motion being measured
-by the angle under O I P. And if the angle under P I S be less than
-the angle under H A S, the moon will have approached nearer to its
-conjunction with the sun.
-
-11. TO come now to the explication of the mentioned inequality in
-the moon’s motion: let S (in fig. 96.) represent the sun, A the
-earth, B C D E the moon’s orbit, C the place of the moon, when in
-the latter quarter. Here it will be nearly at the same distance from
-the sun, as the earth is. In this case therefore they will both be
-equally attracted, the earth in the direction A S, and the moon in
-the direction C S. Whence as the earth in moving round the sun is
-continually descending toward it, so the moon in this situation must in
-any equal portion of time descend as much; and therefore the position
-of the line A C in respect of A S, and the change, which the moon’s
-motion produces in the angle under C A S, will not be altered by the
-sun.
-
-12. BUT now as soon as ever the moon is advanced from the quarter
-toward the new or conjunction, suppose to G, the action of the sun upon
-it will have a different effect. Here, were the sun’s action upon the
-moon to be applied in the direction G H parallel to A S, if its action
-on the moon were equal to its action on the earth, no change would be
-wrought by the sun on the apparent motion of the moon round the earth.
-But the moon receiving a greater impulse in G than the earth receives
-in A, were the sun to act in the direction G H, yet it would accelerate
-the description of the space D A G, and cause the angle under G A D to
-decrease faster, than otherwise it would. The sun’s action will have
-this effect upon account of the obliquity of its direction to that,
-in which the earth attracts the moon. For the moon by this means is
-drawn by two forces oblique to each other, one drawing from G toward
-A, the other from G toward H, therefore the moon must necessarily be
-impelled toward D. Again, because the sun does not act in the direction
-G H parallel to S A, but in the direction G S oblique to it, the sun’s
-action on the moon will by reason of this obliquity farther contribute
-to the moon’s acceleration. Suppose the earth in any short space of
-time would have moved from A to I, if not attracted by the sun; the
-point I being in the straight line C E, which touches the earth’s orbit
-in A. Suppose the moon in the same time would have moved in her orbit
-from G to K, and besides have partook of all the progressive motion of
-the earth. Then if K L be drawn parallel to A I, and taken equal to it,
-the moon, if not attracted by the sun, would be found in L. But the
-earth by the sun’s action is removed from I. Suppose it were moved down
-to M in the line I M N parallel to S A, and if the moon were attracted
-but as much, and in the same direction, as the earth is here supposed
-to be attracted, so as to have descended during the same time in the
-line L O, parallel also to A S, down as far as P, till L P were equal
-to I M; the angle under P M N would be equal to that under L I N, that
-is, the moon will appear advanced no farther forward, than if neither
-it nor the earth had been subject to the sun’s action. But this is upon
-the supposition, that the action of the sun upon the moon and earth
-were equal; whereas the moon being acted upon more than the earth,
-did the sun’s action draw the moon in the line L O parallel to A S,
-it would draw it down so far as to make L P greater than I M; whereby
-the angle under P M N will be rendred less, than that under L I N. But
-moreover, as the sun draws the earth in a direction oblique to I N, the
-earth will be found in its orbit somewhat short of the point M; however
-the moon is attracted by the sun still more out of the line L O, than
-the earth is out of the line I N; therefore this obliquity of the sun’s
-action will yet farther diminish the angle under P M N.
-
-13. THUS the moon at the point G receives an impulse from the sun,
-whereby her motion is accelerated. And the sun producing this effect in
-every place between the quarter and the conjunction, the moon will move
-from the quarter with a motion continually more and more accelerated;
-and therefore by acquiring from time to time additional degrees of
-velocity in its orbit, the spaces, which are described in equal times
-by the line drawn from the earth to the moon, will not be every where
-equal, but those toward the conjunction will be greater, than those
-toward the quarter. But now in the moon’s passage from the conjunction
-D to the next quarter the sun’s action will again retard the moon, till
-at the next quarter in E it be restored to the first velocity, which it
-had in C.
-
-14. AGAIN as the moon moves from E to the full or opposition to the
-sun in B, it is again accelerated, the deficiency of the sun’s action
-upon the moon, from what it has upon the earth, producing here the same
-effect as before the excess of its action. Consider the moon in Q,
-moving from E towards B. Here if the moon were attracted by the sun in
-a direction parallel to A S, yet being acted on less than the earth,
-as the earth descends toward the sun, the moon will in some measure be
-left behind. Therefore Q F being drawn parallel to S B, a spectator
-on the earth would see the moon move, as if attracted from the point
-Q in the direction Q F with a degree of force equal to that, whereby
-the sun’s action on the moon falls short of its action on the earth.
-But the obliquity of the sun’s action has also here an effect. In the
-time the earth would have moved from A to I without the influence of
-the sun, let the moon have moved in its orbit from Q to R. Drawing
-therefore R T parallel to A I, and equal to the same, for the like
-reason as before, the moon by the motion of its orbit, if not at all
-attracted by the sun, must be found in T; and therefore, if attracted
-in a direction parallel to S A, would be in the line T V parallel to
-A S; suppose in W. But the moon in Q being farther off the sun than
-the earth, it will be less attracted, that is, T W will be less than
-I M, and if the line S M be prolonged toward X, the angle under X M
-W will be less than that under X I T. Thus by the sun’s action the
-moon’s passage from the quarter to the full would be accelerated, if
-the sun were to act on the earth and moon in a direction parallel to A
-S: and the obliquity of the sun’s action will still more increase this
-acceleration. For the action of the sun on the moon is oblique to the
-line S A the whole time of the moon’s passage from Q to T, and will
-carry the moon out of the line T V toward the earth. Here I suppose the
-time of the moon’s passage from Q to T so short, that it shall not pass
-beyond the line S A. The earth also will come a little short of the
-line I N, as was said before. From these causes the angle under X M W
-will be still farther lessened.
-
-15. THE moon in passing from the opposition B to the next quarter will
-be retarded again by the same degrees, as it is accelerated before
-its appulse to the opposition. Because this action of the sun, which
-in the moon’s passage from the quarter to the opposition causes it
-to be extraordinarily accelerated, and diminishes the angle, which
-measures its distance from the opposition; will make the moon slacken
-its pace afterwards, and retard the augmentation of the same angle in
-its passage from the opposition to the following quarter; that is, will
-prevent that angle from increasing so fast, as otherwise it would. And
-thus the moon, by the sun’s action upon it, is twice accelerated and
-twice restored to its first velocity, every circuit it makes round the
-earth. This inequality of the moon’s motion about the earth is called
-by astronomers its variation.
-
-16. THE next effect of the sun upon the moon is, that it gives the
-orbit of the moon in the quarters a greater degree of curvature,
-than it would receive from the action of the earth alone; and on the
-contrary in the conjunction and opposition the orbit is less inflected.
-
-17. WHEN the moon is in conjunction with the sun in the point D, the
-sun attracting the moon more forcibly than it does the earth, the
-moon by that means is impelled less toward the earth, than otherwise
-it would be, and so the orbit is less incurvated; for the power, by
-which the moon is impelled toward the earth, being that, by which it is
-inflected from a rectilinear course, the less that power is, the less
-it will be inflected. Again, when the moon is in the opposition in B,
-farther removed from the sun than the earth is; it follows then, though
-the earth and moon are both continually descending to the sun, that
-is, are drawn by the sun toward it self out of the place they would
-otherwise move into, yet the moon descends with less velocity than
-the earth; insomuch that the moon in any given space of time from its
-passing the point of opposition will have less approached the earth,
-than otherwise it would have done, that is, its orbit in respect of
-the earth will approach nearer to a straight line. In the last place,
-when the moon is in the quarter in F, and equally distant from the
-sun as the earth, we observed before, that the earth and moon would
-descend with equal pace toward the sun, so as to make no change by
-that descent in the angle under F A S; but the length of the line F
-A must of necessity be shortned. Therefore the moon in moving from F
-toward the conjunction with the sun will be impelled more toward the
-earth by the sun’s action, than it would have been by the earth alone,
-if neither the earth nor moon had been acted on by the sun; so that
-by this additional impulse the orbit is rendred more curve, than it
-would otherwise be. The same effect will also be produced in the other
-quarter.
-
-18. ANOTHER effect of the sun’s action, consequent upon this we have
-now explained, is, that though the moon undisturbed by the sun might
-move in a circle having the earth for its center; by the sun’s action,
-if the earth were to be in the very middle or center of the moon’s
-orbit, yet the moon would be nearer the earth at the new and full, than
-in the quarters. In this probably will at first appear some difficulty,
-that the moon should come nearest to the earth, where it is least
-attracted to it, and be farthest off when most attracted. Which yet
-will appear evidently to follow from that very cause, by considering
-what was last shewn, that the orbit of the moon in the conjunction
-and opposition is rendred less curve; for the less curve the orbit of
-the moon is, the less will the moon have descended from the place it
-would move into, without the action of the earth. Now if the moon were
-to move from any place without farther disturbance from that action,
-since it would proceed in the line, which would touch its orbit in that
-place, it would recede continually from the earth; and therefore if
-the power of the earth upon the moon, be sufficient to retain it at the
-same distance, this diminution of that power will cause the distance
-to increase, though in a less degree. But on the other hand in the
-quarters, the moon, being pressed more towards the earth than by the
-earth’s single action, will be made to approach it; so that in passing
-from the conjunction or opposition to the quarters the moon ascends
-from the earth, and in passing from the quarters to the conjunction and
-opposition it descends again, becoming nearer in these last mentioned
-places than in the other.
-
-19. ALL these forementioned inequalities are of different degrees,
-according as the sun is more or less distant from the earth; greater
-when the earth is nearest the sun, and less when it is farthest off.
-For in the quarters, the nearer the moon is to the sun, the greater is
-the addition to the earth’s action upon it by the power of the sun; and
-in the conjunction and opposition, the difference between the sun’s
-action upon the earth and upon the moon is likewise so much the greater.
-
-20. This difference in the distance between the earth and the sun
-produces a farther effect upon the moon’s motion; causing the orbit to
-dilate when less remote from the sun, and become greater, than when at
-a farther distance. For it is proved by Sir ~ISAAC NEWTON~, that the
-action of the sun, by which it diminishes the earth’s power over the
-moon, in the conjunction or opposition, is about twice as great, as
-the addition to the earth’s action by the sun in the quarters[188]; so
-that upon the whole, the power of the earth upon the moon is diminished
-by the sun, and therefore is most diminished, when the action of the
-sun is strongest: but as the earth by its approach to the sun has its
-influence lessened, the moon being less attracted will gradually recede
-from the earth; and as the earth in its recess from the sun recovers by
-degrees its former power, the orbit of the moon must again contract.
-Two consequences follow from hence: the moon will be most remote from
-the earth, when the earth is nearest the sun; and also will take up a
-longer time in performing its revolution through the dilated orbit,
-than through the more contracted.
-
-21. THESE irregularities the sun would produce in the moon, if the
-moon, without being acted on unequally by the sun, would describe a
-perfect circle about the earth, and in the plane of the earth’s motion;
-but though neither of these suppositions obtain in the motion of the
-moon, yet the forementioned inequalities will take place, only with
-some difference in respect to the degree of them; but the moon by not
-moving in this manner is subject to some other inequalities also.
-For as the moon describes, instead of a circle concentrical to the
-earth, an ellipsis, with the earth in one focus, that ellipsis will be
-subjected to various changes. It can neither preserve constantly the
-same position, nor yet the same figure; and because the plane of this
-ellipsis is not the same with that of the earth’s orbit, the situation
-of the plane, wherein the moon moves, will continually change; neither
-the line in which it intersects the plane of the earth’s orbit, nor the
-inclination of the planes to each other, will remain for any time the
-same. All these alterations offer themselves now to be explained.
-
-22. I SHALL first consider the changes which are made in the plane
-of the moon’s orbit. The moon not moving in the same plane with the
-earth, the sun is seldom in the plane of the moon’s orbit, viz. only
-when the line made by the common intersection of the two planes, if
-produced, will pass through the sun, as is represented in fig. 97.
-where S denotes the sun; T the earth; A T B the earth’s orbit described
-upon the plane of this scheme; C D E F the moon’s orbit, the part C
-D E being raised above, and the part C F E depressed under the plane
-of this scheme. Here the line C E, in which the plane of this scheme,
-that is, the plane of the earth’s orbit and the plane of the moon’s
-orbit intersect each other, being continued passes through the sun in
-S. When this happens, the action of the sun is directed in the plane of
-the moon’s orbit, and cannot draw the moon out of this plane, as will
-evidently appear to any one that shall consider the present scheme: for
-suppose the moon in G, and let a straight line be drawn from G to S,
-the sun draws the moon in the direction of this line from G toward S:
-but this line lies in the plane of the orbit; and if it be prolonged
-from S beyond G, the continuation of it will lie on the plane C D E;
-for the plane itself, if sufficiently extended, will pass through the
-sun. But in other cases the obliquity of the sun’s action to the plane
-of the orbit will cause this plane continually to change.
-
-23. SUPPOSE in the first place, the line, in which the two planes
-intersect each other, to be perpendicular to the line which joins the
-earth and sun. Let T (in fig. 98, 99, 100, 101.) represent the earth; S
-the sun; the plane of this scheme the plane of the earth’s motion, in
-which both the sun and earth are placed. Let A C be perpendicular to
-S T, which joins the earth and sun; and let the line A C be that, in
-which the plane of the moon’s orbit intersects the plane of the earth’s
-motion. To the center T describe in the plane of the earth’s motion
-the circle A B C D. And in the plane of the moon’s orbit describe the
-circle A E C F, one half of which A E C will be elevated above the
-plane of this scheme, the other half A F C as much depressed below it.
-
-24. NOW suppose the moon to set forth from the point A (in fig. 98.) in
-the direction of the plane A E C. Here she will be continually drawn
-out of this plane by the action of the sun: for this plane A E C, if
-extended, will not pass through the sun, but above it; so that the sun,
-by drawing the moon directly toward it self, will force it continually
-more and more from that plane towards the plane of the earth’s motion,
-in which it self is; causing it to describe the line A K G H I, which
-will be convex to the plane A E C, and concave to the plane of the
-earth’s motion. But here this power of the sun, which is said to draw
-the moon toward the plane of the earth’s motion, must be understood
-principally of so much only of the sun’s action upon the moon, as
-it exceeds the action of the same upon the earth. For suppose the
-preceding figure to be viewed by the eye, placed in the plane of that
-scheme, and in the line C T A on the side of A, the plane A B C D will
-appear as the straight line D T B, (in fig. 102.) and the plane A E C
-F as another straight line F E; and the curve line A K G H I under the
-form of the line T K G H I.
-
-[Illustration]
-
-Now it is plain, that the earth and moon being both attracted by the
-sun, if the sun’s action upon both was equally strong, the earth T,
-and with it the plane A E C F or line F T E in this scheme, would be
-carried toward the sun with as great a pace as the moon, and therefore
-the moon not drawn out of it by the sun’s action, excepting only from
-the small obliquity of the direction of this action upon the moon
-to that of the sun’s action upon the earth, which arises from the
-moon’s being out of the plane of the earth’s motion, and is not very
-considerable; but the action of the sun upon the moon being greater
-than upon the earth, all the time the moon is nearer to the sun than
-the earth is, it will be drawn from the plane A E C or the line T E by
-that excess, and made to describe the curve line A G I or T G I. But it
-is the custom of astronomers, instead of considering the moon as moving
-in such a curve line, to refer its motion continually to the plane,
-which touches the true line wherein it moves, at the point where at
-any time the moon is. Thus when the moon is in the point A, its motion
-is considered as being in the plane A E C, in whose direction it then
-essaies to move; and when in the point K (in fig. 99.) its motion is
-referred to the plane, which passes through the earth, and touches the
-line A K G H I in the point K. Thus the moon in passing from A to I
-will continually change the plane of her motion. In what manner this
-change proceeds, I shall now particularly explain.
-
-25. LET the plane, which touches the line A K I in the point K (in fig.
-99.) intersect the plane of the earth’s orbit in the line L T M. Then,
-because the line A K I is concave to the plane A B C, it falls wholly
-between that plane, and the plane which touches it in K; so that the
-plane M K L will cut the plane A E C, before it meets with the plane of
-the earth’s motion; suppose in the line Y T, and the point A will fall
-between K and L. With a semidiameter equal to T Y or T L describe the
-semicircle L Y M. Now to a spectator on the earth the moon, when in A,
-will appear to move in the circle A E C F, and, when in K, will appear
-to be moving in the semicircle L Y M. The earth’s motion is performed
-in the plane of this scheme, and to a spectator on the earth the sun
-will appear always moving in that plane. We may therefore refer the
-apparent motion of the sun to the circle A B C D, described in this
-plane about the earth. But the points where this circle, in which the
-sun seems to move, intersects the circle in which the moon is seen at
-any time to move, are called the nodes of the moon’s orbit at that
-time. When the moon is seen moving in the circle A E C D, the points A
-and C are the nodes of the orbit; when she appears in the semicircle
-L Y M, then L and M are the nodes. Now here it appears, from what has
-been said, that while the moon has moved from A to K, one of the nodes
-has been carried from A to L, and the other as much from C to M. But
-the motion from A to L, and from C to M, is backward in regard to the
-motion of the moon, which is the other way from A to K, and from thence
-toward C.
-
-26. FARTHER the angle, which the plane, wherein the moon at any time
-appears, makes with the plane of the earth’s motion, is called the
-inclination of the moon’s orbit at that time. And I shall now proceed
-to shew, that this inclination of the orbit, when the moon is in K, is
-less than when she was in A; or, that the plane L Y M, which touches
-the line of the moon’s motion in K, makes a less angle with the plane
-of the earth’s motion or with the circle A B C D, than the plane A E
-C makes with the same. The semicircle L Y M intersects the semicircle
-A E C in Y; and the arch A Y is less than L Y, and both together less
-than half a circle. But it is demonstrated by the writers on that part
-of astronomy, which is called the doctrine of the sphere, that when a
-triangle is made, as here, by three arches of circles A L, A Y, and Y
-L, the angle under Y A B without the triangle is greater than the angle
-under Y L A within, if the two arches A Y, Y L taken together do not
-amount to a semicircle; if the two arches make a complete semicircle,
-the two angles will be equal; but if the two arches taken together
-exceed a semicircle, the inner angle under Y L A is greater than the
-other[189]. Here therefore the two arches A Y and L Y together being
-less than a semicircle, the angle under A L Y is less, than the angle
-under B A E. But from the doctrine of the sphere it is also evident,
-that the angle under A L Y is equal to that, in which the plane of the
-circle L Y K M, that is, the plane which touches the line A K G H I in
-K, is inclined to the plane of the earth’s motion A B C; and the angle
-under B A E is equal to that, in which the plane A E C is inclined to
-the same plane. Therefore the inclination of the former plane is less
-than the inclination of the latter.
-
-27. SUPPOSE now the moon to be advanced to the point G (in fig. 100.)
-and in this point to be distant from its node a quarter part of the
-whole circle; or in other words, to be in the midway between its two
-nodes. And in this case the nodes will have receded yet more, and the
-inclination of the orbit be still more diminished: for suppose the
-line A K G H I to be touched in the point G by a plane passing through
-the earth T: let the intersection of this plane with the plane of the
-earth’s motion be the line W T O, and the line T P its intersection
-with the plane L K M. In this plane let the circle N G O be described
-with the semidiameter T P or N T cutting the other circle L K M in P.
-Now the line A K G I is convex to the plane L K M, which touches it in
-K; and therefore the plane N G O, which touches it in G, will intersect
-the other touching plane between G and K; that is, the point P will
-fall between those two points, and the plane continued to the plane of
-the earth’s motion will pass beyond L; so that the points N and O, or
-the places of the nodes, when the moon is in G, will be farther from A
-and C than L and M, that is, will have moved farther backward. Besides,
-the inclination of the plane N G O to the plane of the earth’s motion A
-B C is less, than the inclination of the plane L K M to the same; for
-here also the two arches L P and N P taken together are less than a
-semicircle, each of these arches being less than a quarter of a circle;
-as appears, because G N, the distance of the moon in G from its node N,
-is here supposed to be a quarter part of a circle.
-
-28. AFTER the moon is passed beyond G, the case is altered; for then
-these arches will be greater than quarters of the circle, by which
-means the inclination will be again increased, tho’ the nodes still go
-on to move the same way. Suppose the moon in H, (in fig. 101.) and that
-the plane, which touches the line A K G I in H, intersects the plane of
-the earth’s motion in the line Q T R, and the plane N G O in the line T
-V, and besides that the circle Q H R be described in that plane; then,
-for the same reason as before, the point V will fall between H and G,
-and the plane R V Q will pass beyond the last plane O V N, causing
-the points Q and R to fall farther from A and C than N and O. But the
-arches N V, V Q are each greater than a quarter of a circle, N V the
-least of them being greater than G N, which is a quarter of a circle;
-and therefore the two arches N V and V Q together exceed a semicircle;
-consequently the angle under B Q V will be greater, than that under B N
-V.
-
-29. IN the last place, when the moon is by this attraction of the sun,
-drawn at length into the plane of the earth’s motion, the node will
-have receded yet more, and the inclination be so much increased, as
-to become somewhat more than at first: for the line A K G H I being
-convex to all the planes, which touch it, the part H I will wholly fall
-between the plane Q V R and the plane A B C; so that the point I will
-fall between B and R; and drawing I T W, the point W will be farther
-remov’d from A than Q. But it is evident, that the plane, which passes
-through the earth T, and touches the line A G I in the point I, will
-cut the plane of the earth’s motion A B C D in the line I T W, and
-be inclined to the same in the angle under H I B; so that the node,
-which was first in A, after having passed into L, N and Q, comes at
-last into the point W; as the node which was at first in C has passed
-successively from thence through the points M, O and R to I: but the
-angle under H I B, which is now the inclination of the orbit to the
-plane of the ecliptic, is manifestly not less than the angle under E C
-B or E A B, but rather something greater.
-
-30. THUS the moon in the case before us, while it passes from the
-plane of the earth’s motion in the quarter, till it comes again into
-the same plane, has the nodes of its orbit continually moved backward,
-and the inclination of its orbit is at first diminished, viz. till it
-comes to G in fig. 100, which is near to its conjunction with the sun,
-but afterwards is increased again almost by the same degrees, till
-upon the moon’s arrival again to the plane of the earth’s motion, the
-inclination of the orbit is restored to something more than its first
-magnitude, though the difference is not very great, because the points
-I and C are not far distant from each other[190].
-
-31. AFTER the same manner, if the moon had departed from the quarter in
-C, it should have described the curve line C X W (in fig. 98.) between
-the planes A F C and A D C, which would be convex to the former of
-those planes, and concave to the latter; so that, here also, the nodes
-should continually recede, and the inclination of the orbit gradually
-diminish more and more, till the moon arrived near its opposition to
-the sun in X; but from that time the inclination should again increase,
-till it became a little greater than at first. This will easily
-appear, by considering, that as the action of the sun upon the moon,
-by exceeding its action upon the earth, drew it out of the plane A E
-C towards the sun, while the moon passed from A to I; so, during its
-passage from C to W, the moon being all that time farther from the sun
-than the earth, it will be attracted less; and the earth, together with
-the plane A E C F, will as it were be drawn from the moon, in such
-sort, that the path the moon describes shall appear from the earth, as
-it did in the former case by the moon’s being drawn away.
-
-32. THESE are the changes, which the nodes and the inclination of the
-moon’s orbit undergo, when the nodes are in the quarters; but when the
-nodes by their motion, and the motion of the sun together, come to
-be situated between the quarter and conjunction or opposition, their
-motion and the change made in the inclination of the orbit are somewhat
-different.
-
-33. LET A G C H (in fig. 103.) be a circle described in the plane of
-the earth’s motion, having the earth in T for its center. Let the
-point opposite to the sun be A, and the point G a fourth part of the
-circle distant from A. Let the nodes of the moon’s orbit be situated
-in the line B T D, and B the node, falling between A, the place where
-the moon would be in the full, and G the place where the moon would
-be in the quarter. Suppose B E D F to be the plane, in which the moon
-essays to move, when it proceeds from the point B. Because the moon
-in B is more distant from the sun than the earth, it shall be less
-attracted by the sun, and shall not descend towards the sun so fast
-as the earth: consequently it shall quit the plane B E D F, which we
-suppose to accompany the earth, and describe the line B I K convex
-thereto, till such time as it comes to the point K, where it will be in
-the quarter: but from thenceforth being more attracted than the earth,
-the moon shall change its course, and the following part of the path
-it describes shall be concave to the plane B E D or B G D, and shall
-continue concave to the plane B G D, till it crosses that plane in L,
-just as in the preceding case. Now I say, while the moon is passing
-from B to K, the nodes, contrary to what was found in the foregoing
-case, will proceed forward, or move the same way with the moon[191];
-and at the same time the inclination of the orbit will increase[192].
-
-[Illustration]
-
-34. WHEN the moon is in the point I, let the plane M I N pass through
-the earth T, and touch the path of the moon in I, cutting the plane of
-the earth’s motion, in the line M T N, and the plane B E D in the line
-T O. Because the line B I K is convex to the plane B E D, which touches
-it in B, the plane N I M must cross the plane D E B, before it meets
-the plane C G B; and therefore the point M will fall from B towards G,
-and the node of the moon’s orbit being translated from B to M is moved
-forward.
-
-35. I SAY farther, the angle under O M G, which the plane M O N makes
-with the plane B G C, is greater than the angle under O B G, which
-the plane B O D makes with the same. This appears from what has been
-already explained; because the arches B O, O M are each less than the
-quarter of a circle, and therefore taken both together are less than a
-semicircle.
-
-36. AGAIN, when the moon is come to the point K in its quarter, the
-nodes will be advanced yet farther forward, and the inclination of the
-orbit also more augmented. Hitherto the moon’s motion has been referred
-to the plane, which passing through the earth touches the path of the
-moon in the point, where the moon is, according to what was asserted at
-the beginning of this discourse upon the nodes, that it is the custom
-of astronomers so to do. But here in the point K no such plane can be
-found; on the contrary, seeing the line of the moon’s motion on one
-side the point K is convex to the plane B E D, and on the other side
-concave to the same, no plane can pass through the points T and K but
-will cut the line B K L in that point. Therefore instead of such a
-touching plane, we must here make use of what is equivalent, the plane
-P K Q, with which the line B K L shall make a less angle than with any
-other plane; for this plane does as it were touch the line B K in the
-point K, since it so cuts it, that no other plane can be drawn so,
-as to pass between the line B K and the plane P K Q. But now it is
-evident, that the point P, or the node, is removed from M towards G,
-that is, has moved yet farther forward; and it is likewise as manifest,
-that the angle under K P G, or the inclination of the moon’s orbit in
-the point K, is greater than the angle under I M G, for the reason so
-often assigned.
-
-37. AFTER the moon has passed the quarter, the path of the moon being
-concave to the plane A G C H, the nodes, as in the preceding case,
-shall recede, till the moon arrives at the point L; which shews, that
-considering the whole time of the moon’s passing from B to L, at the
-end of that time the nodes shall be found to have receded, or to be
-placed backwarder, when the moon is in L, than when it was in B. For
-the moon takes a longer time in passing from K to L, than in passing
-from B to K; and therefore the nodes continue to recede a longer time,
-than they moved forwards; so that their recess must surmount their
-advance.
-
-38. IN the same manner, while the moon is in its passage from K to L,
-the inclination of the orbit shall diminish, till the moon comes to
-the point, in which it is one quarter part of a circle distant from
-its node; suppose in the point R; and from that time the inclination
-shall again increase. Since therefore the inclination of the orbit
-increases, while the moon is passing from B to K, and diminishes itself
-again only, while the moon is passing from K to R, and then augments
-again, till the moon arrive in L; while the moon is passing from B to
-L, the inclination of the orbit is much more increased than diminished,
-and will be distinguishably greater, when the moon is come to L, than
-when it set out from B.
-
-39. IN like manner, while the moon is passing from L on the other side
-the plane A G C H, the node shall advance forward, as long as the moon
-is between the point L and the next quarter; but afterwards it shall
-recede, till the moon come to pass the plane A G C H again in the point
-V, between B and A: and because the time between the moon’s passing
-from L to the next quarter is less, than the time between that quarter
-and the moon’s coming to the point V, the node shall have more receded
-than advanced; so that the point V will be nearer to A, than L is to C.
-So also the inclination of the orbit, when the moon is in V, will be
-greater, than when the moon was at L; for this inclination increases
-all the time the moon is between L and the next quarter; it decreases
-only while the moon is passing from this quarter to the mid way between
-the two nodes, and from thence increases again during the whole passage
-through the other half of the way to the next node.
-
-40. THUS we have traced the moon from her node in the quarter, and
-shewn, that at every period of the moon the nodes will have receded,
-and thereby will have approached toward a conjunction with the sun.
-But this conjunction will be much forwarded by the visible motion of
-the sun itself. In the last scheme the sun will appear to move from
-S toward W. Suppose it appeared to have moved from S to W, while the
-moon’s node has receded from B to V, then drawing the line W T X,
-the arch V X will represent the distance of the line drawn between
-the nodes from the sun, when the moon is in V; whereas the arch B A
-represented that distance, when the moon was in B. This visible motion
-of the sun is much greater, than that of the node; for the sun appears
-to revolve quite round each year, and the node is near 19 years in
-making one revolution. We have also seen, that when the node was in
-the quadrature, the inclination of the moon’s orbit decreased, till
-the moon came to the conjunction, or opposition, according to which
-node it set out from; but that afterwards it again increased, till it
-became at the next node rather greater than at the former. When the
-node is once removed from the quarter nearer to a conjunction with the
-sun, the inclination of the moon’s orbit, when the moon comes into the
-node, is more sensibly greater, than it was in the node preceding; the
-inclination of the orbit by this means more and more increasing till
-the node comes into conjunction with the sun; at which time it has
-been shewn above, that the sun has no power to change the plane of the
-moon’s motion; and consequently has no effect either on the nodes, or
-on the inclination of the orbit.
-
-41. AS soon as the nodes, by the action of the sun, are got out of
-conjunction toward the other quarters, they begin again to recede as
-before; but the inclination of the orbit in the appulse of the moon
-to each succeeding node is less than at the preceding, till the nodes
-come again into the quarters. This will appear as follows. Let A (in
-fig. 104.) represent one of the moon’s nodes placed between the point
-of opposition B and the quarter C. Let the plane A D E pass through
-the earth T, and touch the path of the moon in A. Let the line A F G H
-be the path of the moon in her passage from A to H, where she crosses
-again the plane of the earth’s motion. This line will be convex toward
-the plane A D E, till the moon comes to G, where she is in the quarter;
-and after this, between G and H, the same line will be concave toward
-this plane. All the time this line is convex toward the plane A D
-E, the nodes will recede; and on the contrary proceed, while it is
-concave to that plane. All this will easily be conceived from what has
-been before so largely explained. But the moon is longer in passing
-from A to G, than from G to H; therefore the nodes recede a longer
-time, than they proceed; consequently upon the whole, when the moon is
-arrived at H, the nodes will have receded, that is, the point H will
-fall between B and E. The inclination of the orbit will decrease, till
-the moon is arrived to the point F, in the middle between A and H.
-Through the passage between F and G the inclination will increase, but
-decrease again in the remaining part of the passage from G to H, and
-consequently at H must be less than at A. The like effects, both in
-respect to the nodes and inclination of the orbit, will take place in
-the following passage of the moon on the other side of the plane A B E
-C, from H, till it comes over that plane again in I.
-
-42. THUS the inclination of the orbit is greatest, when the line drawn
-between the moon’s nodes will pass through the sun; and least, when
-this line lies in the quarters, especially if the moon at the same time
-be in conjunction with the sun, or in the opposition. In the first of
-these cases the nodes have no motion, in all others, the nodes will
-each month have receded: and this regressive motion will be greatest,
-when the nodes are in the quarters; for in that case the nodes have
-no progressive motion during the whole month, but in all other cases
-the nodes do at some times proceed forward, viz. whenever the moon is
-between either quarter, and the node which is less distant from that
-quarter than a fourth part of a circle.
-
-43. IT now remains only to explain the irregularities in the moon’s
-motion, which follow from the elliptical figure of the orbit. By
-what has been said at the beginning of this chapter it appears, that
-the power of the earth on the moon acts in the reciprocal duplicate
-proportion of the distance: therefore the moon, if undisturbed by
-the sun, would move round the earth in a true ellipsis, and the line
-drawn from the earth to the moon would pass over equal spaces in equal
-portions of time. That this description of the spaces is altered by
-the sun, has been already declared. It has also been shown, that the
-figure of the orbit is changed each month; that the moon is nearer the
-earth at the new and full, and more remote in the quarters, than it
-would be without the sun. Now we must pass by these monthly changes,
-and consider the effect, which the sun will have in the different
-situations of the axis of the orbit in respect of that luminary.
-
-44. THE action of the sun varies the force, wherewith the moon is drawn
-toward the earth; in the quarters the force of the earth is directly
-increased by the sun; at the new and full the same is diminished; and
-in the intermediate places the influence of the earth is sometimes
-aided, and sometimes lessened by the sun. In these intermediate
-places between the quarters and the conjunction or opposition, the
-sun’s action is so oblique to the action of the earth on the moon, as
-to produce that alternate acceleration and retardment of the moon’s
-motion, which I observed above to be stiled the variation. But besides
-this effect, the power, by which the earth attracts the moon toward
-itself, will not be at full liberty to act with the same force, as if
-the sun acted not at all on the moon. And this effect of the sun’s
-action, whereby it corroborates or weakens the action of the earth, is
-here only to be considered. And by this influence of the sun it comes
-to pass, that the power, by which the moon is impelled toward the
-earth, is not perfectly in the reciprocal duplicate proportion of the
-distance. Consequently the moon will not describe a perfect ellipsis.
-One particular, wherein the moon’s orbit will differ from an ellipsis,
-consists in the places, where the motion of the moon is perpendicular
-to the line drawn from itself to the earth. In an ellipsis, after the
-moon should have set out in the direction perpendicular to this line
-drawn from itself to the earth, and at its greatest distance from the
-earth, its motion would again become perpendicular to this line drawn
-between itself and the earth, and the moon be at its nearest distance
-from the earth, when it should have performed half its period; after
-performing the other half of its period its motion would again become
-perpendicular to the forementioned line, and the moon return into
-the place whence it set out, and have recovered again its greatest
-distance. But the moon in its real motion, after setting out as before,
-sometimes makes more than half a revolution, before its motion comes
-again to be perpendicular to the line drawn from itself to the earth,
-and the moon is at its nearest distance; and then performs more than
-another half of an intire revolution before its motion can a second
-time recover its perpendicular direction to the line drawn from the
-moon to the earth, and the moon arrive again to its greatest distance
-from the earth. At other times the moon will descend to its nearest
-distance, before it has made half a revolution, and recover again
-its greatest distance, before it has made an intire revolution. The
-place, where the moon is at its greatest distance from the earth, is
-called the moon’s apogeon, and the place of the least distance the
-perigeon. This change of the place, where the moon successively comes
-to its greatest distance from the earth, is called the motion of the
-apogeon. In what manner the sun causes the apogeon to move, I shall now
-endeavour to explain.
-
-45. OUR author shews, that if the moon were attracted toward the
-earth by a composition of two powers, one of which were reciprocally
-in the duplicate proportion of the distance from the earth, and the
-other reciprocally in the triplicate proportion of the same distance;
-then, though the line described by the moon would not be in reality
-an ellipsis, yet the moon’s motion might be perfectly explained by
-an ellipsis, whose axis should be made to move round the earth; this
-motion being in consequence, as astronomers express themselves, that
-is, the same way as the moon itself moves, if the moon be attracted by
-the sum of the two powers; but the axis must move in antecedence, or
-the contrary way, if the moon be acted on by the difference of these
-powers. What is meant by duplicate proportion has been often explained;
-namely, that if three magnitudes, as A, B, and C, are so related, that
-the second B bears the same proportion to the third C, as the first A
-bears to the second B, then the proportion of the first A to the third
-C, is the duplicate of the proportion of the first A to the second B.
-Now if a fourth magnitude, as D, be assumed, to which C shall bear the
-same proportion as A bears to B, and B to C, then the proportion of A
-to D is the triplicate of the proportion of A to B.
-
-46. THE way of representing the moon’s motion in this case is thus. T
-denoting the earth (in fig. 105, 106.) suppose the moon in the point
-A, its apogeon, or greatest distance from the earth, moving in the
-direction A F perpendicular to A B, and acted upon from the earth by
-two such forces as have been named. By that power alone, which is
-reciprocally in the duplicate proportion of the distance, if the moon
-let out from the point A with a proper degree of velocity, the ellipsis
-A M B may be described. But if the moon be acted upon by the sum of
-the forementioned powers, and the velocity of the moon in the point
-A be augmented in a certain proportion[193]; or if that velocity be
-diminished in a certain proportion, and the moon be acted upon by the
-difference of those powers; in both these cases the line A E, which
-shall be described by the moon, is thus to be determined. Let the point
-M be that, into which the moon would have arrived in any given space of
-time, had it moved in the ellipsis A M B. Draw M T, and likewise C T D
-in such sort, that the angle under A T M shall bear the same proportion
-to the angle under A T C, as the velocity, with which the ellipsis A
-M B must have been described, bears to the difference between this
-velocity, and the velocity, with which the moon must set out from the
-point A in order to describe the path A E. Let the angle A T C be taken
-toward the moon (as in fig. 105.) if the moon be attracted by the sum
-of the powers; but the contrary way (as in fig. 106.) if by their
-difference. Then let the line A B be moved into the position C D, and
-the ellipsis A M B into the situation C N D, so that the point M be
-translated to L: then the point L shall fall upon the path of the moon
-A E.
-
-47. THE angular motion of the line A T, wereby it is removed into the
-situation C T, represents the motion of the apogeon; by the means of
-which the motion of the moon might be fully explicated by the ellipsis
-A M B, if the action of the sun upon it was directed to the center
-of the earth, and reciprocally in the triplicate proportion of the
-moon’s distance from it. But that not being so, the apogeon will not
-move in the regular manner now described. However, it is to be observed
-here, that in the first of the two preceding cases, where the apogeon
-moves forward, the whole centripetal power increases faster, with the
-decrease of distance, than if the intire power were reciprocally in
-the duplicate proportion of the distance; because one part only is in
-that proportion, and the other part, which is added to this to make up
-the whole power, increases faster with the decrease of distance. On
-the other hand, when the centripetal power is the difference between
-these two, it increases less with the decrease of the distance, than
-if it were simply in the reciprocal duplicate proportion of the
-distance. Therefore if we chuse to explain the moon’s motion by an
-ellipsis (as is most convenient for astronomical uses to be done, and
-by reason of the small effect of the sun’s power, the doing so will
-not be attended with any sensible error;) we may collect in general,
-that when the power, by which the moon is attracted to the earth, by
-varying the distance, increases in a greater than in the duplicate
-proportion of the distance diminished, a motion in consequence must
-be ascribed to the apogeon; but that when the attraction increases
-in a less proportion than that named, the apogeon must have given
-to it a motion in antecedence[194]. It is then observed by Sir IS.
-NEWTON, that the first of these cases obtains, when the moon is in the
-conjunction and opposition; and the latter, when the moon is in the
-quarters: so that in the first the apogeon moves according to the order
-of the signs; in the other, the contrary way[195]. But, as was said
-before, the disturbance given to the action of the earth by the sun
-in the conjunction and opposition being near twice as great as in the
-quarters[196], the apogeon will advance with a greater velocity than
-recede, and in the compass of a whole revolution of the moon will be
-carried in consequence[197].
-
-48. IT is shewn in the next place by our author, that when the line A B
-coincides with that, which joins the earth and the sun, the progressive
-motion of the apogeon, when the moon is in the conjunction or
-opposition, exceeds the regressive in the quadratures more than in any
-other situation of the line A B[198]. On the contrary, when the line
-A B makes right angles with that, which joins the earth and sun, the
-retrograde motion will be more considerable[199], nay is found so great
-as to exceed the progressive; so that in this case the apogeon in the
-compass of an intire revolution of the moon is carried in antecedence.
-Yet from the considerations in the last paragraph the progressive
-motion exceeds the other; so that in the whole the mean motion of the
-apogeon is in consequence, according as astronomers find. Moreover, the
-line A B changes its situation with that, which joins the earth and
-sun, by such slow degrees, that the inequalities in the motion of the
-apogeon arising from this last consideration, are much greater than
-what arises from the other[200].
-
-49. FARTHER, this unsteady motion in the apogeon is attended with
-another inequality in the motion of the moon, that it cannot be
-explained at all times by the same ellipsis. The ellipsis in general
-is called by astronomers an eccentric orbit. The point, in which the
-two axis’s cross, is called the center of the figure; because all
-lines drawn through this point within the ellipsis, from side to side,
-are divided in the middle by this point. But the center, about which
-the heavenly bodies revolve, lying out of this center of the figure
-in one focus, these orbits are said to be eccentric; and where the
-distance of the focus from this center bears the greatest proportion
-to the whole axis, that orbit is called the most eccentric: and in
-such an orbit the distance from the focus to the remoter extremity of
-the axis bears the greatest proportion to the distance of the nearer
-extremity. Now whenever the apogeon of the moon moves in consequence,
-the moon’s motion must be referred to an orbit more eccentric, than
-what the moon would describe, if the whole power, by which the moon
-was acted on in its passing from the apogeon, changed according to the
-reciprocal duplicate proportion of the distance from the earth, and by
-that means the moon did describe an immoveable ellipsis; and when the
-apogeon moves in antecedence, the moon’s motion must be referred to an
-orbit less eccentric. In the first of the two figures last referred
-to, the true place of the moon L falls without the orbit A M B, to
-which its motion is referred: whence the orbit A L E, truly described
-by the moon, is less incurvated in the point A, than is the orbit A M
-B; therefore the orbit A M B is more oblong, and differs farther from
-a circle, than the ellipsis would, whose curvature in A were equal to
-that of the line A L B, that is, the proportion of the distance of the
-earth T from the center of the ellipsis to its axis will be greater in
-the ellipsis A M B, than in the other; but that other is the ellipsis,
-which the moon would describe, if the power acting upon it in the point
-A were altered in the reciprocal duplicate proportion of the distance.
-In the second figure, when the apogeon recedes, the place of the moon
-L falls within the orbit A M B, and therefore that orbit is less
-eccentric, than the immoveable orbit which the moon should describe.
-The truth of this is evident; for, when the apogeon moves forward, the
-power, by which the moon is influenced in its descent from the apogeon,
-increases faster with the decrease of distance, than in the duplicate
-proportion of the distance; and consequently the moon being drawn more
-forcibly toward the earth, it will descend nearer to it. On the other
-hand, when the apogeon recedes, the power acting on the moon increases
-with the decrease of distance in less than the duplicate proportion of
-the distance; and therefore the moon is less impelled toward the earth,
-and will not descend so low.
-
-50. NOW suppose in the first of these figures, that the apogeon A is
-in the situation, where it is approaching toward the conjunction or
-opposition of the sun. In this case the progressive motion of the
-apogeon is more and more accelerated. Here suppose that the moon, after
-having descended from A through the orbit A E as far as F, where it
-is come to its nearest distance from the earth, ascends again up the
-line F G. Because the motion of the apogeon is here continually more
-and more accelerating, the cause of its motion is constantly upon the
-increase; that is, the power, whereby the moon is drawn to the earth,
-will decrease with the increase of distance, in the moon’s ascent
-from F, in a greater proportion than that wherewith it increased with
-the decrease of distance in the moon’s descent to F. Consequently
-the moon will ascend higher than to the distance A T, from whence it
-descended; therefore the proportion of the greatest distance of the
-moon to the least is increased. And when the moon descends again, the
-power will yet more increase with the decrease of distance, than in the
-last ascent it decreased with the augmentation of distance; the moon
-therefore must descend nearer to the earth than it did before, and the
-proportion of the greatest distance to the least yet be more increased.
-Thus as long as the apogeon is advancing toward the conjunction or
-opposition, the proportion of the greatest distance of the moon from
-the earth to the least will continually increase; and the elliptical
-orbit, to which the moon’s motion is referred, will be rendered more
-and more eccentric.
-
-51. AS soon as the apogeon is passed the conjunction with the sun or
-the opposition, the progressive motion thereof abates, and with it
-the proportion of the greatest distance of the moon from the earth to
-the least distance will also diminish; and when the apogeon becomes
-regressive, the diminution of this proportion will be still farther
-continued on, till the apogeon comes into the quarter; from thence this
-proportion, and the eccentricity of the orbit will increase again.
-Thus the orbit of the moon is most eccentric, when the apogeon is in
-conjunction with the sun, or in opposition to it, and least of all when
-the apogeon is in the quarters.
-
-52. THESE changes in the nodes, in the inclination of the orbit to the
-plane of the earth’s motion, in the apogeon, and in the eccentricity,
-are varied like the other inequalities in the motion of the moon, by
-the different distance of the earth from the sun; being greatest, when
-their cause is greatest, that is, when the earth is nearest to the sun.
-
-53. I SAID at the beginning of this chapter, that Sir ISAAC NEWTON
-has computed the very quantity of many of the moon’s inequalities.
-That acceleration of the moon’s motion, which is called the variation,
-when greatest, removes the moon out of the place, in which it would
-otherwise be found, something more than half a degree[201]. In the
-phrase of astronomers, a degree is 1/360 part of the whole circuit of
-the moon or any planet. If the moon, without disturbance from the sun,
-would have described a circle concentrical to the earth, the sun will
-cause the moon to approach nearer to the earth in the conjunction and
-opposition, than in the quarters, nearly in the proportion of 69 to
-70[202]. We had occasion to mention above, that the nodes perform their
-period in almost 19 years. This the astronomers found by observation;
-and our author’s computations assign to them the same period[203].
-The inclination of the moon’s orbit when least, is an angle about
-1/18 part of that angle, which constitutes a perpendicular; and the
-difference between the greatest and least inclination of the orbit is
-determined by our author’s computation to be about 1/18 of the least
-inclination[204]. And this also is agreeable to the observations
-of astronomers. The motion of the apogeon, and the changes in the
-eccentricity, Sir ~ISAAC NEWTON~ has not computed. The apogeon performs
-its revolution in about eight years and ten months. When the moon’s
-orbit is most eccentric, the greatest distance of the moon from the
-earth bears to the least distance nearly the proportion of 8 to 7; when
-the orbit is least eccentric, this proportion is hardly so great as
-that of 12 to 11.
-
-54. SIR ~ISAAC NEWTON~ shews farther, how, by comparing the
-periods of the motion of the satellites, which revolve round Jupiter
-and Saturn, with the period of our moon round the earth, and the
-periods of those planets round the sun with the period of our earth’s
-motion, the inequalities in the motion of those satellites may be
-derived from the inequalities in the moon’s motion; excepting only in
-regard to that motion of the axis of the orbit, which in the moon makes
-the motion of the apogeon; for the orbits of those satellites, as far
-as can be discerned by us at this distance, appearing little or nothing
-eccentric, this motion, as deduced from the moon, must be diminished.
-
-
-
-
-~CHAP. IV.~
-
-Of ~Comets~.
-
-
-IN the former of the two preceding chapters the powers have been
-explained, which keep in motion those celestial bodies, whose courses
-had been well determined by the astronomers. In the last chapter we
-have shewn, how those powers have been applied by our author to the
-making a more perfect discovery of the motion of those bodies, the
-courses of which were but imperfectly understood; for some of the
-inequalities, which we have been describing in the moon’s motion,
-were unknown to the astronomers. In this chapter we are to treat of
-a third species of the heavenly bodies, the true motion of which was
-not at all apprehended before our author writ; in so much, that here
-Sir ~ISAAC NEWTON~ has not only explained the causes of the motion of
-these bodies, but has performed also the part of an astronomer, by
-discovering what their motions are.
-
-2. THAT these bodies are not meteors in our air, is manifest; because
-they rise and set in the same manner, as the sun and stars. The
-astronomers had gone so far in their inquiries concerning them, as to
-prove by their observations, that they moved in the etherial spaces far
-beyond the moon; but they had no true notion at all of the path, which
-they described. The most prevailing opinion before our author was,
-that they moved in straight lines; but in what part of the heavens was
-not determined. DESCARTES[205] removed them far beyond the sphere of
-Saturn, as finding the straight motion attributed to them, inconsistent
-with the vortical fluid, by which he explains the motions of the
-planets, as we have above related[206]. But Sir ISAAC NEWTON distinctly
-proves from astronomical observation, that the comets pass through the
-region of the planets, and are mostly invisible at a less distance,
-than that of Jupiter[207].
-
-3. AND from hence finding the comets to be evidently within the sphere
-of the sun’s action, he concludes they must, necessarily move about the
-sun, as the planets do[208]. The planets move in ellipsis’s; but it is
-not necessary that every body, which is influenced by the sun, should
-move in that particular kind of line. However our author proves, that
-the power of the sun being reciprocally in the duplicate proportion of
-the distance, every body acted on by the sun must either fall directly
-down, or move in some conic section; of which lines I have above
-observed, that there are three species, the ellipsis, parabola, and
-hyperbola[209]. If a body, which descends toward the sun as low as the
-orbit of any planet, move with a swifter motion than the planet does,
-that body will describe an orbit of a more oblong figure, than that
-of the planet, and have a longer axis at least. The velocity of the
-body may be so great, that it shall move in a parabola, and having
-once passed about the sun, shall ascend for ever without returning any
-more: but the sun will be placed in the focus of this parabola. With a
-velocity still greater the body will move in an hyperbola. But it is
-most probable, that the comets move in elliptical orbits, though of a
-very oblong, or in the phrase of astronomers, of a very eccentric form,
-such as is represented in fig. 107, where S is the sun, C the comet,
-and A B D E its orbit, wherein the distance of S and D far exceeds that
-of S and A. Whence it is, that they sometimes are found at a moderate
-distance from the sun, and appear within the planetary regions; at
-other times they ascend to vast distances, far beyond the very orbit of
-Saturn, and so become invisible. That the comets do move in this manner
-is proved by our author, from computations built upon the observations,
-which astronomers had made on many comets. These computations were
-performed by Sir ~ISAAC NEWTON~ himself upon the comet, which appeared
-toward the latter end of the year 1680, and at the beginning of the
-year following[210]; but the learned Dr. HALLEY prosecuted the like
-computations more at large in this, and also in many other comets[211].
-Which computations are made upon propositions highly worthy of our
-author’s unparallel’d genius, such as could scarce have been discovered
-by any one not possessed of the utmost force of invention;
-
-4. THOSE computations depend upon this principle, that the eccentricity
-of the orbits of the comets is so great, that if they are really
-elliptical, yet they approach so near to parabolas in that part of
-them, where they come under our view, that they may be taken for such
-without sensible error[212]: as in the preceding figure the parabola
-F A G differs in the lower part of it about A very little from the
-ellipsis D E A B. Upon which ground our great author teaches a method
-of finding by three observations made upon any comet the parabola,
-which nearest agrees with its orbit[213].
-
-5. NOW what confirms this whole theory beyond the least room for
-doubt is, that the places of the comets computed in the orbits, which
-the method here mentioned assigns them, agree to the observations of
-astronomers with the same degree of exactness, as the computations
-of the primary planets places usually do; and this in comets, whose
-motions are very extraordinary[214].
-
-6. OUR author afterwards shews how to make use of any small deviation
-from the parabola, that shall be observed, to determine whether the
-orbits of the comets are elliptical or not, and so to discover if the
-same comet returns at certain periods[215]. And upon examining the
-comet in 1680, by the rule laid down for this purpose, he finds its
-orbit to agree more exactly to an ellipsis than to a parabola, though
-the ellipsis be so very eccentric, that the comet cannot perform its
-period through it in the space of 500 years[216]. Upon this Dr. HALLEY
-observed, that mention is made in history of a comet, with the like
-eminent tail as this, having appeared three several times before; the
-first of which appearances was at the death of JULIUS CESAR, and each
-appearance was at the distance of 575 years from the next preceding.
-He therefore computed the motion of this comet in such an elliptic
-orbit, as would require this number of years for the body to revolve
-through it; and these computations agree yet more perfectly with the
-observations made on this comet, than any parabolical orbit will
-do[217].
-
-7. THE comparing together different appearances of the same comet, is
-the only way to discover certainly the true form of the orbit: for
-it is impossible to determine with exactness the figure of an orbit
-so exceedingly eccentric, from single observations taken in one part
-of it; and therefore Sir ~ISAAC NEWTON~[218] proposes to compare the
-orbits, upon the supposition that they are parabolical, of such comets
-as appear at different times; for if the same orbit be found to be
-described by a comet at different times, in all probability it will
-be the same comet which describes it. And here he remarks from Dr.
-HALLEY, that the same orbit very nearly agrees to two appearances of
-a comet about the space of 75 years distance[219]; so that if those
-two appearances were really of the same comet, the transverse axis of
-the orbit of the comet would be near 18 times the axis of the earth’s
-orbit; and the comet, when at its greatest distance from the sun, will
-be removed not less than 35 times as far as the middle distance of the
-earth.
-
-8. AND this seems to be the shortest period of any of the comets.
-But it will be farther confirmed, if the same comet should return a
-third time after another period of 75 years. However it is not to be
-expected, that comets should preserve the same regularity in their
-periods, as the planets; because the great eccentricity of their orbits
-makes them liable to suffer very considerable alterations from the
-action of the planets, and other comets, upon them.
-
-9. IT is therefore to prevent too great disturbances in their motions
-from these causes, as our author observes, that while the planets
-revolve all of them nearly in the same plane, the comets are disposed
-in very different ones; and distributed over all parts of the heavens;
-that, when in their greatest distance from the sun, and moving slowest,
-they might be removed as far as possible out of the reach of each
-other’s action[220]. The same end is likewise farther answered in those
-comets, which by moving slowest in the aphelion, or remotest distance
-from the sun, descend nearest to it, by placing the aphelion of these
-at the greatest height from the sun[221].
-
-10. OUR philosopher being led by his principles to explain the motions
-of the comets, in the manner now related, takes occasion from thence to
-give us his thoughts upon their nature and use. For which end he proves
-in the first place, that they must necessarily be solid and compact
-bodies, and by no means any sort of vapour or light substance exhaled
-from the planets or stars: because at the near distance, to which some
-comets approach the sun, it could not be, but the immense heat, to
-which they are exposed, should instantaneously disperse and scatter any
-such light volatile substance[222]. In particular the forementioned
-comet of 1680 descended so near the sun, as to come within a sixth
-part of the sun’s diameter from the surface of it. In which situation
-it must have been exposed, as appears by computation, to a degree of
-heat exceeding the heat of the sun upon our earth no less than 28000
-times; and therefore might have contracted a degree of heat 2000 times
-greater, than that of red hot iron[223]. Now a substance, which could
-endure so intense a heat, without being dispersed in vapor, must needs
-be firm and solid.
-
-11. IT is shewn likewise, that the comets are opake substances, shining
-by a reflected light, borrowed from the sun[224]. This is proved from
-the observation, that comets, though they are approaching the earth,
-yet diminish in lustre, if at the same time they recede from the sun;
-and on the contrary, are found to encrease daily in brightness, when
-they advance towards the sun, though at the same time they move from
-the earth[225].
-
-12. THE comets therefore in these respects resemble the planets; that
-both are durable opake bodies, and both revolve about the sun in conic
-sections. But farther the comets, like our earth, are surrounded by
-an atmosphere. The air we breath is called the earth’s atmosphere;
-and it is most probable, that all the other planets are invested with
-the like fluid. Indeed here a difference is found between the planets
-and comets. The atmospheres of the planets are of so fine and subtile
-a substance, as hardly to be discerned at any distance, by reason of
-the small quantity of light which they reflect, except only in the
-planet Mars. In him there is some little appearance of such a substance
-surrounding him, as stars which have been covered by him are said to
-look somewhat dim a small space before his body comes under them, as if
-their light, when he is near, were obstructed by his atmosphere. But
-the atmospheres which surround the comets are so gross and thick, as to
-reflect light very copiously. They are also much greater in proportion
-to the body they surround, than those of the planets, if we may judge
-of the rest from our air; for it has been observed of comets, that the
-bright light appearing in the middle of them, which is reflected from
-the solid body, is scarce a ninth or tenth part of the whole comet,
-
-13. I SPEAK only of the heads of the comets, the most lucid part of
-which is surrounded by a fainter light, the most lucid part being
-usually not above a ninth or tenth part of the whole in breadth[226].
-Their tails are an appearance very peculiar, nothing of the same
-nature appertaining in the least degree to any other of the celestial
-bodies. Of that appearance there are several opinions; our author
-reduces them to three[227]. The two first, which he proposes, are
-rejected by him; but the third he approves. The first is, that they
-arise from a beam of light transmitted through the head of the comet,
-in like manner as a stream of light is discerned, when the sun shines
-into a darkened room through a small hole. This opinion, as Sir ~ISAAC
-NEWTON~ observes, implies the authors of it wholly unskilled in the
-principles of optics; for that stream of light, seen in a darkened
-room, arises from the reflection of the sun beams by the dust and motes
-floating in the air: for the rays of light themselves are not seen,
-but by their being reflected to the eye from some substance, upon
-which they fall[228]. The next opinion examined by our author is that
-of the celebrated DESCARTES, who imagins these tails to be the light
-of the comet refracted in its passage to us, and thence affording an
-oblong representation; as the light of the sun does, when refracted
-by the prism in that noted experiment, which will have a great share
-in the third book of this discourse[229]. But this opinion is at once
-overturned from this consideration only, that the planets could be
-no more free from this refraction than the comets; nay ought to have
-larger or brighter tails, than they, because the light of the planets
-is strongest. However our author has thought proper to add some farther
-objections against this opinion: for instance, that these tails are not
-variegated with colours, as is the image produced by the prism, and
-which is inseparable from that unequal refraction, which produces that
-disproportioned length of the image. And besides, when the light in
-its passage from different comets to the earth describes the same path
-through the heavens, the refraction of it should of necessity be in all
-respects the same. But this is contrary to observation; for the comet
-in 1680, the 28th day of December, and a former comet in the year 1577,
-the 29th day of December, appear’d in the same place of the heavens,
-that is, were seen adjacent to the same fixed stars, the earth likewise
-being in the same place at both times; yet the tail of the latter comet
-deviated from the opposition to the sun a little to the northward, and
-the tail of the former comet declined from the opposition of the sun
-five times as much southward[230].
-
-14. THERE are some other false opinions, though less regarded than
-these, which have been advanced upon this argument. These our
-excellent author passes over, hastening to explain, what he takes to
-be the true cause of this appearance. He thinks it is certainly owing
-to steams and vapours exhaled from the body, and gross atmosphere of
-the comets, by the heat of the sun; because all the appearances agree
-perfectly to this sentiment. The tails are but small, while the comet
-is descending to the sun, but enlarge themselves to an immense degree,
-as soon as ever the comet has passed its perihelion; which shews the
-tail to depend upon the degree of heat, which the comet receives from
-the sun. And that the intense heat to which comets, when nearest the
-sun, are exposed, should exhale from them a very copious vapour, is a
-most reasonable supposition; especially if we consider, that in those
-free and empty regions steams will more easily ascend, than here upon
-the surface of the earth, where they are suppressed and hindered from
-rising by the weight of the incumbent air: as we find by experiments
-made in vessels exhausted of the air, where upon removal of the air
-several substances will fume and discharge steams plentifully, which
-emit none in the open air. The tails of comets, like such a vapour,
-are always in the plane of the comet’s orbit, and opposite to the
-sun, except that the upper part thereof inclines towards the parts,
-which the comet has left by its motion; resembling perfectly the smoak
-of a burning coal, which, if the coal remain fixed, ascends from it
-perpendicularly; but, if the coal be in motion, ascends obliquely,
-inclining from the motion of the coal. And besides, the tails of
-comets may be compared to this smoak in another respect, that both
-of them are denser and more compact on the convex side, than on the
-concave. The different appearance of the head of the comet, after it
-has past its perihelion, from what it had before, confirms greatly this
-opinion of their tails: for smoke raised by a strong heat is blacker
-and grosser, than when raised by a less; and accordingly the heads of
-comets, at the same distance from the sun, are observed less bright and
-shining after the perihelion, than before, as if obscured by such a
-gross smoke.
-
-15. THE observations of HEVELIUS upon the atmospheres of comets still
-farther illustrate the same; who relates, that the atmospheres,
-especially that part of them next the sun, are remarkably contracted
-when near the sun, and dilated again afterwards.
-
-16. TO give a more full idea of these tails, a rule is laid down by
-our author, whereby to determine at any time, when the vapour in the
-extremity of the tail first rose from the head of the comet. By this
-rule it is found, that the tail does not consist of a fleeting vapour,
-dissipated soon after it is raised, but is of long continuance; that
-almost all the vapour, which rose about the time of the perihelion from
-the comet of 1680, continued to accompany it, ascending by degrees,
-being succeeded constantly by fresh matter, which rendered the tail
-contiguous to the comet. From this computation the tails are found to
-participate of another property of ascending vapours, that, when they
-ascend with the greatest velocity, they are least incurvated.
-
-17. THE only objection that can be made against this opinion is the
-difficulty of explaining, how a sufficient quantity of vapour can
-be raised from the atmosphere of a comet to fill those vast spaces,
-through which their tails are sometimes extended. This our author
-removes by the following computation: our air being an elastic fluid,
-as has been said before[231], is more dense here near the surface of
-the earth, where it is pressed upon by the whole air above; than it is
-at a distance from the earth, where it has a less weight incumbent. I
-have observed, that the density of the air is reciprocally proportional
-to the compressing weight. From hence our author computes to what
-degree of rarity the air must be expanded, according to this rule, at
-an height equal to a semidiameter of the earth: and he finds, that
-a globe of such air, as we breath here on the surface of the earth,
-which shall be one inch only in diameter, if it were expanded to the
-degree of rarity, which the air must have at the height now mentioned,
-would fill all the planetary regions even to the very sphere of Saturn,
-and far beyond. Now since the air at a greater height will be still
-immensly more rarified, and the surface of the atmospheres of comets is
-usually about ten times the distance from the center of the comet, as
-the surface of the comet it self, and the tails are yet vastly farther
-removed from the center of the comet; the vapour, which composes those
-tails, may very well be allowed to be so expanded, as that a moderate
-quantity of matter may fill all that space, they are seen to take up.
-Though indeed the atmospheres of comets being very gross, they will
-hardly be rarified in their tails to so great a degree, as our air
-under the same circumstances; especially since they may be something
-condensed, as well by their gravitation to the sun, as that the parts
-will gravitate to one another; which will hereafter be shewn to be the
-universal property of all matter[232]. The only scruple left is, how so
-much light can be reflected from a vapour so rare, as this computation
-implies. For the removal of which our author observes, that the most
-refulgent of these tails hardly appear brighter, than a beam of the
-sun’s light transmitted into a darkened room through a hole of a single
-inch diameter; and that the smallest fixed stars are visible through
-them without any sensible diminution of their lustre.
-
-18. ALL these considerations put it beyond doubt, what is the true
-nature of the tails of comets. There has indeed nothing been said,
-which will account for the irregular figures, in which those tails
-are sometimes reported to have appeared; but since none of those
-appearances have ever been recorded by astronomers, who on the contrary
-ascribe the same likeness to the tails of all comets, our author
-with great judgment refers all those to accidental refractions by
-intervening clouds, or to parts of the milky way contiguous to the
-comets[233].
-
-19. THE discussion of this appearance in comets has led Sir ~ISAAC
-NEWTON~ into some speculations relating to their use, which I cannot
-but extreamly admire, as representing in the strongest light
-imaginable the extensive providence of the great author of nature,
-who, besides the furnishing this globe of earth, and without doubt
-the rest of the planets, so abundantly with every thing necessary
-for the support and continuance of the numerous races of plants and
-animals, they are stocked with, has over and above provided a numerous
-train of comets, far exceeding the number of the planets, to rectify
-continually, and restore their gradual decay, which is our author’s
-opinion concerning them[234]. For since the comets are subject to such
-unequal degrees of heat, being sometimes burnt with the most intense
-degree of it, at other times scarce receiving any sensible influence
-from the sun; it can hardly be supposed, they are designed for any
-such constant use, as the planets. Now the tails, which they emit,
-like all other kinds of vapour, dilate themselves as they ascend, and
-by consequence are gradually dispersed and scattered through all the
-planetary regions, and thence cannot but be gathered up by the planets,
-as they pass through their orbs: for the planets having a power to
-cause all bodies to gravitate towards them, as will in the sequel of
-this discourse be shewn[235]; these vapours will be drawn in process of
-time into this or the other planet, which happens to act strongest upon
-them. And by entering the atmospheres of the earth and other planets,
-they may well be supposed to contribute to the renovation of the face
-of things, in particular to supply the diminution caused in the humid
-parts by vegetation and putrefaction. For vegetables are nourished by
-moisture, and by putrefaction are turned in great part into dry earth;
-and an earthy substance always subsides in fermenting liquors; by which
-means the dry parts of the planets must continually increase, and the
-fluids diminish, nay in a sufficient length of time be exhausted, if
-not supplied by some such means. It is farther our great author’s
-opinion, that the most subtile and active parts of our air, upon which
-the life of things chiefly depends, is derived to us, and supplied
-by the comets. So far are they from portending any hurt or mischief
-to us, which the natural fears of men are so apt to suggest from the
-appearance of any thing uncommon and astonishing.
-
-20. THAT the tails of comets have some such important use seems
-reasonable, if we consider, that those bodies do not send out those
-fumes merely by their near approach to the sun; but are framed of a
-texture, which disposes them in a particular manner to fume in that
-sort: for the earth, without emitting any such steam, is more than half
-the year at a less distance from the sun, than the comet of 1664 and
-1665 approached it, when nearest; likewise the comets of 1682 and 1683
-never approached the sun much above a seventh part nearer than Venus,
-and were more than half as far again from the sun as Mercury; yet all
-these emitted tails.
-
-21. FROM the very near approach of the comet of 1680 our author draws
-another speculation; for if the sun have an atmosphere about it, the
-comet mentioned seems to have descended near enough to the sun to
-enter within it. If so, it must have been something retarded by the
-resistance it would meet with, and consequently in its next descent to
-the sun will fall nearer than now; by which means it will meet with a
-greater resistance, and be again more retarded. The event of which must
-be, that at length it will impinge upon the sun’s surface, and thereby
-supply any decrease, which may have happened by so long an emission of
-light, or otherwise. And something like this our author conjectures
-may be the case of those fixed stars which by an additional increase
-of their lustre have for a certain time become visible to us, though
-usually they are out of sight. There is indeed a kind of fixed stars,
-which appear and disappear at regular and equal intervals: here some
-more steady cause must be sought for; perhaps these stars turn round
-their own axis’s, as our sun does[236], and have some part of their
-body more luminous than the other, whereby they are seen, when the most
-lucid part is next to us, and when the darker part is turned toward us,
-they vanish out of sight.
-
-
-22. WHETHER the sun does really diminish, as has been here suggested,
-is difficult to prove; yet that it either does so, or that the earth
-increases, if not both, is rendered probable from Dr. HALLEY’s
-observation[237], that by comparing the proportion, which the
-periodical time of the moon bore to that of the sun in former times,
-with the proportion between them at present, the moon is found to be
-something accelerated in respect of the sun. But if the sun diminish,
-the periods of the primary planets will be lengthened; and if the earth
-be encreased, the period of the moon will be shortened: as will appear
-by the next chapter, wherein it shall be shewn, that the power of the
-sun and earth is the result of the same power being lodg’d in all their
-parts, and that this principle of producing gravitation in other bodies
-is proportional to the solid matter in each body.
-
-
-
-
-~CHAP~. V.
-
-Of the BODIES of the SUN and PLANETS.
-
-
-OUR author, after having discovered that the celestial motions are
-performed by a force extended from the sun and primary planets, follows
-this power into the deepest recesses of those bodies themselves, and
-proves the same to accompany the smallest particle, of which they are
-composed.
-
-
-2. PREPARATIVE hereto he shews first, that each of the heavenly bodies
-attracts the rest, and all bodies, with such different degrees of
-force, as that the force of the same attracting body is exerted on
-others exactly in proportion to the quantity of matter in the body
-attracted[238].
-
-3. OF this the first proof he brings is from experiments made here
-upon the earth. The power by which the moon is influenced was above
-shewn to be the same, with that power here on the surface of the earth,
-which we call gravity[239]. Now one of the effects of the principle
-of gravity is, that all bodies descend by this force from the same
-height in equal times. Which has been long taken notice of; particular
-methods having been invented to shew that the only cause, why some
-bodies were observed to fall from the same height sooner than others,
-was the resistance of the air. This we have above related[240]; and
-proved from hence, that since bodies resist to any change of their
-state from rest to motion, or from motion to rest, in proportion to the
-quantity of matter contained in them; the power that can move different
-quantities of matter equally, must be proportional to the quantity. The
-only objection here is, that it can hardly be made certain, whether
-this proportion in the effect of gravity on different bodies holds
-perfectly exact or not from these experiments; by reason that the
-great swiftness, with which bodies fall, prevents our being able to
-determine the times of their descent with all the exactness requisite.
-Therefore to remedy this inconvenience, our author substitutes another
-more certain experiment in the room of these made upon falling bodies.
-Pendulums are caused to vibrate by the same principle, as makes
-bodies descend; the power of gravity putting them in motion, as well
-as the other. But if the ball of any pendulum, of the same length with
-another, were more or less attracted in proportion to the quantity of
-solid matter in the ball, that pendulum must accordingly move faster or
-slower than the other. Now the vibrations of pendulums continue for a
-great length of time, and the number of vibrations they make may easily
-be determined without suspicion of error; so that this experiment may
-be extended to what exactness one pleases: and our author assures us,
-that he examined in this way several substances, as gold, silver, lead,
-glass, sand, common salt, wood, water, and wheat; in all which he found
-not the least deviation from the proportion mentioned, though he made
-the experiment in such a manner, that in bodies of the same weight a
-difference in the quantity of their matter less than a thousandth part
-of the whole would have discovered it self[241]. It appears therefore,
-that all bodies are made to descend by the power of gravity here, near
-the surface of the earth, with the same degree of swiftness. We have
-above observed this descent to be after the rate of 16⅛ feet in the
-first second of time from the beginning of their fall. Moreover it
-was also observed, that if any body, which fell here at the surface
-of the earth after this rate, were to be conveyed up to the height of
-the moon, it would descend from thence just with the same degree of
-velocity, as that with which the moon is attracted toward the earth;
-and therefore the power of the earth upon the moon bears the same
-proportion to the power it would have upon those bodies at the same
-distance, as the quantity of matter in the moon bears to the quantity
-in those bodies.
-
-4. THUS the assertion laid down is proved in the earth, that the power
-of the earth on every body it attracts is, at the same distance from
-the earth, proportional to the quantity of solid matter in the body
-acted on. As to the sun, it has been shewn, that the power of the sun’s
-action upon the same primary planet is reciprocally in the duplicate
-proportion of the distance; and that the power of the sun decreases
-throughout in the same proportion, the motion of comets traversing the
-whole planetary region testifies. This proves, that if any planet were
-removed from the sun to any other distance whatever, the degree of
-its acceleration toward the sun would yet remain reciprocally in the
-duplicate proportion of its distance. But it has likewise been shewn,
-that the degree of acceleration, which the sun gives to every one of
-the planets, is reciprocally in the duplicate proportion of their
-respective distances. All which compared together puts it out of doubt,
-that the power of the sun upon any planet, removed into the place of
-any ether, would give it the same velocity of descent, as it gives that
-other; and consequently, that the sun’s action upon different planets
-at the same distance would be proportional to the quantity of matter
-in each. It has farther been shewn, that the sun attracts the primary
-planets, and their respective secondary, when at the same distance, so
-as to communicate to both the same degree of velocity; and therefore
-the force, wherewith the sun acts on the secondary planet, bears
-the same proportion to the force, wherewith at the same distance it
-attracts the primary, as the quantity of solid matter in the secondary
-planet bears to the quantity of matter in the primary.
-
-5. THIS property therefore is proved of both kinds of planets, in
-respect of the sun. Therefore the sun possesses the quality found in
-the earth, of acting on bodies with a degree of force proportional to
-the quantity of matter in the body, which receives the influence.
-
-6. THAT the power of attraction, with which the other planets are
-endued, should differ from that of the earth, can hardly be supposed,
-if we consider the similitude between those bodies; and that it does
-not in this respect, is farther proved from the satellites of Saturn
-and Jupiter, which are attracted by their respective primary according
-to the same law, that is, in the same proportion to their distances, as
-the primary are attracted by the sun: so that what has been concluded
-of the sun in relation to the primary planets, may be justly concluded
-of these primary in respect of their secondary, and in consequence
-of that, in regard likewise to all other bodies, viz. that they will
-attract every body in proportion to the quantity of solid matter it
-contains.
-
-7. HENCE it follows, that this attraction extends itself to every
-particle of matter in the attracted body: and that no portion of matter
-whatever is exempted from the influence of those bodies, to which we
-have proved this attractive power to belong.
-
-8. BEFORE we proceed farther, we may here remark, that this attractive
-power both of the sun and planets now appears to be quite of the same
-nature in all; for it acts in each in the same proportion to the
-distance, and in the same manner acts alike upon every particle of
-matter. This power therefore in the sun and other planets is not of a
-different nature from this power in the earth; which has been already
-shewn to be the same with that, which we call gravity[242].
-
-9. AND this lays open the way to prove, that the attracting power
-lodged in the sun and planets, belongs likewise to every part of them:
-and that their respective powers upon the same body are proportional to
-the quantity of matter, of which they are composed; for instance, that
-the force with which the earth attracts the moon, is to the force, with
-which the sun would attract it at the same distance, as the quantity of
-solid matter contained in the earth, to the quantity contained in the
-sun[243].
-
-10. THE first of these assertions is a very evident consequence from
-the latter. And before we proceed to the proof, it must first be
-shewn, that the third law of motion, which makes action and reaction
-equal, holds in these attractive powers. The most remarkable attractive
-force, next to the power of gravity, is that, by which the loadstone
-attracts iron. Now if a loadstone were laid upon water, and supported
-by some proper substance, as wood or cork, so that it might swim;
-and if a piece of iron were caused to swim upon the water in like
-manner: as soon as the loadstone begins to attract the iron, the iron
-shall move toward the stone, and the stone shall also move toward
-the iron; when they meet, they shall stop each other, and remain
-fixed together without any motion. This shews, that the velocities,
-wherewith they meet, are reciprocally proportional to the quantities
-of solid matter in each; and that by the stone’s attracting the iron,
-the stone itself receives as much motion, in the strict philosophic
-sense of that word[244], as it communicates to the iron: for it has
-been declared above to be an effect of the percussion of two bodies,
-that if they meet with velocities reciprocally proportional to the
-respective bodies, they shall be stopped by the concourse, unless their
-elasticity put them into fresh motion; but if they meet with any other
-velocities, they shall retain some motion after meeting[245]. Amber,
-glass, sealing-wax, and many other substances acquire by rubbing a
-power, which from its having been remarkable, particularly in amber,
-is called electrical. By this power they will for some time after
-rubbing attract light bodies, that shall be brought within the sphere
-of their activity. On the other hand Mr. BOYLE found, that if a piece
-of amber be hung in a perpendicular position by a string, it shall be
-drawn itself toward the body whereon it was rubbed, if that body be
-brought near it. Both in the loadstone and in electrical bodies we
-usually ascribe the power to the particular body, whose presence we
-find necessary for producing the effect. The loadstone and any piece of
-iron will draw each other, but in two pieces of iron no such effect is
-ordinarily observed; therefore we call this attractive power the power
-of the loadstone: though near a loadstone two pieces of iron will also
-draw each other. In like manner the rubbing of amber, glass, or any
-such body, till it is grown warm, being necessary to cause any action
-between those bodies and other substances, we ascribe the electrical
-power to those bodies. But in all these cases if we would speak more
-correctly, and not extend the sense of our expressions beyond what
-we see; we can only say that the neighbourhood of a loadstone and a
-piece of iron is attended with a power, whereby the loadstone and
-the iron are drawn toward each other; and the rubbing of electrical
-bodies gives rise to a power, whereby those bodies and other substances
-are mutually attracted. Thus we must also understand in the power of
-gravity, that the two bodies are mutually made to approach by the
-action of that power. When the sun draws any planet, that planet also
-draws the sun; and the motion, which the planet receives from the
-sun, bears the same proportion to the motion, which the sun it self
-receives, as the quantity of solid matter in the sun bears to the
-quantity of solid matter in the planet. Hitherto, for brevity sake
-in speaking of these forces, we have generally ascribed them to the
-body, which is least moved; as when we called the power, which exerts
-itself between the sun and any planet, the attractive power of the sun;
-but to speak more correctly, we should rather call this power in any
-case the force, which acts between the sun and earth, between the sun
-and Jupiter, between the earth and moon, &c. for both the bodies are
-moved by the power acting between them, in the same manner, as when
-two bodies are tied together by a rope, if that rope shrink by being
-wet, or otherwise, and thereby cause the bodies to approach, by drawing
-both, it will communicate to both the same degree of motion, and cause
-them to approach with velocities reciprocally proportional to the
-respective bodies. From this mutual action between the sun and planet
-it follows, as has been observed above[246], that the sun and planet do
-each move about their common center of gravity. Let A (in fig. 108.)
-represent the sun, B a planet, C their common center of gravity. If
-these bodies were once at rest, by their mutual attraction they would
-directly approach each other with such velocities, that their common
-center of gravity would remain at rest, and the two bodies would at
-length meet in that point. If the planet B were to receive an impulse,
-as in the direction of the line D E, this would prevent the two bodies
-from falling together; but their common center of gravity would be
-put into motion in the direction of the line C F equidistant from B E.
-In this case Sir ~ISAAC NEWTON~ proves[247], that the sun and planet
-would describe round their common center of gravity similar orbits,
-while that center would proceed with an uniform motion in the line C
-F; and so the system of the two bodies would move on with the center
-of gravity without end. In order to keep the system in the same place,
-it is necessary, that when the planet received its impulse in the
-direction B E, the sun should also receive such an impulse the contrary
-way, as might keep the center of gravity C without motion; for if these
-began once to move without giving any motion to their common center of
-gravity, that center would always remain fixed.
-
-11. BY this may be understood in what manner the action between the sun
-and planets is mutual. But farther, we have shewn above[248], that the
-power, which acts between the sun and primary planets, is altogether of
-the same nature with that, which acts between the earth and the bodies
-at its surface, or between the earth and its parts, and with that which
-acts between the primary planets and their secondary; therefore all
-these actions must be ascribed to the same cause[249]. Again, it has
-been already proved, that in different planets the force of the sun’s
-action upon each at the same distance would be proportional to the
-quantity of solid matter in the planet[250]; therefore the reaction
-of each planet on the sun at the same distance, or the motion, which
-the sun would receive from each planet, would also be proportional
-to the quantity of matter in the planet; that is, these planets at
-the same distance would act on the same body with degrees of strength
-proportional to the quantity of solid matter in each.
-
-[Illustration]
-
-12. IN the next place, from what has been now proved, our great author
-has deduced this farther consequence, no less surprizing than elegant;
-that each of the particles, out of which the bodies of the sun and
-planets are framed, exert their power of gravitation by the same law,
-and in the same proportion to the distance, as the great bodies which
-they compose. For this purpose he first demonstrates, that if a globe
-were compounded of particles, which will attract the particles of any
-other body reciprocally in the duplicate proportion of their distances,
-the whole globe will attract the same in the reciprocal duplicate
-proportion of their distances from the center of the globe; provided
-the globe be of uniform density throughout[251]. And from this our
-author deduces the reverse, that if a globe acts upon distant bodies by
-the law just now specified, and the power of the globe is derived from
-its being composed of attractive particles; each of those particles
-will attract after the same proportion[252]. The manner of deducing
-this is not set down at large by our author, but is as follows. The
-globe is supposed to act upon the particles of a body without it
-constantly in the reciprocal duplicate proportion of their distances
-from its center; and therefore at the same distance from the globe, on
-which side soever the body be placed, the globe will act equally upon
-it. Now because, if the particles, of which the globe is composed,
-acted upon those without in the reciprocal duplicate proportion of
-their distances, the whole globe would act upon them in the same manner
-as it does; therefore, if the particles of the globe have not all of
-them that property, some must act stronger than in that proportion,
-while others act weaker: and if this be the condition of the globe,
-it is plain, that when the body attracted is in such a situation
-in respect of the globe, that the greater number of the strongest
-particles are nearest to it, the body will be more forcibly attracted;
-than when by turning the globe about, the greater quantity of weak
-particles should be nearest, though the distance of the body should
-remain the same from the center of the globe. Which is contrary to what
-was at first remarked, that the globe on all sides of it acts with the
-same strength at the same distance. Whence it appears, that no other
-constitution of the globe can agree to it.
-
-13. FROM these propositions it is farther collected, that if all
-the particles of one globe attract all the particles of another in
-the proportion so often mentioned, the attracting globe will act
-upon the other in the same proportion to the distance between the
-center of the globe which attracts, and the center of that which is
-attracted[253]: and farther, that this proportion holds true, though
-either or both the globes be composed of dissimilar parts, some rarer
-and some more dense; provided only, that all the parts in the same
-globe equally distant from the center be homogeneous[254]. And also,
-if both the globes attract each other[255]. All which place it beyond
-contradiction, that this proportion obtains with as much exactness
-near and contiguous to the surface of attracting globes, as at greater
-distances from them.
-
-14. THUS our author, without the pompous pretence of explaining the
-cause of gravity, has made one very important step toward it, by
-shewing that this power in the great bodies of the universe, is derived
-from the same power being lodged in every particle of the matter which
-composes them: and consequently, that this property is no less than
-universal to all matter whatever, though the power be too minute to
-produce any visible effects on the small bodies, wherewith we converse,
-by their action on each other[256]. In the fixed stars indeed we have
-no particular proof that they have this power; for we find no apperance
-to demonstrate that they either act, or are acted upon by it. But
-since this power is found to belong to all bodies, whereon we can make
-observation; and we see that it is not to be altered by any change in
-the form of bodies, but always accompanies them in every shape without
-diminution, remaining ever proportional to the quantity of solid matter
-in each; such a power must without doubt belong universally to all
-matter.
-
-15. THIS therefore is the universal law of matter; which recommends
-it self no less for its great plainness and simplicity, than for the
-surprizing discoveries it leads us to. By this principle we learn the
-different weight, which the same body will have upon the surfaces
-of the sun and of diverse planets; and by the same we can judge of
-the composition of those celestial bodies, and know the density of
-each; which is formed of the most compact, and which of the most rare
-substance. Let the adversaries of this philosophy reflect here, whether
-loading this principle with the appellation of an occult quality, or
-perpetual miracle, or any other reproachful name, be sufficient to
-dissuade us from cultivating it; since this quality, which they call
-occult, leads to the knowledge of such things, that it would have
-been reputed no less than madness for any one, before they had been
-discovered, even to have conjectured that our faculties should ever
-have reached so far.
-
-16. SEE how all this naturally follows from the foregoing principles
-in those planets, which have satellites moving about them. By the
-times, in which these satellites perform their revolutions, compared
-with their distances from their respective primary, the proportion
-between the power, with which one primary attracts his satellites, and
-the force with which any other attracts his will be known; and the
-proportion of the power with which any planet attracts its secondary,
-to the power with which it attracts a body at its surface is found,
-by comparing the distance of the secondary planet from the center of
-the primary, to the distance of the primary planet’s surface from the
-same: and from hence is deduced the proportion between the power of
-gravity upon the surface of one planet, to the gravity upon the surface
-of another. By the like method of comparing the periodical time of a
-primary planet about the sun, with the revolution of a satellite about
-its primary, may be found the proportion of gravity, or of the weight
-of any body upon the surface of the sun, to the gravity, or to the
-weight of the same body upon the surface of the planet, which carries
-about the satellite.
-
-17. BY these kinds of computation it is found, that the weight of the
-same body upon the surface of the sun will be about 23 times as great,
-as here upon the surface of the earth; about 10⅗ times as great, as
-upon the surface of Jupiter; and near 19 times as great, as upon the
-surface of Saturn[257].
-
-18. THE quantity of matter, which composes each of these bodies, is
-proportional to the power it has upon a body at a given distance. By
-this means it is found, that the sun contains 1067 times as much matter
-as Jupiter; Jupiter 158⅔ times as much as the earth, and 2-5/6 times as
-much as Saturn[258]. The diameter of the sun is about 92 times, that of
-Jupiter about 9 times, and that of Saturn about 7 times the diameter of
-the earth.
-
-19. BY making a comparison between the quantity of matter in these
-bodies and their magnitudes, to be found from their diameters, their
-respective densities are readily deduced; the density of every body
-being measured by the quantity of matter contained under the same bulk,
-as has been above remarked[259]. Thus the earth is found 4¼ times
-more dense than Jupiter; Saturn has between ⅔ and ¾ of the density of
-Jupiter; but the sun has one fourth part only of the density of the
-earth[260]. From which this observation is drawn by our author; that
-the sun is rarified by its great heat, and that of the three planets
-named, the more dense is nearer the sun than the more rare; as was
-highly reasonable to expect, the densest bodies requiring the greatest
-heat to agitate and put their parts in motion; as on the contrary, the
-planets which are more rare, would be rendered unfit for their office,
-by the intense heat to which the denser are exposed. Thus the waters
-of our seas, if removed to the distance of Saturn from the sun, would
-remain perpetually frozen; and if as near the sun as Mercury, would
-constantly boil[261].
-
-20. THE densities of the three planets Mercury, Venus, and Mars, which
-have no satellites, cannot be expresly assigned; but from what is
-found in the others, it is very probable, that they also are of such
-different degrees of density, that universally the planet which is
-nearest to the sun, is formed of the most compact substance.
-
-
-
-
-~CHAP~. VI.
-
-Of the FLUID PARTS of the PLANETS.
-
-
-THIS globe, that we inhabit, is composed of two parts; the solid earth,
-which affords us a foundation to dwell upon; and the seas and other
-waters, that furnish rains and vapours necessary to render the earth
-fruitful, and productive of what is requisite for the support of life.
-And that the moon, though but a secondary planet, is composed in like
-manner, is generally thought, from the different degrees of light
-which appear on its surface; the parts of that planet, which reflect a
-dim light, being supposed to be fluid, and to imbibe the sun’s rays,
-while the solid parts reflect them more copiously. Some indeed do not
-allow this to be a conclusive argument: but whether we can distinguish
-the fluid part of the moon’s surface from the rest or not; yet it is
-most probable that there are two such different parts, and with still
-greater reason we may ascribe the like to the other primary planets,
-which yet more nearly resemble our earth. The earth is also encompassed
-by another fluid the air, and we have before remarked, that probably
-the rest of the planets are surrounded by the like. These fluid parts
-in particular engage our author’s attention, both by reason of some
-remarkable appearances peculiar to them, and likewise of some effects
-they have upon the whole bodies to which they belong.
-
-2. FLUIDS have been already treated of in general, with respect to the
-effect they have upon solid bodies moving in them[262]; now we must
-consider them in reference to the operation of the power of gravity
-upon them. By this power they are rendered weighty, like all other
-bodies, in proportion to the quantity of matter, which is contained
-in them. And in any quantity of a fluid the upper parts press upon
-the lower as much, as any solid body would press on another, whereon
-it should lie. But there is an effect of the pressure of fluids on
-the bottom of the vessel, wherein they are contained, which I shall
-particularly explain. The force supported by the bottom of such a
-vessel is not simply the weight of the quantity of the fluid in the
-vessel, but is equal to the weight of that quantity of the fluid, which
-would be contained in a vessel of the same bottom and of equal width
-throughout, when this vessel is filled up to the same height, as that
-to which the vessel proposed is filled. Suppose water were contained
-in the vessel A B C D (in fig. 109.) filled up to E F. Here it is
-evident, that if a part of the bottom, as G H, which is directly under
-any part of the space E F, be considered separately; it will appear
-at once, that this part sustains the weight of as much of the fluid,
-as stands perpendicularly over it up to the height of E F; that is,
-the two perpendiculars G I and H K being drawn, the part G H of the
-bottom will sustain the whole weight of the fluid included between
-these two perpendiculars. Again, I say, every other part of the bottom
-equally broad with this, will sustain as great a pressure. Let the
-part L M be of the same breadth with G H. Here the perpendiculars
-L O and M N being drawn, the quantity of water contained between
-these perpendiculars is not so great, as that contained between the
-perpendiculars G I and H K; yet, I say, the pressure on L M will be
-equal to that on G H. This will appear by the following considerations.
-It is evident, that if the part of the vessel between O and N were
-removed, the water would immediately flow out, and the surface E F
-would subside; for all parts of the water being equally heavy, it must
-soon form itself to a level surface, if the form of the vessel, which
-contains it, does not prevent. Therefore since the water is prevented
-from rising by the side N O of the vessel, it is manifest, that it must
-press against N O with some degree of force. In other words, the water
-between the perpendiculars L O and M N endeavours to extend itself with
-a certain degree of force; or more correctly, the ambient water presses
-upon this, and endeavours to force this pillar or column of water into
-a greater length. But since this column of water is sustained between
-N O and L M, each of these parts of the vessel will be equally pressed
-against by the power, wherewith this column endeavours to extend.
-Consequently L M bears this force over and above the weight of the
-column of water between L O and M N. To know what this expansive force
-is, let the part O N of the vessel be removed, and the perpendiculars
-L O and M N be prolonged; then by means of some pipe fixed over N O
-let water be filled between these perpendiculars up to P Q an equal
-height with E F. Here the water between the perpendiculars L P and M Q
-is of an equal height with the highest part of the water in the vessel;
-therefore the water in the vessel cannot by its pressure force it
-up higher, nor can the water in this column subside; because, if it
-should, it would raise the water in the vessel to a greater height than
-itself. But it follows from hence, that the weight of water contained
-between P O and Q N is a just balance to the force, wherewith the
-column between L O and M N endeavours to extend. So the part L M of
-the bottom, which sustains both this force and the weight of the water
-between L O and M N, is pressed upon by a force equal to the united
-weight of the water between L O and M N, and the weight of the water
-between P O and Q N; that is, it is pressed on by a force equal to the
-weight of all the water contained between L P and M Q. And this weight
-is equal to that of the water contained between G I and H K, which is
-the weight sustained by the part G H of the bottom. Now this being
-true of every part of the bottom B C, it is evident, that if another
-vessel R S T V be formed with a bottom R V equal to the bottom B C, and
-be throughout its whole height of one and the same breadth; when this
-vessel is filled with water to the same height, as the vessel A B C D
-is filled, the bottoms of these two vessels shall be pressed upon with
-equal force. If the vessel be broader at the top than at the bottom,
-it is evident, that the bottom will bear the pressure of so much of
-the fluid, as is perpendicularly over it, and the sides of the vessel
-will support the rest. This property of fluids is a corollary from a
-proposition of our author[263]; from whence also he deduces the effects
-of the pressure of fluids on bodies resting in them. These are, that
-any body heavier than a fluid will sink to the bottom of the vessel,
-wherein the fluid is contained, and in the fluid will weigh as much as
-its own weight exceeds the weight of an equal quantity of the fluid;
-any body uncompressible of the same density with the fluid, will rest
-any where in the fluid without suffering the least change either in
-its place or figure from the pressure of such a fluid, but will remain
-as undisturbed as the parts of the fluid themselves; but every body
-of less density than the fluid will swim on its surface, a part only
-being received within the fluid. Which part will be equal in bulk to
-a quantity of the fluid, whose weight is equal to the weight of the
-whole body; for by this means the parts of the fluid under the body
-will suffer as great a pressure as any other parts of the fluid as much
-below the surface as these.
-
-3. IN the next place, in relation to the air, we have above made
-mention, that the air surrounding the earth being an elastic fluid,
-the power of gravity will have this effect on it, to make the lower
-parts near the surface of the earth more compact and compressed
-together by the weight of the air incumbent, than the higher parts,
-which are pressed upon by a less quantity of the air, and therefore
-sustain a less weight[264]. It has been also observed, that our author
-has laid down a rule for computing the exact degree of density in
-the air at all heights from the earth[265]. But there is a farther
-effect from the air’s being compressed by the power of gravity, which
-he has distinctly considered. The air being elastic and in a state
-of compression, any tremulous body will propagate its motion to the
-air, and excite therein vibrations, which will spread from the body
-that occasions them to a great distance. This is the efficient cause
-of sound: for that sensation is produced by the air, which, as it
-vibrates, strikes against the organ of hearing. As this subject was
-extremely difficult, so our great author’s success is surprizing.
-
-4. OUR author’s doctrine upon this head I shall endeavour to explain
-somewhat at large. But preliminary thereto must be shewn, what he has
-delivered in general of pressure propagated through fluids; and also
-what he has set down relating to that wave-like motion, which appears
-upon the surface of water, when agitated by throwing any thing into it,
-or by the reciprocal motion of the finger, &c.
-
-5. CONCERNING the first, it is proved, that pressure is spread
-through fluids, not only right forward in a streight line, but also
-laterally, with almost the same ease and force. Of which a very obvious
-exemplification by experiment is proposed: that is, to agitate the
-surface of water by the reciprocal motion of the finger forwards and
-backwards only; for though the finger have no circular motion given
-it, yet the waves excited in the water will diffuse themselves on each
-hand of the direction of the motion, and soon surround the finger. Nor
-is what we observe in sounds unlike to this, which do not proceed in
-straight lines only, but are heard though a mountain intervene, and
-when they enter a room in any part of it, they spread themselves into
-every corner; not by reflection from the walls, as some have imagined,
-but as far as the sense can judge, directly from the place where they
-enter.
-
-6. HOW the waves are excited in the surface of stagnant water, may be
-thus conceived. Suppose in any place, the water raised above the rest
-in form of a small hillock; that water will immediately subside, and
-raise the circumambient water above the level of the parts more remote,
-to which the motion cannot be communicated under longer time. And
-again, the water in subsiding will acquire, like all falling bodies, a
-force, which will carry it below the level surface, till at length the
-pressure of the ambient water prevailing, it will rise again, and even
-with a force like to that wherewith it descended, which will carry it
-again above the level. But in the mean time the ambient water before
-raised will subside, as this did, sinking below the level; and in so
-doing, will not only raise the water, which first subsided, but also
-the water next without itself. So that now beside the first hillock, we
-shall have a ring investing it, at some distance raised above the plain
-surface likewise; and between them the water will be sunk below the
-rest of the surface. After this, the first hillock, and the new made
-annular rising, will descend; raising the water between them, which
-was before depressed, and likewise the adjacent part of the surface
-without. Thus will these annular waves be successively spread more
-and more. For, as the hillock subsiding produces one ring, and that
-ring subsiding raises again the hillock, and a second ring; so the
-hillock and second ring subsiding together raise the first ring, and
-a third; then this first and third ring subsiding together raise the
-first hillock, the second ring, and a fourth; and so on continually,
-till the motion by degrees ceases. Now it is demonstrated, that these
-rings ascend and descend in the manner of a pendulum; descending with
-a motion continually accelerated, till they become even with the plain
-surface of the fluid, which is half the space they descend; and then
-being retarded again by the same degrees as those, whereby they were
-accelerated, till they are depressed below the plain surface, as much
-as they were before raised above it: and that this augmentation and
-diminution of their velocity proceeds by the same degrees, as that of
-a pendulum vibrating in a cycloid, and whose length should be a fourth
-part of the distance between any two adjacent waves: and farther, that
-a new ring is produced every time a pendulum, whose length is four
-times the former, that is, equal to the interval between the summits of
-two waves, makes one oscillation or swing[266].
-
-7. THIS now opens the way for understanding the motion consequent upon
-the tremors of the air, excited by the vibrations of sonorous bodies:
-which we must conceive to be performed in the following manner.
-
-8. LET A, B, C, D, E, F, G, H (in fig. 110.) represent a series of
-the particles of the air, at equal distances from each other. I K L
-a musical chord, which I shall use for the tremulous and sonorous
-body, to make the conception as simple as may be. Suppose this chord
-stretched upon the points I and L, and forcibly drawn into the
-situation I K L, so that it become contiguous to the particle A in its
-middle point K: and let the chord from this situation begin to recoil,
-pressing against the particle A, which will thereby be put into motion
-towards B: but the particles A, B, C being equidistant, the elastic
-power, by which B avoids A, is equal to, and balanced by the power, by
-which it avoids C; therefore the elastic force, by which B is repelled
-from A, will not put B into any degree of motion, till A is by the
-motion of the chord brought nearer to B, than B is to C: but as soon as
-that is done, the particle B will be moved towards C; and being made
-to approach C, will in the next place move that; which will upon that
-advance, put D likewise into motion, and so on: therefore the particle
-A being moved by the chord, the following particles of the air B, C, D,
-&c. will successively be moved. Farther, if the point K of the chord
-moves forward with an accelerated velocity, so that the particle A
-shall move against B with an advancing pace, and gain ground of it,
-approaching nearer and nearer continually; A by approaching will press
-more upon B, and give it a greater velocity likewise, by reason that as
-the distance between the particles diminishes, the elastic power, by
-which they fly each other, increases. Hence the particle B, as well as
-A, will have its motion gradually accelerated, and by that means will
-more and more approach to C. And from the same cause C will more and
-more approach D; and so of the rest. Suppose now, since the agitation
-of these particles has been shewn to be successive, and to follow one
-another, that E be the remotest particle moved, while the chord is
-moving from its curve situation I K L into that of a streight line, as
-I k L; and F the first which remains unaffected, though just upon the
-point of being put into motion. Then shall the particles A, B, C, D,
-E, F, G, when the point K is moved into k, have acquired the rangement
-represented by the adjacent points _a, b, c, d, e, f, g_: in which _a_
-is nearer to _b_ than _b_ to _c_, and _b_ nearer to _c_ than _c_ to
-_d_, and _c_ nearer to _d_ than _d_ to _e_ and _d_ nearer to _e_ than
-_e_ to _f_, and lastly _e_ nearer to _f_ than _f_ to _g_.
-
-9. BUT now the chord having recovered its rectilinear situation I k L,
-the following motion will be changed, for the point K, which before
-advanced with a motion more and more accelerated, though by the force
-it has acquired it will go on to move the same way as before, till it
-has advanced near as far forwards, as it was at first drawn backwards;
-yet the motion of it will henceforth be gradually lessened. The effect
-of which upon the particles _a, b, c, d, e, f, g_ will be, that by the
-time the chord has made its utmost advance, and is upon the return,
-these particles will be put into a contrary rangement; so that _f_
-shall be nearer to _g_, than _e_ to _f_, and _e_ nearer to _f_ than _d_
-to _e_; and the like of the rest, till you come to the first particles
-_a_, _b_, whose distance will then be nearly or quite what it was at
-first. All which will appear as follows. The present distance between
-_a_ and _b_ is such, that the elastic power, by which _a_ repels _b_,
-is strong enough to maintain that distance, though a advance with the
-velocity, with which the string resumes its rectilinear figure; and
-the motion of the particle _a_ being afterwards slower, the present
-elasticity between _a_ and _b_ will be more than sufficient to preserve
-the distance between them. Therefore while it accelerates _b_ it will
-retard _a_. The distance _b c_ will still diminish, till _b_ come about
-as near to _c_, as it is from a at present; for after the distances
-_a b_ and _b c_ are become equal, the particle _b_ will continue its
-velocity superior to that of _c_ by its own power of inactivity, till
-such time as the increase of elasticity between _b_ and _c_ more than
-shall be between _a_ and _b_ shall suppress its motion: for as the
-power of inactivity in _b_ made a greater elasticity necessary on the
-side of a than on the side of _c_ to push _b_ forward, so what motion
-_b_ has acquired it will retain by the same power of inactivity, till
-it be suppressed by a greater elasticity on the side of _c_, than on
-the side of _a_. But as soon as _b_ begins to slacken its pace the
-distance of _b_ from c will widen as the distance _a b_ has already
-done. Now as _a_ acts on _b_, so will _b_ on _c_, _c_ on _d_, &c. so
-that the distances between all the particles _b, c, d, e, f, g_ will
-be successively contracted into the distance of _a_ from _b_, and then
-dilated again. Now because the time, in which the chord describes
-this present half of its vibration, is about equal to that it took up
-in describing the former; the particles _a_, _b_ will be as long in
-dilating their distance, as before in contracting it, and will return
-nearly to their original distance. And farther, the particles _b_, _c_,
-which did not begin to approach so soon as _a_, _b_, are now about as
-much longer, before they begin to recede; and likewise the particles
-_c_, _d_, which began to approach after _b_, _c_, begin to separate
-later. Whence it appears that the particles, whose distance began to be
-lessened, when that of _a_, _b_ was first enlarged, viz. the particles
-_f_, _g,_ should be about their nearest distance, when _a_ and _b_ have
-recovered their prime interval. Thus will the particles _a, b, c, d, e,
-f, g_ have changed their situation in the manner asserted. But farther,
-as the particles _f_, _g_ or F, G gradually approach each other, they
-will move by degrees the succeeding particles to as great a length, as
-the particles A, B did by a like approach. So that, when the chord has
-made its greatest advance, being arrived into the situation I ϰ L, the
-particles moved by it will have the rangement noted by the points α, β,
-γ, δ, ε, ζ, η, θ, λ, μ, ν, χ. Where α, β are at the original distance
-of the particles in the line A H; ζ, η are the nearest of all, and the
-distance ν χ is equal to that between α and β.
-
-10. BY this time the chord I ϰ L begins to return, and the distance
-between the particles α and β being enlarged to its original magnitude,
-α has lost all that force it had acquired by its motion, being now at
-rest; and therefore will return with the chord, making the distance
-between α and β greater than the natural; for β will not return so
-soon, because its motion forward is not yet quite suppressed, the
-distance β γ not being already enlarged to its prime dimension: but the
-recess of α, by diminishing the pressure upon β by its elasticity, will
-occasion the motion of β to be stopt in a little time by the action of
-γ, and then shall β begin to return: at which time the distance between
-γ and δ shall by the superior action of δ above β be enlarged to the
-dimension of the distance β γ, and therefore soon after to that of α β.
-Thus it appears, that each of these particles goes on to move forward,
-till its distance from the preceding one be equal to its original
-distance; the whole chain α, β, γ, δ, ε, ζ, η, having an undulating
-motion forward, which is stopt gradually by the excess of the expansive
-power of the preceding parts above that of the hinder. Thus are these
-parts successively stopt, as before they were moved; so that when the
-chord has regained its rectilinear situation, the expansion of the
-parts of the air will have advanced so far, that the interval between
-ζ η, which at present is most contracted, will then be restored to its
-natural size: the distances between η and θ, θ and λ, λ and μ, μ and ν,
-ν and χ, being successively contracted into the present distance of ζ
-from η, and again enlarged; so that the same effect shall be produced
-upon the parts beyond ζ η, by the enlargement of the distance between
-those two particles, as was occasioned upon the particles α, β, γ, δ,
-ε, ζ, η, θ, λ, μ, ν, χ, by the enlargement of the distance α β to its
-natural extent. And therefore the motion in the air will be extended
-half as much farther as at present, and the distance between ν and χ
-contracted into that, which is at present between ζ and η, all the
-particles of the air in motion taking the rangement expressed in figure
-111. by the points α, β, γ, δ, ε, ζ, η, θ, λ, μ, ν, χ, ϰ, ρ, σ, τ, φ
-wherein the particles from α to χ have their distances from each other
-gradually diminished, the distances between the particles ν, χ being
-contracted the most from the natural distance between those particles,
-and the distance between α, β as much augmented, and the distance
-between the middle particles ζ, η becoming equal to the natural. The
-particles π, ρ, ω τ, φ which follow χ, have their distances gradually
-greater and greater, the particles ν, χ, π, ρ, σ, τ, φ being ranged
-like the particles _a, b, c, d, e, f, g_, or like the particles ζ,
-η, θ, λ, μ, ν, χ in the former figure. Here it will be understood,
-by what has been before explained, that the particles ζ, η being at
-their natural distance from each other, the particle ζ is at rest, the
-particles ε, δ, λ, β, ϰ between them and the string being in motion
-backward, and the rest of the particles η, θ, λ, μ, ν, χ, π, ρ, σ, τ
-in motion forward: each of the particles between η and χ moving faster
-than that, which immediately follows it; but of the particles from χ
-to φ, on the contrary, those behind moving on faster than those, which
-precede.
-
-11. BUT now the string having recovered its rectilinear figure, though
-it shall go on recoiling, till it return near to its first situation
-I K L, yet there will be a change in its motion; so that whereas it
-returned from the situation I ϰ L with an accelerated motion, its
-motion shall from hence be retarded again by the same degrees, as
-accelerated before. The effect of which change upon the particles of
-the air will be this. As by the accelerated motion of the chord α
-contiguous to it moved faster than β, γ, so as to make the interval α
-β greater than the interval β γ, and from thence β was made likewise
-to move faster than γ, and the distance between β and γ rendered
-greater than the distance between γ and δ, and so of the rest; now the
-motion of α being diminished, β shall overtake it, and the distance
-between α and β be reduced into that, which is at present between β
-and γ, the interval between β and γ being inlarged into the present
-distance between α and β; but when the interval β γ is increased to
-that, which is at present between α and β γ the distance between γ
-and δ shall be enlarged to the present distance between γ and β,
-and the distance between δ and ι inlarged into the present distance
-between γ and δ; and the same of the rest. But the chord more and more
-slackening its pace, the distance between α and β shall be more and
-more diminished; and in consequence of that the distance between β and
-γ shall be again contracted, first into its present dimension, and
-afterwards into a narrower space; while the interval γ δ shall dilate
-into that at present between α and β, and as soon as it is so much
-enlarged, it shall contract again. Thus by the reciprocal expansion
-and contraction of the air between α and ζ, by that time the chord is
-got into the situation I K L, the interval ζ η shall be expanded into
-the present distance between α and β; and by that time likewise the
-present distance of α from β will be contracted into their natural
-interval: for this distance will be about the same time in contracting
-it self, as has been taken up in its dilatation; seeing the string will
-be as long in returning from its rectilinear figure, as it has been in
-recovering it from its situation I ϰ L. This is the change which will
-be made in the particles between α and ζ. As for those between ζ and
-χ, because each preceding particle advances faster than that, which
-immediately follows it, their distances will successively be dilated
-into that, which is at present between ζ and η. And as soon as any two
-particles are arrived at their natural distance, the hindermost of them
-shall be stopt, and immediately after return, the distances between
-the returning particles being greater than the natural. And this
-dilatation of these distances shall extend so far, by that time the
-chord is returned into its first situation I K L, that the particles ι
-χ shall be removed to their natural distance. But the dilatation of ν
-χ shall contract the interval τ φ into that at present between ν and
-χ, and the contraction of the distance between those two particles τ
-and φ will agitate a part of the air beyond; so that when the chord is
-returned into the situation I K L, having made an intire vibration, the
-moved particles of the air will take the rangement expressed by the
-points, _l, m, n, o, p, q, r, s, t, u, w, x, y, z_, 1, 2, 3, 4, 5, 6,
-7, 8: in which _l m_, are at the natural distance of the particles, the
-distance _m n_ greater than _l m_ and _n o_ greater than _m n_, and so
-on, till you come to _q r_, the widest of all: and then the distances
-gradually diminish not only to the natural distance, as _w x_, but till
-they are contracted as much as χ τ was before; which falls out in the
-points 2, 3, from whence the distances augment again, till you come to
-the part of the air untouched.
-
-12. THIS is the motion, into which the air is put, while the chord
-makes one vibration, and the whole length of air thus agitated in
-the time of one vibration of the chord our author calls the length
-of one pulse. When the chord goes on to make another vibration, it
-will not only continue to agitate the air at present in motion, but
-spread the pulsation of the air as much farther, and by the same
-degrees, as before. For when the chord returns into its rectilinear
-situation I _k_ L, _l m_ shall be brought into its most contracted
-state, _q r_ now in the state of greatest dilatation shall be reduced
-to its natural distance, the points _w_, _x_ now at their natural
-distance shall be at their greatest distance, the points 2, 3 now most
-contracted enlarged to their natural distance, and the points 7, 8
-reduced to their most contracted state: and the contraction of them
-will carry the agitation of the air as far beyond them, as that motion
-was carried from the chord, when it first moved out of the situation
-I K L into its rectilinear figure. When the chord is got into the
-situation I ϰ L, _l m_ shall recover its natural dimensions, _q r_ be
-reduced to its state of greatest contraction, _w x_ brought to its
-natural dimension, the distance 2 3 enlarged to the utmost, and the
-points 7, 8 shall have recovered their natural distance; and by thus
-recovering themselves they shall agitate the air to as great a length
-beyond them, as it was moved beyond the chord, when it first came into
-the situation I ϰ L. When the chord is returned back again into its
-rectilinear situation, _l m_ shall be in its utmost dilatation, _q r_
-restored again to its natural distance, _w x_ reduced into its state of
-greatest contraction, 2 3 shall recover its natural dimension, and 7 8
-be in its state of greatest dilatation. By which means the air shall be
-moved as far beyond the points 7, 8, as it was moved beyond the chord,
-when it before made its return back to its rectilinear situation; for
-the particles 7, 8 have been changed from their state of rest and
-their natural distance into a state of contraction, and then have
-proceeded to the recovery of their natural distance, and after that to
-a dilatation of it, in the same manner as the particles contiguous to
-the chord were agitated before. In the last place, when the chord is
-returned into the situation I K L, the particles of air from _l_ to δ
-shall acquire their present rangement, and the motion of the air be
-extended as much farther. And the like will happen after every compleat
-vibration of the string.
-
-13. CONCERNING this motion of sound, our author shews how to compute
-the velocity thereof, or in what time it will reach to any proposed
-distance from the sonorous body. For this he requires to know the
-height of air, having the same density with the parts here at the
-surface of the earth, which we breath, that would be equivalent in
-weight to the whole incumbent atmosphere. This is to be found by the
-barometer, or common weatherglass. In that instrument quicksilver is
-included in a hollow glass cane firmly closed at the top. The bottom is
-open, but immerged into quicksilver contained in a vessel open to the
-air. Care is taken when the lower end of the cane is immerged, that the
-whole cane be full of quicksilver, and that no air insinuate itself.
-When the instrument is thus fixed, the quicksilver in the cane being
-higher than that in the vessel, if the top of the cane were open, the
-fluid would soon sink out of the glass cane, till it came to a level
-with that in the vessel. But the top of the cane being closed up, so
-that the air, which has free liberty to press on the quicksilver in
-the vessel, cannot bear at all on that, which is within the cane, the
-quicksilver in the cane will be suspended to such a height, as to
-balance the pressure of the air on the quicksilver in the vessel. Here
-it is evident, that the weight of the quicksilver in the glass cane is
-equivalent to the pressure of so much of the air, as is perpendicularly
-over the hollow of the cane; for if the cane be opened that the air may
-enter, there will be no farther use of the quicksilver to sustain the
-pressure of the air without; for the quicksilver in the cane, as has
-already been observed, will then subside to a level with that without.
-Hence therefore if the proportion between the density of quicksilver
-and of the air we breath be known, we may know what height of such air
-would form a column equal in weight to the column of quicksilver within
-the glass cane. When the quicksilver is sustained in the barometer
-at the height of 30 inches, the height of such a column of air will
-be about 29725 feet; for in this case the air has about 1/870 of the
-density of water, and the density of quicksilver exceeds that of water
-about 13⅔ times, so that the density of quicksilver exceeds that of the
-air about 11890 times; and so many times 30 inches make 29725 feet. Now
-Sir ~ISAAC NEWTON~ determines, that while a pendulum of the length of
-this column should make one vibration or swing, the space, which any
-sound will have moved, shall bear to this length the same proportion,
-as the circumference of a circle bears to the diameter thereof;
-that is, about the proportion of 355 to 113[267]. Only our author
-here considers singly the gradual progress of sound in the air from
-particle to particle in the manner we have explained, without taking
-into consideration the magnitude of those particles. And though there
-requires time for the motion to be propagated from one particle to
-another, yet it is communicated to the whole of the same particle in an
-instant: therefore whatever proportion the thickness of these particles
-bears to their distance from each other, in the same proportion will
-the motion of sound be swifter. Again the air we breath is not simply
-composed of the elastic part, by which sound is conveyed, but partly of
-vapours, which are of a different nature; and in the computation of the
-motion of sound we ought to find the height of a column of this pure
-air only, whose weight should be equal to the weight of the quicksilver
-in the cane of the barometer, and this pure air being a part only of
-that we breath, the column of this pure air will be higher than 29725
-feet. On both these accounts the motion of sound is found to be about
-1142 feet in one second of time, or near 13 miles in a minute, whereas
-by the computation proposed above, it should move but 979 feet in one
-second.
-
-14. WE may observe here, that from these demonstrations of our author
-it follows, that all sounds whether acute or grave move equally swift,
-and that sound is swiftest, when the quicksilver stands highest in the
-barometer.
-
-15. THUS much of the appearances, which are caused in these fluids from
-their gravitation toward the earth. They also gravitate toward the
-moon; for in the last chapter it has been proved, that the gravitation
-between the earth and moon is mutual, and that this gravitation of
-the whole bodies arises from that power acting in all their parts; so
-that every particle of the moon gravitates toward the earth, and every
-particle of the earth toward the moon. But this gravitation of these
-fluids toward the moon produces no sensible effect, except only in the
-sea, where it causes the tides.
-
-16. THAT the tides depend upon the influence of the moon has been the
-receiv’d opinion of all antiquity; nor is there indeed the least shadow
-of reason to suppose otherwise, considering how steadily they accompany
-the moon’s course. Though how the moon caused them, and by what
-principle it was enabled to produce so distinguish’d an appearance,
-was a secret left for this philosophy to unfold: which teaches, that
-the moon is not here alone concerned, but that the sun likewise has a
-considerable share in their production; though they have been generally
-ascribed to the other luminary, because its effect is greatest, and by
-that means the tides more immediately suit themselves to its motion;
-the sun discovering its influence more by enlarging or restraining the
-moon’s power, than by any distinct effects. Our author finds the power
-of the moon to bear to the power of the sun about the proportion of
-4½ to 1. This he deduces from the observations made at the mouth of
-the river Avon, three miles from Bristol, by Captain STURMEY, and at
-Plymouth by Mr. COLEPRESSE, of the height to which the water is raised
-in the conjunction and opposition of the luminaries, compared with the
-elevation of it, when the moon is in either quarter; the first being
-caused by the united actions of the sun and moon, and the other by the
-difference of them, as shall hereafter be shewn.
-
-17. THAT the sun should have a like effect on the sea, as the moon, is
-very manifest; since the sun likewise attracts every single particle,
-of which this earth is composed. And in both luminaries since the power
-of gravity is reciprocally in the duplicate proportion of the distance,
-they will not draw all the parts of the waters in the same manner;
-but must act upon the nearest parts stronger, than upon the remotest,
-producing by this inequality an irregular motion. We shall now attempt
-to shew how the actions of the sun and moon on the waters, by being
-combined together, produce all the appearances observed in the tides.
-
-18. TO begin therefore, the reader will remember what has been said
-above, that if the moon without the sun would have described an orbit
-concentrical to the earth, the action of the sun would make the orbit
-oval, and bring the moon nearer to the earth at the new and full,
-than at the quarters[268]. Now our excellent author observes, that
-if instead of one moon, we suppose a ring of moons, contiguous and
-occupying the whole orbit of the moon, his demonstration would still
-take place, and prove that the parts of this ring in passing from the
-quarter to the conjunction or opposition would be accelerated, and be
-retarded again in passing from the conjunction or opposition to the
-next quarter. And as this effect does not depend on the magnitude of
-the bodies, whereof the ring is composed, the same would hold, though
-the magnitude of these moons were so far to be diminished, and their
-number increased, till they should form a fluid[269]. Now the earth
-turns round continually upon its own center, causing thereby the
-alternate change of day and night, while by this revolution each part
-of the earth is successively brought toward the sun, and carried off
-again in the space of 24 hours. And as the sea revolves round along
-with the earth itself in this diurnal motion, it will represent in some
-sort such a fluid ring.
-
-19. BUT as the water of the sea does not move round with so much
-swiftness, as would carry it about the center of the earth in the
-circle it now describes, without being supported by the body of the
-earth; it will be necessary to consider the water under three distinct
-cases. The first case shall suppose the water to move with the degree
-of swiftness, required to carry a body round the center of the
-earth disingaged from it in a circle at the distance of the earth’s
-semidiameter, like another moon. The second case is, that the waters
-make but one turn about the axis of the earth in the space of a month,
-keeping pace with the moon; so that all parts of the water should
-preserve continually the same situation in respect of the moon. The
-third case shall be the real one of the waters moving with a velocity
-between these two, neither so swift as the first case requires, nor so
-slow as the second.
-
-20. IN the first case the waters, like the body which they equalled
-in velocity, by the action of the moon would be brought nearer the
-center under and opposite to the moon, than in the parts in the middle
-between these eastward or westward. That such a body would so alter
-its distance by the moon’s action upon it, is clear from what has
-been mentioned of the like changes in the moon’s motion caused by
-the sun[270]. And computation shews, that the difference between the
-greatest and least distance of such a body would not be much above 4½
-feet. But in the second case, where all the parts of the water preserve
-the same situation continually in respect of the moon, the weight of
-those parts under and opposite to the moon will be diminished by the
-moon’s action, and the parts in the middle between these will have
-their weight increased: this being effected just in the same manner,
-as the sun diminishes the attraction of the moon towards the earth in
-the conjunction and opposition, but increases that attraction in the
-quarters. For as the first of these consequences from the sun’s action
-on the moon is occasioned by the moon’s being attracted by the sun in
-the conjunction more than the earth, and in the opposition less than
-it, and therefore in the common motion of the earth and moon, the moon
-is made to advance toward the sun in one case too fast, and in the
-other is left as it were behind; so the earth will not have its middle
-parts drawn towards the moon so strongly as the nearer parts, and yet
-more forcibly than the remotest: and therefore since the earth and
-moon move each month round their common center of gravity[271], while
-the earth moves round this center, the same effect will be produced,
-on the parts of the water nearest to that center or to the moon, as
-the moon feels from the sun when in conjunction, and the water on the
-contrary side of the earth will be affected by the moon, as the moon is
-by the sun, when in opposition[272]; that is, in both cases the weight
-of the water, or its propensity towards the center of the earth, will
-be diminished. The parts in the middle between these will have their
-weight increased, by being pressed towards the center of the earth
-through the obliquity of the moon’s action upon them to its action
-upon the earth’s center, just as the sun increases the gravitation
-of the moon in the quarters from the same cause[273]. But now it is
-manifest, that where the weight of the same quantity of water is least,
-there it will be accumulated; while the parts, which have the greatest
-weight, will subside. Therefore in this case there would be no tide or
-alternate rising and falling of the water, but the water would form it
-self into an oblong figure, whose axis prolonged would pass through the
-moon. By Sir ~ISAAC NEWTON~’s computation the excess of this axis above
-the diameters perpendicular to it, that is, the height of the waters
-under and opposite to the moon above their height in the middle between
-these places eastward or westward caused by the moon, is about 8⅔ feet.
-
-21. THUS the difference of height in this latter supposition is little
-short of twice that difference in the preceding. But the case of the
-sea is a middle between these two: for a body, which should revolve
-round the center of the earth at the distance of a semidiameter without
-pressing on the earth’s surface, must perform its period in less than
-an hour and half, whereas the earth turns round but once in a day; and
-in the case of the waters keeping pace with the moon it should turn
-round but once in a month: so that the real motion of the water is
-between the motions required in these two cases. Again, if the waters
-moved round as swiftly as the first case required, their weight would
-be wholly taken off by their motion; for this case supposes the body
-to move so, as to be kept revolving in a circle round the earth by
-the power of gravity without pressing on the earth at all, so that
-its motion just supports its weight. But if the power of gravity had
-been only 1/289 part of what it is, the body could have moved thus
-without pressing on the earth, and have been as long in moving round,
-as the earth it self is. Consequently the motion of the earth takes off
-from the weight of the water in the middle between the poles, where
-its motion is swiftest, 1/289 part of its weight and no more. Since
-therefore in the first case the weight of the waters must be intirely
-taken off by their motion, and by the real motion of the earth they
-lose only 1/289 part thereof, the motion of the water will so little
-diminish their weight, that their figure will much nearer resemble
-the case of their keeping pace with the moon than the other. Upon
-the whole, if the waters moved with the velocity necessary to carry
-a body round the center of the earth at the distance of the earth’s
-semidiameter without bearing on its surface, the water would be lowest
-under the moon, and rise gradually as it moved on with the earth
-eastward, till it came half way toward the place opposite to the moon;
-from thence it would subside again, till it came to the opposition,
-where it would become as low as at first; afterwards it would rise
-again, till it came half way to the place under the moon; and from
-hence it would subside, till it came a second time under the moon. But
-in case the water kept pace with the moon, it would be highest where
-in the other case it is lowest, and lowest where in the other it is
-highest; therefore the diurnal motion of the earth being between the
-motions of these two cases, it will cause the highest place of the
-water to fall between the places of the greatest height in these two
-cases. The water as it passes from under the moon shall for some time
-rise, but descend again before it arrives half way to the opposite
-place, and shall come to its least height before it becomes opposite
-to the moon; then it shall rise again, continuing so to do till it has
-passed the place opposite to the moon, but subside before it comes
-to the middle between the places opposite to and under the moon; and
-lastly it shall come to its lowest, before it comes a second time
-under the moon. If A (in fig. 112, 113, 114.) represent the moon, B
-the center of the earth, the oval C D E F in fig. 112. will represent
-the situation of the water in the first case; but if the water kept
-pace with the moon, the line C D E F in fig. 113. would represent
-the situation of the water; but the line C D E F in fig. 114. will
-represent the same in the real motion of the water, as it accompanies
-the earth in its diurnal rotation: in all these figures C and E being
-the places where the water is lowest, and D and F the places where it
-is highest. Pursuant to this determination it is found, that on the
-shores, which lie exposed to the open sea, the high water usually falls
-out about three hours after the moon has passed the meridian of each
-place.
-
-22. LET this suffice in general for explaining the manner, in which the
-moon acts upon the seas. It is farther to be noted, that these effects
-are greatest, when the moon is over the earth’s equator[274], that
-is, when it shines perpendicularly upon the parts of the earth in the
-middle between the poles. For if the moon were placed over either of
-the poles, it could have no effect upon the water to make it ascend and
-descend. So that when the moon declines from the equator toward either
-pole, it’s action must be something diminished, and that the more, the
-farther it declines. The tides likewise will be greatest, when the moon
-is nearest to the earth, it’s action being then the strongest.
-
-23. THUS much of the action of the moon. That the sun should produce
-the very same effects, though in a less degree, is too obvious to
-require a particular explanation: but as was remarked before, this
-action of the sun being weaker than that of the moon, will cause the
-tides to follow more nearly the moon’s course, and principally shew it
-self by heightening or diminishing the effects of the other luminary.
-Which is the occasion, that the highest tides are found about the
-conjunction and opposition of the luminaries, being then produced by
-their united action, and the weakest tides about the quarters of the
-moon; because the moon in this case raising the water where the sun
-depresses it, and depressing it where the sun raises it, the stronger
-action of the moon is in part retunded and weakened by that of the sun.
-Our author computes that the sun will add near two feet to the height
-of the water in the first case, and in the other take from it as much.
-However the tides in both comply with the same hour of the moon. But at
-other times, between the conjunction or opposition and quarters, the
-time deviates from that forementioned, towards the hour in which the
-sun would make high water, though still it keeps much nearer to the
-moon’s hour than to the sun’s.
-
-24. AGAIN the tides have some farther varieties from the situation of
-the places where they happen northward or southward. Let _p_ P (in fig.
-115.) represent the axis, on which the earth daily revolves, let _h_
-_p_ H P represent the figure of the water, and let _n_ B N D be a globe
-inscribed within this figure. Suppose the moon to be advanced from the
-equator toward the north pole, so that _h_ H the axis of the figure of
-the water _p_ A H P E _h_ shall decline towards the north pole N; take
-any place G nearer to the north pole than to the south, and from the
-center of the earth C draw C G F; then will G F denote the altitude
-to which the water is raised by the tide, when the moon is above the
-horizon: in the space of twelve hours, the earth having turned half
-round its axis, the place G will be removed to _g_; but the axis _h_
-H will have kept its place preserving its situation in respect of the
-moon, at least will have moved no more than the moon has done in that
-time, which it is not necessary here to take into consideration. Now
-in this case the height of the water will be equal to _g_ _f_, which
-is not so great as G F. But whereas G F is the altitude at high water,
-when the moon is above the horizon, _g_ _f_ will be the altitude of the
-same, when the moon is under the horizon. The contrary happens toward
-the south pole, for K L is less than _k_ _l_. Hence is proved, that
-when the moon declines from the equator, in those places, which are on
-the same side of the equator as the moon, the tides are greater, when
-the moon is above the horizon, than when under it; and the contrary
-happens on the other side of the equator.
-
-25. NOW from these principles may be explained all the known
-appearances in the tides; only by the assistance of this additional
-remark, that the fluctuating motion, which the water has in flowing
-and ebbing, is of a durable nature, and would continue for some time,
-though the action of the luminaries should cease; for this prevents
-the difference between the tide when the moon is above the horizon,
-and the tide when the moon is below it from being so great, as the
-rule laid down requires. This likewise makes the greatest tides not
-exactly upon the new and full moon, but to be a tide or two after; as
-at Bristol and Plymouth they are found the third after.
-
-26. THIS doctrine farther shews us, why not only the spring tides fall
-out about the new and full moon, and the neap tides about the quarters;
-but likewise how it comes to pass, that the greatest spring tides
-happen about the equinoxes; because the luminaries are then one of them
-over the equator, and the other not far from it. It appears too, why
-the neap tides, which accompany these, are the least of all, for the
-sun still continuing over the equator continues to have the greatest
-power of lessening the moon’s action, and the moon in the quarters
-being far removed toward one of the poles, has its power thereby
-weakned.
-
-27. MOREOVER the action of the moon being stronger, when near the
-earth, than when more remote; if the moon, when new suppose, be at its
-nearest distance from the earth, it shall when at the full be farthest
-off; whence it is, that two of the very largest spring tides do never
-immediately succeed each other.
-
-28. BECAUSE the sun in its passage from the winter solstice to the
-summer recedes from the earth, and passing from the summer solstice
-to the winter approaches it, and is therefore nearer the earth before
-the vernal equinox than after, but nearer after the autumnal equinox
-than before; the greatest tides oftner precede the vernal equinox than
-follow it, and in the autumnal equinox on the contrary they oftner
-follow it than come before it.
-
-29. THE altitude, to which the water is raised in the open ocean,
-corresponds very well to the forementioned calculations; for as it was
-shewn, that the water in spring tides should rise to the height of 10
-or 11 feet, and the neap tides to 6 or 7; accordingly in the Pacific,
-Atlantic and Ethiopic oceans in the parts without the tropics, the
-water is observed to rise about 6, 9, 12 or 15 feet. In the Pacific
-ocean this elevation is said to be greater than in the other, as it
-ought to be by reason of the wide extent of that sea. For the same
-reason in the Ethiopic ocean between the tropics the ascent of the
-water is less than without, by reason of the narrowness of the sea
-between the coasts of Africa and the southern parts of America. And
-islands in such narrow seas, if far from shore, have less tides than
-the coasts. But now in those ports where the water flows in with great
-violence upon fords and shoals, the force it acquires by that means
-will carry it to a much greater height, so as to make it ascend and
-descend to 30, 40 or even 50 feet and more; instances of which we have
-at Plymouth, and in the Severn near Chepstow; at St. Michael’s and
-Auranches in Normandy; at Cambay and Pegu in the East Indies.
-
-30. AGAIN the tides take a considerable time in passing through long
-straits, and shallow places. Thus the tide, which is made on the west
-coast of Ireland and on the coast of Spain at the third hour after the
-moon’s coming to the meridian, in the ports eastward toward the British
-channel falls out later, and as the flood passes up that channel still
-later and later, so that the tide takes up full twelve hours in coming
-up to London bridge.
-
-31. IN the last place tides may come to the same port from different
-seas, and as they may interfere with each other, they will produce
-particular effects. Suppose the tide from one sea come to a port at the
-third hour after the moon’s passing the meridian of the place, but from
-another sea to take up six hours more in its passage. Here one tide
-will make high water, when by the other it should be lowest; so that
-when the moon is over the equator, and the two tides are equal, there
-will be no rising and falling of the water at all; for as much as the
-water is carried off by one tide, it will be supplied by the other.
-But when the moon declines from the equator, the same way as the port
-is situated, we have shewn that of the two tides of the ocean, which
-are made each day, that tide, which is made when the moon is above the
-horizon, is greater than the other. Therefore in this case, as four
-tides come to this port each day the two greatest will come on the
-third, and on the ninth hour after the moon’s passing the meridian, and
-the two least at the fifteenth and at the twenty first hour. Thus from
-the third to the ninth hour more water will be in this port by the two
-greatest tides than from the ninth to the fifteenth, or from the twenty
-first to the following third hour, where the water is brought by one
-great and one small tide; but yet there will be more water brought
-by these tides, than what will be found between the two least tides,
-that is, between the fifteenth and twenty first hour. Therefore in the
-middle between the third and ninth hour, or about the moon’s setting,
-the water will be at its greatest height; in the middle between the
-ninth and fifteenth, as also between the twenty first and following
-third hour it will have its mean height; and be lowest in the middle
-between the fifteenth and twenty first hour, that is, at the moon’s
-rising. Thus here the water will have but one flood and one ebb each
-day. When the moon is on the other side of the equator, the flood will
-be turned into ebb, and the ebb into flood; the high water falling
-out at the rising of the moon, and the low water at the setting. Now
-this is the case of the port of Batsham in the kingdom of Tunquin in
-the East Indies; to which port there are two inlets, one between the
-continent and the islands which are called the Manillas, and the other
-between the continent and Borneo.
-
-32. THE next thing to be considered is the effect, which these fluids
-of the planets have upon the solid part of the bodies to which they
-belong. And in the first place I shall shew, that it was necessary upon
-account of these fluid parts to form the bodies of the planets into a
-figure something different from that of a perfect globe. Because the
-diurnal rotation, which our earth performs about its axis, and the
-like motion we see in some of the other planets, (which is an ample
-conviction that they all do the like) will diminish the force, with
-which bodies are attracted upon all the parts of their surfaces, except
-at the very poles, upon which they turn. Thus a stone or other weighty
-substance resting upon the surface of the earth, by the force which it
-receives from the motion communicated to it by the earth, if its weight
-prevented not, would continue that motion in a straight line from the
-point where it received it, and according to the direction, in which it
-was given, that is, in a line which touches the surface at that point;
-insomuch that it would move off from the earth in the same manner, as
-a weight fasten’d to a string and whirled about endeavours continually
-to recede from the center of motion, and would forthwith remove it self
-to a greater distance from it, if loosed from the string which retains
-it. And farther, as the centrifugal force, with which such a weight
-presses from the center of its motion, is greater, by how much greater
-the velocity is, with which it moves; so such a body, as I have been
-supposing to lie on the earth, would recede from it with the greater
-force, the greater the velocity is, with which the part of the earth’s
-surface it rests upon is moved, that is, the farther distant it is from
-the poles. But now the power of gravity is great enough to prevent
-bodies in any part of the earth from being carried off from it by this
-means; however it is plain that bodies having an effort contrary to
-that of gravity, though much weaker than it, their weight, that is,
-the degree of force, with which they are pressed to the earth, will
-be diminished thereby, and be the more diminished, the greater this
-contrary effort is; or in other words, the same body will weigh heavier
-at either of the poles, than upon any other part of the earth; and if
-any body be removed from the pole towards the equator, it will lose of
-its weight more and more, and be lightest of all at the equator, that
-is, in the middle between the poles.
-
-33. THIS now is easily applied to the waters of the seas, and shews
-that the water under the poles will press more forcibly to the earth,
-than at or near the equator: and consequently that which presses
-least, must give place, till by ascending it makes room for receiving
-a greater quantity, which by its additional weight may place the whole
-upon a ballance. To illustrate this more particularly I shall make
-use of fig. 116 In which let A C B D be a circle, by whose revolution
-about the diameter A B a globe should be formed, representing a globe
-of solid earth. Suppose this globe covered on all sides with water to
-the same height, suppose that of E A or B F, at which distance the
-circle E G F H surrounds the circle A C B D; then it is evident, if the
-globe of earth be at rest, the water which surrounds it will rest in
-that situation. But if the globe be turned incessantly about its axis
-A B, and the water have likewise the same motion, it is also evident,
-from what has been explained, that the water between the circles E H
-F G and A D B C will remain no longer in the present situation, the
-parts of it between H and D, and between G and C being by this rotation
-become lighter, than the parts between E and A and between B and F; so
-that the water over the poles A and B must of necessity subside, and
-the water be accumulated over D and C, till the greater quantity in
-these latter places supply the defect of its weight. This would be the
-case, were the globe all covered with water. And the same figure of the
-surface would also be preserved, if some part of the water adjoining
-to the globe in any part of it were turned into solid earth, as is too
-evident to need any proof; because the parts of the water remaining
-at rest, it is the same thing, whether they continue in the state of
-being easily separable, which denominates them fluid, or were to be
-consolidated together, so as to make a hard body: and this, though the
-water should in some places be thus consolidated, even to the surface
-of it. Which shews that the form of the solid part of the earth makes
-no alteration in the figure the water will take: and by consequence in
-order to the preventing some parts of the earth from being entirely
-overflowed, and other parts quite deserted, the solid parts of the
-earth must have given them much the same figure, as if the whole earth
-were covered on all sides with water.
-
-34. FARTHER, I say, this figure of the earth is the same, as it would
-receive, were it entirely a globe of water, provided that water were of
-the same density as the substance of the globe. For suppose the globe A
-C B D to be liquified, and that the globe E H F G, now entirely water,
-by its rotation about its axis should receive such a figure as we have
-been describing, and then the globe A C B D should be consolidated
-again, the figure of the water would plainly not be altered, by such a
-consolidation.
-
-35. BUT from this last observation our author is enabled to determine
-the proportion between the axis of the earth drawn from pole to pole,
-and the diameter of the equator, upon the supposition that all the
-parts of the earth are of equal density; which he does by computing in
-the first place the proportion of the centrifugal force of the parts
-under the equator to the power of gravity; and then by considering
-the earth as a spheroid, made by the revolution of an ellipsis about
-its lesser axis, that is, supposing the line M I L K to be an exact
-ellipsis, from which it can differ but little, by reason that the
-difference between the lesser axis M L and the greater I K is but very
-small. From this supposition, and what was proved before, that all the
-particles which compose the earth have the attracting power explained
-in the preceding chapter, he finds at what distance the parts under the
-equator ought to be removed from the center, that the force, with which
-they shall be attracted to the center, diminished by their centrifugal
-force, shall be sufficient to keep those parts in a ballance with those
-which lie under the poles. And upon the supposition of all the parts of
-the earth having the same degree of density, the earth’s surface at the
-equator must be above 17 miles more distant from the center, than at
-the poles[275].
-
-36. AFTER this it is shewn, from the proportion of the equatorial
-diameter of the earth to its axis, how the same may be determined of
-any other planet, whose density in comparison of the density of the
-earth, and the time of its revolution about its axis, are known. And
-by the rule delivered for this, it is found, that the diameter of the
-equator in Jupiter should bear to its axis about the proportion of 10
-to 9[276], and accordingly this planet appears of an oval form to the
-astronomers. The most considerable effects of this spheroidical figure
-our author takes likewise into consideration; one of which is that
-bodies are not equally heavy in all distances from the poles; but near
-the equator, where the distance from the center is greatest, they are
-lighter than towards the poles: and nearly in this proportion, that
-the actual power, by which they are drawn to the center, resulting
-from the difference between their absolute gravity and centrifugal
-force, is reciprocally as the distance from the center. That this may
-not appear to contradict what has before been said of the alteration
-of the power of gravity, in proportion to the change of the distance
-from the center, it is proper carefully to remark, that our author
-has demonstrated three things relating hereto: the first is, that
-decrease of the power of gravity as we recede from the center, which
-has been fully explained in the last chapter, upon supposition that
-the earth and planets are perfect spheres, from which their difference
-is by many degrees too little to require notice for the purposes there
-intended: the next is, that whether they be perfect spheres, or exactly
-such spheroids as have now been mentioned, the power of gravity, as
-we descend in the same line to the center, is at all distances as the
-distance from the center, the parts of the earth above the body by
-drawing the body towards them lessening its gravitation towards the
-center[277]; and both these assertions relate to gravity alone: the
-third is what we mentioned in this place, that the actual force on
-different parts of the surface, with which bodies are drawn to the
-center, is in the proportion here assigned[278].
-
-38. THE next effect of this figure of the earth is an obvious
-consequence of the former: that pendulums of the same length do not in
-different distances from the pole make their vibrations in the same
-time; but towards the poles, where the gravity is strongest, they move
-quicker than near the equator, where they are less impelled to the
-center; and accordingly pendulums, that measure the same time by their
-vibrations, must be shorter near the poles than at a greater distance.
-Both which deductions are found true in fact; of which our author has
-recounted particularly several experiments, in which it was found, that
-clocks exactly adjusted to the true measure of time at Paris, when
-transported nearer to the equator, became erroneous and moved too slow,
-but were reduced to their true motion by contracting their pendulums.
-Our author is particular in remarking, how much they lost of their
-motion, while the pendulums remained unaltered; and what length the
-observers are said to have shortened them, to bring them to time. And
-the experiments, which appear to be most carefully made, shew the earth
-to be raised in the middle between the poles, as much as our author
-found it by his computation[279].
-
-39. THESE experiments on the pendulum our author has been very exact
-in examining, inquiring particularly how much the extension of the
-rod of the pendulum by the great heats in the torrid zone might make
-it necessary to shorten it. For by an experiment made by PICART, and
-another made by DE LA HIRE, heat, though not very intense, was found
-to increase the length of rods of iron. The experiment of PICART was
-made with a rod one foot long, which in winter, at the time of frost,
-was found to increase in length by being heated at the fire. In the
-experiment of DE LA HIRE a rod of six foot in length was found, when
-heated by the summer sun only, to grow to a greater length, than it
-had in the aforesaid cold season. From which observations a doubt has
-been raised, whether the rod of the pendulums in the aforementioned
-experiments was not extended by the heat of those warm climates to all
-that excess of length, the observers found themselves obliged to lessen
-them by. But the experiments now mentioned shew the contrary. For in
-the first of them the rod of a foot long was lengthened no more than
-1/9 part of what the pendulum under the equator must be diminished;
-and therefore a rod of the length of the pendulum would not have been
-extended above ⅓ of that length. In the experiment of DE LA HIRE,
-where the heat was less, the rod of six foot long was extended no more
-than 3/10 of what the pendulum must be shortened; so that a rod of the
-length of the pendulum would not have gained above 3/20 or 1/7 of that
-length. And the heat in this latter experiment, though less than in
-the former, was yet greater than the rod of a pendulum can ordinarily
-contract in the hottest country; for metals receive a great heat when
-exposed to the open sun, certainly much greater than that of a human
-body. But pendulums are not usually so exposed, and without doubt in
-these experiments were kept cool enough to appear so to the touch;
-which they would do in the hottest place, if lodged in the shade. Our
-author therefore thinks it enough to allow about 1/10 of the difference
-observed upon account of the greater warmth of the pendulum.
-
-40. THERE is a third effect, which the water has on the earth by
-changing its figure, that is taken notice of by our author; for
-the explaining of which we shall first prove, that bodies descend
-perpendicularly to the surface of the earth in all places. The manner
-of collecting this from observation, is as follows. The surfaces of
-all fluids rest parallel to that part of the surface of the sea, which
-is in the same place with them, to the figure of which, as has been
-particularly shewn, the figure of the whole earth is formed. For if
-any hollow vessel, open at the bottom, be immersed into the sea; it
-is evident, that the surface of the sea within the vessel will retain
-the same figure it had, before the vessel inclosed it; since its
-communication with the external water is not cut off by the vessel.
-But all the parts of the water being at rest, it is as clear, that if
-the bottom of the vessel were closed, the figure of the water could
-receive no change thereby, even though the vessel were raised out of
-the sea; any more than from the insensible alteration of the power of
-gravity, consequent upon the augmentation of the distance from the
-center. But now it is clear, that bodies descend in lines perpendicular
-to the surfaces of quiescent fluids; for if the power of gravity did
-not act perpendicularly to the surface of fluids, bodies which swim on
-them could not rest, as they are seen to do; because, if the power of
-gravity drew such bodies in a direction oblique to the surface whereon
-they lay, they would certainly be put in motion, and be carried to the
-side of the vessel, in which the fluid was contained, that way the
-action of gravity inclined.
-
-41. HENCE it follows, that as we stand, our bodies are perpendicular
-to the surface of the earth. Therefore in going from north to south
-our bodies do not keep in a parallel direction. Now in all distances
-from the pole the same length gone on the earth will not make the same
-change in the position of our bodies, but the nearer we are to the
-poles, we must go greater length to cause the same variation herein.
-Let M I L K (in fig. 117) represent the figure of the earth, M, L the
-poles, I, K two opposite points in the middle between these poles. Let
-T V and P O be two arches, T V being most remote from the pole L; draw
-T W, V X, P Q, O R, each perpendicular to the surface of the earth,
-and let T W, V X meet in Y, and P Q, O R in S. Here it is evident,
-that in passing from V to T the position of a man’s body would be
-changed by the angle under T Y V, for at V he would stand in the line
-Y V continued upward, and at T in the line Y T; but in passing from O
-to P the position of his body would be changed by the angle under O
-S P. Now I say, if these two angles are equal the arch O P is longer
-than T V: for the figure M I L K being oblong, and I K longer than M L,
-the figure will be more incurvated toward I than toward L; so that the
-lines T W and V X will meet in Y before they are drawn out to so great
-a length as the lines P Q and O R must be continued to, before they
-will meet in S. Since therefore Y T and Y V are shorter than P S and S
-V, T V must be less than O P. If these angles under T Y V and O S P are
-each 1/90 part of the angle made by a perpendicular line, they are said
-each to contain one degree. And the unequal length of these arches O P
-and V T gives occasion to the assertion, that in passing from north to
-south the degrees on the earth’s surface are not of an equal length,
-but those near the pole longer than those toward the equator. For the
-length of the arch on the earth lying between the two perpendiculars,
-which make an angle of a degree with each other, is called the length
-of a degree on the earth’s surface.
-
-42. THIS figure of the earth has some effect on eclipses. It has been
-observed above, that sometimes the nodes of the moon’s orbit lie in a
-straight line drawn from the sun to the earth; in which case the moon
-will cross the plane of the earth’s motion at the new and full. But
-whenever the moon passes near the plane at the full, some part of the
-earth will intercept the sun’s light, and the moon shining only with
-light borrow’d from the sun, when that light is prevented from falling
-on any part of the moon, so much of her body will be darkened. Also
-when the moon at the new is near the plane of the earth’s motion, the
-inhabitants on some part of the earth will see the moon come under
-the sun, and the sun thereby be covered from them either wholly or in
-part. Now the figure, which we have shewn to belong to the earth, will
-occasion the shadow of the earth on the moon not to be perfectly round,
-but cause the diameter from east to west to be somewhat longer than
-the diameter from north to south. In eclipse of the sun this figure
-of the earth will make some little difference in the place, where the
-sun shall appear wholly or in any given part covered. Let A B C D (in
-fig. 118.) represent the earth, A C the axis whereon it turns daily,
-E the center. Let F A G C represent a perfect globe inscribed within
-the earth. Let H I be a line drawn through the centers of the sun and
-moon, crossing the surface of the earth in K, and the surface of the
-globe inscribed in L. Draw E L, which will be perpendicular to the
-surface of the globe in L: and draw likewise K M, so that it shall
-be perpendicular to the surface of the earth in K. Now whereas the
-eclipse would appear central at L, if the earth were the globe A G C
-F, and does really appear so at K; I say, the latitude of the place K
-on the real earth is different from the latitude of the place L on the
-globe F A G C. What is called the latitude of any place is determined
-by the angle which the line perpendicular to the surface of the earth
-at that place makes with the axis; the difference between this angle,
-and that made by a perpendicular line or square being called the
-latitude of each place. But it might here be proved, that the angle
-which K M makes with M C is less, than the angle made between L E and
-E C: consequently the latitude of the place K is greater, than the
-latitude, which the place L would have.
-
-43. THE next effect, which follows from this figure of the earth,
-is that gradual change in the distance of the fixed stars from the
-equinoctial points, which astronomers observe. But before this can be
-explained, it is necessary to say something more particular, than has
-yet been done, concerning the manner of the earth’s motion round the
-sun.
-
-44. IT has already been said, that the earth turns round each day on
-its own axis, while its whole body is carried round the sun once in a
-year. How these two motions are joined together may be conceived in
-some degree by the motion of a bowl on the ground, where the bowl in
-rouling on continually turns upon its axis, and at the same time the
-whole body thereof is carried straight on. But to be more express let
-A (in fig. 119) represent the sun B C D E four different situations
-of the earth in its orbit moving about the sun. In all these let F
-G represent the axis, about which the earth daily turns. The points
-F, G are called the poles of the earth; and this axis is supposed to
-keep always parallel to it self in every situation of the earth; at
-least that it would do so, were it not for a minute deviation, the
-cause whereof will be explained in what follows. When the earth is in
-B, the half H I K will be illuminated by the sun, and the other half
-H L K will be in darkness. Now if on the globe any point be taken in
-the middle between the poles, this point shall describe by the motion
-of the globe the circle M N, half of which is in the enlightened part
-of the globe, and half in the dark part. But the earth is supposed to
-move round its axis with an equable motion; therefore on this point of
-the globe the sun will be seen just half the day, and be invisible the
-other half. And the same will happen to every point of this circle, in
-all situations of the earth during its whole revolution round the sun.
-This circle M N is called the equator, of which we have before made
-mention.
-
-45. NOW suppose any other point taken on the surface of the globe
-toward the pole F, which in the diurnal revolution of the globe
-shall describe the circle O P. Here it appears that more than half
-this circle is enlightned by the sun, and consequently that in any
-particular point of this circle the sun will be longer seen than
-lie hid, that is the day will be longer than the night. Again if we
-consider the same circle O P on the globe situated in D the opposite
-part of the orbit from B, we shall see, that here in any place of this
-circle the night will be as much longer than the day.
-
-46. IN these situations of the globe of earth a line drawn from the
-sun to the center of the earth will be obliquely inclined toward the
-axis F G. Now suppose, that such a line drawn from the sun to the
-center of the earth, when in C or E, would be perpendicular to the
-axis F G; in which cases the sun will shine perpendicularly upon the
-equator, and consequently the line drawn from the center of the earth
-to the sun will cross the equator, as it passes through the surface
-of the earth; whereas in all other situations of the globe this line
-will pass through the surface of the globe at a distance from the
-equator either northward or southward. Now in both these cases half the
-circle O P will be in the light, and half in the dark; and therefore
-to every place in this circle the day will be equal to the night. Thus
-it appears, that in these two opposite situations of the earth the
-day is equal to the night in all parts of the globe; but in all other
-situations this equality will only be found in places situated in the
-very middle between the poles, that is, on the equator.
-
-47. THE times, wherein this universal equality between the day and
-night happens, are called the equinoxes. Now it has been long observed
-by astronomers, that after the earth hath set out from either equinox,
-suppose from E (which will be the spring equinox, if F be the north
-pole) the same equinox shall again return a little before the earth has
-made a compleat revolution round the sun. This return of the equinox
-preceding the intire revolution of the earth is called the precession
-of the equinox, and is caused by the protuberant figure of the earth.
-
-49. SINCE the sun shines perpendicularly upon the equator, when the
-line drawn from the sun to the center of the earth is perpendicular to
-the earth’s axis, in this case the plane, which should cut through
-the earth at the equator, may be extended to pass through the sun;
-but it will not do so in any other position of the earth. Now let us
-consider the prominent part of the earth about the equator, as a solid
-ring moving with the earth round the sun. At the time of the equinoxes,
-this ring will have the same kind of situation in respect of the sun,
-as the orbit of the moon has, when the line of the nodes is directed
-to the sun; and at all other times will resemble the moon’s orbit in
-other situations. Consequently this ring, which otherwise would keep
-throughout its motion parallel to it self, will receive some change in
-its position from the action of the sun upon it, except only at the
-time of the equinox. The manner of this change may be understood as
-follows. Let A B C D (in fig. 120) represent this ring, E the center of
-the earth, S the sun, A F C G a circle described in the plane of the
-earth’s motion to the center E. Here A and C are the two points, in
-which the earth’s equator crosses the plane of the earth’s motion; and
-the time of the equinox falls out, when the straight line A C continued
-would pass through the sun. Now let us recollect what was said above
-concerning the moon, when her orbit was in the same situation with this
-ring. From thence it will be understood, if a body were supposed to
-be moving in any part of this circle A B C D, what effect the action
-of the sun on the body would have toward changing the position of the
-line A C. In particular H I being drawn perpendicular to S E, if the
-body be in any part of this circle between A and H, or between C and I,
-the line A C would be so turned, that the point A shall move toward
-B, and the point C toward D; but if it were in any other part of the
-circle, either between H and C, or between I and A, the line A C would
-be turned the contrary way. Hence it follows, that as this solid ring
-turns round the center of the earth, the parts of this ring between A
-and H, and between C and I, are so influenced by the sun, that they
-will endeavour, so to change the situation of the line A C as to cause
-the point A to move toward B, and the point C to move toward D; but all
-the parts of the ring between H and C, and between I and A, will have
-the opposite tendency, and dispose the line A C to move the contrary
-way. And since these last named parts are larger than the other, they
-will prevail over the other, so that by the action of the sun upon this
-ring, the line A C will be so turned, that A shall continually be more
-and more moving toward D, and C toward B. Thus no sooner shall the sun
-in its visible motion have departed from A, but the motion of the line
-A C shall hasten its meeting with C, and from thence the motion of this
-line shall again hasten the sun’s second conjunction with A; for as
-this line so turns, that A is continually moving toward D, so the sun’s
-visible motion is the same way as from S toward T.
-
-49. THE moon will have on this ring the like effect as the sun, and
-operate on it more strongly, in the same proportion as its force on
-the sea exceeded that of the sun on the same. But the effect of the
-action of both luminaries will be greatly diminished by reason of this
-ring’s being connected to the rest of the earth; for by this means the
-sun and moon have not only this ring to move, but likewise the whole
-globe of the earth, upon whose spherical part they have no immediate
-influence. Beside the effect is also rendred less, by reason that the
-prominent part of the earth is not collected all under the equator,
-but spreads gradually from thence toward both poles. Upon the whole,
-though the sun alone carries the nodes of the moon through an intire
-revolution in about 19 years, the united force of both luminaries on
-the prominent parts of the earth will hardly carry round the equinox in
-a less space of time than 26000 years.
-
-50. TO this motion of the equinox we must add another consequence of
-this action of the sun and moon upon the elevated parts of the earth,
-that this annular part of the earth about the equator, and consequently
-the earth’s axis, will twice a year and twice a month change its
-inclination to the plane of the earth’s motion, and be again restored,
-just as the inclination of the moon’s orbit by the action of the sun
-is annually twice diminished, and as often recovers its original
-magnitude. But this change is very insensible.
-
-51. I SHALL now finish the present chapter with our great author’s
-inquiry into the figure of the secondary planets, particularly of our
-moon, upon the figure of which its fluid parts will have an influence.
-The moon turns always the same side towards the earth, and consequently
-revolves but once round its axis in the space of an entire month; for
-a spectator placed without the circle, in which the moon moves, would
-in that time observe all the parts of the moon successively to pass
-once before his view and no more, that is, that the whole globe of the
-moon has turned once round. Now the great slowness of this motion will
-render the centrifugal force of the parts of the waters very weak, so
-that the figure of the moon cannot, as in the earth, be much affected
-by this revolution upon its axis: but the figure of those waters are
-made different from spherical by another cause, viz. the action of
-the earth upon them; by which they will be reduced to an oblong oval
-form, whose axis prolonged would pass through the earth; for the same
-reason, as we have above observed, that the waters of the earth would
-take the like figure, if they had moved so slowly, as to keep pace with
-the moon. And the solid part of the moon must correspond with this
-figure of the fluid part: but this elevation of the parts of the moon
-is nothing near so great as is the protuberance of the earth at the
-equator, for it will not exceed 93 english feet.
-
-52. The waters of the moon will have no tide, except what will arise
-from the motion of the moon round the earth. For the conversion of the
-moon about her axis is equable, whereby the inequality in the motion
-round the earth discovers to us at some times small parts of the moon’s
-surface towards the east or west, which at other times lie hid; and
-as the axis, whereon the moon turns, is oblique to her motion round
-the earth, sometimes small parts of her surface toward the north, and
-sometimes the like toward the south are visible, which at other times
-are out of sight. These appearances make what is called the libration
-of the moon, discovered by HEVELIUS. But now as the axis of the oval
-figure of the waters will he pointed towards the earth, there must
-arise from hence some fluctuation in them; and beside, by the change of
-the moon’s distance from the earth, they will not always have the very
-same height.
-
-[Illustration]
-
-[Illustration]
-
-
-
-
-~BOOK III~.
-
-
-
-
-~CHAP~ I.
-
-Concerning the cause of COLOURS inherent in the LIGHT.
-
-
-AFTER this view which has been taken of Sir ISAAC NEWTON’S mathematical
-principles of philosophy, and the use he has made of them, in
-explaining the system of the world, &c. the course of my design directs
-us to turn our eyes to that other philosophical work, his treatise of
-Optics, in which we shall find our great author’s inimitable genius
-discovering it self no less, than in the former; nay perhaps even
-more, since this work gives as many instances of his singular force
-of reasoning, and of his unbounded invention, though unassisted in
-great measure by those rules and general precepts, which facilitate
-the invention of mathematical theorems. Nor yet is this work inferior
-to the other in usefulness; for as that has made known to us one great
-principle in nature, by which the celestial motions are continued, and
-by which the frame of each globe is preserved; so does this point out
-to us another principle no less universal, upon which depends all those
-operations in the smaller parts of matter, for whose sake the greater
-frame of the universe is erected; all those immense globes, with which
-the whole heavens are filled, being without doubt only design’d as so
-many convenient apartments for carrying on the more noble operations of
-nature in vegetation and animal life. Which single consideration gives
-abundant proof of the excellency of our author’s choice, in applying
-himself carefully to examine the action between light and bodies, so
-necessary in all the varieties of these productions, that none of them
-can be successfully promoted without the concurrence of heat in a
-greater or less degree.
-
-2. ’TIS true, our author has not made so full a discovery of the
-principle, by which this mutual action between light and bodies is
-caused; as he has in relation to the power, by which the planets are
-kept in their courses: yet he has led us to the very entrance upon it,
-and pointed out the path so plainly which must be followed to reach it;
-that one may be bold to say, whenever mankind shall be blessed with
-this improvement of their knowledge, it will be derived so directly
-from the principles laid down by our author in this book, that the
-greatest share of the praise due to the discovery will belong to him.
-
-3. IN speaking of the progress our author has made, I shall distinctly
-pursue three things, the two first relating to the colours of natural
-bodies: for in the first head shall be shewn, how those colours are
-derived from the properties of the light itself; and in the second upon
-what properties of the bodies they depend: but the third head of my
-discourse shall treat of the action of bodies upon light in refracting,
-reflecting, and inflecting it.
-
-4. THE first of these, which shall be the business of the present
-chapter, is contained in this one proposition: that the sun’s direct
-light is not uniform in respect of colour, not being disposed in every
-part of it to excite the idea of whiteness, which the whole raises; but
-on the contrary is a composition of different kinds of rays, one sort
-of which if alone would give the sense of red, another of orange, a
-third of yellow, a fourth of green, a fifth of light blue, a sixth of
-indigo, and a seventh of a violet purple; that all these rays together
-by the mixture of their sensations impress upon the organ of sight
-the sense of whiteness, though each ray always imprints there its own
-colour; and all the difference between the colours of bodies when
-viewed in open day light arises from this, that coloured bodies do not
-reflect all the sorts of rays falling upon them in equal plenty, but
-some sorts much more copiously than others; the body appearing of that
-colour, of which the light coming from it is most composed.
-
-5. THAT the light of the sun is compounded, as has been said, is proved
-by refracting it with a prism. By a prism I here mean a glass or other
-body of a triangular form, such as is represented in fig. 121. But
-before we proceed to the illustration of the proposition we have just
-now laid down, it will be necessary to spend a few words in explaining
-what is meant by the refraction of light; as the design of our present
-labour is to give some notion of the subject, we are engaged in, to
-such as are not versed in the mathematics.
-
-6. IT is well known, that when a ray of light passing through the air
-falls obliquely upon the surface of any transparent body, suppose water
-or glass, and enters it, the ray will not pass on in that body in the
-same line it described through the air, but be turned off from the
-surface, so as to be less inclined to it after passing it, than before.
-Let A B C D (in fig. 122.) represent a portion of water, or glass, A
-B the surface of it, upon which the ray of light E F falls obliquely;
-this ray shall not go right on in the course delineated by the line
-F G, but be turned off from the surface A B into the line F H, less
-inclined to the surface A B than the line E F is, in which the ray is
-incident upon that surface.
-
-7. ON the other hand, when the light passes out of any such body into
-the air, it is inflected the contrary way, being after its emergence
-rendred more oblique to the surface it passes through, than before.
-Thus the ray F H, when it goes out of the surface C D, will be turned
-up towards that surface, going out into the air in the line H I.
-
-8. THIS turning of the light out of its way, as it passes from one
-transparent body into another is called its refraction. Both these
-cases may be tried by an easy experiment with a bason and water. For
-the first case set an empty bason in the sunshine or near a candle,
-making a mark upon the bottom at the extremity of the shadow cast
-by the brim of the bason, then by pouring water into the bason you
-will observe the shadow to shrink, and leave the bottom of the bason
-enlightned to a good distance from the mark. Let A B C (in fig. 123.)
-denote the empty bason, E A D the light shining over the brim of it,
-so that all the part A B D be shaded. Then a mark being made at D, if
-water be poured into the bason (as in fig. 124.) to F G, you shall
-observe the light, which before went on to D, now to come much short of
-the mark D, falling on the bottom in the point H, and leaving the mark
-D a good way within the enlightened part; which shews that the ray E A,
-when it enters the water at I, goes no longer straight forwards, but is
-at that place incurvated, and made to go nearer the perpendicular. The
-other case may be tryed by putting any small body into an empty bason,
-placed lower than your eye, and then receding from the bason, till you
-can but just see the body over the brim. After which, if the bason be
-filled with water, you shall presently observe the body to be visible,
-though you go farther off from the bason. Let A B C (in fig. 125.)
-denote the bason as before, D the body in it, E the place of your eye,
-when the body is seen just over the edge A, while the bason is empty.
-If it be then filled with water, you will observe the body still to be
-visible, though you take your eye farther off. Suppose you see the body
-in this case just over the brim A, when your eye is at F, it is plain
-that the rays of light, which come from the body to your eye have not
-come straight on, but are bent at A, being turned downwards, and more
-inclined to the surface of the water, between A and your eye at F, than
-they are between A and the body D.
-
-9. THIS we hope is sufficient to make all our readers apprehend,
-what the writers of optics mean, when they mention the refraction
-of the light, or speak of the rays of light being refracted. We
-shall therefore now go on to prove the assertion advanced in the
-forementioned proposition, in relation to the different kinds of
-colours, that the direct light of the sun exhibits to our sense: which
-may be done in the following manner.
-
-10. IF a room be darkened, and the sun permitted to shine into it
-through a small hole in the window shutter, and be made immediately to
-fall upon a glass prism, the beam of light shall in passing through
-such a prism be parted into rays, which exhibit all the forementioned
-colours. In this manner if A B (in fig. 126) represent the window
-shutter; C the hole in it; D E F the prism; Z Y a beam of light coming
-from the sun, which passes through the hole, and falls upon the prism
-at Y, and if the prism were removed would go on to X, but in entring
-the surface B F of the glass it shall be turned off, as has been
-explained, into the course Y W falling upon the second surface of the
-prism D F in W, going out of which into the air it shall be again
-farther inflected. Let the light now, after it has passed the prism, be
-received upon a sheet of paper held at a proper distance, and it shall
-paint upon the paper the picture, image, or spectrum L M of an oblong
-figure, whose length shall much exceed its breadth; though the figure
-shall not be oval, the ends L and M being semicircular and the sides
-straight. But now this figure will be variegated with colours in this
-manner. From the extremity M to some length, suppose to the line _n
-o_, it shall be of an intense red; from _n o_ to _p q_ it shall be an
-orange; from _p q_ to _r s_ it shall be yellow; from thence to _t u_ it
-shall be green; from thence to _w x_ blue; from thence to _y z_ indigo;
-and from thence to the end violet.
-
-11. THUS it appears that the sun’s white light by its passage through
-the prism, is so changed as now to be divided into rays, which exhibit
-all these several colours. The question is, whether the rays while
-in the sun’s beam before this refraction possessed these properties
-distinctly; so that some part of that beam would without the rest have
-given a red colour, and another part alone have given an..orange,
-&c. That this is possible to be the case, appears from hence; that if
-a convex glass be placed between the paper and the prism, which may
-collect all the rays proceeding out of the prism into its focus, as a
-burning glass does the sun’s direct rays; and if that focus fall upon
-the paper, the spot formed by such a glass upon the paper shall appear
-white, just like the sun’s direct light.
-
-[Illustration]
-
-The rest remaining as before, let P Q. (in fig. 127.) be the convex
-glass, causing the rays to meet upon the paper H G I K in the point N,
-I say that point or rather spot of light shall appear white, without
-the least tincture of any colour. But it is evident that into this
-spot are now gathered all those rays, which before when separate gave
-all those different colours; which shews that whiteness may be made by
-mixing those colours: especially if we consider, it can be proved that
-the glass P Q does not alter the colour of the rays which pass through
-it. Which is done thus: if the paper be made to approach the glass P
-Q, the colours will manifest themselves as far as the magnitude of the
-spectrum, which the paper receives, will permit. Suppose it in the
-situation _h g i k_, and that it then receive the spectrum _l m_, this
-spectrum shall be much smaller, than if the glass P Q were removed,
-and therefore the colours cannot be so much separated; but yet the
-extremity _m_ shall manifestly appear red, and the other extremity _l_
-shall be blue; and these colours as well as the intermediate ones shall
-discover themselves more perfectly, the farther the paper is removed
-from N, that is, the larger the spectrum is: the same thing happens,
-if the paper be removed farther off from P Q than N. Suppose into the
-position θ γ η ϰ, the spectrum λ μ painted upon it shall again discover
-its colours, and that more distinctly, the farther the paper is
-removed, but only in an inverted order: for as before, when the paper
-was nearer the convex glass, than at N, the upper part of the image was
-blue, and the under red; now the upper part shall be red, and the under
-blue: because the rays cross at N.
-
-12. NAY farther that the whiteness at the focus N, is made by the union
-of the colours may be proved without removing the paper out of the
-focus, by intercepting with any opake body part of the light near the
-glass; for if the under part, that is the red, or more properly the
-red-making rays, as they are styled by our author, are intercepted,
-the spot shall take a bluish hue; and if more of the inferior rays are
-cut off, so that neither the red-making nor orange-making rays, and if
-you please the yellow-making rays likewise, shall fall upon the spot;
-then shall the spot incline more and more to the remaining colours.
-In like manner if you cut off the upper part of the rays, that is the
-violet coloured or indigo-making rays, the spot shall turn reddish, and
-become, more so, the more of those opposite colours are intercepted.
-
-13. THIS I think abundantly proves that whiteness may be produced by a
-mixture of all the colours of the spectrum. At least there is but one
-way of evading the present arguments, which is, by asserting that the
-rays of light after passing the prism have no different properties to
-exhibit this or the other colour, but are in that respect perfectly
-homogeneal, so that the rays which pass to the under and red part of
-the image do not differ in any properties whatever from those, which
-go to the upper and violet part of it; but that the colours of the
-spectrum are produced only by some new modifications of the rays, made
-at their incidence upon the paper by the different terminations of
-light and shadow: if indeed this assertion can be allowed any place,
-after what has been said; for it seems to be sufficiently obviated
-by the latter part of the preceding experiment, that by intercepting
-the inferior part of the light, which comes from the prism, the white
-spot shall receive a bluish cast, and by stopping the upper part the
-spot shall turn red, and in both cases recover its colour, when the
-intercepted light is permitted to pass again; though in all these
-trials there is the like termination of light and shadow. However our
-author has contrived some experiments expresly to shew the absurdity of
-this supposition; all which he has explained and enlarged upon in so
-distinct and expressive a manner, that it would be wholly unnecessary
-to repeat them in this place[280]. I shall only mention that of them,
-which may be tried in the experiment before us. If you draw upon
-the paper H G I K, and through the spot N, the straight line _w x_
-parallel to the horizon, and then if the paper be much inclined into
-the situation _r s v t_ the line _w x_ still remaining parallel to
-the horizon, the spot N shall lose its whiteness and receive a blue
-tincture; but if it be inclined as much the contrary way, the same
-spot shall exchange its white colour for a reddish dye. All which can
-never be accounted for by any difference in the termination of the
-light and shadow, which here is none at all; but are easily explained
-by supposing the upper part of the rays, whenever they enter the eye,
-disposed to give the sensation of the dark colours blue, indigo and
-violet; and that the under part is fitted to produce the bright colours
-yellow, orange and red: for when the paper is in the situation _r s t
-u_, it is plain that the upper part of the light falls more directly
-upon it, than the under part, and therefore those rays will be most
-plentifully reflected from it; and by their abounding in the reflected
-light will cause it to incline to their colour. Just so when the paper
-is inclined the contrary way, it will receive the inferior rays most
-directly, and therefore ting the light it reflects with their colour.
-
-14. IT is now to be proved that these dispositions of the rays of
-light to produce some one colour and some another, which manifest
-themselves after their being refracted, are not wrought by any action
-of the prism upon them, but are originally inherent in those rays; and
-that the prism only affords each species an occasion of shewing its
-distinct quality by separating them one from another, which before,
-while they were blended together in the direct beam of the sun’s light,
-lay conceal’d. But that this is so, will be proved, if it can be shewn
-that no prism has any power upon the rays, which after their passage
-through one prism are rendered uncompounded and contain in them but one
-colour, either to divide that colour into several, as the sun’s light
-is divided, or so much as to change it into any other colour. This will
-be proved by the following experiment[281]. The same thing remaining,
-as in the first experiment, let another prism N O (in fig. 128.) be
-placed either immediately, or at some distance after the first, in a
-perpendicular posture, so that it shall refract the rays issuing from
-the first sideways. Now if this prism could divide the light falling
-upon it into coloured rays, as the first has done, it would divide the
-spectrum breadthwise into colours, as before it was divided lengthwise;
-but no such thing is observed. If L M were the spectrum, which the
-first prism D E F would paint upon the paper H G I K; P Q lying in an
-oblique posture shall be the spectrum projected by the second, and
-shall be divided lengthwise into colours corresponding to the colours
-of the spectrum L M, and occasioned like them by the refraction of the
-first prism, but its breadth shall receive no such division; on the
-contrary each colour shall be uniform from side to side, as much as in
-the spectrum L M, which proves the whole assertion.
-
-15. THE same is yet much farther confirmed by another experiment.
-Our author teaches that the colours of the spectrum L M in the first
-experiment are yet compounded, though not so much as in the sun’s
-direct light. He shews therefore how, by placing the prism at a
-distance from the hole, and by the use of a convex glass, to separate
-the colours of the spectrum, and make them uncompounded to any degree
-of exactness[282]. And he shews when this is done sufficiently, if
-you make a small hole in the paper whereon the spectrum is received,
-through which any one sort of rays may pass, and then let that coloured
-ray fall so upon a prism, as to be refracted by it, it shall in no case
-whatever change its colour; but shall always retain it perfectly as at
-first, however it be refracted[283].
-
-16. NOR yet will these colours after this full separation of them
-suffer any change by reflection from bodies of different colours; on
-the other hand they make all bodies placed in these colours appear of
-the colour which falls upon them[284]: for minium in red light will
-appear as in open day light; but in yellow light will appear yellow;
-and which is more extraordinary, in green light will appear green, in
-blue, blue; and in the violet-purple coloured light will appear of a
-purple colour; in like manner verdigrease, or blue bise, will put on
-the appearance of that colour, in which it is placed; so that neither
-bise placed in the red light shall be able to give that light the least
-blue tincture, or any other different from red; nor shall minium in
-the indigo or violet light exhibit the least appearance of red, or any
-other colour distinct from that it is placed in. The only difference
-is, that each of these bodies appears most luminous and bright in the
-colour, which corresponds with that it exhibits in the day light, and
-dimmed in the colours most remote from that; that is, though minium and
-bise placed in blue light shall both appear blue, yet the bise shall
-appear of a bright blue, and the minium of a dusky and obscure blue:
-but if minium and bise be compared together in red light, the minium
-shall afford a brisk red, the bise a duller colour, though of the same
-species.
-
-17. AND this not only proves the immutability of all these simple
-and uncompounded colours; but likewise unfolds the whole mystery,
-why bodies appear in open day-light of such different colours, it
-consisting in nothing more than this, that whereas the white light of
-the day is composed of all sorts of colours, some bodies reflect the
-rays of one sort in greater abundance than the rays of any other[285].
-Though it appears by the fore-cited experiment, that almost all these
-bodies reflect some portion of the rays of every colour, and give the
-sense of particular colours only by the predominancy of some sorts of
-rays above the rest. And what has before been explained of composing
-white by mingling all the colours of the spectrum together shews
-clearly, that nothing more is required to make bodies look white,
-than a power to reflect indifferently rays of every colour. But this
-will more fully appear by the following method: if near the coloured
-spectrum in our first experiment a piece of white paper be so held, as
-to be illuminated equally by all the parts of that spectrum, it shall
-appear white; whereas if it be held nearer to the red end of the image,
-than to the other, it shall turn reddish; if nearer the blue end, it
-shall seem bluish[286].
-
-18. OUR indefatigable and circumspect author farther examined his
-theory by mixing the powders which painters use of several colours, in
-order if possible to produce a white powder by such a composition[287].
-But in this he found some difficulties for the following reasons. Each
-of these coloured powders reflects but part of the light, which is
-cast upon them; the red powders reflecting little green or blue, and
-the blue powders reflecting very little red or yellow, nor the green
-powders reflecting near so much of the red or indigo and purple, as
-of the other colours: and besides, when any of these are examined in
-homogeneal light, as our author calls the colours of the prism, when
-well separated, though each appears more bright and luminous in its
-own day-light colour, than in any other; yet white bodies, suppose
-white paper for instance, in those very colours exceed these coloured
-bodies themselves in brightness; so that white bodies reflect not only
-more of the whole light than coloured bodies do in the day-light, but
-even more of that very colour which they reflect most copiously. All
-which considerations make it manifest that a mixture of these will not
-reflect so great a quantity of light, as a white body of the same size;
-and therefore will compose such a colour as would result from a mixture
-of white and black, such as are all grey and dun colours, rather than a
-strong white. Now such a colour he compounded of certain ingredients,
-which he particularly sets down, in so much that when the composition
-was strongly illuminated by the sun’s direct beams, it would appear
-much whiter than even white paper, if considerably shaded. Nay he
-found by trials how to proportion the degree of illumination of the
-mixture and paper, so that to a spectator at a proper distance it
-could not well be determined which was the more perfect colour; as he
-experienced not only by himself, but by the concurrent opinion of a
-friend, who chanced to visit him while he was trying this experiment.
-I must not here omit another method of trying the whiteness of such a
-mixture, proposed in one of our author’s letters on this subject[288]:
-which is to enlighten the composition by a beam of the sun let into a
-darkened room, and then to receive the light reflected from it upon a
-piece of white paper, observing whether the paper appears white by that
-reflection; for if it does, it gives proof of the composition’s being
-white; because when the paper receives the reflection from any coloured
-body, it looks of that colour. Agreeable to this is the trial he made
-upon water impregnated with soap, and agitated into a froth[289]:
-for when this froth after some short time exhibited upon the little
-bubbles, which composed it, a great variety of colours, though these
-colours to a spectator at a small distance discover’d themselves
-distinctly; yet when the eye was so far removed, that each little
-bubble could no longer be distinguished, the whole froth by the mixture
-of all these colours appeared intensly white.
-
-19. OUR author having fully satisfied himself by these and many other
-experiments, what the result is of mixing together all the prismatic
-colours; he proceeds in the next place to examine, whether this
-appearance of whiteness be raised by the rays of these different kinds
-acting so, when they meet, upon one another, as to cause each of them
-to impress the sense of whiteness upon the optic nerve; or whether each
-ray does not make upon the organ of sight the same impression, as when
-separate and alone; so that the idea of whiteness is not excited by the
-impression from any one part of the rays, but results from the mixture
-of all those different sensations. And that the latter sentiment is the
-true one, he evinces by undeniable experiments.
-
-20. IN particular the foregoing experiment[290], wherein the convex
-glass was used, furnishes proofs of this: in that when the paper is
-brought into the situation θ γ η ϰ, beyond, beyond N the colours, that
-at N disappeared, begin to emerge again; which shews that by mingling
-at N they did not lose their colorific qualities, though for some
-reason they lay concealed. This farther appears by that part of the
-experiment, when the paper, while in the focus, was directed to be
-enclined different ways; for when the paper was in such a situation,
-that it must of necessity reflect the rays, which before their arrival
-at the point N would have given a blue colour, those rays in this
-very point itself by abounding in the reflected light tinged it with
-the same colour; so when the paper reflects most copiously the rays,
-which before they come to the point N exhibit redness, those same rays
-tincture the light reflected by the paper from that very point with
-their own proper colour.
-
-21. THERE is a certain condition relating to sight, which affords an
-opportunity of examining this still more fully: it is this, that the
-impressions of light remain some short space upon the eye; as when a
-burning coal is whirl’d about in a circle, if the motion be very quick,
-the eye shall not be able to distinguish the coal, but shall see an
-entire circle of fire. The reason of which appearance is, that the
-impression made by the coal upon the eye in any one situation is not
-worn out, before the coal returns again to the same place, and renews
-the sensation. This gives our author the hint to try, whether these
-colours might not be transmitted successively to the eye so quick,
-that no one of the colours should be distinctly perceived, but the
-mixture of the sensations should produce a uniform whiteness; when the
-rays could not act upon each other, because they never should meet,
-but come to the eye one after another. And this thought he executed
-by the following expedient[291]. He made an instrument in shape like
-a comb, which he applied near the convex glass, so that by moving it
-up and down slowly the teeth of it might intercept sometimes one and
-sometimes another colour; and accordingly the light reflected from the
-paper, placed at N, should change colour continually. But now when the
-comb-like instrument was moved very quick, the eye lost all preception
-of the distinct colours, which came to it from time to time, a perfect
-whiteness resulting from the mixture of all those distinct impressions
-in the sensorium. Now in this case there can be no suspicion of the
-several coloured rays acting upon one another, and making any change in
-each other’s manner of affecting the eye, seeing they do not so much as
-meet together there.
-
-22. OUR author farther teaches us how to view the spectrum of colours
-produced in the first experiment with another prism, so that it shall
-appear to the eye under the shape of a round spot and perfectly
-white[292]. And in this case if the comb be used to intercept
-alternately some of the colours, which compose the spectrum, the round
-spot shall change its colour according to the colours intercepted; but
-if the comb be moved too swiftly for those changes to be distinctly
-perceived, the spot shall seem always white, as before[293].
-
-23. BESIDES this whiteness, which results from an universal composition
-of all sorts of colours, our author particularly explains the effects
-of other less compounded mixtures; some of which compound other colours
-like some of the simple ones, but others produce colours different
-from any of them. For instance, a mixture of red and yellow compound
-a colour like in appearance to the orange, which in the spectrum lies
-between them; as a composition of yellow and blue is made use of in all
-dyes to make a green. But red and violet purple compounded make purples
-unlike to any of the prismatic colours, and these joined with yellow
-or blue make yet new colours. Besides one rule is here to be observed,
-that when many different colours are mixed, the colour which arises
-from the mixture grows languid and degenerates into whiteness. So when
-yellow green and blue are mixed together, the compound will be green;
-but if to this you add red and purple, the colour shall first grow dull
-and less vivid, and at length by adding more of these colours it shall
-turn to whiteness, or some other colour[294].
-
-24. ONLY here is one thing remarkable of those compounded colours,
-which are like in appearance to the simple ones; that the simple
-ones when viewed through a prism shall still retain their colour,
-but the compounded colours seen through such a glass shall be parted
-into the simple ones of which they are the aggregate. And for this
-reason any body illuminated by the simple light shall appear through
-a prism distinctly, and have its minutest parts observable, as may
-easily be tried with flies, or other such little bodies, which have
-very small parts; but the same viewed in this manner when enlighten’d
-with compounded colours shall appear confused, their smallest parts
-not being distinguishable. How the prism separates these compounded
-colours, as likewise how it divides the light of the sun into its
-colours, has not yet been explained; but is reserved for our third
-chapter.
-
-25. IN the mean time what has been said, I hope, will suffice to
-give a taste of our author’s way of arguing, and in some measure to
-illustrate the proposition laid down in this chapter.
-
-26. THERE are methods of separating the heterogeneous rays of the
-sun’s light by reflection, which perfectly conspire with and confirm
-this reasoning. One of which ways may be this. Let A B (in fig. 129)
-represent the window shutter of a darkened room; C a hole to let in
-the sun’s rays; D E F, G H I two prisms so applied together, that the
-sides E F and G I be contiguous, and the sides D F, G H parallel; by
-this means the light will pass through them without any separation
-into colours: but if it be afterwards received by a third prism I K L,
-it shall be divided so as to form upon any white body P Q the usual
-colours, violet at _m_, blue at _n_, green at _o_, yellow at _r_, and
-red at _s_. But because it never happens that the two adjacent surfaces
-E F and G I perfectly touch, part only of the light incident upon the
-surface E F shall be transmitted, and part shall be reflected. Let now
-the reflected part be received by a fourth prism Δ Θ Λ, and passing
-through it paint upon a white body Ζ Γ the colours of the prism, red
-at _t_, yellow at _u_, green at _w_, blue at _x_, violet at _y_. If
-the prisms D E F, G H I be slowly turned about while they remain
-contiguous, the colours upon the body P Q shall not sensibly change
-their situation, till such time as the rays become pretty oblique to
-the surface E F; but then the light incident upon the surface E F shall
-begin to be wholly reflected. And first of all the violet light shall
-be wholly reflected, and thereupon will disappear at _m_, appearing
-instead thereof at _y_, and increasing the violet light falling there,
-the other colours remaining as before. If the prisms D E F, G H I be
-turned a little farther about, that the incident rays become yet more
-inclined to the surface E F, the blue shall be totally reflected, and
-shall disappear in _n_, but appear at _x_ by making the colour there
-more intense. And the same may be continued, till all the colours are
-successively removed from the surface P Q to Ζ Γ. But in any case,
-suppose when the violet and the blue have forsaken the surface P Q,
-and appear upon the surface Ζ Γ, Ζ Γ, the green, yellow, and red only
-remaining upon the surface P Q; if the light be received upon a paper
-held any where in its whole passage between the light’s coming out of
-the prisms D E F, G I H and its incidence upon the prism I K L, it
-shall appear of the colour compounded of all the colours seen upon P
-Q; and the reflected ray, received upon a piece of white paper held
-any where between the prisms D E F and Δ Θ Σ shall exhibit the colour
-compounded of those the surface P Q is deprived of mixed with the sun’s
-light: whereas before any of the light was reflected from the surface
-E F, the rays between the prisms G H I and I K L would appear white;
-as will likewise the reflected ray both before and after the total
-reflection, provided the difference of refraction by the surfaces D F
-and D E be inconsiderable. I call here the sun’s light white, as I have
-all along done; but it is more exact to ascribe to it something of a
-yellowish tincture, occasioned by the brighter colours abounding in it;
-which caution is necessary in examining the colours of the reflected
-beam, when all the violet and blue are in it: for this yellowish turn
-of the sun’s light causes the blue not to be quite so visible in it,
-as it should be, were the light perfectly white; but makes the beam of
-light incline rather towards a pale white.
-
-
-
-
-~CHAP~. II.
-
-Of the properties of BODIES, upon which their COLOURS depend.
-
-
-AFTER having shewn in the last chapter, that the difference between
-the colours of bodies viewed in open day-light is only this, that some
-bodies are disposed to reflect rays of one colour in the greatest
-plenty, and other bodies rays of some other colour; order now requires
-us to examine more particularly into the property of bodies, which
-gives them this difference. But this our author shews to be nothing
-more, than the different magnitude of the particles, which compose each
-body: this I question not will appear no small paradox. And indeed
-this whole chapter will contain scarce any assertions, but what will
-be almost incredible, though the arguments for them are so strong and
-convincing, that they force our assent. In the former chapter have
-been explained properties of light, not in the least thought of before
-our author’s discovery of them; yet are they not difficult to admit,
-as soon as experiments are known to give proof of their reality; but
-some of the propositions to be stated here will, I fear, be accounted
-almost past belief; notwithstanding that the arguments, by which they
-are established are unanswerable. For it is proved by our author, that
-bodies are rendered transparent by the minuteness of their pores, and
-become opake by having them large; and more, that the most transparent
-body by being reduced to a great thinness will become less pervious to
-the light.
-
-2. BUT whereas it had been the received opinion, and yet remains so
-among all who have not studied this philosophy, that light is reflected
-from bodies by its impinging against their solid parts, rebounding from
-them, as a tennis ball or other elastic substance would do, when struck
-against any hard and resisting surface; it will be proper to begin with
-declaring our author’s sentiment concerning this, who shews by many
-arguments that reflection cannot be caused by any such means[295]: some
-few of his proofs I shall set down, referring the reader to our author
-himself for the rest.
-
-3. IT is well known, that when light falls upon any transparent body,
-glass for instance, part of it is reflected and part transmitted;
-for which it is ready to account, by saying that part of the light
-enters the pores of the glass, and part impinges upon its solid
-parts. But when the transmitted light arrives at the farther surface
-of the glass, in passing out of glass into air there is as strong a
-reflection caused, or rather something stronger. Now it is not to
-be conceived, how the light should find as many solid parts in the
-air to strike against as in the glass, or even a greater number of
-them. And to augment the difficulty, if water be placed behind the
-glass, the reflection becomes much weaker. Can we therefore say, that
-water has fewer solid parts for the light to strike against, than the
-air? And if we should, what reason can be given for the reflection’s
-being stronger, when the air by the air-pump is removed from behind
-the glass, than when the air receives the rays of light. Besides the
-light may be so inclined to the hinder surface of the glass, that it
-shall wholly be reflected, which happens when the angle which the
-ray makes with the surface does not exceed about 49⅓ degrees; but if
-the inclination be a very little increased, great part of the light
-will be transmitted; and how the light in one case should meet with
-nothing but the solid parts of the air, and by so small a change of
-its inclination find pores in great plenty, is wholly inconceivable.
-It cannot be said, that the light is reflected by striking against
-the solid parts of the surface of the glass; because without making
-any change in that surface, only by placing water contiguous to it
-instead of air, great part of that light shall be transmitted, which
-could find no passage through the air. Moreover in the last experiment
-recited in the preceding chapter, when by turning the prisms D E F, G
-H I, the blue light became wholly reflected, while the rest was mostly
-transmitted, no possible reason can be assigned, why the blue-making
-rays should meet with nothing but the solid parts of the air between
-the prisms, and the rest of the light in the very same obliquity find
-pores in abundance. Nay farther, when two glasses touch each other, no
-reflection at all is made; though it does not in the least appear,
-how the rays should avoid the solid parts of glass, when contiguous
-to other glass, any more than when contiguous to air. But in the last
-place upon this supposition it is not to be comprehended, how the most
-polished substances could reflect the light in that regular manner we
-find they do; for when a polished looking glass is covered over with
-quicksilver, we cannot suppose the particles of light so much larger
-than those of the quicksilver that they should not be scattered as
-much in reflection, as a parcel of marbles thrown down upon a rugged
-pavement. The only cause of so uniform and regular a reflection must be
-some more secret cause, uniformly spread over the whole surface of the
-glass.
-
-4. BUT now, since the reflection of light from bodies does not depend
-upon its impinging against their solid parts, some other reason must
-be sought for. And first it is past doubt that the least parts of
-almost all bodies are transparent, even the microscope shewing as
-much[296]; besides that it may be experienced by this method. Take any
-thin plate of the opakest body, and apply it to a small hole designed
-for the admission of light into a darkened room; however opake that
-body may seem in open day-light, it shall under these circumstances
-sufficiently discover its transparency, provided only the body be very
-thin. White metals indeed do not easily shew themselves transparent in
-these trials, they reflecting almost all the light incident upon them
-at their first superficies; the cause of which will appear in what
-follows[297]. But yet these substances, when reduced into parts of
-extraordinary minuteness by being dissolved in aqua fortis or the like
-corroding liquors do also become transparent.
-
-5. SINCE therefore the light finds free passage through the least
-parts of bodies, let us consider the largeness of their pores, and
-we shall find, that whenever a ray of light has passed through any
-particle of a body, and is come to its farther surface, if it finds
-there another particle contiguous, it will without interruption pass
-into that particle; just as light will pass through one piece of glass
-into another piece in contact with it without any impediment, or any
-part being reflected: but as the light in passing out of glass, or any
-other transparent body, shall part of it be reflected back, if it enter
-into air or other transparent body of a different density from that
-it passes out of; the same thing will happen in the light’s passage
-through any particle of a body, whenever at its exit out of that
-particle it meets no other particle contiguous, but must enter into a
-pore, for in this case it shall not all pass through, but part of it
-be reflected back. Thus will the light, every time it enters a pore,
-be in part reflected; so that nothing more seems necessary to opacity,
-than that the particles, which compose any body, touch but in very
-few places, and that the pores of it are numerous and large, so that
-the light may in part be reflected from it, and the other part, which
-enters too deep to be returned out of the body, by numerous reflections
-may be stifled and lost[298]; which in all probability happens, as
-often as it impinges against the solid part of the body, all the light
-which does so not being reflected back, but stopt, and deprived of any
-farther motion[299].
-
-6. THIS notion of opacity is greatly confirmed by the observation,
-that opake bodies become transparent by filling up the pores with any
-substance of near the same density with their parts. As when paper
-is wet with water or oyl; when linnen cloth is either dipt in water,
-oyled, or varnished; or the oculus mundi stone steeped in water[300].
-All which experiments confirm both the first assertion, that light is
-not reflected by striking upon the solid parts of bodies; and also
-the second, that its passage is obstructed by the reflections it
-undergoes in the pores; since we find it in these trials to pass in
-greater abundance through bodies, when the number of their solid parts
-is increased, only by taking away in great measure those reflections;
-which filling the pores with a substance of near the same density
-with the parts of the body will do. Besides as filling the pores of a
-dark body makes it transparent; so on the other hand evacuating the
-pores of a body transparent, or separating the parts of such a body,
-renders it opake. As salts or wet paper by being dried, glass by being
-reduced to powder or the surface made rough; and it is well known that
-glass vessels discover cracks in them by their opacity. Just so water
-itself becomes impervious to the light by being formed into many small
-bubbles, whether in froth, or by being mixed and agitated with any
-quantity of a liquor with which it will not incorporate, such as oyl
-of turpentine, or oyl olive.
-
-7. A CERTAIN electrical experiment made by Mr. HAUKSBEE may not perhaps
-be useless to clear up the present speculation, by shewing that
-something more is necessary besides mere porosity for transmitting
-freely other fine substances. The experiment is this; that a glass cane
-rubbed till it put forth its electric quality would agitate leaf brass
-inclosed under a glass vessel, though not at so great a distance, as if
-no body had intervened; yet the same cane would lose all its influence
-on the leaf brass by the interposition of a piece of the finest muslin,
-whose pores are immensely larger and more patent than those of glass.
-
-8. THUS I have endeavoured to smooth my way, as much as I could, to
-the unfolding yet greater secrets in nature; for I shall now proceed
-to shew the reason why bodies appear of different colours. My reader
-no doubt will be sufficiently surprized, when I inform him that the
-knowledge of this is deduced from that ludicrous experiment, with which
-children divert themselves in blowing bubbles of water made tenacious
-by the solution of soap. And that these bubbles, as they gradually grow
-thinner and thinner till they break, change successively their colours
-from the same principle, as all natural bodies preserve theirs.
-
-9. OUR author after preparing water with soap, so as to render it very
-tenacious, blew it up into a bubble, and placing it under a glass,
-that it might not be irregularly agitated by the air, observed as
-the water by subsiding changed the thickness of the bubble, making
-it gradually less and less till the bubble broke; there successively
-appeared colours at the top of the bubble, which spread themselves
-into rings surrounding the top and descending more and more, till they
-vanished at the bottom in the same order in which they appeared[301].
-The colours emerged in this order: first red, then blue; to which
-succeeded red a second time, and blue immediately followed; after that
-red a third time, succeeded by blue; to which followed a fourth red,
-but succeeded by green; after this a more numerous order of colours,
-first red, then yellow, next green, and after that blue, and at last
-purple; then again red, yellow, green, blue, violet followed each other
-in order; and in the last place red, yellow, white, blue; to which
-succeeded a dark spot, which reflected scarce any light, though our
-author found it did make some very obscure reflection, for the image of
-the sun or a candle might be faintly discerned upon it; and this last
-spot spread itself more and more, till the bubble at last broke. These
-colours were not simple and uncompounded colours, like those which
-are exhibited by the prism, when due care is taken to separate them;
-but were made by a various mixture of those simple colours, as will
-be shewn in the next chapter: whence these colours, to which I have
-given the name of blue, green, or red, were not all alike, but differed
-as follows. The blue, which appeared next the dark spot, was a pure
-colour, but very faint, resembling the sky-colour; the white next to
-it a very strong and intense white, brighter much than the white, which
-the bubble reflected, before any of the colours appeared. The yellow
-which preceded this was at first pretty good, but soon grew dilute;
-and the red which went before the yellow at first gave a tincture of
-scarlet inclining to violet, but soon changed into a brighter colour;
-the violet of the next series was deep with little or no redness in
-it; the blue a brisk colour, but came much short of the blue in the
-next order; the green was but dilute and pale; the yellow and red were
-very bright and full, the best of all the yellows which appeared among
-any of the colours: in the preceding orders the purple was reddish,
-but the blue, as was just now said, the brightest of all; the green
-pretty lively better than in the order which appeared before it, though
-that was a good willow green; the yellow but small in quantity, though
-bright; the red of this order not very pure: those which appeared
-before yet more obscure, being very dilute and dirty; as were likewise
-the three first blues.
-
-10. NOW it is evident, that these colours arose at the top of the
-bubble, as it grew by degrees thinner and thinner: but what the express
-thickness of the bubble was, where each of these colours appeared upon
-it, could not be determined by these experiments; but was found by
-another means, viz. by taking the object glass of a long telescope,
-which is in a small degree convex, and placing it upon a flat glass,
-so as to touch it in one point, and then water being put between them,
-the same colours appeared as in the bubble, in the form of circles or
-rings surrounding the point where the glasses touched, which appeared
-black for want of any reflection from it, like the top of the bubble
-when thinnest[302]: next to this spot lay a blue circle, and next
-without that a white one; and so on in the same order as before,
-reckoning from the dark spot. And henceforward I shall speak of each
-colour, as being of the first, second, or any following order, as it is
-the first, second, or any following one, counting from the black spot
-in the center of these rings; which is contrary to the order in which
-I must have mentioned them, if I should have reputed them the first,
-second, or third, &c. in order, as they arise after one another upon
-the top of the bubble.
-
-11. But now by measuring the diameters of each of these rings, and
-knowing the convexity of the telescope glass, the thickness of the
-water at each of those rings may be determined with great exactness:
-for instance the thickness of it, where the white light of the first
-order is reflected, is about 3⅞ such parts, of which an inch contains
-1000000[303]. And this measure gives the thickness of the bubble, where
-it appeared of this white colour, as well as of the water between the
-glasses; though the transparent body which surrounds the water in these
-two cases be very different: for our author found, that the condition
-of the ambient body would not alter the species of the colour at all,
-though it might its strength and brightness; for pieces of Muscovy
-glass, which were so thin as to appear coloured by being wet with
-water, would have their colours faded and made less bright thereby; but
-he could not observe their species at all to be changed. So that the
-thickness of any transparent body determines its colour, whatever body
-the light passes through in coming to it[304].
-
-12. BUT it was found that different transparent bodies would not under
-the same thicknesses exhibit the same colours: for if the forementioned
-glasses were laid upon each other without any water between their
-surfaces, the air itself would afford the same colours as the water,
-but more expanded, insomuch that each ring had a larger diameter, and
-all in the same proportion. So that the thickness of the air proper to
-each colour was in the same proportion larger, than the thickness of
-the water appropriated to the same[305].
-
-13. IF we examine with care all the circumstances of these colours,
-which will be enumerated in the next chapter, we shall not be
-surprized, that our author takes them to bear a great analogy to the
-colours of natural bodies[306]. For the regularity of those various and
-strange appearances relating to them, which makes the most mysterious
-part of the action between light and bodies, as the next chapter will
-shew, is sufficient to convince us that the principle, from which
-they flow, is of the greatest importance in the frame of nature; and
-therefore without question is designed for no less a purpose than to
-give bodies their various colours, to which end it seems very fitly
-suited. For if any such transparent substance of the thickness
-proper to produce any one colour should be cut into slender threads,
-or broken into fragments, it does not appear but these should retain
-the same colour; and a heap of such fragments should frame a body of
-that colour. So that this is without dispute the cause why bodies are
-of this or the other colour, that the particles of which they are
-composed are of different sizes. Which is farther confirmed by the
-analogy between the colours of thin plates, and the colours of many
-bodies. For example, these plates do not look of the same colour when
-viewed obliquely, as when seen direct; for if the rings and colours
-between a convex and plane glass are viewed first in a direct manner,
-and then at different degrees of obliquity, the rings will be observed
-to dilate themselves more and more as the obliquity is increased[307];
-which shews that the transparent substance between the glasses does
-not exhibit the same colour at the same thickness in all situations of
-the eye: just so the colours in the very same part of a peacock’s tail
-change, as the tail changes posture in respect of the sight. Also the
-colours of silks, cloths, and other substances, which water or oyl can
-intimately penetrate, become faint and dull by the bodies being wet
-with such fluids, and recover their brightness again when dry; just
-as it was before said that plates of Muscovy glass grew faint and dim
-by wetting. To this may be added, that the colours which painters use
-will be a little changed by being ground very elaborately, without
-question by the diminution of their parts. All which particulars, and
-many more that might be extracted from our author, give abundant
-proof of the present point. I shall only subjoin one more: these
-transparent plates transmit through them all the light they do not
-reflect; so that when looked through they exhibit those colours, which
-result from the depriving white light of the colour reflected. This
-may commodiously be tryed by the glasses so often mentioned; which if
-looked through exhibit coloured rings as by reflected light, but in a
-contrary order; for the middle spot, which in the other view appears
-black for want of reflected light, now looks perfectly white, opposite
-to the blue circle; next without this spot the light appears tinged
-with a yellowish red; where the white circle appeared before, it now
-seems dark; and so of the rest[308]. Now in the same manner, the light
-transmitted through foliated gold into a darkened room appears greenish
-by the loss of the yellow light, which gold reflects.
-
-14. HENCE it follows, that the colours of bodies give a very probable
-ground for making conjecture concerning the magnitude of their
-constituent particles[309]. My reason for calling it a conjecture is,
-its being difficult to fix certainly the order of any colour. The
-green of vegetables our author judges to be of the third order, partly
-because of the intenseness of their colour; and partly from the changes
-they suffer when they wither, turning at first into a greenish or more
-perfect yellow, and afterwards some of them to an orange or red; which
-changes seem to be effected from their ringing particles growing denser
-by the exhalation of their moisture, and perhaps augmented likewise
-by the accretion of the earthy and oily parts of that moisture. How
-the mentioned colours should arise from increasing the bulk of those
-particles, is evident; seeing those colours lie without the ring
-of green between the glasses, and are therefore formed where the
-transparent substance which reflects them is thicker. And that the
-augmentation of the density of the colorific particles will conspire
-to the production of the same effect, will be evident; if we remember
-what was said of the different size of the rings, when air was included
-between the glasses, from their size when water was between them; which
-shewed that a substance of a greater density than another gives the
-same colour at a less thickness. Now the changes likely to be wrought
-in the density or magnitude of the parts of vegetables by withering
-seem not greater, than are sufficient to change their colour into those
-of the same order; but the yellow and red of the fourth order are not
-full enough to agree with those, into which these substances change,
-nor is the green of the second sufficiently good to be the colour of
-vegetables; so that their colour must of necessity be of the third
-order.
-
-15. THE blue colour of syrup of violets our author supposes to be of
-the third order; for acids, as vinegar, with this syrup change it red,
-and salt of tartar or other alcalies mixed therewith turn it green.
-But if the blue colour of the syrup were of the second order, the red
-colour, which acids by attenuating its parts give it, must be of the
-first order, and the green given it by alcalies by incrassating its
-particles should be of the second; whereas neither of those colours is
-perfect enough, especially the green, to answer those produced by these
-changes; but the red may well enough be allowed to be of the second
-order, and the green of the third; in which case the blue must be
-likewise of the third order.
-
-16. THE azure colour of the skies our author takes to be of the
-first order, which requires the smallest particles of any colour,
-and therefore most like to be exhibited by vapours, before they have
-sufficiently coalesced to produce clouds of other colours.
-
-17. THE most intense and luminous white is of the first order, if
-less strong it is a mixture of the colours of all the orders. Of
-the latter sort he takes the colour of linnen, paper, and such like
-substances to be; but white metals to be of the former sort. The
-arguments for it are these. The opacity of all bodies has been shewn
-to arise from the number and strength of the reflections made within
-them; but all experiments shew, that the strongest reflection is made
-at those surfaces, which intercede transparent bodies differing most
-in density. Among other instances of this, the experiments before us
-afford one; for when air only is included between the glasses, the
-coloured rings are not only more dilated, as has before been said,
-than when water is between them; but are likewise much more luminous
-and bright. It follows therefore, that whatever medium pervades the
-pores of bodies, if so be there is any, those substances must be most
-opake, the density of whose parts differs most from the density of the
-medium, which fills their pores. But it has been sufficiently proved
-in the former part of this tract, that there is no very dense medium
-lodging in, at least pervading at liberty the pores of bodies. And it
-is farther proved by the present experiments. For when air is inclosed
-by the denser substance of glass, the rings dilate themselves, as
-has been said, by being viewed obliquely; this they do so very much,
-that at different obliquities the same thickness of air will exhibit
-all sorts of colours. The bubble of water, though surrounded with the
-thinner substance of air, does likewise change its colour by being
-viewed obliquely; but not any thing near so much, as in the other case;
-for in that the same colour might be seen, when the rings were viewed
-most obliquely, at more than twelve times the thickness it appeared
-at under a direct view; whereas in this other case the thickness was
-never found considerably above half as much again. Now the colours of
-bodies not depending only on the light, that is incident upon them
-perpendicularly, but likewise upon that, which falls on them in all
-degrees of obliquity; if the medium surrounding their particles were
-denser than those particles, all sorts of colours must of necessity
-be reflected from them so copiously, as would make the colours of all
-bodies white, or grey, or at best very dilute and imperfect. But on
-the other hand, if the medium in the pores of bodies be much rarer
-than their particles, the colour reflected will be so little changed
-by the obliquity of the rays, that the colour produced by the rays,
-which fall near the perpendicular, may so much abound in the reflected
-light, as to give the body their colour with little allay. To this
-may be added, that when the difference of the contiguous transparent
-substances is the same, a colour reflected from the denser substance
-reduced into a thin plate and surrounded by the rarer will be more
-brisk, than the same colour will be, when reflected from a thin plate
-formed of the rarer substance, and surrounded by the denser; as our
-author experienced by blowing glass very thin at a lamp furnace,
-which exhibited in the open air more vivid colours, than the air does
-between two glasses. From these considerations it is manifest, that
-if all other circumstances are alike, the densest bodies will be most
-opake. But it was observed before, that these white metals can hardly
-be made so thin, except by being dissolved in corroding liquors, as
-to be rendred transparent; though none of them are so dense as gold,
-which proves their great opacity to have some other cause besides their
-density; and none is more fit to produce this, than such a size of
-their particles, as qualifies them to reflect the white of the first
-order.
-
-18. FOR producing black the particles ought to be smaller than for
-exhibiting any of the colours, viz. of a size answering to the
-thickness of the bubble, where by reflecting little or no light it
-appears colourless; but yet they must not be too small, for that will
-make them transparent through deficiency of reflections in the inward
-parts of the body, sufficient to stop the light from going through it;
-but they must be of a size bordering upon that disposed to reflect
-the faint blue of the first order, which affords an evident reason why
-blacks usually partake a little of that colour. We see too, why bodies
-dissolved by fire or putrefaction turn black: and why in grinding
-glasses upon copper plates the dust of the glass, copper, and sand it
-is ground with, become very black: and in the last place why these
-black substances communicate so easily to others their hue; which is,
-that their particles by reason of the great minuteness of them easily
-overspread the grosser particles of others.
-
-19. I SHALL now finish this chapter with one remark of the exceeding
-great porosity in bodies necessarily required in all that has here
-been said; which, when duly considered, must appear very surprizing;
-but perhaps it will be matter of greater surprize, when I affirm that
-the sagacity of our author has discovered a method, by which bodies
-may easily become so; nay how any the least portion of matter may be
-wrought into a body of any assigned dimensions how great so ever, and
-yet the pores of that body none of them greater, than any the smallest
-magnitude proposed at pleasure; notwithstanding which the parts of the
-body shall so touch, that the body itself shall be hard and solid[310].
-The manner is this: suppose the body be compounded of particles of
-such figures, that when laid together the pores found between them
-may be equal in bigness to the particles; how this may be effected,
-and yet the body be hard and solid, is not difficult to understand;
-and the pores of such a body may be made of any proposed degree of
-smallness. But the solid matter of a body so framed will take up only
-half the space occupied by the body; and if each constituent particle
-be composed of other less particles according to the same rule, the
-solid parts of such a body will be but a fourth part of its bulk; if
-every one of these lesser particles again be compounded in the same
-manner, the solid parts of the whole body shall be but one eighth of
-its bulk; and thus by continuing the composition the solid parts of the
-body may be made to bear as small a proportion to the whole magnitude
-of the body, as shall be desired, notwithstanding the body will be by
-the contiguity of its parts capable of being in any degree hard. Which
-shews that this whole globe of earth, nay all the known bodies in the
-universe together, as far as we know, may be compounded of no greater
-a portion of solid matter, than might be reduced into a globe of one
-inch only in diameter, or even less. We see therefore how by this means
-bodies may easily be made rare enough to transmit light, with all
-that freedom pellucid bodies are found to do. Though what is the real
-structure of bodies we yet know not.
-
-
-
-
-~CHAP. III.~
-
-Of the REFRACTION, REFLECTION, and INFLECTION of LIGHT.
-
-
-THUS much of the colours of natural bodies; our method now leads us
-to speculations yet greater, no less than to lay open the causes of
-all that has hitherto been related. For it must in this chapter be
-explained, how the prism separates the colours of the sun’s light, as
-we found in the first chapter; and why the thin transparent plates
-discoursed of in the last chapter, and consequently the particles of
-coloured bodies, reflect that diversity of colours only by being of
-different thicknesses.
-
-2. FOR the first it is proved by our author, that the colours of the
-sun’s light are manifested by the prism, from the rays undergoing
-different degrees of refraction; that the violet-making rays, which
-go to the upper part of the coloured image in the first experiment
-of the first chapter, are the most refracted; that the indigo-making
-rays are refracted, or turned out of their course by passing through
-the prism, something less than the violet-making rays, but more than
-the blue-making rays; and the blue-making rays more than the green;
-the green-making rays more than the yellow; the yellow more than the
-orange; and the orange-making rays more than the red-making, which are
-least of all refracted. The first proof of this, that rays of different
-colours are refracted unequally is this. If you take any body, and
-paint one half of it red and the other half blue, then upon viewing
-it through a prism those two parts shall appear separated from each
-other; which can be caused no otherwise than by the prism’s refracting
-the light of one half more than the light of the other half. But the
-blue half will be most refracted; for if the body be seen through the
-prism in such a situation, that the body shall appear lifted upwards
-by the refraction, as a body within a bason of water, in the experiment
-mentioned in the first chapter, appeared to be lifted up by the
-refraction of the water, so as to be seen at a greater distance than
-when the bason is empty, then shall the blue part appear higher than
-the red; but if the refraction of the prism be the contrary way, the
-blue part shall be depressed more than the other. Again, after laying
-fine threads of black silk across each of the colours, and the body
-well inlightened, if the rays coming from it be received upon a convex
-glass, so that it may by refracting the rays cast the image of the body
-upon a piece of white paper held beyond the glass; then it will be seen
-that the black threads upon the red part of the image, and those upon
-the blue part, do not at the same time appear distinctly in the image
-of the body projected by the glass; but if the paper be held so, that
-the threads on the blue part may distinctly appear, the threads cannot
-be seen distinct upon the red part; but the paper must be drawn farther
-off from the convex glass to make the threads on this part visible; and
-when the distance is great enough for the threads to be seen in this
-red part, they become indistinct in the other. Whence it appears that
-the rays proceeding from each point of the blue part of the body are
-sooner united again by the convex glass than the rays which come from
-each point of the red parts[311]. But both these experiments prove that
-the blue-making rays, as well in the small refraction of the convex
-glass, as in the greater refraction of the prism, are more bent, than
-the red-making rays.
-
-3. THIS seems already to explain the reason of the coloured spectrum
-made by refracting the sun’s light with a prism, though our author
-proceeds to examine that in particular, and proves that the different
-coloured rays in that spectrum are in different degrees refracted; by
-shewing how to place the prism in such a posture, that if all the rays
-were refracted in the same manner, the spectrum should of necessity
-be round: whereas in that case if the angle made by the two surfaces
-of the prism, through which the light passes, that is the angle D F
-E in fig. 126, be about 63 or 64 degrees, the image instead of being
-round shall be near five times as long as broad; a difference enough
-to shew a great inequality in the refractions of the rays, which
-go to the opposite extremities of the image. To leave no scruple
-unremoved, our author is very particular in shewing by a great number
-of experiments, that this inequality of refraction is not casual, and
-that it does not depend upon any irregularities of the glass; no nor
-that the rays are in their passage through the prism each split and
-divided; but on the contrary that every ray of the sun has its own
-peculiar degree of refraction proper to it, according to which it is
-more or less refracted in passing through pellucid substances always
-in the same manner[312]. That the rays are not split and multiplied
-by the refraction of the prism, the third of the experiments related
-in our first chapter shews very clearly; for if they were, and the
-length of the spectrum in the first refraction were thereby occasioned,
-the breadth should be no less dilated by the cross refraction of the
-second prism; whereas the breadth is not at all increased, but the
-image is only thrown into an oblique posture by the upper part of the
-rays which were at first more refracted than the under part, being
-again turned farthest out of their course. But the experiment most
-expressly adapted to prove this regular diversity of refraction is
-this, which follows[313]. Two boards A B, C D (in fig. 130.) being
-erected in a darkened room at a proper distance, one of them A B being
-near the window-shutter E F, a space only being left for the prism G
-H I to be placed between them; so that the rays entring at the hole M
-of the window-shutter may after passing through the prism be trajected
-through a smaller hole K made in the board A B, and passing on from
-thence go out at another hole L made in the board C D of the same size
-as the hole K, and small enough to transmit the rays of one colour
-only at a time; let another prism N O P be placed after the board C
-D to receive the rays passing through the holes K and L, and after
-refraction by that prism let those rays fall upon the white surface
-Q R. Suppose first the violet light to pass through the holes, and
-to be refracted by the prism N O P to _s_, which if the prism N O P
-were removed should have passed right onto W. If the prism G H I be
-turned slowly about, while the boards and prism N O P remain fixed,
-in a little time another colour will fall upon the hole L, which, if
-the prism N O P were taken away, would proceed like the former rays
-to the same point W; but the refraction of the prism N O P shall not
-carry these rays to _s_, but to some place less distant from W as to
-_t_. Suppose now the rays which go to _t_ to be the indigo-making rays.
-It is manifest that the boards A B, C D, and prism N O P remaining
-immoveable, both the violet-making and indigo-making rays are incident
-alike upon the prism N O P, for they are equally inclined to its
-surface O P, and enter it in the same part of that surface; which shews
-that the indigo-making rays are less diverted out of their course by
-the refraction of the prism, than the violet-making rays under an
-exact parity of all circumstances. Farther, if the prism G H I be more
-turned about, ’till the blue-making rays pass through the hole L, these
-shall fall upon the surface Q R below I, as at _v_, and therefore are
-subjected to a less refraction than the indigo-making rays. And thus
-by proceeding it will be found that the green-making rays are less
-refracted than the blue-making rays, and so of the rest, according to
-the order in which they lie in the coloured spectrum.
-
-4. THIS disposition of the different coloured rays to be refracted
-some more than others our author calls their respective degrees of
-refrangibility. And since this difference of refrangibility discovers
-it self to be so regular, the next step is to find the rule it observes.
-
-5. IT is a common principle in optics, that the sine of the angle of
-incidence bears to the sine of the refracted angle a given proportion.
-If A B (in fig. 131, 132) represent the surface of any refracting
-substance, suppose of water or glass, and C D a ray of light incident
-upon that face in the point D, let D E be the ray, after it has passed
-the surface A B; if the ray pass out of the air into the substance
-whose surface is A B (as in fig. 131) it shall be turned from the
-surface, and if it pass out of that substance into air it shall be
-bent towards it (as in fig. 132) But if F G be drawn through the point
-D perpendicular to the surface A B, the angle under C D F made by the
-incident ray and this perpendicular is called the angle of incidence;
-and the angle under E D G, made by this perpendicular and the ray after
-refraction, is called the refracted angle. And if the circle H F I G
-be described with any interval cutting C D in H and D E in I, then
-the perpendiculars H K, I L being let fall upon F G, H K is called
-the sine of the angle under C D F the angle of incidence, and I L the
-sine of the angle under E D G the refracted angle. The first of these
-sines is called the sine of the angle of incidence, or more briefly the
-sine of incidence, the latter is the sine of the refracted angle, or
-the sine of refraction. And it has been found by numerous experiments
-that whatever proportion the sine of incidence H K bears to the sine
-of refraction I L in any one case, the same proportion shall hold in
-all cases; that is, the proportion between these sines will remain
-unalterably the same in the same refracting substance, whatever be the
-magnitude of the angle under C D F.
-
-6. BUT now because optical writers did not observe that every beam of
-white light was divided by refraction, as has been here explained,
-this rule collected by them can only be understood in the gross of the
-whole beam after refraction, and not so much of any particular part
-of it, or at most only of the middle part of the beam. It therefore
-was incumbent upon our author to find by what law the rays were parted
-from each other; whether each ray apart obtained this property, and
-that the separation was made by the proportion between the sines of
-incidence and refraction being in each species of rays different; or
-whether the light was divided by some other rule. But he proves by a
-certain experiment that each ray has its sine of incidence proportional
-to its sine of refraction; and farther shews by mathematical reasoning,
-that it must be so upon condition only that bodies refract the light
-by acting upon it, in a direction perpendicular to the surface of the
-refracting body, and upon the same sort of rays always in an equal
-degree at the same distances[314].
-
-7. OUR great author teaches in the next place how from the refraction
-of the most refrangible and least refrangible rays to find the
-refraction of all the intermediate ones[315]. The method is this:
-if the sine of incidence be to the sine of refraction in the least
-refrangible rays as A to B C, (in fig. 133) and to the sine of
-refraction in the most refrangible as A to B D; if C E be taken equal
-to C D, and then E D be so divided in F, G, H, I, K, L, that E D, E
-F, E G, E H, E I, E K, E L, E C, shall be proportional to the eight
-lengths of musical chords, which found the notes in an octave, E D
-being the length of the key, E F the length of the tone above that
-key, E G the length of the lesser third, E H of the fourth, E I of the
-fifth, E K of the greater sixth, E L of the seventh, and E C of the
-octave above that key; that is if the lines E D, E F, E G, E H, E I, E
-K, E L, and E C bear the same proportion as the numbers, 1, 9/8, 5/6,
-¾, ⅓, ¾, 9/61, ½, respectively then shall B D, B F, be the two limits
-of the sines of refraction of the violet-making rays, that is the
-violet-making rays shall not all of them have precisely the same sine
-of refraction, but none of them shall have a greater sine than B D,
-nor a less than B F, though there are violet-making rays which answer
-to any sine of refraction that can be taken between these two. In the
-same manner B F and B G are the limits of the sines of refraction
-of the indigo-making rays; B G, B H are the limits belonging to the
-blue-making rays; B H, B I the limits pertaining to the green-making
-rays, B I, B K the limits for the yellow-making rays; B K, B L the
-limits for the orange-making rays; and lastly, B L and B C the extreme
-limits of the sines of refraction belonging to the red-making rays.
-These are the proportions by which the heterogeneous rays of light are
-separated from each other in refraction.
-
-8. WHEN light passes out of glass into air, our author found A to B C
-as 50 to 77, and the same A to B D as 50 to 78. And when it goes out
-of any other refracting substance into air, the excess of the sine
-of refraction of any one species of rays above its sine of incidence
-bears a constant proportion, which holds the same in each species, to
-the excess of the sine of refraction of the same sort of rays above
-the sine of incidence into the air out of glass; provided the sines
-of incidence both in glass and the other substance are equal. This
-our author verified by transmitting the light through prisms of glass
-included within a prismatic vessel of water; and draws from those
-experiments the following observations: that whenever the light in
-passing through so many surfaces parting diverse transparent substances
-is by contrary refractions made to emerge into the air in a direction
-parallel to that of its incidence, it will appear afterwards white at
-any distance from the prisms, where you shall please to examine it;
-but if the direction of its emergence be oblique to its incidence, in
-receding from the place of emergence its edges shall appear tinged with
-colours: which proves that in the first case there is no inequality
-in the refractions of each species of rays, but that when any one
-species is so refracted as to emerge parallel to the incident rays,
-every sort of rays after refraction shall likewise be parallel to the
-same incident rays, and to each other; whereas on the contrary, if the
-rays of any one sort are oblique to the incident light, the several
-species shall be oblique to each other, and be gradually separated by
-that obliquity. From hence he deduces both the forementioned theorem,
-and also this other; that in each sort of rays the proportion of the
-sine of incidence to the sine of refraction, in the passage of the ray
-out of any refracting substance into another, is compounded of the
-proportion to which the sine of incidence would have to the sine of
-refraction in the passage of that ray out of the first substance into
-any third, and of the proportion which the sine of incidence would
-have to the sine of refraction in the passage of the ray out of that
-third substance into the second. From so simple and plain an experiment
-has our most judicious author deduced these important theorems, by
-which we may learn how very exact and circumspect he has been in this
-whole work of his optics; that notwithstanding his great particularity
-in explaining his doctrine, and the numerous collection of experiments
-he has made to clear up every doubt which could arise, yet at the same
-time he has used the greatest caution to make out every thing by the
-simplest and easiest means possible.
-
-9. OUR author adds but one remark more upon refraction, which is, that
-if refraction be performed in the manner he has supposed from the
-light’s being pressed by the refracting power perpendicularly toward
-the surface of the refracting body, and consequently be made to move
-swifter in the body than before its incidence; whether this power act
-equally at all distances or otherwise, provided only its power in the
-same body at the same distances remain without variation the same in
-one inclination of the incident rays as well as another; he observes
-that the refracting powers in different bodies will be in the duplicate
-proportion of the tangents of the lead angles, which the refracted
-light can make with the surfaces of the refracting bodies[316].
-This observation may be explained thus. When the light passes into
-any refracting substance, it has been shewn above that the sine of
-incidence bears a constant proportion to the sine of refraction.
-Suppose the light to pass to the refracting body A B C D (in fig.
-134) in the line E F, and to fall upon it at the point F, and then to
-proceed within the body in the line F G. Let H I be drawn through F
-perpendicular to the surface A B, and any circle K L M N be described
-to the center F. Then from the points O and P where this circle cuts
-the incident and refracted ray, the perpendiculars O Q, P R being
-drawn, the proportion of O Q to P R will remain the same in all the
-different obliquities, in which the same ray of light can fall on the
-surface A B. Now O Q is less than F L the semidiameter of the circle K
-L M N, but the more the ray E F is inclined down toward the surface A
-B, the greater will O Q be, and will approach nearer to the magnitude
-of F L. But the proportion of O Q to P R remaining always the same,
-when O Q, is largest, P R will also be greatest; so that the more the
-incident ray E F is inclined toward the surface A B, the more the ray
-F G after refraction will be inclined toward the same. Now if the line
-F S T be so drawn, that S V being perpendicular to F I shall be to F L
-the semidiameter of the circle in the constant proportion of P R to O
-Q; then the angle under N F T is that which I meant by the least of all
-that can be made by the refracted ray with this surface, for the ray
-after refraction would proceed in this line, if it were to come to the
-point F lying on the very surface A B; for if the incident ray came to
-the point F in any line between A F and F H, the ray after refraction
-would proceed forward in some line between F T and F I. Here if N W
-be drawn perpendicular to F N, this line N W in the circle K L M N is
-called the tangent of the angle under N F S. Thus much being premised,
-the sense of the forementioned proposition is this. Let there be two
-refracting substances (in fig. 135) A B C D, and E F G H. Take a point,
-as I, in the surface A B, and to the center I with any semidiameter
-describe the circle K L M. In like manner on the surface E F take
-some point N, as a center, and describe with the same semidiameter
-the circle O P Q. Let the angle under B I R be the least which the
-refracted light can make with the surface A B, and the angle under F N
-S the least which the refracted light can make with the surface E F.
-Then if L T be drawn perpendicular to A B, and P V perpendicular to E
-F; the whole power, wherewith the substance A B C D acts on the light,
-will bear to the whole power wherewith the substance E F G H acts on,
-the light, a proportion, which is duplicate of the proportion, which L
-T bears to P V.
-
-10. UPON comparing according to this rule the refractive powers of a
-great many bodies it is found, that unctuous bodies which abound most
-with sulphureous parts refract the light two or three times more in
-proportion to their density than others: but that those bodies, which
-seem to receive in their composition like proportions of sulphureous
-parts, have their refractive powers proportional to their densities; as
-appears beyond contradiction by comparing the refractive power of so
-rare a substance as the air with that of common glass or rock crystal,
-though these substances are 2000 times denser than air; nay the same
-proportion is found to hold without sensible difference in comparing
-air with pseudo-topar and glass of antimony, though the pseudo-topar
-be 3500 times denser than air, and glass of antimony no less than
-4400 times denser. This power in other substances, as salts, common
-water, spirit of wine, &c. seems to bear a greater proportion to their
-densities than these last named, according as they abound with sulphurs
-more than these; which makes our author conclude it probable, that
-bodies act upon the light chiefly, if not altogether, by means of the
-sulphurs in them; which kind of substances it is likely enters in some
-degree the composition of all bodies. Of all the substances examined
-by our author, none has so great a refractive power, in respect of its
-density, as a diamond.
-
-11. OUR author finishes these remarks, and all he offers relating to
-refraction, with observing, that the action between light and bodies is
-mutual, since sulphureous bodies, which are most readily set on fire
-by the sun’s light, when collected upon them with a burning glass, act
-more upon light in refracting it, than other bodies of the same density
-do. And farther, that the densest bodies, which have been now shewn to
-act most upon light, contract the greatest heat by being exposed to the
-summer sun.
-
-12. HAVING thus dispatched what relates to refraction, we must address
-ourselves to discourse of the other operation of bodies upon light
-in reflecting it. When light passes through a surface, which divides
-two transparent bodies differing in density, part of it only is
-transmitted, another part being reflected. And if the light pass out
-of the denser body into the rarer, by being much inclined to the
-foresaid surface at length no part of it shall pass through, but be
-totally reflected. Now that part of the light, which suffers the
-greatest refraction, shall be wholly reflected with a less obliquity
-of the rays, than the parts of the light which undergo a less degree
-of refraction; as is evident from the last experiment recited in the
-first chapter; where, as the prisms D E F, G H I, (in fig. 129.) were
-turned about, the violet light was first totally reflected, and then
-the blue, next to that the green, and so of the rest. In consequence
-of which our author lays down this proportion; that the sun’s light
-differs in reflexibility, those rays being most reflexible, which are
-most refrangible. And collects from this, in conjunction with other
-arguments, that the refraction and reflection, of light are produced
-by the same cause, compassing those different effects only by the
-difference of circumstances with which it is attended. Another proof
-of this being taken by our author from what he has discovered of
-the passage of light through thin transparent plates, viz. that any
-particular species of light, suppose, for instance, the red-making
-rays, will enter and pass out of such a plate, if that plate be of
-some certain thicknesses; but if it be of other thicknesses, it will
-not break through it, but be reflected back: in which is seen, that
-the thickness of the plate determines whether the power, by which that
-plate acts upon the light, shall reflect it, or suffer it to pass
-through.
-
-13. BUT this last mentioned surprising property of the action between
-light and bodies affords the reason of all that has been said in the
-preceding chapter concerning the colours of natural bodies; and must
-therefore more particularly be illustrated and explained, as being what
-will principally unfold the nature of the action of bodies upon light.
-
-14. TO begin: The object glass of a long telescope being laid upon a
-plane glass, as proposed in the foregoing chapter, in open day-light
-there will be exhibited rings of various colours, as was there related;
-but if in a darkened room the coloured spectrum be formed by the prism,
-as in the first experiment of the first chapter, and the glasses be
-illuminated by a reflection from the spectrum, the rings shall not
-in this case exhibit the diversity of colours before described, but
-appear all of the colour of the light which falls upon the glasses,
-having dark rings between. Which shews that the thin plate of air
-between the glasses at some thicknesses reflects the incident light,
-at other places does not reflect it, but is found in those places to
-give the light passage; for by holding the glasses in the light as
-it passes from the prism to the spectrum, suppose at such a distance
-from the prism that the several sorts of light must be sufficiently
-separated from each other, when any particular sort of light falls
-on the glasses, you will find by holding a piece of white paper at a
-small distance beyond the glasses, that at those intervals, where the
-dark lines appeared upon the glasses, the light is so transmitted,
-as to paint upon the paper rings of light having that colour which
-falls upon the glasses. This experiment therefore opens to us this
-very strange property of reflection, that in these thin plates it
-should bear such a relation to the thickness of the plate, as is here
-shewn. Farther, by carefully measuring the diameters of each ring it
-is found, that whereas the glasses touch where the dark spot appears
-in the center of the rings made by reflexion, where the air is of
-twice the thickness at which the light of the first ring is reflected,
-there the light by being again transmitted makes the first dark ring;
-where the plate has three times that thickness which exhibits the
-first lucid ring, it again reflects the light forming the second lucid
-ring; when the thickness is four times the first, the light is again
-transmitted so as to make the second dark ring; where the air is five
-times the first thickness, the third lucid ring is made; where it has
-six times the thickness, the third dark ring appears, and so on: in
-so much that the thicknesses, at which the light is reflected, are
-in proportion to the numbers 1, 3, 5, 7, 9, &c. and the thicknesses,
-where the light is transmitted, are in the proportion of the numbers
-0, 2, 4, 6, 8, &c. And these proportions between the thicknesses which
-reflect and transmit the light remain the same in all situations of the
-eye, as well when the rings are viewed obliquely, as when looked on
-perpendicularly. We must farther here observe, that the light, when it
-is reflected, as well as when it is transmitted, enters the thin plate,
-and is reflected from its farther surface; because, as was before
-remarked, the altering the transparent body behind the farther surface
-alters the degree of reflection as when a thin piece of Muscovy glass
-has its farther surface wet with water, and the colour of the glass
-made dimmer by being so wet; which shews that the light reaches to the
-water, otherwise its reflection could not be influenced by it. But
-yet this reflection depends upon some power propagated from the first
-surface to the second; for though made at the second surface it depends
-also upon the first, because it depends upon the distance between the
-surfaces; and besides, the body through which the light passes to the
-first surface influences the reflection: for in a plate of Muscovy
-glass, wetting the surface, which first receives the light, diminishes
-the reflection, though not quite so much as wetting the farther surface
-will do. Since therefore the light in passing through these thin plates
-at some thicknesses is reflected, but at others transmitted without
-reflection, it is evident, that this reflection is caused by some
-power propagated from the first surface, which intermits and returns
-successively. Thus is every ray apart disposed to alternate reflections
-and transmissions at equal intervals; the successive returns of which
-disposition our author calls the fits of easy reflection, and of easy
-transmission. But these fits, which observe the same law of returning
-at equal intervals, whether the plates are viewed perpendicularly or
-obliquely, in different situations of the eye change their magnitude.
-For what was observed before in respect of those rings, which appear
-in open day-light, holds likewise in these rings exhibited by simple
-lights; namely, that these two alter in bigness according to the
-different angle under which they are seen: and our author lays down a
-rule whereby to determine the thicknesses of the plate of air, which
-shall exhibit the same colour under different oblique views[317]. And
-the thickness of the aereal plate, which in different inclinations of
-the rays will exhibit to the eye in open day-light the same colour, is
-also varied by the same rule[318]. He contrived farther a method of
-comparing in the bubble of water the proportion between the thickness
-of its coat, which exhibited any colour when seen perpendicularly,
-to the thickness of it, where the same colour appeared by an oblique
-view; and he found the same rule to obtain here likewise[319]. But
-farther, if the glasses be enlightened successively by all the several
-species of light, the rings will appear of different magnitudes; in
-the red light they will be larger than in the orange colour, in that
-larger than in the yellow, in the yellow larger than in the green,
-less in the blue, less yet in the indigo, and least of all in the
-violet: which shew that the same thickness of the aereal plate is not
-fitted to reflect all colours, but that one colour is reflected where
-another would have been transmitted; and as the rays which are most
-strongly refracted form the least rings, a rule is laid down by our
-author for determining the relation, which the degree of refraction of
-each species of colour has to the thicknesses of the plate where it is
-reflected.
-
-15. FROM these observations our author shews the reason of that great
-variety of colours, which appears in these thin plates in the open
-white light of the day. For when this white light falls on the plate,
-each part of the light forms rings of its own colour; and the rings
-of the different colours not being of the same bigness are variously
-intermixed, and form a great variety of tints[320].
-
-16. IN certain experiments, which our author made with thick glasses,
-he found, that these fits of easy reflection and transmission returned
-for some thousands of times, and thereby farther confirmed his
-reasoning concerning them[321].
-
-17. UPON the whole, our great author concludes from some of the
-experiments made by him, that the reason why all transparent bodies
-refract part of the light incident upon them, and reflect another
-part, is, because some of the light, when it comes to the surface of
-the body, is in a fit of easy transmission, and some part of it in
-a fit of easy reflection; and from the durableness of these fits he
-thinks it probable, that the light is put into these fits from their
-first emission out of the luminous body; and that these fits continue
-to return at equal intervals without end, unless those intervals be
-changed by the light’s entring into some refracting substance[322]. He
-likewise has taught how to determine the change which is made of the
-intervals of the fits of easy transmission and reflection, when the
-light passes out of one transparent space or substance into another.
-His rule is, that when the light passes perpendicularly to the surface,
-which parts any two transparent substances, these intervals in the
-substance, out of which the light passes, bear to the intervals in the
-substance, whereinto the light enters, the same proportion, as the sine
-of incidence bears to the sine of refraction[323]. It is farther to be
-observed, that though the fits of easy reflection return at constant
-intervals, yet the reflecting power never operates, but at or near a
-surface where the light would suffer refraction; and if the thickness
-of any transparent body shall be less than the intervals of the fits,
-those intervals shall scarce be disturbed by such a body, but the light
-shall pass through without any reflection[324].
-
-18. WHAT the power in nature is, whereby this action between light and
-bodies is caused, our author has not discovered. But the effects, which
-he has discovered, of this power are very surprising, and altogether
-wide from any conjectures that had ever been framed concerning it; and
-from these discoveries of his no doubt this power is to be deduced,
-if we ever can come to the knowledge of it. Sir ISAAC NEWTON has in
-general hinted at his opinion concerning it; that probably it is
-owing to some very subtle and elastic substance diffused through the
-universe, in which such vibrations may be excited by the rays of
-light, as they pass through it, that shall occasion it to operate so
-differently upon the light in different places as to give rise to these
-alternate fits of reflection and transmission, of which we have now
-been speaking[325]. He is of opinion, that such a substance may produce
-this and other effects also in nature, though it be so rare as not to
-give any sensible resistance to bodies in motion[326]; and therefore
-not inconsistent with what has been said above, that the planets move
-in spaces free from resistance[327].
-
-19. IN order for the more full discovery of this action between light
-and bodies, our author began another set of experiments, wherein he
-found the light to be acted on as it passes near the edges of solid
-bodies; in particular all small bodies, such as the hairs of a man’s
-head or the like, held in a very small beam of the sun’s light, cast
-extremely broad shadows. And in one of these experiments the shadow
-was 35 times the breadth of the body[328]. These shadows are also
-observed to be bordered with colours[329]. This our author calls the
-inflection of light; but as he informs us, that he was interrupted
-from prosecuting these experiments to any length, I need not detain my
-readers with a more particular account of them.
-
-
-
-
-~CHAP. IV.~
-
-Of OPTIC GLASSES.
-
-
-SIR ~ISAAC NEWTON~ having deduced from his doctrine of light and
-colours a surprising improvement of telescopes, of which I intend
-here to give an account, I shall first premise something in general
-concerning those instruments.
-
-2. IT will be understood from what has been said above, that when light
-falls upon the surface of glass obliquely, after its entrance into
-the glass it is more inclined to the line drawn through the point of
-incidence perpendicular to that surface, than before. Suppose a ray of
-light issuing from the point A (in fig. 136) falls on a piece of glass
-B C D E, whose surface B C, whereon the ray falls, is of a spherical
-or globular figure, the center whereof is F. Let the ray proceed in
-the line A G falling on the surface B C in the point G, and draw F G
-H. Here the ray after its entrance into the glass will pass on in some
-line, as G I, more inclined toward the line F G H that the line A G is
-inclined thereto; for the line F G H is perpendicular to the surface B
-C in the point G. By this means, if a number of rays proceeding from
-any one point fall on a convex spherical surface of glass, they shall
-be inflected (as is represented in fig. 137,) so as to be gathered
-pretty close together about the line drawn through the center of the
-glass from the point, whence the rays proceed; which line henceforward
-we shall call the axis of the glass: or the point from whence the rays
-proceed may be so near the glass, that the rays shall after entring the
-glass still go on to spread themselves, but not so much as before; so
-that if the rays were to be continued backward (as in fig. 138,) they
-should gather together about the axis at a place more remote from the
-glass, than the point is, whence they actually proceed. In these and
-the following figures A denotes the point to which the rays are related
-before refraction, B the point to which they are directed afterwards,
-and C the center of the refracting surface. Here we may observe, that
-it is possible to form the glass of such a figure, that all the rays
-which proceed from one point shall after refraction be reduced again
-exactly into one point on the axis of the glass. But in glasses of a
-spherical form though this does not happen; yet the rays, which fall
-within a moderate distance from the axis, will unite extremely near
-together. If the light fall on a concave spherical surface, after
-refraction it shall spread quicker than before (as in fig. 139,) unless
-the rays proceed from a point between the center and the surface of the
-glass. If we suppose the rays of light, which fall upon the glass, not
-to proceed from any point, but to move so as to tend all to some point
-in the axis of the glass beyond the surface; if the glass have a convex
-surface, the rays shall unite about the axis sooner, than otherwise
-they would do (as in fig. 140,) unless the point to which they tended
-was between the surface and the center of that surface. But if the
-surface be concave, they shall not meet so soon: nay perhaps converge.
-(See fig. 141 and 142.)
-
-5. FARTHER, because the light in passing out of glass into the air is
-turned by the refraction farther off from the line drawn through the
-point of incidence perpendicular to the refracting surface, than it was
-before; the light which spreads from a point shall by parting through
-a convex surface of glass into the air be made either to spread less
-than before (as in fig. 143,) or to gather about the axis beyond the
-glass (as in fig. 144.) But if the rays of light were proceeding to a
-point in the axis of the glass, they should by the refraction be made
-to unite sooner about that axis (as in fig. 145.) If the surface of
-the glass be concave, rays which proceed from a point shall be made to
-spread faster (as in fig 146,) but rays which are tending to a point in
-the axis of the glass, shall be made to gather about the axis farther
-from the glass (as in fig. 147) or even to diverge (as in fig. 148,)
-unless the point, to which the rays are directed, lies between the
-surface of the glass and its center.
-
-4. THE rays, which spread themselves from a point, are called
-diverging; and such as move toward a point, are called converging rays.
-And the point in the axis of the glass, about which the rays gather
-after refraction, is called the focus of those rays.
-
-5. IF a glass be formed of two convex spherical surfaces (as in fig.
-149,) where the glass AB is formed of the surfaces A C B and A D B, the
-line drawn through the centers of the two surfaces, as the line E F, is
-called the axis of the glass; and rays, which diverge from any point of
-this axis, by the refraction of the glass will be caused to converge
-toward some part of the axis, or at least to diverge as from a point
-more remote from the glass, than that from whence they proceeded; for
-the two surfaces both conspire to produce this effect upon the rays.
-But converging rays will be caused by such a glass as this to converge
-sooner. If a glass be formed of two concave surfaces, as the glass A
-B (in fig. 150,) the line C D drawn through the centers, to which the
-two surfaces are formed, is called the axis of the glass. Such a glass
-shall cause diverging rays, which proceed from any point in the axis
-of the glass, to diverge much more, as if they came from some place in
-the axis of the glass nearer to it than the point, whence the rays
-actually proceed. But converging rays will be made either to converge
-less, or even to diverge.
-
-[Illustration]
-
-6. IN these glasses rays, which proceed from any point near the axis,
-will be affected as it were in the same manner, as if they proceeded
-from the very axis it self, and such as converge toward a point at a
-small distance from the axis will suffer much the same effects from
-the glass, as if they converged to some point in the very axis. By
-this means any luminous body exposed to a convex glass may have an
-image formed upon any white body held beyond the glass. This may be
-easily tried with a common spectacle-glass. For if such a glass be held
-between a candle and a piece of white paper, if the distances of the
-candle, glass, and paper be properly adjusted, the image of the candle
-will appear very distinctly upon the paper, but be seen inverted; the
-reason whereof is this. Let A B (in fig. 151) be the glass, C D an
-object placed cross the axis of the glass. Let the rays of light, which
-issue from the point E, where the axis of the glass crosses the object,
-be so refracted by the glass, as to meet again about the point F. The
-rays, which diverge from the point C of the object, shall meet again
-almost at the same distance from the glass, but on the other side of
-the axis, as at G; for the rays at the glass cross the axis. In like
-manner the rays, which proceed from the point D, will meet about H on
-the other side of the axis. None of these rays, neither those which
-proceed from the point E in the axis, nor those which issue from C or
-D, will meet again exactly in one point; but yet in one place, as is
-here supposed at F, G, and H, they will be crouded so close together,
-as to make a distinct image of the object upon any body proper to
-reflect it, which shall be held there.
-
-7. IF the object be too near the glass for the rays to converge after
-the refraction, the rays shall issue out of the glass, as if they
-diverged from a point more distant from the glass, than that from
-whence they really proceed (as in fig. 152,) where the rays coming from
-the point E of the object, which lies on the axis of the glass A B,
-issue out of the glass, as if they came from the point F more remote
-from the glass than E; and the rays proceeding from the point C issue
-out of the glass, as if they proceeded from the point G; likewise the
-rays which issue from the point D emerge out of the glass, as if they
-came from the point H. Here the point G is on the same side of the
-axis, as the point C; and the point H on the same side, as the point
-D. In this case to an eye placed beyond the glass the object should
-appear, as if it were in the situation G F H.
-
-8. IF the glass A B had been concave (as in, fig. 153,) to an eye
-beyond the glass the object C D would appear in the situation G H,
-nearer to the glass than really it is. Here also the object will not be
-inverted; but the point G is on the same side the axe with the point C,
-and H on the same side as D.
-
-9. HENCE may be understood, why spectacles made with convex glasses
-help the sight in old age: for the eye in that age becomes unfit to
-see objects distinctly, except such as are remov’d to a very great
-distance; whence all men, when they first stand in need of spectacles,
-are observed to read at arm’s length, and to hold the object at a
-greater distance, than they used to do before. But when an object is
-removed at too great a distance from the sight, it cannot be seen
-clearly, by reason that a less quantity of light from the object will
-enter the eye, and the whole object will also appear smaller. Now by
-help of a convex glass an object may be held near, and yet the rays of
-light issuing from it will enter the eye, as if the object were farther
-removed.
-
-10. AFTER the same manner concave glasses assist such, as are short
-sighted. For these require the object to be brought inconveniently near
-to the eye, in order to their seeing it distinctly; but by such a glass
-the object may be removed to a proper distance, and yet the rays of
-light enter the eye, as if they came from a place much nearer.
-
-11. WHENCE these defects of the sight arise, that in old age
-objects cannot be seen distinct within a moderate distance, and in
-short-sightedness not without being brought too near, will be easily
-understood, when the manner of vision in general shall be explain’d;
-which I shall now endeavour to do, in order to be better understood in
-what follows. The eye is form’d, as is represented in fig. 154. It is
-of a globular figure, the fore part whereof scarce more protuberant
-than the rest is transparent. Underneath this transparent part is a
-small collection of an humour in appearance like water, and it has also
-the same refractive power as common water; this is called the aqueous
-humour, and fills the space A B C D in the figure. Next beyond lies the
-body D E F G; this is solid but transparent, it is composed with two
-convex surfaces, the hinder surface E F G being more convex, than the
-anterior E D G. Between the outer membrane A B C, and this body E D G
-F is placed that membrane, which exhibits the colours, that are seen
-round the sight of the eye; and the black spot, which is called the
-sight or pupil, is a hole in this membrane, through which the light
-enters, whereby we see. This membrane is fixed only by its outward
-circuit, and has a muscular power, whereby it dilates the pupil in
-a weak light, and contracts it in a strong one. The body D E F G is
-called the crystalline humour, and has a greater refracting power than
-water. Behind this the bulk of the eye is filled up with what is called
-the vitreous humor, this has much the same refractive power with water.
-At the bottom of the eye toward the inner side next the nose the optic
-glass enters, as at H, and spreads it self all over the inside of the
-eye, till within a small diftance from A and C. Now any object, as I K,
-being placed before the eye, the rays of light issuing from each point
-of this object are so refracted by the convex surface of the aqueous
-humour, as to be caused to converge; after this being received by the
-convex surface E D G of the crystalline humour, which has a greater
-refractive power than the aqueous, the rays, when they are entered into
-this surface, still more converge, and at going out of the surface E F
-G into a humour of a less refractive power than the crystalline they
-are made to converge yet farther. By all these successive refractions
-they are brought to converge at the bottom of the eye, so that a
-distinct image of the object as L M is impress’d on the nerve. And by
-this means the object is seen.
-
-11. IT has been made a difficulty, that the image of the object
-impressed on the nerve is inverted, so that the upper part of the image
-is impressed on the lower part of the eye. But this difficulty, I
-think, can no longer remain, if we only consider, that upper and lower
-are terms merely relative to the ordinary position of our bodies: and
-our bodies, when view’d by the eye, have their image as much inverted
-as other objects; so that the image of our own bodies, and of other
-objects, are impressed on the eye in the same relation to one another,
-as they really have.
-
-12. THE eye can see objects equally distinct at very different
-distances, but in one distance only at the same time. That the eye may
-accomodate itself to different distances, some change in its humours
-is requir’d. It is my opinion, that this change is made in the figure
-of the crystalline humour, as I have indeavoured to prove in another
-place.
-
-13. IF any of the humours of the eye are too flat, they will refract
-the light too little; which is the case in old age. If they are too
-convex, they refract too much; as in those who are short-sighted.
-
-14. THE manner of direct vision being thus explained, I proceed to give
-some account of telescopes, by which we view more distinctly remote
-objects; and also of microscopes, whereby we magnify the appearance of
-small objects. In the first place, the most simple sort of telescope
-is composed of two glasses, either both convex, or one convex, and the
-other concave. (The first sort of these is represented in fig. 155, the
-latter in fig. 156.)
-
-15. IN fig. 155 let A B represent the convex glass next the object, C
-D the other glass more convex near the eye. Suppose the object-glass A
-B to form the image of the object at E F; so that if a sheet of white
-paper were to be held in this place, the object would appear. Now
-suppose the rays, which pass the glass A B, and are united about F, to
-proceed to the eye glass C D, and be there refracted. Three only of
-these rays are drawn in the figure, those which pass by the extremities
-of the glass A B, and that which passes its middle. If the glass C D
-be placed at such a distance from the image E F, that the rays, which
-pass by the point F, after having proceeded through the glass diverge
-so much, as the rays do that come from an object, which is at such a
-distance from the eye as to be seen distinctly, these being received
-by the eye will make on the bottom of the eye a distinct representation
-of the point F. In like manner the rays, which pass through the object
-glass A B to the point E after proceeding through the eye-glass C D
-will on the bottom of the eye make a distinct representation of the
-point E. But if the eye be placed where these rays, which proceed from
-E, cross those, which proceed from F, the eye will receive the distinct
-impression of both these points at the same time; and consequently
-will also receive a distinct impression from all the intermediate
-parts of the image E F, that is, the eye will see the object, to which
-the telescope is directed, distinctly. The place of the eye is about
-the point G, where the rays H E, H F cross, which pass through the
-middle of the object-glass A B to the points E and F; or at the place
-where the focus would be formed by rays coming from the point H, and
-refracted by the glass C D. To judge how much this instrument magnifies
-any object, we must first observe, that the angle under E H F, in which
-the eye at the point H would see the image E F, is nearly the same as
-the angle, under which the object appears by direct vision; but when
-the eye is in G, and views the object through the telescope, it sees
-the same under a greater angle; for the rays, which coming from E and F
-cross in G, make a greater angle than the rays, which proceed from the
-point H to these points E and F. The angle at G is greater than that at
-H in the proportion, as the distance between the glasses A B and C D is
-greater than the distance of the point G from the glass C D.
-
-16. THIS telescope inverts the object; for the rays, which came from
-the right-hand side of the object, go to the point E the left side of
-the image; and the rays, which come from the left side of the object,
-go to F the right side of the image. These rays cross again in G, so
-that the rays, which come from the right side of the object, go to the
-right side of the eye; and the rays from the left side of the object go
-to the left side of the eye. Therefore in this telescope the image in
-the eye has the same situation as the object; and seeing that in direct
-vision the image in the eye has an inverted situation, here, where
-the situation is not inverted, the object must appear so. This is no
-inconvenience to astronomers in celestial observations; but for objects
-here on the earth it is usual to add two other convex glasses, which
-may turn the object again (as is represented in fig. 157,) or else to
-use the other kind of telescope with a concave eye-glass.
-
-17. IN this other kind of telescope the effect is founded on the same
-principles, as in the former. The distinctness of the appearance is
-procured in the same manner. But here the eye-glass C D (in fig. 156)
-is placed between the image E F, and the object glass A B. By this
-means the rays, which come from the right-hand side of the object,
-and proceed toward E the left side of the image, being intercepted by
-the eye-glass are carried to the left side of the eye; and the rays,
-which come from the left side of the object, go to the right side of
-the eye; so that the impression in the eye being inverted the object
-appears in the same situation, as when view’d by the naked eye. The
-eye must here be placed close to the glass. The degree of magnifying in
-this instrument is thus to be found. Let the rays, which pass through
-the glass A B at H, after the refraction of the eye-glass C D diverge,
-as if they came from the point G; then the rays, which come from the
-extremities of the object, enter the eye under the angle at G; so
-that here also the object will be magnified in the proportion of the
-distance between the glasses, to the distance of G from the eye-glass.
-
-18. THE space, that can be taken in at one view in this telescope,
-depends on the breadth of the pupil of the eye; for as the rays, which
-go to the points E, F of the image, are something distant from each
-other, when they come out of the glass C D, if they are wider asunder
-than the pupil, it is evident, that they cannot both enter the eye
-at once. In the other telescope the eye is placed in the point G,
-where the rays that come from the points E or F cross each other, and
-therefore must enter the eye together. On this account the telescope
-with convex glasses takes in a larger view, than those with concave.
-But in these also the extent of the view is limited, because the
-eye-glass does not by the refraction towards its edges form so distinct
-a representation of the object, as near the middle.
-
-18. MICROSCOPES are of two sorts. One kind is only a very convex glass,
-by the means of which the object may be brought very near the eye, and
-yet be seen distinctly. This microscope magnifies in proportion, as
-the object by being brought near the eye will form a broader impression
-on the optic nerve. The other kind made with convex glasses produces
-its effects in the same manner as the telescope. Let the object A B
-(in fig. 158) be placed under the glass C D, and by this glass let an
-image be formed of this object. Above this image let the glass G H be
-placed. By this glass let the rays, which proceed from the points A and
-B, be refracted, as is expressed in the figure. In particular, let the
-rays, which from each of these points pass through the middle of the
-glass C D, cross in I, and there let the eye be placed. Here the object
-will appear larger, when seen through the microscope, than if that
-instrument were removed, in proportion as the angle, in which these
-rays cross in I, is greater than the angle, which the lines would make,
-that should be drawn from I to A and B; that is, in the proportion made
-up of the proportion of the distance of the object A B from I, to the
-distance of I from the glass G H; and of the proportion of the distance
-between the glasses, to the distance of the object A B from the glass C
-D.
-
-
-19. I SHALL now proceed to explain the imperfection in these
-instruments, occasioned by the different refrangibility of the light
-which comes from every object. This prevents the image of the object
-from being formed in the focus of the object glass with perfect
-distinctness; so that if the eye-glass magnify the image overmuch,
-the imperfections of it must be visible, and make the whole appear
-confused. Our author more fully to satisfy himself, that the different
-refrangibility of the several sorts of rays is sufficient to produce
-this irregularity, underwent the labour of a very nice and difficult
-experiment, whose process he has at large set down, to prove, that the
-rays of light are refracted as differently in the small refraction
-of telescope glasses as in the larger of the prism; so exceeding
-careful has he been in searching out the true cause of this effect.
-And he used, I suppose, the greater caution, because another reason
-had before been generally assigned for it. It was the opinion of all
-mathematicians, that this defect in telescopes arose from the figure,
-in which the glasses were formed; a spherical refracting surface not
-collecting into an exact point all the rays which come from any one
-point of an object, as has before been said[330]. But after our author
-has proved, that in these small refractions, as well as in greater,
-the sine of incidence into air out of glass, to the sine of refraction
-in the red-making rays, is as 50 to 77, and in the blue-making rays 50
-to 78; he proceeds to compare the inequalities of refraction arising
-from this different refrangibility of the rays, with the inequalities,
-which would follow from the figure of the glass, were light uniformly
-refracted. For this purpose he observes, that if rays issuing from
-a point so remote from the object glass of a telescope, as to be
-esteemed parallel, which is the case of the rays, which come from the
-heavenly bodies; then the distance from the glass of the point, in
-which the least refrangible rays are united, will be to the distance,
-at which the most refrangible rays unite, as 28 to 27; and therefore
-that the least space, into which all the rays can be collected, will
-not be less than the 55th part of the breadth of the glass. For if A
-B (in fig. 159) be the glass, C D its axis, E A, F B two rays of the
-light parallel to that axis entring the glass near its edges; after
-refraction let the least refrangible part of these rays meet in G,
-the most refrangible in H; then, as has been said, G I will be to I
-H, as 28 to 27; that is, G H will be the 28th part of G I, and the
-27th part of H I; whence if K L be drawn through G, and M N through H,
-perpendicular to C D, M N will be the a 28th part of A B, the breadth
-of the glass, and K L the 27th part of the same; so that O P the least
-space, into which the rays are gathered, will be about half the mean
-between these two, that is the 55th part of A B.
-
-20. THIS is the error arising from the different refrangibility
-of the rays of light, which our author finds vastly to exceed the
-other, consequent upon the figure of the glass. In particular, if the
-telescope glass be flat on one side, and convex on the other; when the
-flat side is turned towards the object, by a theorem, which he has laid
-down, the error from the figure comes out above 5000 times less than
-the other. This other inequality is so great, that telescopes could
-not perform so well as they do, were it not that the light does not
-equally fill all the space O P, over which it is scattered, but is much
-more dense toward the middle of that space than at the extremities. And
-besides, all the kinds of rays affect not the sense equally strong, the
-yellow and orange being the strongest, the red and green next to them,
-the blue indigo and violet being much darker and fainter colours; and
-it is shewn that all the yellow and orange, and three fifths of the
-brighter half of the red next the orange, and as great a share of the
-brighter half of the green next the yellow, will be collected into a
-space whose breadth is not above the 250th part of the breadth of the
-glass.
-
-[Illustration]
-
-And the remaining colours, which fall without this space, as they are
-much more dull and obscure than these, so will they be likewise much
-more diffused; and therefore call hardly affect the sense in comparison
-of the other. And agreeable to this is the observation of astronomers,
-that telescopes between twenty and sixty feet in length represent the
-fixed stars, as being about 5 or 6, at most about 8 or 10 seconds in
-diameter. Whereas other arguments shew us, that they do not really
-appear to us of any sensible magnitude any otherwise than as their
-light is dilated by refraction. One proof that the fixed stars do not
-appear to us under any sensible angle is, that when the moon passes
-over any of them, their light does not, like the planets on the same
-occasion, disappear by degrees, but vanishes at once.
-
-21. OUR author being thus convinced, that telescopes were not
-capable of being brought to much greater perfection than at present
-by refractions, contrived one by reflection, in which there is no
-separation made of the different coloured light; for in every kind of
-light the rays after reflection have the same degree of inclination
-to the surface, from whence they are reflected, as they have at their
-incidence, so that those rays which come to the surface in one line,
-will go off also in one line without any parting from one another.
-Accordingly in the attempt he succeeded so well, that a short one, not
-much exceeding six inches in length, equalled an ordinary telescope
-whose length was four feet. Instruments of this kind to greater
-lengths, have of late been made, which fully answer expectation[331].
-
-
-
-
-~CHAP. V.~
-
-Of the RAINBOW.
-
-
-I SHALL now explain the rainbow. The manner of its production was
-understood, in the general, before Sir ~ISAAC NEWTON~ had discovered
-his theory of colours; but what caused the diversity of colours in it
-could not then be known, which obliges him to explain this appearance
-particularly; whom we shall imitate as follows. The first person, who
-expressly shewed the rainbow to be formed by the reflection of the
-sun-beams from drops of falling rain, was ANTONIO DE DOMINIS. But this
-was afterwards more fully and distinctly explained by DESCARTES.
-
-2. THERE appears most frequently two rainbows; both of which are caused
-by the foresaid reflection of the sun-beams from the drops of falling
-rain, but are not produced by all the light which falls upon and are
-reflected from the drops. The inner bow is produced by those rays only
-which enter the drop, and at their entrance are so refracted as to
-unite into a point, as it were, upon the farther surface of the drop,
-as is represented in fig. 160; where the contiguous rays _a b_, _c d_,
-_e f_, coming from the sun, and therefore to sense parallel, upon
-their entrance into the drop in the points _b, d, f_, are so refracted
-as to meet together in the point _g_, upon the farther surface of
-the drop. Now these rays being reflected nearly from the same point
-of the surface, the angle of incidence of each ray upon the point g
-being equal to the angle of reflection, the rays will return in the
-lines _g h, g k, g l_, in the same manner inclined to each other, as
-they were before their incidence upon the point _g_, and will make
-the same angles with the surface of the drop at the points _b, k,
-l_, as at the points _b, d, f_, after their entrance; and therefore
-after their emergence out of the drop each ray will be inclined to the
-surface in the same angle, as when it first entered it; whence the
-lines _b m, k n, l o_, in which the rays emerge, must be parallel to
-each other, as well as the lines _a b, c d, e f_, in which they were
-incident. But these emerging rays being parallel will not spread nor
-diverge from each other in their passage from the drop, and therefore
-will enter the eye conveniently situated in sufficient plenty to cause
-a sensation. Whereas all the other rays, whether those nearer the
-center of the drop, as _p q, r s_, or those farther off, as _t u, w
-x_, will be reflected from other points in the hinder surface of the
-drop; namely, the ray _p q_ from the point _y, r s_ from _z, t v_
-from α, and _w x_ from β. And for this reason by their reflection and
-succeeding refraction they will be scattered after their emergence from
-the forementioned rays and from each other, and therefore cannot enter
-the eye placed to receive them copious enough to excite any distinct
-sensation.
-
-3. THE external rainbow is formed by two reflections made between the
-incidence and emergence of the rays; for it is to be noted, that the
-rays _g h, g k, g l_, at the points _h, k, l_, do not wholly pass
-out of the drop, but are in part reflected back; though the second
-reflection of these particular rays does not form the outer bow. For
-this bow is made by those rays, which after their entrance into the
-drop are by the refraction of it united, before they arrive at the
-farther surface, at such a distance from it, that when they fall
-upon that surface, they may be reflected in parallel lines, as is
-represented in fig. 161; where the rays _a b, c d, e f_, are collected
-by the refraction of the drop into the point _g_, and passing on from
-thence strike upon the surface of the drop in the points _h, k, l_, and
-are thence reflected to _m, n, o_, passing from _h_ to _m_, from _k_
-to _n_, and from _l_ to _o_ in parallel lines. For these rays after
-reflection at _m, n, o_, will meet again in the point _p_, at the same
-distance from these points of reflection _m, n, o_, as the point _g_ is
-from the former points of reflection _h, k, l_. Therefore these rays
-in passing from _p_ to the surface of the drop will fall upon that
-surface in the points _q, r, s_ in the same angles, as these rays made
-with the surface in _b, d, f_, after refraction. Consequently, when
-these rays emerge out of the drop into the air, each ray will make
-with the surface of the drop the same angle, as it made at its first
-incidence; so that the lines _q t, r v, s w_, in which they come from
-the drop, will be parallel to each other, as well as the lines _a b,
-c d, e f_, in which they came to the drop. By this means these rays
-to a spectator commodiously situated will become visible. But all the
-other rays, as well those nearer the center of the drop _x y_, _z_
-α, as those more remote from it β γ, δ ε, will be reflected in lines
-not parallel to the lines _h m, k n, l o_; namely, the ray _x y_, in
-the line ζ η, the ray ϰ α in the line θ ϰ, the ray β γ in the line
-λ μ, and the ray δ ε in the line ν χ. Whence these rays after their
-next reflection and subsequent refraction will be scattered from the
-forementioned rays, and from one another, and by that means become
-invisible.
-
-4. IT is farther to be remarked, that if in the first case the incident
-rays _a b, c d, e f_, and their correspondent emergent rays _h m, k
-n, l o_, are produced till they meet, they will make with each other
-a greater angle, than any other incident ray will make with its
-corresponding emergent ray. And in the latter case, on the contrary,
-the emergent rays _q t, r v, s w_ make with the incident rays an acuter
-angle, than is made by any other of the emergent rays.
-
-5. OUR author delivers a method of finding each of these extream angles
-from the degree of refraction being given; by which method it appears,
-that the first of these angles is the less, and the latter the greater,
-by how much the refractive power of the drop, or the refrangibility of
-the rays is greater. And this last consideration fully compleats the
-doctrine of the rainbow, and shews, why the colours of each bow are
-ranged in the order wherein they are seen.
-
-6. SUPPOSE A (in fig. 162.) to be the eye, B, C, D, E, F, drops of
-rain, M _n_, O _p_, Q _r_, S _t_, V _w_ parcels of rays of the sun,
-which entring the drops B, C, D, E, F after one reflection pass out to
-the eye in A. Now let M _n_ be produced to η till it meets with the
-emergent ray likewise produced, let O _p_ produced meet its emergent
-ray produced in ϰ, let Q _r_ meet its emergent ray in λ, let S _t_ meet
-its emergent ray in μ, and let V _w_ meet its emergent ray produced
-in ν. If the angle under M η A be that, which is derived from the
-refraction of the violet-making rays by the method we have here spoken
-of, it follows that the violet light will only enter the eye from
-the drop B, all the other coloured rays passing below it, that is,
-all those rays which are not scattered, but go out parallel so as to
-cause a sensation. For the angle, which these parallel emergent rays
-makes with the incident in the most refrangible or violet-making rays,
-being less than this angle in any other sort of rays, none of the rays
-which emerge parallel, except the violet-making, will enter the eye
-under the angle M η A, but the rest making with the incident ray M η
-a greater angle than this will pass below the eye. In like manner if
-the angle under O ϰ A agrees to the blue-making rays, the blue rays
-only shall enter the eye from the drop C, and all the other coloured
-rays will pass by the eye, the violet-coloured rays passing above, the
-other colours below. Farther, the angle Q λ A corresponding to the
-green-making rays, those only shall enter the eye from the drop D, the
-violet and blue-making rays passing above, and the other colours, that
-is the yellow and red, below. And if the angle S μ A answers to the
-refraction of the yellow-making rays, they only shall come to the eye
-from the drop E. And in the last place, if the angle V ν A belongs to
-the red-making and least refrangible rays, they only shall enter the
-eye from the drop F, all the other coloured rays passing above.
-
-7. BUT now it is evident, that all the drops of water found in any of
-the lines A ϰ, A λ, A μ, A ν, whether farther from the eye, or nearer
-than the drops B, C, D, E, F, will give the same colours as these do,
-all the drops upon each line giving the same colour; so that the light
-reflected from a number of these drops will become copious enough to be
-visible; whereas the reflection from one minute drop alone could not be
-perceived. But besides, it is farther manifest, that if the line A Ξ be
-drawn from the sun through the eye, that is, parallel to the lines M
-_n_, O _p_, Q _r_, S _t_, V _w_, and if drops of water are placed all
-round this line, the same colour will be exhibited by all the drops at
-the same distance from this line. Hence it follows, that when the sun
-is moderately elevated above the horizon, if it rains opposite to it,
-and the sun shines upon the drops as they fall, a spectator with his
-back turned to the sun must observe a coloured circular arch reaching
-to the horizon, being red without, next to that yellow, then green,
-blue, and on the inner edge violet; only this last colour appears faint
-by being diluted with the white light of the clouds, and from another
-cause to be mentioned hereafter[332].
-
-8. THUS is caused the interior or primary bow. The drops of rain at
-some distance without this bow will cause the exterior or secondary
-bow by two reflections of the sun’s light. Let these drops be G, H, I,
-K, L; X _y_, Z α, Γ β, Δ ι, Θ ζ denoting parcels of rays which enter
-each drop. Now it has been remarked, that these rays make with the
-visible refracted rays the greatest angle in those rays, which are
-most refrangible. Suppose therefore the visible refracted rays, which
-pass out from each drop after two reflections, and enter the eye in
-A, to intersect the incident rays in π, ρ, σ, τ, φ respectively. It
-is manifest, that the angle under Θ φ A is the greatest of all, next
-to that the angle under Δ τ A, the next in bigness will be the angle
-under Γ σ A, the next to this the angle under Z ρ A, and the least of
-all the angle under X π A. From the drop L therefore will come to the
-eye the violet-making, or most refrangible rays, from K the blue, from
-I the green, from H the yellow, and from G the red-making rays; and
-the like will happen to all the drops in the lines A π, A ρ, A τ, A φ,
-and also to all the drops at the same distances from the line A Ξ all
-round that line. Whence appears the reason of the secondary bow, which
-is seen without the other, having its colours in a contrary order,
-violet without and red within; though the colours are fainter than in
-the other bow, as being made by two reflections, and two refractions;
-whereas the other bow is made by two refractions, and one reflection
-only.
-
-9. THERE is a farther appearance in the rainbow particularly described
-about five years ago[333], which is, that under the upper part or
-the inner bow there appears often two or three orders of very faint
-colours, making alternate arches of green, and a reddish purple. At the
-time this appearance was taken notice of, I gave my thoughts concerning
-the cause of it[334], which I shall here repeat. Sir ~ISAAC NEWTON~ has
-observed, that in glass, which is polished and quick-silvered, there is
-an irregular refraction made, whereby some small quantity of light is
-scattered from the principal reflected beam[335]. If we allow the same
-thing to happen in the reflection whereby the rainbow is caused, it
-seems sufficient to produce the appearance now mentioned.
-
-10. LET A B (in fig. 162.) represent a globule of water, B the point
-from whence the rays of any determinate species being reflected to C,
-and afterwards emerging in the line C D, would proceed to the eye, and
-cause the appearance of that colour in the rainbow, which appertains to
-this species. Here suppose, that besides what is reflected regularly,
-some small part of the light is irregularly scattered every way; so
-that from the point B, besides the rays that are regularly reflected
-from B to C, some scattered rays will return in other lines, as
-in B E, B F, B G, B H, on each side the line B C. Now it has been
-observed above[336], that the rays of light in their passage from one
-superficies of a refracting body to the other undergo alternate fits
-of easy transmission and reflection, succeeding each other at equal
-intervals; insomuch that if they reach the farther superficies in one
-sort of those fits, they shall be transmitted; if in the other kind
-of them, they shall rather be reflected back. Whence the rays that
-proceed from B to C, and emerge in the line C D, being in a fit of
-easy transmission, the scattered rays, that fall at a small distance
-without these on either side (suppose the rays that pass in the lines
-B E, B G) shall fall on the surface in a fit of easy reflection, and
-shall not emerge; but the scattered rays, that pass at some distance
-without these last, shall arrive at the surface of the globule in a fit
-of easy transmission, and break through that surface. Suppose these
-rays to pass in the lines B F, B H; the former of which rays shall have
-had one fit more of easy transmission, and the latter one fit less,
-than the rays that pass from B to C. Now both these rays, when they
-go out of the globule, will proceed by the refraction of the water
-In the lines F I, H K, that will be inclined almost equally to the
-rays incident on the globule, which come from the sun; but the angles
-of their inclination will be less than the angle, in which the rays
-emerging in the line C D are inclined to those incident rays. And after
-the same manner rays scattered from the point B at a certain distance
-without these will emerge out of the globule, while the intermediate
-rays are intercepted; and these emergent rays will be inclined to the
-rays incident on the globule in angles still less than the angles, in
-which the rays F I and H K are inclined to them; and without these rays
-will emerge other rays, that shall be inclined to the incident rays in
-angles yet less.
-
-[Illustration]
-
-Now by this means may be formed of every kind of rays, besides the
-principal arch, which goes to the formation of the rainbow, other
-arches within every one of the principal of the same colour, though
-much more faint; and this for divers successions, as long as these weak
-lights, which in every arch grow more and more obscure, shall continue
-visible. Now as the arches produced by each colour will be variously
-mixed together, the diversity of colours observ’d in these secondary
-arches may very possibly arise from them.
-
-11. IN the darker colours these arches may reach below the bow, and
-be seen distinct. In the brighter colours these arches are lost in
-the inferior part of the principal light of the rainbow; but in all
-probability they contribute to the red tincture, which the purple of
-the rainbow usually has, and is most remarkable when these secondary
-colours appear strongest. However these secondary arches in the
-brightest colours may possibly extend with a very faint light below the
-bow, and tinge the purple of these secondary arches with a reddish hue.
-
-12. THE precise distances between the principal arch and these fainter
-arches depend on the magnitude of the drops, wherein they are formed.
-To make them any degree separate it is necessary the drop be exceeding
-small. It is most likely, that they are formed in the vapour of the
-cloud, which the air being put in motion by the fall of the rain may
-carry down along with the larger drops; and this may be the reason, why
-these colours appear under the upper part of the bow only, this vapour
-not descending very low. As a farther confirmation of this, these
-colours are seen strongest, when the rain falls from very black clouds,
-which cause the fiercest rains, by the fall whereof the air will be
-most agitated.
-
-13. TO the like alternate return of the fits of easy transmission and
-reflection in the passage of light through the globules of water, which
-compose the clouds, Sir ISAAC NEWTON ascribes some of those coloured
-circles, which at times appear about the sun and moon[337].
-
-[Illustration]
-
-[Illustration]
-
-
-
-
-CONCLUSION.
-
-
-SIR ~ISAAC NEWTON~ having concluded each of his philosophical treatises
-with some general reflections, I shall now take leave of my readers
-with a short account of what he has there delivered. At the end of
-his mathematical principles of natural philosophy he has given us his
-thoughts concerning the Deity. Wherein he first observes, that the
-similitude found in all parts of the universe makes it undoubted, that
-the whole is governed by one supreme being, to whom the original is
-owing of the frame of nature, which evidently is the effect of choice
-and design. He then proceeds briefly to state the best metaphysical
-notions concerning God. In short, we cannot conceive either of space
-or time otherwise than as necessarily existing; this Being therefore,
-on whom all others depend, must certainly exist by the same necessity
-of nature. Consequently wherever space and time is found, there God
-must also be. And as it appears impossible to us, that space should be
-limited, or that time should have had a beginning, the Deity must be
-both immense and eternal.
-
-2. AT the end of his treatise of optics he has proposed some thoughts
-concerning other parts of nature, which he had not distinctly searched
-into. He begins with some farther reflections concerning light, which
-he had not fully examined. In particular he declares his sentiments at
-large concerning the power, whereby bodies and light act on each other.
-In some parts of his book he had given short hints at his opinion
-concerning this[338], but here he expressly declares his conjecture,
-which we have already mentioned[339], that this power is lodged in
-a very subtle spirit of a great elastic force diffused thro’ the
-universe, producing not only this, but many other natural operations.
-He thinks it not impossible, that the power of gravity itself should be
-owing to it. On this occasion he enumerates many natural appearances,
-the chief of which are produced by chymical experiments. From numerous
-observations of this kind he makes no doubt, that the smallest parts of
-matter, when near contact, act strongly on each other, sometimes being
-mutually attracted, at other times repelled.
-
-3. THE attractive power is more manifest than the other, for
-the parts of all bodies adhere by this principle. And the name of
-attraction, which our author has given to it, has been very freely
-made use of by many writers, and as much objected to by others. He has
-often complained to me of having been misunderstood in this matter.
-What he lays upon this head was not intended by him as a philosophical
-explanation of any appearances, but only to point out a power in nature
-not hitherto distinctly observed, the cause of which, and the manner of
-its acting, he thought was worthy of a diligent enquiry. To acquiesce
-in the explanation of any appearance by asserting it to be a general
-power of attraction, is not to improve our knowledge in philosophy, but
-rather to put a stop to our farther search.
-
-                                FINIS.
-
-[Illustration]
-
-
-
-
-                              FOOTNOTES:
-
-[1] Philosoph. Nat. princ. math. L. iii. introduct.
-
-[2] Nov. Org. Scient. L. i. Aphorism. 9.
-
-[3] Nov. Org. L. i. Aph. 19.
-
-[4] Ibid. Aph. 25.
-
-[5] Aph. 30. Errores radicales & in prima digestione mentis ab
-excellentia functionum & remediorum sequentium non curantur.
-
-[6] Aph. 38.
-
-[7] Ibid.
-
-[8] Aph. 39.
-
-[9] Aph. 41.
-
-[10] Aph. 10, 24.
-
-[11] Aph. 45.
-
-[12] De Cartes Princ. Phil. Part. 3. §. 52.
-
-[13] Fermat, in Oper. pag. 156, &c.
-
-[14] Nov. Org. Aph. 46.
-
-[15] Aph. 50.
-
-[16] Ibid.
-
-[17] Aph 53.
-
-[18] Aph. 54.
-
-[19] Aph. 56.
-
-[20] Aph. 55.
-
-[21] Locke, On human understanding, B. iii.
-
-[22] Nov. Org. Aph. 59.
-
-[23] In the conclusion.
-
-[24] Nov. Org. L. i. Aph. 59.
-
-[25] Ibid. Aph. 60.
-
-[26] Ibid. Aph. 62.
-
-[27] Aph. 63.
-
-[28] Aph. 64.
-
-[29] Aph. 65.
-
-[30] See above, § 4, 5.
-
-[31] Nov. Org. L. i. Aph. 69.
-
-[32] Ibid.
-
-[33] Ibid. Aph. 109.
-
-[34] Book III. Chap. iv.
-
-[35] Book I. Chap. 2. § 14.
-
-[36] Ibid. § 85, &c.
-
-[37] See Book II. Ch. 3. § 3, 4. of this treatise.
-
-[38] See Book II. Ch. 3. of this treatise.
-
-[39] See Chap. 4.
-
-[40] At the end of his Optics. in Qu. 21.
-
-[41] See the same treatise, in Advertisement 2.
-
-[42] Nov. Org. Lib. i. Ax. 105.
-
-[43] Princip. philos. pag. 13, 14.
-
-[44] Princ. Philos. L. II. prop. 24. corol. 7. See also B. II. Ch. 5. §
-3. of this treatise.
-
-[45] How this degree of elasticity is to be found by experiment, will
-be shewn below in § 74.
-
-[46] In oper. posthum de Motu corpor. ex percussion. prop. 9.
-
-[47] In the above-cited place.
-
-[48] In the place above-cited.
-
-[49] These experiments are described in § 73.
-
-[50] Book II. Chap. 5.
-
-[51] Chap. 1. § 25, 26, 27, compared with § 15, &c.
-
-[52] Book II. Chap. 5. § 3.
-
-[53] See Euclid’s Elements, Book XII. prop. 13.
-
-[54] Archimed. de æquipond. prop. 11.
-
-[55] Ibid. prop. 12.
-
-[56] Lucas Valerius De centr. gravit. solid. L. I. prop. 2.
-
-[57] Idem L. II. prop. 2.
-
-[58] § 25.
-
-[59] § 27.
-
-[60] Pag. 65, 68.
-
-[61] § 23.
-
-[62] § 20
-
-[63] § 17.
-
-[64] § 27.
-
-[65] Hugen. Horolog. oscillat. pag. 141, 142.
-
-[66] See Hugen. Horolog. Oscillat. p. 142.
-
-[67] Princip. Philos. pag. 22.
-
-[68] Chap. 1. § 29.
-
-[69] Princip. Philos. pag. 25.
-
-[70] § 71.
-
-[71] See Method. Increment. prop. 25.
-
-[72] Lib. XI. Def.
-
-[73] Chap. 2. § 17.
-
-[74] See above Ch. 2. § 17.
-
-[75] From B II. Ch. 3.
-
-[76] Prin. Philos. pag. 7, &c.
-
-[77] See Newton, princip. philos. pag. 9. lin. 30.
-
-[78] Princip. Philos. pag. 10.
-
-[79] Renat. Des Cart. Princ. Philos. Part. II. § 25.
-
-[80] Ibid. § 30.
-
-[81] § 85, &c.
-
-[82] Princip. Philos. Lib. I. prop. 9.
-
-[83] § 92.
-
-[84] Ch. II. § 22.
-
-[85] Viz. L. I. prop. 30, 29, & 26.
-
-[86] Ch. II. § 21, 22.
-
-[87] viz. His doctrine of prime and ultimate ratios.
-
-[88] § 57
-
-[89] § 3.
-
-[90] Ch. 2. § 22.
-
-[91] § 12.
-
-[92] Ch. 1. sect. 21, 22.
-
-[93] Elem. Book I. p. 37.
-
-[94] § 12.
-
-[95] Ch 1 § 24.
-
-[96] Ch 2 select. 17.
-
-[97] Newt. Princ. L. II. prop. 2; 5, 6, 7; 11, 12.
-
-[98] Prop. 3; 8, 9; 13, 14.
-
-[99] Prop. 4.
-
-[100] Prælect. Geometr. pag. 123.
-
-[101] Newton. Princ. Lib. II. prop. 10.
-
-[102] Newton. Princ. Lib II. prop 10. in schol.
-
-[103] Torricelli de motu gravium.
-
-[104] Ch. 2 § 85, &c.
-
-[105] Newt. Princ L. II. sect 6.
-
-[106] L. II. sect. 4.
-
-[107] See B. II. Ch 6. § 7. of this treatise.
-
-[108] Lib. I. sect. 10.
-
-[109] De la Pesanteur, pag. 169, and the following.
-
-[110] Newton. Princ. L. II. prop 4. schol.
-
-[111] See his Tract on the admirable rarifaction of the air.
-
-[112] Book II. Ch. 6.
-
-[113] Princ. philos. Lib. II. prop. 23.
-
-[114] Book I. Ch. 2. § 30.
-
-[115] Princ. philos. Lib. II. prop. 23, in schol.
-
-[116] Princ. philos. Lib. II. prop. 33. coroll.
-
-[117] Lib. II. Ch. 5.
-
-[118] Ibid. Prop. 35. coroll. 2.
-
-[119] Ibid. coroll. 3.
-
-[120] Vid. ibid. coroll. 6.
-
-[121] In § 2.
-
-[122] Princ. philos. Lib. II. Prop. 35.
-
-[123] Ibid.
-
-[124] Id.
-
-[125] h. 1. § 29.
-
-[126] Princ. philos. Lib. II. Prop. 38, compared with coroll. 1 of
-prop. 35.
-
-[127] L. II. Lem. 7. schol. pag. 341.
-
-[128] Lib. II. Prop. 34.
-
-[129] Lib. II. Lem. 7. p. 341.
-
-[130] Schol. to Lem. 7.
-
-[131] Prop. 34. schol.
-
-[132] Ibid.
-
-[133] Ibid.
-
-[134] Book II. Ch. I. § 6.
-
-[135] Vid. Newt. princ. in schol. to Lem. 7, of Lib. II. pag. 341.
-
-[136] Sect. 17. of this chapter.
-
-[137] See Princ. philos. Lib. II. prop. 34.
-
-[138] Vid. Princ. philos. Lib. II. Lem. 5. p. 314.
-
-[139] Lemm. 6.
-
-[140] Ibid. 7.
-
-[141] Newt. Princ. Lib. II. prop. 40, in schol.
-
-[142] Lib. II. in schol. post prop. 31.
-
-[143] Book I. ch. 2 § 82.
-
-[144] Book I. Ch. 3 § 29.
-
-[145] Ch. 3. of this present book.
-
-[146] Ch. 4.
-
-[147] In Princ. philos. part. 3.
-
-[148] Philos. princ. mathem. Lib. II. prop. 2. & schol.
-
-[149] Ibid. prop 53.
-
-[150] Philos. princ. prop. 52. coroll. 4.
-
-[151] Ibid.
-
-[152] Coroll. 11.
-
-[153] See ibid. schol. post prop. 53.
-
-[154] Princ. philos. pag. 316, 317.
-
-[155] Ch. I. § 7.
-
-[156] Book I. Ch. 3.
-
-[157] Book I. Ch. 3. § 29.
-
-[158] Ibid. Ch. 2. § 30, 17.
-
-[159] Book I. Ch. 3.
-
-[160] Ch. 1. § 7.
-
-[161] Chap. 5. § 8.
-
-[162] Princ. pag. 60.
-
-[163] Street, in Astron. Carolin.
-
-[164] See Chap. 5. §9, &c.
-
-[165] In the foregoing page.
-
-[166] See Newton. Princ. Lib. III. prop. 13.
-
-[167] Chap. 5. § 10.
-
-[168] Princ. Lib. I. prop. 60.
-
-[169] Book I, Chap. 2. § 80.
-
-[170] Princ. philos. Lib. I. prop. 58. coroll. 3.
-
-[171] Newt. Optics. pag. 378.
-
-[172] Newton. Princ. Lib. III. prop. 1.
-
-[173] Newton, Princ. Lib. III. pag. 390,391. compared with pag. 393.
-
-[174] Book I. Ch. 3. § 29.
-
-[175] Princ. philos. Lib. I. prop. 4.
-
-[176] Ibid. coroll.
-
-[177] Newt. Princ. philos. Lib. III. pag. 390.
-
-[178] Newt. Princ. philos. Lib. III. pag. 391, 392.
-
-[179] Book III. Ch. 4.
-
-[180] Newt. Princ. philos. Lib. III. pag. 391.
-
-[181] Ibid. pag. 392.
-
-[182] See Book I. Ch. 2. § 60, 64.
-
-[183] Book I. Ch. 2. § 17.
-
-[184] See Ch. II. § 6.
-
-[185] The second of the laws of motion laid down in Book I. Ch. 1.
-
-[186] Newton. Princ. philos. Lib. III. prop. 6. pag. 401.
-
-[187] Newton’s Princ. philos. Lib. III. prop. 22, 23.
-
-[188] Newton. Princ. Lib. I. prop. 66. coroll. 7.
-
-[189] Menelai Sphaeric. Lib. I. prop. 10.
-
-[190] Vid. Newt. Princ. Lib. I. prop. 66. coroll. 10.
-
-[191] Vid. Newt. Princ. Lib. III prop. 30. p. 440.
-
-[192] Ibid. Lib. I. prop. 66. coroll. 10.
-
-[193] What this proportion is, may be known from Coroll. 2 prop. 44.
-Lib. I. Princ. philos. Newton.
-
-[194] Princ. Phil. Newt. Lib. I. prop. 45. Coroll. 1.
-
-[195] Pr. Phil. Newt. Lib. I. prop. 66. Coroll. 7.
-
-[196] See § 19 of this chapter.
-
-[197] Phil. Nat. Pr. Math Lib. I. prop. 66. cor. 8.
-
-[198] Ibid. Coroll. 8.
-
-[199] Ibid.
-
-[200] Ibid.
-
-[201] Newt. Princ. Lib. III. prop. 29.
-
-[202] Ibid. prop. 28.
-
-[203] Ibid. prop. 31.
-
-[204] Newt. Princ. pag. 459.
-
-[205] In Princ. philos. part. 3. § 41.
-
-[206] Chap. 1. § 11.
-
-[207] Newton. Princ. philos. Lib. III. Lemm. 4. pag. 478.
-
-[208] Princ. philos. Lib. III. prop. 40.
-
-[209] Book I. chap. 2. § 82.
-
-[210] Princ. philos. Lib. III. pag. 499, 500.
-
-[211] Ibid. pag. 500, and 520, &c.
-
-[212] Princ. Philos. Lib. III. prop. 40.
-
-[213] Ibid. prop. 41.
-
-[214] Ibid. pag. 522.
-
-[215] Ibid. prop. 42.
-
-[216] Newt. Princ. philos. edit. 2. p. 464, 465.
-
-[217] Ibid. edit. 3. p 501, 502.
-
-[218] Ibid. pag. 519.
-
-[219] Ibid. pag. 524.
-
-[220] Newt. Princ. philos. p. 525.
-
-[221] Ibid.
-
-[222] Ibid. pag. 508.
-
-[223] Ibid.
-
-[224] Ibid. pag. 484.
-
-[225] Ibid. pag. 482, 483.
-
-[226] Ibid. pag. 481.
-
-[227] Ibid. pag. 509.
-
-[228] See the fore-cited place.
-
-[229] Ibid. and Cartes. Princ. Phil. part. 3. § 134, &c.
-
-[230] Vid. Phil. Nat. princ. Math. p. 511.
-
-[231] Book I. Ch. 4. § 11.
-
-[232] Ch. 5.
-
-[233] All these arguments are laid down in Philos. Nat. Princ. Lib.
-III. from p. 509, to 517.
-
-[234] Philos. Nat. Princ. Lib. III. p. 515.
-
-[235] Ch. 5.
-
-[236] See Ch. 1. § 11.
-
-[237] Newt. Princ. Philos. pag. 525, 526. An account of all the stars
-of both these kinds, which have appeared within the last 150 years may
-be seen in the Philosophical transactions, vol. 29. numb. 346.
-
-[238] Newt. Princ. Philos. Nat. Lib. III. prop. 6.
-
-[239] Ch. 3. § 6.
-
-[240] Book I. Ch. 2. § 24.
-
-[241] Newt. Princ. Lib. III. prop. 6.
-
-[242] Ch. 3. § 6.
-
-[243] Newt. Princ. philos. Lib. III. prop. 7. cor. 1.
-
-[244] See Book I. Ch. 1. § 15.
-
-[245] Ibid. § 5, 6.
-
-[246] Chap. 2. § 8.
-
-[247] Newt. Princ. Lib. I. prop. 63.
-
-[248] § 8.
-
-[249] See Introd. § 23.
-
-[250] § 4, 5.
-
-[251] Newt. Princ. philos. Lib. I. prop. 74.
-
-[252] Ibid. coroll. 3.
-
-[253] Lib. I. Prop. 75. and Lib. III. prop. 8.
-
-[254] Lib. I. Prop. 76.
-
-[255] Ibid. cor. 5.
-
-[256] Vid. Lib. III. Prop. 7. coroll. 1
-
-[257] Newt. Princ. Lib. III. prop. 8. coroll. 1.
-
-[258] Ibid. coroll. 2.
-
-[259] Book I. Ch. 4. § 2.
-
-[260] Newt. Princ. Lib. III. prop. 8. coroll. 3.
-
-[261] Ibid. coroll. 4.
-
-[262] Book I. Ch. 4.
-
-[263] Lib. II. prop. 20. cor. 2.
-
-[264] Chap. 4. § 17.
-
-[265] Ibid.
-
-[266] Vid. Newt. Princ. Lib. II. prop. 46.
-
-[267] Princ. philos. Lib. II. prop. 49.
-
-[268] Chap. 3. § 18.
-
-[269] Newt. Princ. philos. Lib. I. prop. 66. coroll. 18.
-
-[270] § 8.
-
-[271] Ch. 3. § 5.
-
-[272] Ch. 3 § 17.
-
-[273] Ibid.
-
-[274] See below § 44.
-
-[275] Newton Princ. Lib. III. prop. 19.
-
-[276] Lib. III. prop. 19.
-
-[277] Lib. I. prop. 73.
-
-[278] Lib. III. prop. 20.
-
-[279] Ibid.
-
-[280] Opt. B. I. part. 2. prop. 1.
-
-[281] Newt. Opt. B. 1. part 1. experim. 5.
-
-[282] Ibid. prop. 4.
-
-[283] Newt. Opt. B. 1. part 2. exper. 5.
-
-[284] Ibid exper. 6.
-
-[285] Newton Opt. B. I. prop. 10.
-
-[286] Ibid exp. 9.
-
-[287] Newt. Opt. B. I. part 1. exp 15.
-
-[288] Philos. Transact. N. 88, p. 5099.
-
-[289] Opt B. I. par. 2. exp. 14.
-
-[290] Ibid. exp. 10.
-
-[291] Opt. pag. 122.
-
-[292] Opt. B. I. part 2. exp. 11.
-
-[293] Ibid prop. 4, 6.
-
-[294] Opt. pag. 51.
-
-[295] Opt. Book II. prop. 8.
-
-[296] Opt. Book II. par. 3. prop. 2.
-
-[297] § 17.
-
-[298] Opt. Book II. par. 3. prop. 4.
-
-[299] Opt. Book II. pag. 241.
-
-[300] Ibid. pag. 224.
-
-[301] Ibid. Obs. 17. &c.
-
-[302] Ibid. Obs. 10.
-
-[303] Ibid. pag. 206.
-
-[304] Obser. 21.
-
-[305] Observ. 5. compared with Observ. 10
-
-[306] Ibid. prop. 5.
-
-[307] Observ. 7.
-
-[308] Observ. 9.
-
-[309] Ibid prop. 7.
-
-[310] Opt. pag. 243.
-
-[311] Newt. Opt. B. I. part. 1. prop. I.
-
-[312] Opt. B. I. part. 1. prop. 2.
-
-[313] Opt. B. I. part 1. Expec. 6.
-
-[314] Opt. pag. 67, 68, &c.
-
-[315] Ibid. B. 1. par. 2. prop. 3.
-
-[316] Opt. B. II. par. 3. prop. 10.
-
-[317] Opt. B. II. par. 3. prop. 15.
-
-[318] Ibid. par. 1. observ. 7.
-
-[319] Ibid. Observ. 19.
-
-[320] Opt. B. II. par. 2. pag. 199. &c.
-
-[321] Ibid. par. 4
-
-[322] Ibid. part. 3. prop. 13.
-
-[323] Ibid. prop. 17.
-
-[324] Ibid. prop. 13.
-
-[325] Opt. Qu. 18, &c.
-
-[326] See Concl. S. 2.
-
-[327] B. II. Ch. 1.
-
-[328] Opt. B. III. Obs. 1.
-
-[329] Ibid. Obs. 2.
-
-[330] § 2.
-
-[331] Philos. Trans. No. 378.
-
-[332] § 11.
-
-[333] Philos. Transact No. 375.
-
-[334] Ibid.
-
-[335] Opt. B. II. part 4.
-
-[336] Ch. 3. § 14.
-
-[337] Opt. B. II. part 4. obs. 13.
-
-[338] Opt. pag. 255.
-
-[339] Ch. 3. § 18.
-
-
-
-
-
-
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-
-Project Gutenberg's A View of Sir Isaac Newton's Philosophy, by Anonymous
-
-This eBook is for the use of anyone anywhere in the United States and most
-other parts of the world at no cost and with almost no restrictions
-whatsoever.  You may copy it, give it away or re-use it under the terms of
-the Project Gutenberg License included with this eBook or online at
-www.gutenberg.org.  If you are not located in the United States, you'll have
-to check the laws of the country where you are located before using this ebook.
-
-
-
-Title: A View of Sir Isaac Newton's Philosophy
-
-Author: Anonymous
-
-Release Date: September 28, 2016 [EBook #53161]
-
-Language: English
-
-Character set encoding: UTF-8
-
-*** START OF THIS PROJECT GUTENBERG EBOOK SIR ISAAC NEWTON'S PHILOSOPHY ***
-
-
-
-
-Produced by Giovanni Fini, Markus Brenner, Irma Spehar and
-the Online Distributed Proofreading Team at
-http://www.pgdp.net (This file was produced from images
-generously made available by The Internet Archive/Canadian
-Libraries)
-
-
-
-
-
-
-</pre>
-
-<div class="limit">
-
-<div class="chapter">
-<div class="transnote p4">
-<p class="pc large">TRANSCRIBER’S NOTES:</p>
-<p class="ptn">&mdash;Obvious print and punctuation errors were corrected.</p>
-<p class="ptn">&mdash;The transcriber of this project created the book cover
-image using the title page of the original book. The image
-is placed in the public domain.</p>
-</div>
-
-<hr class="chap" />
-
-</div>
-
-<p><span class="pagenum"><a name="Page_i" id="Page_i">[i]</a></span></p>
-
-<div class="chapter">
-
-<h1 class="p4"><span class="small">A</span><br />
-<span class="large"><em class="gesperrt">VIEW</em></span><br />
-<span class="small"><em class="gesperrt">OF</em></span><br />
-<span class="mid">Sir <em class="gesperrt"><i>ISAAC NEWTON</i></em>’s</span><br />
-<span class="large">PHILOSOPHY.</span></h1>
-
-<div class="figcenter">
-     <img src="images/title.jpg" width="400" height="251"
-         alt=""
-         title="" />
-</div>
-
-<p class="pc large"><em class="gesperrt"><i>LONDON</i></em>:</p>
-
-<p class="pc mid">Printed by <span class="smcap"><em class="gesperrt">S. Palmer</em></span>, 1728.</p>
-
-</div>
-<p><span class="pagenum"><a name="Page_ii" id="Page_ii">[ii]</a></span></p>
-<p>&nbsp;</p>
-<p><span class="pagenum"><a name="Page_iii" id="Page_iii">[iii]</a></span></p>
-
-<div class="chapter">
-
-<div class="figcenter">
-     <img src="images/ill-003.jpg" width="400" height="210"
-         alt=""
-         title="" />
-</div>
-
-<p class="pc"><span class="lmid">To the Noble and Right Honourable</span><br />
-<span class="mid"><span class="smcap">Sir</span> <i>ROBERT WALPOLE.</i></span></p>
-
-<p class="pi4 p1 mid"><i>SIR,</i></p>
-
-<div>
-  <img class="dcap1" src="images/di1.jpg" width="80" height="81" alt=""/>
-</div>
-<p class="cap09">I Take the liberty to send you
-this view of Sir <em class="gesperrt"><span class="smcap">Isaac Newton’s</span></em>
-philosophy, which, if
-it were performed suitable to the
-dignity of the subject, might
-not be a present unworthy the
-acceptance of the greatest person. For his philosophy<span class="pagenum"><a name="Page_iv" id="Page_iv">[iv]</a></span>
-operations of nature, which for so many ages
-had imployed the curiosity of mankind; though
-no one before him was furnished with the
-strength of mind necessary to go any depth in
-this difficult search. However, I am encouraged
-to hope, that this attempt, imperfect as it is, to
-give our countrymen in general some conception
-of the labours of a person, who shall always
-be the boast of this nation, may be received
-with indulgence by one, under whose
-influence these kingdoms enjoy so much happiness.
-Indeed my admiration at the surprizing
-inventions of this great man, carries me to conceive
-of him as a person, who not only must
-raise the glory of the country, which gave him
-birth; but that he has even done honour to human
-nature, by having extended the greatest
-and most noble of our faculties, reason, to subjects,
-which, till he attempted them, appeared
-to be wholly beyond the reach of our limited
-capacities.  And what can give us a<span class="pagenum"><a name="Page_v" id="Page_v">[v]</a></span>
-more pleasing prospect of our own condition,
-than to see so exalted a proof of the strength
-of that faculty, whereon the conduct of our
-lives, and our happiness depends; our passions
-and all our motives to action being in such
-manner guided by our opinions, that where
-these are just, our whole behaviour will be
-praise-worthy? But why do I presume to detain
-you, <span class="smcap">Sir</span>, with such reflections as these,
-who must have the fullest experience within
-your own mind, of the effects of right reason?
-For to what other source can be ascribed that
-amiable frankness and unreserved condescension
-among your friends, or that masculine perspicuity
-and strength of argument, whereby you draw
-the admiration of the publick, while you are
-engaged in the most important of all causes,
-the liberties of mankind?</p>
-
-<p class="p2">I humbly crave leave to make the only acknowledgement
-within my power, for the benefits,<span class="pagenum"><a name="Page_vi" id="Page_vi">[vi]</a></span>
-which I receive in common with the rest of my
-countrymen from these high talents, by subscribing
-my self</p>
-
-<p class="pi10 p2 mid"><em class="gesperrt"><i>SIR</i></em>,</p>
-<p class="pi10 p1 mid"><i>Your most faithful</i>,</p>
-<p class="pi12 p1 mid"><i>and</i></p>
-<p class="pi10 p1 mid"><i>Most humble Servant</i>,</p>
-
-<p class="pi8 p1 large"><span class="smcap"><em class="gesperrt">Henry Pemberton</em>.</span></p>
-
-<hr class="chap" />
-
-</div>
-
-<p><span class="pagenum"><a name="Page_vii" id="Page_vii">[vii]</a></span></p>
-
-<div class="chapter">
-
-<h2 class="p4"><em class="gesperrt">PREFACE</em>.</h2>
-
-
-<p class="drop-cap00">I <i>Drew up the following papers many years ago at the desire of
-some friends, who, upon my taking care of the late edition of
-Sir</i> <em class="gesperrt"><span class="smcap">Isaac Newton’s</span></em> <i>Principia, perswaded me to make them
-publick. I laid hold of that opportunity, when my thoughts
-were afresh employed on this subject, to revise what I had formerly
-written. And I now send it abroad not without some hopes of answering
-these two ends. My first intention was to convey to such, as are not
-used to mathematical reasoning, some idea of the philosophy of a person,
-who has acquired an universal reputation, and rendered our nation
-famous for these speculations in the learned world. To which purpose
-I have avoided using terms of art as much as possible, and taken
-care to define such as I was obliged to use. Though this caution
-was the less necessary at present, since many of them are become familiar
-words to our language, from the great number of books wrote
-in it upon philosophical subjects, and the courses of experiments, that
-have of late years been given by several ingenious men. The other
-view I had, was to encourage such young gentlemen as have a turn for
-the mathematical sciences, to pursue those studies the more chearfully,
-in order to understand in our author himself the demonstrations of the
-things I here declare. And to facilitate their progress herein, I intend
-to proceed still farther in the explanation of Sir</i> <em class="gesperrt"><span class="smcap">Isaac Newton’s</span></em>
-<i>philosophy. For as I have received very much pleasure from
-perusing his writings, I hope it is no illaudable ambition to endeavour
-the rendering them more easily understood, that greater numbers may
-enjoy the same satisfaction.</i></p>
-
-<p><i>It will perhaps be expected, that I should say something particular
-of a person, to whom I must always acknowledge my self to be much
-obliged. What I have to declare on this head will be but short; for
-it was in the very last years of Sir</i> <em class="gesperrt"><span class="smcap">Isaac</span></em><i>’s life, that I had the honour<span class="pagenum"><a name="Page_viii" id="Page_viii">[viii]</a></span>
-of his acquaintance. This happened on the following occasion.
-Mr.</i> Polenus, <i>a Professor in the University of</i> Padua, <i>from a new experiment
-of his, thought the common opinion about the force of moving
-bodies was overturned, and the truth of Mr.</i> Libnitz<i>’s notion in that
-matter fully proved. The contrary of what Polenus had asserted I
-demonstrated in a paper, which Dr.</i> <em class="gesperrt"><span class="smcap">Mead</span></em>, <i>who takes all opportunities
-of obliging his friends, was pleased to shew Sir</i> <em class="gesperrt"><span class="smcap">Isaac Newton</span></em>
-<i>This was so well approved of by him, that he did me the honour
-to become a fellow-writer with me, by annexing to what I had
-written, a demonstration of his own drawn from another consideration.
-When I printed my discourse in the philosophical transactions, I
-put what Sir</i> <em class="gesperrt"><span class="smcap">Isaac</span></em> <i>had written in a scholium by it self, that I
-might not seem to usurp what did not belong to me. But I concealed
-his name, not being then sufficiently acquainted with him to ask whether
-he was willing I might make use of it or not. In a little time
-after he engaged me to take care of the new edition he was about
-making if his Principia. This obliged me to be very frequently with
-him, and as he lived at some distance from me, a great number of
-letters passed between us on this account. When I had the honour of
-his conversation, I endeavoured to learn his thoughts upon mathematical
-subjects, and something historical concerning his inventions, that I
-had not been before acquainted with. I found, he had read fewer of the
-modern mathematicians, than one could have expected; but his own
-prodigious invention readily supplied him with what he might have an
-occasion for in the pursuit of any subject he undertook. I have often heard
-him censure the handling geometrical subjects by algebraic calculations;
-and his book of Algebra he called by the name of Universal Arithmetic,
-in opposition to the injudicious title of Geometry, which</i> Des&nbsp;Cartes <i>had
-given to the treatise, wherein he shews, how the geometer may assist his
-invention by such kind of computations. He frequently praised</i> Slusius,
-Barrow <i>and</i> Huygens <i>for not being influenced by the false taste, which
-then began to prevail. He used to commend the laudable attempt of</i> Hugo
-de&nbsp;Omerique <i>to restore the ancient analysis, and very much esteemed Apollonius’s
-book De sectione rationis for giving us a clearer notion of that
-analysis than we had before. Dr.</i> Barrow <i>may be esteemed as having<span class="pagenum"><a name="Page_ix" id="Page_ix">[ix]</a></span>
-shewn a compass of invention equal, if not superior to any of the
-moderns, our author only excepted; but Sir</i> <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> <i>has
-several times particularly recommended to me</i> Huygens<i>’s stile and
-manner. He thought him the most elegant of any mathematical writer
-of modern times, and the most just imitator of the antients. Of
-their taste, and form of demonstration Sir</i> <em class="gesperrt"><span class="smcap">Isaac</span></em> <i>always professed
-himself a great admirer: I have heard him even censure himself for
-not following them yet more closely than he did; and speak with regret
-of his mistake at the beginning of his mathematical studies, in
-applying himself to the works of</i> Des Cartes <i>and other algebraic writers,
-before he had considered the elements of</i> Euclide <i>with that attention,
-which so excellent a writer deserves. As to the history of his
-inventions, what relates to his discoveries of the methods of series and
-fluxions, and of his theory of light and colours, the world has been sufficiently
-informed of already. The first thoughts, which gave rise
-to his Principia, he had, when he retired from</i> Cambridge <i>in 1666 on
-account of the plague. As he sat alone in a garden, he fell into a
-speculation on the power of gravity: that as this power is not found
-sensibly diminished at the remotest distance from the center of the earth,
-to which we can rise, neither at the tops of the loftiest buildings, nor
-even on the summits of the highest mountains; it appeared to him
-reasonable to conclude, that this power must extend much farther than
-was usually thought; why not as high as the moon, said he to himself?
-and if so, her motion must be influenced by it; perhaps she is retained
-in her orbit thereby. However, though the power of gravity
-is not sensibly weakened in the little change of distance, at which we
-can place our selves from the center of the earth; yet it is very possible,
-that so high as the moon this power may differ much in strength from
-what it is here. To make an estimate, what might be the degree of
-this diminution, he considered with himself, that if the moon be retained
-in her orbit by the force of gravity, no doubt the primary planets
-are carried round the sun by the like power. And by comparing the
-periods of the several planets with their distances from the sun, he found,
-that if any power like gravity held them in their courses, its strength must
-decrease in the duplicate proportion of the increase of distance. This<span class="pagenum"><a name="Page_x" id="Page_x">[x]</a></span>
-be concluded by supposing them to move in perfect circles concentrical
-to the sun, from which the orbits of the greatest part of them do
-not much differ. Supposing therefore the power of gravity, when
-extended to the moon, to decrease in the same manner, he computed
-whether that force would be sufficient to keep the moon in her orbit.
-In this computation, being absent from books, he took the common estimate
-in use among geographers and our seamen, before</i> Norwood <i>had measured
-the earth, that 60 English miles were contained in one degree
-of latitude on the surface of the earth. But as this is a very faulty
-supposition, each degree containing about 69½ of our miles, his computation
-did not answer expectation; whence he concluded, that some
-other cause must at least join with the action of the power of gravity
-on the moon. On this account he laid aside for that time any farther
-thoughts upon this matter. But some years after, a letter which he
-received from Dr.</i> Hook, <i>put him on inquiring what was the real
-figure, in which a body let fall from any high place descends, taking
-the motion of the earth round its axis into consideration. Such a body,
-having the same motion, which by the revolution of the earth the
-place has whence it falls, is to be considered as projected forward
-and at the same time drawn down to the center of the earth.  This
-gave occasion to his resuming his former thoughts concerning the
-moon; and</i> Picart <i>in</i> France <i>having lately measured the earth, by
-using his measures the moon appeared to be kept in her orbit purely
-by the power of gravity; and consequently, that this power decreases
-as you recede from the center of the earth in the manner our author
-had formerly conjectured. Upon this principle he found the line described
-by a falling body to be an ellipsis, the center of the earth being
-one focus. And the primary planets moving in such orbits round
-the sun, he had the satisfaction to see, that this inquiry, which he
-had undertaken merely out of curiosity, could be applied to the
-greatest purposes. Hereupon he composed near a dozen propositions
-relating to the motion of the primary planets about the sun. Several
-years after this, some discourse he had with Dr.</i> Halley, <i>who at
-Cambridge made him a visit, engaged Sir</i> <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> <i>to
-resume again the consideration of this subject; and gave occasion<span class="pagenum"><a name="Page_xi" id="Page_xi">[xi]</a></span>
-to his writing the treatise which he published under the title of mathematical
-principles of natural philosophy. This treatise, full of
-such a variety of profound inventions, was composed by him from
-scarce any other materials than the few propositions before mentioned,
-in the space of one year and an half.</i></p>
-
-<p><i>Though his memory was much decayed, I found he perfectly understood
-his own writings, contrary to what I had frequently heard
-in discourse from many persons. This opinion of theirs might arise
-perhaps from his not being always ready at speaking on these subjects,
-when it might be expected he should. But as to this, it may be
-observed, that great genius’s are frequently liable to be absent, not only
-in relation to common life, but with regard to some of the parts of science
-they are the best informed of. Inventors seem to treasure up in their
-minds, what they have found out, after another manner than those do
-the same things, who have not this inventive faculty. The former,
-when they have occasion to produce their knowledge, are in some measure
-obliged immediately to investigate part of what they want. For
-this they are not equally fit at all times: so it has often happened,
-that such as retain things chiefly by means of a very strong memory,
-have appeared off hand more expert than the discoverers themselves.</i></p>
-
-<p><i>As to the moral endowments of his mind, they were as much to be
-admired as his other talents. But this is a field I leave others to
-exspatiate in. I only touch upon what I experienced myself during the
-few years I was happy in his friendship. But this I immediately
-discovered in him, which at once both surprized and charmed me:
-Neither his extreme great age, nor his universal reputation had
-rendred him stiff in opinion, or in any degree elated. Of this
-I had occasion to have almost daily experience. The Remarks I
-continually sent him by letters on his Principia were received with
-the utmost goodness. These were so far from being any ways displeasing
-to him, that on the contrary it occasioned him to speak many kind
-things of me to my friends, and to honour me with a publick testimony
-of his good opinion. He also approved of the following treatise, a
-great part of which we read together. As many alterations were<span class="pagenum"><a name="Page_xii" id="Page_xii">[xii]</a></span>
-made in the late edition of his Principia, so there would have been
-many more if there had been a sufficient time. But whatever of this
-kind may be thought wanting, I shall endeavour to supply in my comment
-on that book. I had reason to believe he expected such a thing
-from me, and I intended to have published it in his life time, after I
-had printed the following discourse, and a mathematical treatise Sir</i>
-<em class="gesperrt"><span class="smcap">Isaac Newton</span></em> <i>had written a long while ago, containing the
-first principles of fluxions, for I had prevailed on him to let that piece
-go abroad. I had examined all the calculations, and prepared part
-of the figures; but as the latter part of the treatise had never been
-finished, he was about letting me have other papers, in order to
-supply what was wanting. But his death put a stop to that design.
-As to my comment on the Principia, I intend there to demonstrate
-whatever Sir</i> <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> <i>has set down without
-express proof, and to explain all such expressions in his book, as I shall
-judge necessary. This comment I shall forthwith put to the press,
-joined to an english translation of his Principia, which I have
-had some time by me. A more particular account of my whole design
-has already been published in the new memoirs of literature for
-the month of march 1727.</i></p>
-
-<p><i>I have presented my readers with a copy of verses on Sir</i> <em class="gesperrt"><span class="smcap">Isaac
-Newton</span></em>, <i>which I have just received from a young Gentleman,
-whom I am proud to reckon among the number of my dearest friends.
-If I had any apprehension that this piece of poetry stood in need of
-an apology, I should be desirous the reader might know, that the
-author is but sixteen years old, and was obliged to finish his composition
-in a very short space of time. But I shall only take the liberty
-to observe, that the boldness of the digressions will be best judged of
-by those who are acquainted with</i> <em class="gesperrt"><span class="smcap">Pindar</span></em>.</p>
-
-<p><span class="pagenum"><a name="Page_xiii" id="Page_xiii">[xiii]</a></span></p>
-
-<hr class="d1" />
-<hr class="d2" />
-
-<p class="pc4">A<br />
-<span class="xlarge"><em class="gesperrt">POEM</em></span><br />
-ON<br />
-<span class="large">Sir <em class="gesperrt"><i>ISAAC NEWTON</i></em>.</span><br />
-</p>
-
-<div class="pi6">
-
-<p class="drop-cap04"><span class="smcap">To</span> <em class="gesperrt"><span class="smcap">Newton</span></em>’s genius, and immortal fame<br />
-Th’ advent’rous muse with trembling pinion soars.<br />
-Thou, heav’nly truth, from thy seraphick throne<br />
-Look favourable down, do thou assist<br />
-My lab’ring thought, do thou inspire my song.<br />
-<span class="smcap">Newton</span>, who first th’ almighty’s works display’d,<br />
-And smooth’d that mirror, in whose polish’d face<br />
-The great creator now conspicuous shines;<br />
-Who open’d nature’s adamantine gates,<br />
-And to our minds her secret powers expos’d;<br />
-<span class="smcap">Newton</span> demands the muse; his sacred hand<br />
-Shall guide her infant steps; his sacred hand<br />
-Shall raise her to the Heliconian height,<br />
-Where, on its lofty top inthron’d, her head<br />
-Shall mingle with the Stars. Hail nature, hail,<br />
-O Goddess, handmaid of th’ ethereal power,<br />
-Now lift thy head, and to th’ admiring world<br />
-Shew thy long hidden beauty. Thee the wise<br />
-Of ancient fame, immortal <em class="gesperrt"><span class="smcap">Plato</span></em>’s self,<br />
-<span class="pagenum"><a name="Page_xiv" id="Page_xiv">[xiv]</a></span>The Stagyrite, and Syracusian sage,<br />
-From black obscurity’s abyss to raise,<br />
-(Drooping and mourning o’er thy wondrous works)<br />
-With vain inquiry sought. Like meteors these<br />
-In their dark age bright sons of wisdom shone:<br />
-But at thy <em class="gesperrt"><span class="smcap">Newton</span></em> all their laurels fade,<br />
-They shrink from all the honours of their names.<br />
-So glimm’ring stars contract their feeble rays,<br />
-When the swift lustre of <em class="gesperrt"><span class="smcap">Aurora</span></em>’s face<br />
-Flows o’er the skies, and wraps the heav’ns in light.</p>
-
-<p class="p1"><span class="smcap">The</span> Deity’s omnipotence, the cause,<br />
-Th’ original of things long lay unknown.<br />
-Alone the beauties prominent to sight<br />
-(Of the celestial power the outward form)<br />
-Drew praise and wonder from the gazing world.<br />
-As when the deluge overspread the earth,<br />
-Whilst yet the mountains only rear’d their heads<br />
-Above the surface of the wild expanse,<br />
-Whelm’d deep below the great foundations lay,<br />
-Till some kind angel at heav’n’s high command<br />
-Roul’d back the rising tides, and haughty floods,<br />
-And to the ocean thunder’d out his voice:<br />
-Quick all the swelling and imperious waves,<br />
-The foaming billows and obscuring surge,<br />
-Back to their channels and their ancient seats<br />
-Recoil affrighted: from the darksome main<br />
-Earth raises smiling, as new-born, her head,<br />
-And with fresh charms her lovely face arrays.<br />
-So his extensive thought accomplish’d first<br />
-The mighty task to drive th’ obstructing mists<br />
-Of ignorance away, beneath whose gloom<br />
-Th’ inshrouded majesty of Nature lay.<br />
-He drew the veil and swell’d the spreading scene.<br />
-<span class="pagenum"><a name="Page_xv" id="Page_xv">[xv]</a></span>How had the moon around th’ ethereal void<br />
-Rang’d, and eluded lab’ring mortals care,<br />
-Till his invention trac’d her secret steps,<br />
-While she inconstant with unsteady rein<br />
-Through endless mazes and meanders guides<br />
-In its unequal course her changing carr:<br />
-Whether behind the sun’s superior light<br />
-She hides the beauties of her radiant face,<br />
-Or, when conspicuous, smiles upon mankind,<br />
-Unveiling all her night-rejoicing charms.<br />
-When thus the silver-tressed moon dispels<br />
-The frowning horrors from the brow of night,<br />
-And with her splendors chears the sullen gloom,<br />
-While sable-mantled darkness with his veil<br />
-The visage of the fair horizon shades,<br />
-And over nature spreads his raven wings;<br />
-Let me upon some unfrequented green<br />
-While sleep sits heavy on the drowsy world,<br />
-Seek out some solitary peaceful cell,<br />
-Where darksome woods around their gloomy brows<br />
-Bow low, and ev’ry hill’s protended shade<br />
-Obscures the dusky vale, there silent dwell,<br />
-Where contemplation holds its still abode,<br />
-There trace the wide and pathless void of heav’n,<br />
-And count the stars that sparkle on its robe.<br />
-Or else in fancy’s wild’ring mazes lost<br />
-Upon the verdure see the fairy elves<br />
-Dance o’er their magick circles, or behold,<br />
-In thought enraptur’d with the ancient bards,<br />
-Medea’s baleful incantations draw<br />
-Down from her orb the paly queen of night.<br />
-But chiefly <em class="gesperrt"><span class="smcap">Newton</span></em> let me soar with thee,<br />
-And while surveying all yon starry vault<br />
-With admiration I attentive gaze,<br />
-<span class="pagenum"><a name="Page_xvi" id="Page_xvi">[xvi]</a></span>Thou shalt descend from thy celestial seat,<br />
-And waft aloft my high-aspiring mind,<br />
-Shalt shew me there how nature has ordain’d<br />
-Her fundamental laws, shalt lead my thought<br />
-Through all the wand’rings of th’ uncertain moon,<br />
-And teach me all her operating powers.<br />
-She and the sun with influence conjoint<br />
-Wield the huge axle of the whirling earth,<br />
-And from their just direction turn the poles,<br />
-Slow urging on the progress of the years.<br />
-The constellations seem to leave their seats,<br />
-And o’er the skies with solemn pace to move.<br />
-You, splendid rulers of the day and night,<br />
-The seas obey, at your resistless sway<br />
-Now they contract their waters, and expose<br />
-The dreary desart of old ocean’s reign.<br />
-The craggy rocks their horrid sides disclose;<br />
-Trembling the sailor views the dreadful scene,<br />
-And cautiously the threat’ning ruin shuns.<br />
-But where the shallow waters hide the sands,<br />
-There ravenous destruction lurks conceal’d,<br />
-There the ill-guided vessel falls a prey,<br />
-And all her numbers gorge his greedy jaws.<br />
-But quick returning see th’ impetuous tides<br />
-Back to th’ abandon’d shores impell the main.<br />
-Again the foaming seas extend their waves,<br />
-Again the rouling floods embrace the shoars,<br />
-And veil the horrours of the empty deep.<br />
-Thus the obsequious seas your power confess,<br />
-While from the surface healthful vapours rise<br />
-Plenteous throughout the atmosphere diffus’d,<br />
-Or to supply the mountain’s heads with springs,<br />
-Or fill the hanging clouds with needful rains,<br />
-That friendly streams, and kind refreshing show’rs<br />
-<span class="pagenum"><a name="Page_xvii" id="Page_xvii">[xvii]</a></span>May gently lave the sun-burnt thirsty plains,<br />
-Or to replenish all the empty air<br />
-With wholsome moisture to increase the fruits<br />
-Of earth, and bless the labours of mankind.<br />
-O <em class="gesperrt"><span class="smcap">Newton</span></em>, whether flies thy mighty soul,<br />
-How shall the feeble muse pursue through all<br />
-The vast extent of thy unbounded thought,<br />
-That even seeks th’ unseen recesses dark<br />
-To penetrate of providence immense.<br />
-And thou the great dispenser of the world<br />
-Propitious, who with inspiration taught’st<br />
-Our greatest bard to send thy praises forth;<br />
-Thou, who gav’st <em class="gesperrt"><span class="smcap">Newton</span></em> thought; who smil’dst serene,<br />
-When to its bounds he stretch’d his swelling soul;<br />
-Who still benignant ever blest his toil,<br />
-And deign’d to his enlight’ned mind t’ appear<br />
-Confess’d around th’ interminated world:<br />
-To me O thy divine infusion grant<br />
-(O thou in all so infinitely good)<br />
-That I may sing thy everlasting works,<br />
-Thy inexhausted store of providence,<br />
-In thought effulgent and resounding verse.<br />
-O could I spread the wond’rous theme around,<br />
-Where the wind cools the oriental world,<br />
-To the calm breezes of the Zephir’s breath,<br />
-To where the frozen hyperborean blasts.<br />
-To where the boist’rous tempest-leading south<br />
-From their deep hollow caves send forth their storms.<br />
-Thou still indulgent parent of mankind,<br />
-Left humid emanations should no more<br />
-Flow from the ocean, but dissolve away<br />
-Through the long series of revolving time;<br />
-And left the vital principle decay,<br />
-By which the air supplies the springs of life;<br />
-<span class="pagenum"><a name="Page_xviii" id="Page_xviii">[xviii]</a></span>Thou hast the fiery visag’d comets form’d<br />
-With vivifying spirits all replete,<br />
-Which they abundant breathe about the void,<br />
-Renewing the prolifick soul of things.<br />
-No longer now on thee amaz’d we call,<br />
-No longer tremble at imagin’d ills,<br />
-When comets blaze tremendous from on high,<br />
-Or when extending wide their flaming trains<br />
-With hideous grasp the skies engirdle round,<br />
-And spread the terrors of their burning locks.<br />
-For these through orbits in the length’ning space<br />
-Of many tedious rouling years compleat<br />
-Around the sun move regularly on;<br />
-And with the planets in harmonious orbs,<br />
-And mystick periods their obeysance pay<br />
-To him majestick ruler of the skies<br />
-Upon his throne of circled glory fixt.<br />
-He or some god conspicuous to the view,<br />
-Or else the substitute of nature seems,<br />
-Guiding the courses of revolving worlds.<br />
-He taught great <em class="gesperrt"><span class="smcap">Newton</span></em> the all-potent laws<br />
-Of gravitation, by whose simple power<br />
-The universe exists. Nor here the sage<br />
-Big with invention still renewing staid.<br />
-But O bright angel of the lamp of day,<br />
-How shall the muse display his greatest toil?<br />
-Let her plunge deep in Aganippe’s waves,<br />
-Or in Castalia’s ever-flowing stream,<br />
-That re-inspired she may sing to thee,<br />
-How <em class="gesperrt"><span class="smcap">Newton</span></em> dar’d advent’rous to unbraid<br />
-The yellow tresses of thy shining hair.<br />
-Or didst thou gracious leave thy radiant sphere,<br />
-And to his hand thy lucid splendours give,<br />
-<span class="pagenum"><a name="Page_xix" id="Page_xix">[xix]</a></span>T’ unweave the light-diffusing wreath, and part<br />
-The blended glories of thy golden plumes?<br />
-He with laborious, and unerring care,<br />
-How different and imbodied colours form<br />
-Thy piercing light, with just distinction found.<br />
-He with quick sight pursu’d thy darting rays,<br />
-When penetrating to th’ obscure recess<br />
-Of solid matter, there perspicuous saw,<br />
-How in the texture of each body lay<br />
-The power that separates the different beams.<br />
-Hence over nature’s unadorned face<br />
-Thy bright diversifying rays dilate<br />
-Their various hues: and hence when vernal rains<br />
-Descending swift have burst the low’ring clouds,<br />
-Thy splendors through the dissipating mists<br />
-In its fair vesture of unnumber’d hues<br />
-Array the show’ry bow. At thy approach<br />
-The morning risen from her pearly couch<br />
-With rosy blushes decks her virgin cheek;<br />
-The ev’ning on the frontispiece of heav’n<br />
-His mantle spreads with many colours gay;<br />
-The mid-day skies in radiant azure clad,<br />
-The shining clouds, and silver vapours rob’d<br />
-In white transparent intermixt with gold,<br />
-With bright variety of splendor cloath<br />
-All the illuminated face above.<br />
-When hoary-headed winter back retires<br />
-To the chill’d pole, there solitary sits<br />
-Encompass’d round with winds and tempests bleak<br />
-In caverns of impenetrable ice,<br />
-And from behind the dissipated gloom<br />
-Like a new Venus from the parting surge<br />
-The gay-apparell’d spring advances on;<br />
-When thou in thy meridian brightness sitt’st,<br />
-<span class="pagenum"><a name="Page_xx" id="Page_xx">[xx]</a></span>And from thy throne pure emanations flow<br />
-Of glory bursting o’er the radiant skies:<br />
-Then let the muse Olympus’ top ascend,<br />
-And o’er Thessalia’s plain extend her view,<br />
-And count, O Tempe, all thy beauties o’er.<br />
-Mountains, whose summits grasp the pendant clouds,<br />
-Between their wood-invelop’d slopes embrace<br />
-The green-attired vallies. Every flow’r<br />
-Here in the pride of bounteous nature clad<br />
-Smiles on the bosom of th’ enamell’d meads.<br />
-Over the smiling lawn the silver floods<br />
-Of fair Peneus gently roul along,<br />
-While the reflected colours from the flow’rs,<br />
-And verdant borders pierce the lympid waves,<br />
-And paint with all their variegated hue<br />
-The yellow sands beneath. Smooth gliding on<br />
-The waters hasten to the neighbouring sea.<br />
-Still the pleas’d eye the floating plain pursues;<br />
-At length, in Neptune’s wide dominion lost,<br />
-Surveys the shining billows, that arise<br />
-Apparell’d each in Phœbus’ bright attire:<br />
-Or from a far some tall majestick ship,<br />
-Or the long hostile lines of threat’ning fleets,<br />
-Which o’er the bright uneven mirror sweep,<br />
-In dazling gold and waving purple deckt;<br />
-Such as of old, when haughty Athens power<br />
-Their hideous front, and terrible array<br />
-Against Pallene’s coast extended wide,<br />
-And with tremendous war and battel stern<br />
-The trembling walls of Potidæa shook.<br />
-Crested with pendants curling with the breeze<br />
-The upright masts high bristle in the air,<br />
-Aloft exalting proud their gilded heads.<br />
-The silver waves against the painted prows<br />
-<span class="pagenum"><a name="Page_xxi" id="Page_xxi">[xxi]</a></span>Raise their resplendent bosoms, and impearl<br />
-The fair vermillion with their glist’ring drops:<br />
-And from on board the iron-cloathed host<br />
-Around the main a gleaming horrour casts;<br />
-Each flaming buckler like the mid-day sun,<br />
-Each plumed helmet like the silver moon,<br />
-Each moving gauntlet like the light’ning’s blaze,<br />
-And like a star each brazen pointed spear.<br />
-But lo the sacred high-erected fanes,<br />
-Fair citadels, and marble-crowned towers,<br />
-And sumptuous palaces of stately towns<br />
-Magnificent arise, upon their heads<br />
-Bearing on high a wreath of silver light.<br />
-But see my muse the high Pierian hill,<br />
-Behold its shaggy locks and airy top,<br />
-Up to the skies th’ imperious mountain heaves<br />
-The shining verdure of the nodding woods.<br />
-See where the silver Hippocrene flows,<br />
-Behold each glitt’ring rivulet, and rill<br />
-Through mazes wander down the green descent,<br />
-And sparkle through the interwoven trees.<br />
-Here rest a while and humble homage pay,<br />
-Here, where the sacred genius, that inspir’d<br />
-Sublime <em class="gesperrt"><span class="smcap">Mæonides</span></em> and <em class="gesperrt"><span class="smcap">Pindar’s</span></em> breast,<br />
-His habitation once was fam’d to hold.<br />
-Here thou, O <em class="gesperrt"><span class="smcap">Homer</span></em>, offer’dst up thy vows,<br />
-Thee, the kind muse <em class="gesperrt"><span class="smcap">Calliopæa</span></em> heard,<br />
-And led thee to the empyrean feats,<br />
-There manifested to thy hallow’d eyes<br />
-The deeds of gods; thee wise <em class="gesperrt"><span class="smcap">Minerva</span></em> taught<br />
-The wondrous art of knowing human kind;<br />
-Harmonious <em class="gesperrt"><span class="smcap">Phœbus</span></em> tun’d thy heav’nly mind,<br />
-And swell’d to rapture each exalted sense;<br />
-Even <em class="gesperrt"><span class="smcap">Mars</span></em> the dreadful battle-ruling god,<br />
-<span class="pagenum"><a name="Page_xxii" id="Page_xxii">[xxii]</a></span><em class="gesperrt"><span class="smcap">Mars</span></em> taught thee war, and with his bloody hand<br />
-Instructed thine, when in thy sounding lines<br />
-We hear the rattling of Bellona’s carr,<br />
-The yell of discord, and the din of arms.<br />
-<em class="gesperrt"><span class="smcap">Pindar</span></em>, when mounted on his fiery steed,<br />
-Soars to the sun, opposing eagle like<br />
-His eyes undazled to the fiercest rays.<br />
-He firmly seated, not like <em class="gesperrt"><span class="smcap">Glaucus’</span></em> son,<br />
-Strides his swift-winged and fire-breathing horse,<br />
-And born aloft strikes with his ringing hoofs<br />
-The brazen vault of heav’n, superior there<br />
-Looks down upon the stars, whose radiant light<br />
-Illuminates innumerable worlds,<br />
-That through eternal orbits roul beneath.<br />
-But thou all hail immortalized son<br />
-Of harmony, all hail thou Thracian bard,<br />
-To whom <em class="gesperrt"><span class="smcap">Apollo</span></em> gave his tuneful lyre.<br />
-O might’st thou, <em class="gesperrt"><span class="smcap">Orpheus</span></em>, now again revive,<br />
-And <em class="gesperrt"><span class="smcap">Newton</span></em> should inform thy list’ning ear<br />
-How the soft notes, and soul-inchanting strains<br />
-Of thy own lyre were on the wind convey’d.<br />
-He taught the muse, how sound progressive floats<br />
-Upon the waving particles of air,<br />
-When harmony in ever-pleasing strains,<br />
-Melodious melting at each lulling fall,<br />
-With soft alluring penetration steals<br />
-Through the enraptur’d ear to inmost thought,<br />
-And folds the senses in its silken bands.<br />
-So the sweet musick, which from <em class="gesperrt"><span class="smcap">Orpheus</span></em>’ touch<br />
-And fam’d <em class="gesperrt"><span class="smcap">Amphion’s</span></em>, on the sounding string<br />
-Arose harmonious, gliding on the air,<br />
-Pierc’d the tough-bark’d and knotty-ribbed woods,<br />
-Into their saps soft inspiration breath’d<br />
-And taught attention to the stubborn oak.<br />
-<span class="pagenum"><a name="Page_xxiii" id="Page_xxiii">[xxiii]</a></span>Thus when great <em class="gesperrt"><span class="smcap">Henry</span></em>, and brave <em class="gesperrt"><span class="smcap">Marlb’rough</span></em> led<br />
-Th’ imbattled numbers of <em class="gesperrt"><span class="smcap">Britannia’s</span></em> sons,<br />
-The trump, that swells th’ expanded cheek of fame,<br />
-That adds new vigour to the gen’rous youth,<br />
-And rouzes sluggish cowardize it self,<br />
-The trumpet with its Mars-inciting voice,<br />
-The winds broad breast impetuous sweeping o’er<br />
-Fill’d the big note of war. Th’ inspired host<br />
-With new-born ardor press the trembling <em class="gesperrt"><span class="smcap">Gaul</span></em>;<br />
-Nor greater throngs had reach’d eternal night,<br />
-Not if the fields of Agencourt had yawn’d<br />
-Exposing horrible the gulf of fate;<br />
-Or roaring Danube spread his arms abroad,<br />
-And overwhelm’d their legions with his floods.<br />
-But let the wand’ring muse at length return;<br />
-Nor yet, angelick genius of the sun,<br />
-In worthy lays her high-attempting song<br />
-Has blazon’d forth thy venerated name.<br />
-Then let her sweep the loud-resounding lyre<br />
-Again, again o’er each melodious string<br />
-Teach harmony to tremble with thy praise.<br />
-And still thine ear O favourable grant,<br />
-And she shall tell thee, that whatever charms,<br />
-Whatever beauties bloom on nature’s face,<br />
-Proceed from thy all-influencing light.<br />
-That when arising with tempestuous rage,<br />
-The North impetuous rides upon the clouds<br />
-Dispersing round the heav’ns obstructive gloom,<br />
-And with his dreaded prohibition stays<br />
-The kind effusion of thy genial beams;<br />
-Pale are the rubies on <em class="gesperrt"><span class="smcap">Aurora’s</span></em> lips,<br />
-No more the roses blush upon her cheeks,<br />
-Black are Peneus’ streams and golden sands<br />
-In Tempe’s vale dull melancholy sits,<br />
-<span class="pagenum"><a name="Page_xxiv" id="Page_xxiv">[xxiv]</a></span>And every flower reclines its languid head.<br />
-By what high name shall I invoke thee, say,<br />
-Thou life-infusing deity, on thee<br />
-I call, and look propitious from on high,<br />
-While now to thee I offer up my prayer.<br />
-O had great <em class="gesperrt"><span class="smcap">Newton</span></em>, as he found the cause,<br />
-By which sound rouls thro’ th’ undulating air,<br />
-O had he, baffling times resistless power,<br />
-Discover’d what that subtle spirit is,<br />
-Or whatsoe’er diffusive else is spread<br />
-Over the wide-extended universe,<br />
-Which causes bodies to reflect the light,<br />
-And from their straight direction to divert<br />
-The rapid beams, that through their surface pierce.<br />
-But since embrac’d by th’ icy arms of age,<br />
-And his quick thought by times cold hand congeal’d,<br />
-Ev’n <em class="gesperrt"><span class="smcap">Newton</span></em> left unknown this hidden power;<br />
-Thou from the race of human kind select<br />
-Some other worthy of an angel’s care,<br />
-With inspiration animate his breast,<br />
-And him instruct in these thy secret laws.<br />
-O let not <em class="gesperrt"><span class="smcap">Newton</span></em>, to whose spacious view,<br />
-Now unobstructed, all th’ extensive scenes<br />
-Of the ethereal ruler’s works arise;<br />
-When he beholds this earth he late adorn’d,<br />
-Let him not see philosophy in tears,<br />
-Like a fond mother solitary sit,<br />
-Lamenting him her dear, and only child.<br />
-But as the wise <em class="gesperrt"><span class="smcap">Pythagoras</span></em>, and he,<br />
-Whose birth with pride the fam’d Abdera boasts,<br />
-With expectation having long survey’d<br />
-This spot their ancient seat, with joy beheld<br />
-Divine philosophy at length appear<br />
-In all her charms majestically fair,<br />
-<span class="pagenum"><a name="Page_xxv" id="Page_xxv">[xxv]</a></span>Conducted by immortal <em class="gesperrt"><span class="smcap">Newton’s</span></em> hand.<br />
-So may he see another sage arise,<br />
-That shall maintain her empire: then no more<br />
-Imperious ignorance with haughty sway<br />
-Shall stalk rapacious o’er the ravag’d globe:<br />
-Then thou, O <em class="gesperrt"><span class="smcap">Newton</span></em>, shalt protect these lines.<br />
-The humble tribute of the grateful muse;<br />
-Ne’er shall the sacrilegious hand despoil<br />
-Her laurel’d temples, whom his name preserves:<br />
-And were she equal to the mighty theme,<br />
-Futurity should wonder at her song;<br />
-Time should receive her with extended arms,<br />
-Seat her conspicuous in his rouling carr,<br />
-And bear her down to his extreamest bound.</p>
-
-<p class="p1"><span class="smcap"><em class="gesperrt">Fables</em></span> with wonder tell how Terra’s sons<br />
-With iron force unloos’d the stubborn nerves<br />
-Of hills, and on the cloud-inshrouded top<br />
-Of Pelion Ossa pil’d. But if the vast<br />
-Gigantick deeds of savage strength demand<br />
-Astonishment from men, what then shalt thou,<br />
-O what expressive rapture of the soul,<br />
-When thou before us, <em class="gesperrt"><span class="smcap">Newton</span></em>, dost display<br />
-The labours of thy great excelling mind;<br />
-When thou unveilest all the wondrous scene,<br />
-The vast idea of th’ eternal king,<br />
-Not dreadful bearing in his angry arm<br />
-The thunder hanging o’er our trembling heads;<br />
-But with th’ effulgency of love replete,<br />
-And clad with power, which form’d th’ extensive heavens.<br />
-O happy he, whose enterprizing hand<br />
-Unbars the golden and relucid gates<br />
-Of th’ empyrean dome, where thou enthron’d<br />
-Philosophy art seated. Thou sustain’d<br />
-<span class="pagenum"><a name="Page_xxvi" id="Page_xxvi">[xxvi]</a></span>By the firm hand of everlasting truth<br />
-Despisest all the injuries of time;<br />
-Thou never know’st decay when all around,<br />
-Antiquity obscures her head. Behold<br />
-Th’ Egyptian towers, the Babylonian walls,<br />
-And Thebes with all her hundred gates of brass,<br />
-Behold them scatter’d like the dust abroad.<br />
-Whatever now is flourishing and proud,<br />
-Whatever shall, must know devouring age.<br />
-Euphrates’ stream, and seven-mouthed Nile,<br />
-And Danube, thou that from Germania’s soil<br />
-To the black Euxine’s far remoted shore,<br />
-O’er the wide bounds of mighty nations sweep’st<br />
-In thunder loud thy rapid floods along.<br />
-Ev’n you shall feel inexorable time;<br />
-To you the fatal day shall come; no more<br />
-Your torrents then shall shake the trembling ground,<br />
-No longer then to inundations swol’n<br />
-Th’ imperious waves the fertile pastures drench,<br />
-But shrunk within a narrow channel glide;<br />
-Or through the year’s reiterated course<br />
-When time himself grows old, your wond’rous streams<br />
-Lost ev’n to memory shall lie unknown<br />
-Beneath obscurity, and Chaos whelm’d,<br />
-But still thou sun illuminatest all<br />
-The azure regions round, thou guidest still<br />
-The orbits of the planetary spheres;<br />
-The moon still wanders o’er her changing course,<br />
-And still, O <em class="gesperrt"><span class="smcap">Newton</span></em>, shall thy name survive:<br />
-As long as nature’s hand directs the world,<br />
-When ev’ry dark obstruction shall retire,<br />
-And ev’ry secret yield its hidden store,<br />
-Which thee dim-sighted age forbad to see<br />
-Age that alone could stay thy rising soul.<br />
-<span class="pagenum"><a name="Page_xxvii" id="Page_xxvii">[xxvii]</a></span>And could mankind among the fixed stars,<br />
-E’en to th’ extremest bounds of knowledge reach,<br />
-To those unknown innumerable suns,<br />
-Whose light but glimmers from those distant worlds,<br />
-Ev’n to those utmost boundaries, those bars<br />
-That shut the entrance of th’ illumin’d space<br />
-Where angels only tread the vast unknown,<br />
-Thou ever should’st be seen immortal there:<br />
-In each new sphere, each new-appearing sun,<br />
-In farthest regions at the very verge<br />
-Of the wide universe should’st thou be seen.<br />
-And lo, th’ all-potent goddess <em class="gesperrt"><span class="smcap">Nature</span></em> takes<br />
-With her own hand thy great, thy just reward<br />
-Of immortality; aloft in air<br />
-See she displays, and with eternal grasp<br />
-Uprears the trophies of great <em class="gesperrt"><span class="smcap">Newton</span></em>’s fame.</p>
-
-<p class="pr2 p1 large"><span class="smcap">R. Glover.</span></p>
-
-</div>
-
-</div>
-
-<p><span class="pagenum"><a name="Page_xxviii" id="Page_xxviii">[xxviii]</a></span></p>
-
-<div class="chapter">
-
-<hr class="d1" />
-<hr class="d2" />
-
-<h2 class="p4">THE<br />
-<span class="large"><em class="gesperrt">CONTENTS</em>.</span></h2>
-
-<p class="drop1">I<i>NTRODUCTION concerning Sir</i> <em class="gesperrt"><span class="smcap">Isaac Newton</span></em>’<i>s<br />
-method of reasoning in philosophy</i><span class="vh">&mdash;&mdash;&mdash;&mdash;&mdash;&mdash;&mdash;&mdash;</span>pag.   1</p>
-
-<p class="pc1 mid"><span class="smcap">Book I.</span><br /></p>
-
-<table id="toc1" summary="cont">
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c27">Chap. 1.</a></em></span> <i>Of the laws of motion</i></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The first law of motion proved</i></td>
-  <td class="tdrl"><a href="#c29a">p. 29</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The second law of motion proved</i></td>
-  <td class="tdrl"><a href="#c29b">p. 29</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The third law of motion proved</i></td>
-  <td class="tdrl"><a href="#c31">p. 31</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c48">Chap. 2.</a></em></span> <i>Further proofs of the laws of motion</i></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The effects of percussion</i></td>
-  <td class="tdrl"><a href="#c49">p. 49</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The perpendicular descent of bodies</i></td>
-  <td class="tdrl"><a href="#c55">p. 55</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The oblique descent of bodies in a straight line</i></td>
-  <td class="tdrl"><a href="#c57">p. 57</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The curvilinear descent of bodies</i></td>
-  <td class="tdrl"><a href="#c58a">p. 58</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The perpendicular ascent of bodies</i></td>
-  <td class="tdrl"><a href="#c58b">ibid.</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The oblique ascent of bodies</i></td>
-  <td class="tdrl"><a href="#c59">p. 59</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The power of gravity proportional to the quantity of matter in each body</i></td>
-  <td class="tdrl"><a href="#c60">p. 60</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The centre of gravity of bodies</i></td>
-  <td class="tdrl"><a href="#c62">p. 62</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The mechanical powers</i></td>
-  <td class="tdrl"><a href="#c69">p. 69</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>The lever</i></td>
-  <td class="tdrl"><a href="#c71">p. 71</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>The wheel and axis</i></td>
-  <td class="tdrl"><a href="#c77">p. 77</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>The pulley</i></td>
-  <td class="tdrl"><a href="#c80">p. 80</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>The wedge</i></td>
-  <td class="tdrl"><a href="#c83a">p. 83</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>The screw</i></td>
-  <td class="tdrl"><a href="#c83b">ibid.</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>The inclined plain</i></td>
-  <td class="tdrl"><a href="#c84">p. 84</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The pendulum<span class="pagenum"><a name="Page_xxix" id="Page_xxix">[xxix]</a></span></i></td>
-  <td class="tdrl"><a href="#c86a">p. 86</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>Vibrating in a circle</i></td>
-  <td class="tdrl"><a href="#c86b">ibid.</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>Vibrating in a cycloid</i></td>
-  <td class="tdrl"><a href="#c91">p. 91</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The line of swiftest descent</i></td>
-  <td class="tdrl"><a href="#c93">p. 93</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The centre of oscillation</i></td>
-  <td class="tdrl"><a href="#c94">p. 94</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Experiments upon the percussion of bodies made by pendulums</i></td>
-  <td class="tdrl"><a href="#c98">p. 98</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The centre of percussion</i></td>
-  <td class="tdrl"><a href="#c100">p. 100</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The motion of projectiles</i></td>
-  <td class="tdrl"><a href="#c102">p. 102</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The description of the conic sections</i></td>
-  <td class="tdrl"><a href="#c106">p. 106</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The difference between absolute and relative motion,
-as also between absolute and relative time</i></td>
-  <td class="tdrl"><a href="#c112">p. 112</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c117">Chap. 3.</a></em></span> <i>Of centripetal forces</i></td>
-  <td class="tdrl"><a href="#c117">p. 117</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c143">Chap. 4.</a></em></span> <i>Of the resistance of fluids</i></td>
-  <td class="tdrl"><a href="#c143">p. 143</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Bodies are resisted in the duplicate proportion of their velocities</i></td>
-  <td class="tdrl"><a href="#c147">p. 147</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Of elastic fluids and their resistance</i></td>
-  <td class="tdrl"><a href="#c149">p. 149</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>How fluids may be rendered elastic </i></td>
-  <td class="tdrl"><a href="#c150">p. 150</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The degree of resistance in regard to the proportion
-between the density of the body and of the fluid</i></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>In rare and uncompressed fluids</i></td>
-  <td class="tdrl"><a href="#c153">p. 153</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>In compressed fluids</i></td>
-  <td class="tdrl"><a href="#c155a">p. 155</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The degree of resistance as it depends upon the figure of bodies</i></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>In rare and uncompressed fluids</i></td>
-  <td class="tdrl"><a href="#c155b">p. 155</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>In compressed fluids</i></td>
-  <td class="tdrl"><a href="#c158">p. 158</a></td>
- </tr>
-
-
-</table>
-
-<p class="pc1 mid"><span class="smcap">Book II.</span><br /></p>
-
-<table id="toc2" summary="cont2">
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c161">Chap. 1.</a></em></span>
-<i>That the planets move in a space empty of sensible matter</i></td>
-  <td class="tdrl"><a href="#c161">p. 161</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The system of the world described</i></td>
-  <td class="tdrl"><a href="#c162">p. 162</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The planets suffer no sensible resistance in their motion</i></td>
-  <td class="tdrl"><a href="#c166">p. 166</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>They are not kept in motion by a fluid</i></td>
-  <td class="tdrl"><a href="#c168">p. 168</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>That all space is not full of matter without vacancies</i></td>
-  <td class="tdrl"><a href="#c169">p. 169</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="pagenum"><a name="Page_xxx" id="Page_xxx">[xxx]</a></span><span class="smcap"><em class="gesperrt"><a href="#c171a">Chap. 2.</a></em></span>
-<i>Concerning the cause that keeps in motion the primary planets</i></td>
-  <td class="tdrl"><a href="#c171a">p. 171</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>They are influenced by a centripetal power directed to the sun</i></td>
-  <td class="tdrl"><a href="#c171b">p. 171</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The strength of this power is reciprocally in the
-duplicate proportion of the distance</i></td>
-  <td class="tdrl"><a href="#c171c">ibid.</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The cause of the irregularities in the motions of the planets</i></td>
-  <td class="tdrl"><a href="#c175">p. 175</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>A correction of their motions</i></td>
-  <td class="tdrl"><a href="#c178">p. 178</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>That the frame of the world is not eternal</i></td>
-  <td class="tdrl"><a href="#c180">p. 180</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c181">Chap. 3.</a></em></span> <i>Of the motion of the moon and the other
-secondary planets</i></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>That they are influenced by a centripetal force directed
-toward their primary, as the primary are influenced by the sun</i></td>
-  <td class="tdrl"><a href="#c182">p. 182</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>That the power usually called gravity extends to the moon</i></td>
-  <td class="tdrl"><a href="#c189">p. 189</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>That the sun acts on the secondary planets</i></td>
-  <td class="tdrl"><a href="#c190">p. 190</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The variation of the moon</i></td>
-  <td class="tdrl"><a href="#c193">p. 193</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>That the circuit of the moons orbit is increased by the
-sun in the quarters, and diminished in the conjunction and opposition</i></td>
-  <td class="tdrl"><a href="#c198">p. 198</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The distance of the moon from the earth in the quarters
-and in the conjunction and opposition is altered by the sun</i></td>
-  <td class="tdrl"><a href="#c200">p. 200</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>These irregularities in the moon’s motion varied by the
-change of distance between the earth and sun</i></td>
-  <td class="tdrl"><a href="#c201a">p. 201</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The period of the moon round the earth and her distance
-varied by the same means</i></td>
-  <td class="tdrl"><a href="#c201b">ibid.</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The motion of the nodes and the inclination of the
-moons orbit</i></td>
-  <td class="tdrl"><a href="#c202">p. 202</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The motion of the apogeon and change of the
-eccentricity</i></td>
-  <td class="tdrl"><a href="#c218">p. 218</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><span class="pagenum"><a name="Page_xxxi" id="Page_xxxi">[xxxi]</a></span><i>The inequalities of the other secondary planets deducible
-from these of the moon</i></td>
-  <td class="tdrl"><a href="#c229">p. 229</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c230a">Chap. 4.</a></em></span> <i>Of comets</i></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>They are not meteors, nor placed totally without the
-planetary system</i></td>
-  <td class="tdrl"><a href="#c230b">p. 230</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The sun acts on them in the same manner as on the
-planets</i></td>
-  <td class="tdrl"><a href="#c231">p. 231</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Their orbits are near to parabola’s</i></td>
-  <td class="tdrl"><a href="#c233">p. 233</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The comet that appeared at the end of the year 1680,
-probably performs its period in 575 years, and another
-comet in 75 years</i></td>
-  <td class="tdrl"><a href="#c234">p. 234</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Why the comets move in planes more different from
-one another than the planets</i></td>
-  <td class="tdrl"><a href="#c235">p. 235</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The tails of comets</i></td>
-  <td class="tdrl"><a href="#c238">p. 238</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The use of them</i></td>
-  <td class="tdrl"><a href="#c243">p. 243 244</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The possible use of the comet it self</i></td>
-  <td class="tdrl"><a href="#c245">p. 245 246</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c247">Chap. 5.</a></em></span> <i>Of the bodies of the sun and planets</i></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>That each of the heavenly bodies is endued with an
-attractive power, and that the force of the same
-body on others is proportional to the quantity of
-matter in the body attracted</i></td>
-  <td class="tdrl"><a href="#c247">p. 247</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>This proved in the earth</i></td>
-  <td class="tdrl"><a href="#c248">p. 248</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>In the sun</i></td>
-  <td class="tdrl"><a href="#c250">p. 250</a></td>
- </tr>
-
- <tr>
-  <td class="tdl3"><i>In the rest of the planets</i></td>
-  <td class="tdrl"><a href="#c251">p. 251</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>That the attractive power is of the same nature in
-the sun and in all the planets, and therefore is
-the same with gravity</i></td>
-  <td class="tdrl"><a href="#c252a">p. 252</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>That the attractive power in each of these bodies is
-proportional to the quantity of matter in the body attracting</i></td>
-  <td class="tdrl"><a href="#c252b">ibid.</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><span class="pagenum"><a name="Page_xxxii" id="Page_xxxii">[xxxii]</a></span><i>That each particle of which the sun and planets are
-composed is endued with an attracting power, the
-strength of which is reciprocally in the duplicate
-proportion of the distance</i></td>
-  <td class="tdrl"><a href="#c257">p. 257</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The power of gravity universally belongs to all matter</i></td>
-  <td class="tdrl"><a href="#c259">p. 259</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The different weight of the same body upon the surface
-of the sun, the earth, Jupiter and Saturn; the respective
-densities of these bodies, and the proportion
-between their diameters</i></td>
-  <td class="tdrl"><a href="#c261">p. 261</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c263">Chap. 6.</a></em></span> <i>Of the fluid parts of the planets</i></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The manner in which fluids press</i></td>
-  <td class="tdrl"><a href="#c264">p. 264</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The motion of waves on the surface of water</i></td>
-  <td class="tdrl"><a href="#c269">p. 269</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The motion of sound through the air</i></td>
-  <td class="tdrl"><a href="#c270">p. 270</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The velocity of sound</i></td>
-  <td class="tdrl"><a href="#c282">p. 282</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Concerning the tides</i></td>
-  <td class="tdrl"><a href="#c283">p. 283</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The figure of the earth</i></td>
-  <td class="tdrl"><a href="#c296">p. 296</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The effect of this figure upon the power of gravity</i></td>
-  <td class="tdrl"><a href="#c300">p. 300</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The effect it has upon pendulums</i></td>
-  <td class="tdrl"><a href="#c302">p. 302</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Bodies descend perpendicularly to the surface of the earth</i></td>
-  <td class="tdrl"><a href="#c304">p. 304</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The axis of the earth changes its direction twice a year,
-and twice a month</i></td>
-  <td class="tdrl"><a href="#c313a">p. 313</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The figure of the secondary planets</i></td>
-  <td class="tdrl"><a href="#c313b">ibid.</a></td>
- </tr>
-
-</table>
-
-<p class="pc1 mid"><span class="smcap">Book III.</span><br /></p>
-
-<table id="toc3" summary="cont3">
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c316">Chap. 1.</a></em></span> <i>Concerning the cause of colours inherent in the light</i></td>
- </tr>
-
-
- <tr>
-  <td class="tdl2"><i>The sun’s light is composed of rays of different colours</i></td>
-  <td class="tdrl"><a href="#c318">p. 318</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The refraction of light</i></td>
-  <td class="tdrl"><a href="#c319">p. 319<br />320</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Bodies appear of different colour by day-light, because
-some reflect one kind of light more copiously than the
-rest, and other bodies other kinds of light</i></td>
-  <td class="tdrl"><a href="#c329">p. 329</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The effect of mixing rays of different colours</i></td>
-  <td class="tdrl"><a href="#c334">p. 334</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="pagenum"><a name="Page_xxxiii" id="Page_xxxiii">[xxxiii]</a></span><span class="smcap"><em class="gesperrt"><a href="#c338">Chap. 2.</a></em></span> <i>Of the properties of bodies whereon their
-colours depend.</i></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Light is not reflected by impinging against the solid
-parts of bodies</i></td>
-  <td class="tdrl"><a href="#c339">p. 339</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The particles which compose bodies are transparent</i></td>
-  <td class="tdrl"><a href="#c341">p. 341</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Cause of opacity</i></td>
-  <td class="tdrl"><a href="#c342">p. 342</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Why bodies in the open day-light have different colours</i></td>
-  <td class="tdrl"><a href="#c344">p. 344</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The great porosity of bodies considered</i></td>
-  <td class="tdrl"><a href="#c355">p. 355</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c356">Chap. 3.</a></em></span> <i>Of the refraction, reflection, and
-inflection of light.</i></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Rays of different colours are differently refracted</i></td>
-  <td class="tdrl"><a href="#c357">p. 357</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The sine of the angle of incidence in each kind of rays
-bears a given proportion to the sine of refraction</i></td>
-  <td class="tdrl"><a href="#c361">p. 361</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The proportion between the refractive powers in different
-bodies</i></td>
-  <td class="tdrl"><a href="#c366">p. 366</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Unctuous bodies refract most in proportion to their
-density</i></td>
-  <td class="tdrl"><a href="#c368">p. 368</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The action between light and bodies is mutual</i></td>
-  <td class="tdrl"><a href="#c369">p. 369</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Light has alternate fits of easy transmission and
-reflection</i></td>
-  <td class="tdrl"><a href="#c371">p. 371</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The fits found to return alternately many thousand
-times</i></td>
-  <td class="tdrl"><a href="#c375a">p. 375</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Why bodies reflect part of the light incident upon them
-and transmit another part</i></td>
-  <td class="tdrl"><a href="#c375b">ibid.</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Sir</i> <em class="gesperrt"><span class="smcap">Isaac Newton</span></em>’s <i>conjecture
-concerning the cause of this alternate reflection and
-transmission of light</i></td>
-  <td class="tdrl"><a href="#c376">p. 376</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The inflection of light</i></td>
-  <td class="tdrl"><a href="#c377a">p. 377</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c377b">Chap. 4.</a></em></span> <i>Of optic glasses.</i></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>How the rays of light are refracted by a spherical
-surface of glass</i></td>
-  <td class="tdrl"><a href="#c378">p. 378</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>How they are refracted by two such surfaces</i></td>
-  <td class="tdrl"><a href="#c380">p. 380</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>How the image of objects is formed by a convex glass</i></td>
-  <td class="tdrl"><a href="#c381">p. 381</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Why convex glasses help the sight in old age, and concave
-glasses assist short-sighted people</i></td>
-  <td class="tdrl"><a href="#c383">p. 383</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>The manner in which vision is performed by the eye</i></td>
-  <td class="tdrl"><a href="#c385">p. 385</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i><span class="pagenum"><a name="Page_xxxiv" id="Page_xxxiv">[xxxiv]</a></span>Of telescopes with two convex glasses</i></td>
-  <td class="tdrl"><a href="#c386">p. 386</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Of telescopes with four convex glasses</i></td>
-  <td class="tdrl"><a href="#c388a">p. 388</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Of telescopes with one convex and one concave glass</i></td>
-  <td class="tdrl"><a href="#c388b">ibid.</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Of microscopes</i></td>
-  <td class="tdrl"><a href="#c389">p. 389</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Of the imperfection of telescopes arising from the
-different refrangibility of the light</i></td>
-  <td class="tdrl"><a href="#c390">p. 390</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Of the reflecting telescope</i></td>
-  <td class="tdrl"><a href="#c393">p. 393</a></td>
- </tr>
-
- <tr>
-  <td class="tdl1"><span class="smcap"><em class="gesperrt"><a href="#c394a">Chap. 5.</a></em></span> <i>Of the rainbow</i></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Of the inner rainbow</i></td>
-  <td class="tdrl"><a href="#c394b">p. 394<br />395 398 399</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Of the outter bow</i></td>
-  <td class="tdrl"><a href="#c396">p. 396<br />397 400</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Of a particular appearance in the inner rainbow</i></td>
-  <td class="tdrl"><a href="#c401">p. 401</a></td>
- </tr>
-
- <tr>
-  <td class="tdl2"><i>Conclusion</i></td>
-  <td class="tdrl"><a href="#c405">p. 405</a></td>
- </tr>
-
-</table>
-
-<hr class="d3" />
-
-<h2><em class="gesperrt">ERRATA.</em></h2>
-
-<div class="pbq">
-
-<p class="drop-cap04">PAGE 25. line 4. read <i>In these Precepts.</i> p. 40. l. 24. for <i>I</i> read <i>K</i>. p. 53. l. penult. f. Æ. r. F.
-p. 82. l. ult. f. 40. r. 41. p. 83 l. ult. f. 43. r. 45. p. 91. l. 3. f. 48. r. 50. ibid. l. 25.
-for 49. r. 51. p. 92. l. 18. f. <i>A&nbsp;G&nbsp;F&nbsp;E.</i> r. <i>H&nbsp;G&nbsp;F&nbsp;C.</i> p. 96. l. 23. dele the comma after {⅓}.
-p. 140. l. 12. dele <i>and.</i> p. 144. l. 15. f. <i>threefold.</i> r. <i>two-fold.</i> p. 162. l. 25. f. {⅓}. r. {⅞}. p. 193.
-1. 2. r. <i>always.</i> p. 199. l. penult. and p. 200. l. 3. 5. f. F. r. C. p. 201. l. 8. f. <i>ascends.</i> r.<i> must
-ascend.</i> ibid. l. 10. f. <i>it descends.</i> r. <i>descend.</i> p. 208. l. 14. f. <i>W&nbsp;T&nbsp;O.</i> r. <i>N&nbsp;T&nbsp;O.</i> In <i>fig.</i> 110. draw a line
-from <i>I</i> through <i>T</i>, till it meets the circle <i>A&nbsp;D&nbsp;C&nbsp;B</i>, where place <i>W.</i> p. 216. l. penult. f. <i>action.</i> r.
-<i>motion.</i> p. 221. l. 23. f. <i>A&nbsp;F.</i> r. <i>A&nbsp;H.</i> p. 232. l. 23. after <i>invention</i> put a full point. p. 253. l. penult.
-delete the comma after <i>remarkable</i>. p. 255. l. ult. f. <i>D&nbsp;E.</i> r. <i>B&nbsp;E.</i> p. 278. l. 17. f. ξ τ. r. ξ π.
-p. 299. l. 19 r. <i>the.</i> p. 361. l. 12. f. I. r. t. p. 369. l. 2, 3. r. <i>Pseudo-topaz.</i> p. 378. l. 12. f. <i>that.</i>
-r. <i>than.</i> p. 379. l. 15. f. <i>converge.</i> r. <i>diverge.</i> p. 384. l. 7. f. <i>optic-glass.</i> r. <i>optic-nerve.</i> p. 391.
-l. 18. r. <i>as 50 to 78.</i> p. 392. l. 18. after <i>telescope</i> add <i>be about 100 feet long and the.</i> in <i>fig. 161.</i>
-f. δ put ε. p. 399. l. 8. r. A&nbsp;n, A&nbsp;x. &amp;c. p. 400. 1. 19. r. A&nbsp;π, A&nbsp;ρ. A&nbsp;σ, A&nbsp;τ. A&nbsp;φ. p. 401.
-l. 14. r. <i>fig. 163.</i> The pages 374, 375, 376 are erroneously numbered 375, 376, 377; and the
-pages 382, 383 are numbered 381, 382.</p></div>
-
-</div>
-
-<p><span class="pagenum"><a name="Page_xxxv" id="Page_xxxv">[xxxv]</a></span></p>
-
-<div class="chapter">
-
-<hr class="d1" />
-<hr class="d2" />
-
-<h2 class="p4"><span class="reduct wn">A LIST of such of the</span><br />
-<span class="mid">SUBSCRIBERS NAMES</span><br />
-<span class="reduct wn">As are come to the <span class="smcap"><em class="gesperrt">Hand</em></span> of the</span><br />
-<span class="large">AUTHOR.</span></h2>
-
-<p class="pi4 p4">A</p>
-
-<p class="drop-cap04">M<i>Onseigneur</i> d’Aguesseau, <i>Chancelier de</i> France<br />
-<i>Reverend</i> Mr Abbot, <i>of</i> Emanuel Coll. Camb.<br />
-<i>Capt.</i> George Abell<br />
-<i>The Hon. Sir</i> John Anstruther, <i>Bar.</i><br />
-Thomas Abney, <i>Esq;</i><br />
-Mr. Nathan Abraham<br />
-<i>Sir</i> Arthur Acheson, Bart.<br />
-Mr William Adair<br />
-<i>Rev.</i> Mr John Adams, <i>Fellow of</i> Sidney Coll. Cambridge<br />
-Mr William Adams<br />
-Mr George Adams<br />
-Mr William Adamson, <i>Scholar of</i> Caius Coll. Camb.<br />
-Mr Samuel Adee, <i>Fell. of</i> Corp.  Chr. Coll. Oxon<br />
-Mr Andrew Adlam<br />
-Mr John Adlam<br />
-Mr Stephen Ainsworth<br />
-Mrs Aiscot<br />
-Mr Robert Akenhead, <i>Bookseller at</i> Newcastle <i>upon</i> Tyne<br />
-S. B. Albinus, M.&nbsp;D. Anatom. <i>and</i> Chirurg <i>in</i> Acad. L. B. Prof.<br />
-George Aldridge, <i>M. D.</i><br />
-Mr George Algood<br />
-Mr Aliffe<br />
-Robert Allen, <i>Esq;</i><br />
-Mr Zach. Allen<br />
-<i>Rev.</i> Mr Allerton, <i>Fellow of</i> Sidney Coll. Cambridge<br />
-Mr St. Amand<br />
-Mr John Anns<br />
-Thomas Anson, <i>Esq;</i><br />
-<i>Rev. Dr.</i> Christopher Anstey<br />
-Mr Isaac Antrabus<br />
-Mr Joshua Appleby<br />
-John Arbuthnot, <i>M. D.</i><br />
-William Archer, <i>Esq;</i><br />
-Mr John Archer, <i>Merchant of</i> Amsterdam<br />
-Thomas Archer, <i>Esq;</i><br />
-<i>Coll.</i> John Armstrong, Surveyor-General <i>of</i> His Majesty’s Ordnance<br />
-Mr Armytage<br />
-Mr Street Arnold, <i>Surgeon</i><br />
-Mr Richard Arnold<br />
-Mr Ascough<br />
-Mr Charles Asgill<br />
-Richard Ash, <i>Esq; of</i> Antigua<br />
-Mr Ash, <i>Fellow-Commoner of</i> Jesus Coll. Cambridge<br />
-William Ashurst, <i>Esq; of</i> Castle Henningham, Essex<br />
-Mr Thomas Ashurst<br />
-Mr Samuel Ashurst<br />
-Mr John Askew, <i>Merchant</i><br />
-Mr Edward Athawes, <i>Merchant</i><br />
-Mr Abraham Atkins<br />
-Mr Edward Kensey Atkins<br />
-Mr Ayerst<br />
-Mr Jonathan Ayleworth, <i>Jun.</i><br />
-Rowland Aynsworth, <i>Esq;</i></p>
-
-<p class="pi4 p2">B</p>
-
-<p class="pn2"><i>His Grace the Duke of</i> Bedford<br />
-<i>Right Honourable the Marquis of</i> Bowmont<br />
-<i>Right Hon. the Earl of</i> Burlington<br />
-<i>Right Honourable Lord Viscount</i> Bateman<br />
-<i>Rt. Rev. Ld. Bp. of</i> Bath <i>and</i> Wells<br />
-<i>Rt. Rev. Lord Bishop of</i> Bristol<br />
-<i>Right Hon. Lord</i> Bathurst<br />
-Richard Backwell, <i>Esq;</i><br />
-Mr William Backshell, <i>Merch.</i><br />
-Edmund Backwell, <i>Gent.</i><br />
-<i>Sir</i> Edmund Bacon<br />
-Richard Bagshaw, <i>of</i> Oakes, <i>Esq;</i><br />
-Tho. Bagshaw, <i>of</i> Bakewell, <i>Esq;</i><br />
-<i>Rev.</i> Mr. Bagshaw<br />
-<i>Sir</i> Robert Baylis<br />
-<i>Honourable</i> George Baillie, <i>Esq;</i><br />
-Giles Bailly, <i>M. D. of</i> Bristol<br />
-Mr Serjeant Baines<br />
-<i>Rev.</i> Mr. Samuel Baker, <i>Residen. of St.</i> Paul’s.<br />
-Mr George Baker<br />
-Mr Francis Baker<br />
-Mr Robert Baker<br />
-Mr John Bakewell<br />
-Anthony Balam, <i>Esq;</i><br />
-<span class="pagenum"><a name="Page_xxxvi" id="Page_xxxvi">[xxxvi]</a></span>Charles Bale, <i>M. D.</i><br />
-Mr Atwell, <i>Fellow of</i> Exeter Coll. Oxon<br />
-Mr Savage Atwood<br />
-Mr John Atwood<br />
-Mr James Audley<br />
-<i>Sir</i> Robert Austen, <i>Bart.</i><br />
-<i>Sir</i> John Austen<br />
-Benjamin Avery, <i>L. L. D.</i><br />
-Mr Balgay<br />
-<i>Rev.</i> Mr Tho. Ball, <i>Prebendary of</i> Chichester<br />
-Mr Pappillon Ball, <i>Merchant</i><br />
-Mr Levy Ball<br />
-<i>Rev.</i> Mr Jacob Ball, <i>of</i> Andover<br />
-<i>Rev.</i> Mr Edward Ballad, <i>of</i> Trin. Coll. Cambridge<br />
-Mr Baller<br />
-John Bamber, <i>M. D.</i><br />
-<i>Rev.</i> Mr Banyer, <i>Fellow of</i> Emanuel Coll. Cambridge<br />
-Mr Henry Banyer, <i>of</i> Wisbech, <i>Surgeon</i><br />
-Mr John Barber, <i>Apothecary in</i> Coventry<br />
-Henry Steuart Barclay, <i>of</i> Colairny, <i>Esq;</i><br />
-<i>Rev.</i> Mr Barclay, <i>Canon of</i> Windsor<br />
-Mr David Barclay<br />
-Mr Benjamin Barker, <i>Bookseller in</i> London<br />
-&mdash;&mdash; Barker, <i>Esq;</i><br />
-Mr Francis Barkstead<br />
-<i>Rev.</i> Mr Barnard<br />
-Thomas Barrett, <i>Esq;</i><br />
-Mr Barrett<br />
-Richard Barret, <i>M. D.</i><br />
-Mr Barrow, <i>Apothecary</i><br />
-William Barrowby, <i>M. D.</i><br />
-Edward Barry, <i>M. D. of</i> Corke<br />
-Mr Humphrey Bartholomew, <i>of</i> University College, Oxon<br />
-Mr Benjamin Bartlett<br />
-Mr Henry Bartlett<br />
-Mr James Bartlett<br />
-Mr Newton Barton, <i>of</i> Trinity College, Cambridge<br />
-<i>Rev.</i> Mr. Barton<br />
-William Barnsley, <i>Esq;</i><br />
-Mr Samuel Bateman<br />
-Mr Thomas Bates<br />
-Peter Barhurst, <i>Esq;</i><br />
-Mark Barr, <i>Esq;</i><br />
-Thomas Bast, <i>Esq;</i><br />
-Mr Batley, <i>Bookseller in</i> London<br />
-Mr Christopher Batt, <i>jun.</i><br />
-Mr William Batt, <i>Apothecary</i><br />
-Rev. Mr Battely, <i>M. A. Student of</i> Christ Church, Oxon<br />
-Mr Edmund Baugh<br />
-<i>Rev.</i> Mr. Thomas Bayes<br />
-Edward Bayley, <i>M. D. of</i> Havant<br />
-John Bayley, <i>M. D. of</i> Chichester<br />
-Mr. Alexander Baynes, <i>Professor of Law in the University of</i> Edinburgh<br />
-Mr Benjamin Beach<br />
-Thomas Beacon, <i>Esq;</i><br />
-<i>Rev.</i> Mr Philip Bearcroft<br />
-Mr Thomas Bearcroft<br />
-Mr William Beachcroft<br />
-Richard Beard, <i>M. D. of</i> Worcester<br />
-Mr Joseph Beasley<br />
-<i>Rev.</i> Mr Beats, <i>M. A. Fellow of</i> Magdalen College, Cambridge<br />
-<i>Sir</i> George Beaumont<br />
-John Beaumont, <i>Esq; of</i> Clapham<br />
-William Beecher, <i>of</i> Howberry, <i>Esq;</i><br />
-Mr Michael Beecher<br />
-Mr Finney Beifield, <i>of the</i> Inner-Temple<br />
-Mr Benjamin Bell<br />
-Mr Humphrey Bell<br />
-Mr Phineas Bell<br />
-Leonard Belt, <i>Gent.</i><br />
-William Benbow, <i>Esq;</i><br />
-Mr Martin Bendall<br />
-Mr George Bennet, <i>of</i> Cork, <i>Bookseller</i><br />
-Rev. Mr Martin Benson, <i>Archdeacon of</i> Berks<br />
-Samuel Benson, <i>Esq;</i><br />
-William Benson, <i>Esq;</i><br />
-Rev. Richard Bently, <i>D. D. Master of</i> Trinity Coll. Cambridge<br />
-Thomas Bere, <i>Esq;</i><br />
-<i>The Hon.</i> John Berkley, <i>Esq;</i><br />
-Mr Maurice Berkley, sen. <i>Surgeon</i><br />
-John Bernard, <i>Esq;</i><br />
-Mr Charles Bernard<br />
-Hugh Bethell, <i>of</i> Rise <i>in</i> Yorkshire, <i>Esq;</i><br />
-Hugh Bethell, <i>of</i> Swindon <i>in</i> Yorkshire, <i>Esq;</i><br />
-Mr Silvanus Bevan, <i>Apothecary</i><br />
-Mr Calverly Bewick, jun.<br />
-Henry Bigg, <i>B. D.</i> Warden <i>of</i> New College, Oxon<br />
-<i>Sir</i> William Billers<br />
-&mdash;&mdash; Billers, <i>Esq;</i><br />
-Mr John Billingsley<br />
-Mr George Binckes<br />
-<i>Rev.</i> Mr Birchinsha, <i>of</i> Exeter College, Oxon<br />
-<i>Rev.</i> Mr Richard Biscoe<br />
-Mr Hawley Bishop, <i>Fellow of St.</i> John’s College, Oxon<br />
-<i>Dr</i> Bird, <i>of</i> Reading<br />
-Henry Blaake, <i>Esq;</i><br />
-Mr Henry Blaake<br />
-<i>Rev.</i> Mr George Black<br />
-Steward Blacker, <i>Esq;</i><br />
-William Blacker, <i>Esq;</i><br />
-Rowland Blackman, <i>Esq;</i><br />
-<i>Rev.</i> Mr Charles Blackmore, <i>of</i> Worcester<br />
-<i>Rev</i> Mr Blackwall, <i>of</i> Emanuel College, Cambridge<br />
-Jonathan Blackwel, <i>Esq;</i><br />
-James Blackwood, <i>Esq;</i><br />
-Mr Thomas Blandford<br />
-Arthur Blaney, <i>Esq;</i><br />
-Mr James Blew<br />
-Mr William Blizard<br />
-<i>Dr</i> Blomer<br />
-Mr Henry Blunt<br />
-Mr Elias Bocket<br />
-Mr Thomas Bocking<br />
-Mr Charles Boehm, <i>Merchant</i><br />
-Mr William Bogdani<br />
-Mr John Du Bois, <i>Merchant</i><br />
-Mr Samuel Du Bois<br />
-Mr Joseph Bolton, of Londonderry, <i>Esq;</i><br />
-Mr John Bond<br />
-John Bonithon, <i>M. A.</i><br />
-Mr James Bonwick, <i>Bookseller in</i> London<br />
-Thomas Boone, <i>Esq;</i><br />
-<i>Rev.</i> Mr Pennystone, <i>M. A.</i><br />
-Mrs Judith Booth<br />
-Thomas Bootle, <i>Esq;</i><br />
-Thomas Borret, <i>Esq;</i><br />
-Mr Benjamin Boss<br />
-<i>Dr</i> Bostock<br />
-Henry Bosville, <i>Esq;</i><br />
-Mr John Bosworth<br />
-<i>Dr</i> George Boulton<br />
-<i>Hon.</i> Bourn <i>M. D. of</i> Chesterfield<br />
-Mrs Catherine Bovey<br />
-Mr Humphrey Bowen<br />
-Mr Bower<br />
-John Bowes, <i>Esq;</i><br />
-William Bowles, <i>Esq;</i><br />
-Mr John Bowles<br />
-Mr Thomas Bowles<br />
-Mr Duvereux Bowly<br />
-<span class="pagenum"><a name="Page_xxxvii" id="Page_xxxvii">[xxxvii]</a></span>Duddington Bradeel, <i>Esq;</i><br />
-Rev. Mr James Bradley, <i>Professor of</i> Astronomy, <i>in</i> Oxford<br />
-Mr Job Bradley, <i>Bookseller in</i> Chesterfield<br />
-<i>Rev.</i> Mr John Bradley<br />
-<i>Rev.</i> Mr Bradshaw, <i>Fellow of</i> Jesus College, Cambridge<br />
-Mr Joseph Bradshaw<br />
-Mr Thomas Blackshaw<br />
-Mr Robert Bragge<br />
-Champion Bramfield, <i>Esq;</i><br />
-Joseph Brand, <i>Esq;</i><br />
-Mr Thomas Brancker<br />
-Mr Thomas Brand<br />
-Mr Braxton<br />
-<i>Capt.</i> David Braymer<br />
-<i>Rev</i> Mr Charles Brent, <i>of</i> Bristol<br />
-Mr William Brent<br />
-Mr Edmund Bret<br />
-John Brickdale, <i>Esq;</i><br />
-<i>Rev.</i> Mr John Bridgen <i>A. M.</i><br />
-Abraham Bridges, <i>Esq;</i><br />
-George Briggs, <i>Esq;</i><br />
-John Bridges, <i>Esq;</i><br />
-Brook Bridges, <i>Esq;</i><br />
-Orlando Bridgman, <i>Esq;</i><br />
-Mr Charles Bridgman<br />
-Mr William Bridgman, <i>of</i> Trinity College, Cambridge<br />
-<i>Sir</i> Humphrey Briggs, <i>Bart.</i><br />
-Robert Bristol, <i>Esq;</i><br />
-Mr Joseph Broad<br />
-Peter Brooke, <i>of</i> Meer, <i>Esq;</i><br />
-Mr Jacob Brook<br />
-Mr Brooke, <i>of</i> Oriel Coll. Oxon<br />
-Mr Thomas Brookes<br />
-Mr James Brooks<br />
-William Brooks, <i>Esq;</i><br />
-<i>Rev.</i> Mr William Brooks<br />
-Stamp Brooksbank, <i>Esq;</i><br />
-Mr Murdock Broomer<br />
-William Brown, <i>Esq;</i><br />
-Mr Richard Brown, <i>of</i> Norwich<br />
-Mr William Brown, <i>of</i> Hull<br />
-Mrs Sarah Brown<br />
-Mr John Browne<br />
-Mr John Browning, <i>of</i> Bristol<br />
-Mr John Browning<br />
-Noel Broxholme, <i>M. D.</i><br />
-William Bryan, <i>Esq;</i><br />
-<i>Rev.</i> Mr Brydam<br />
-Christopher Buckle, <i>Esq;</i><br />
-Samuel Buckley, <i>Esq;</i><br />
-Mr Budgen<br />
-<i>Sir</i> John Bull<br />
-Josiah Bullock, <i>of</i> Faulkbourn-Hall, Essex, <i>Esq;</i><br />
-<i>Rev.</i> Mr Richard Bullock<br />
-<i>Rev.</i> Mr Richard Bundy<br />
-Mr Alexander Bunyan<br />
-<i>Rev.</i> Mr D. Burges<br />
-Ebenezer Burgess, <i>Esq;</i><br />
-Robert Burleston, <i>M. B.</i><br />
-Gilbert Burnet, <i>Esq;</i><br />
-Thomas Burnet, <i>Esq;</i><br />
-<i>Rev.</i> Mr Gilbert Burnet<br />
-<i>His Excellency</i> Will. Burnet, <i>Esq;</i> Governour <i>of</i> New-York<br />
-Mr Trafford Burnston, <i>of</i> Trin. College, Cambridge<br />
-Peter Burrel <i>Esq;</i><br />
-John Burridge, <i>Esq;</i><br />
-James Burrough, <i>Esq;</i> Beadle <i>and Fellow of</i> Caius Coll. Cambr.<br />
-Mr Benjamin Burroughs<br />
-Jeremiah Burroughs, <i>Esq;</i><br />
-<i>Rev.</i> Mr Joseph Burroughs<br />
-Christopher Burrow, <i>Esq;</i><br />
-James Burrow, <i>Esq;</i><br />
-William Burrow, <i>A. M.</i><br />
-Francis Burton, <i>Esq;</i><br />
-John Burton, <i>Esq;</i><br />
-Samuel Burton, <i>of</i> Dublin, <i>Esq;</i><br />
-William Burton, <i>Esq;</i><br />
-Mr Burton.<br />
-Richard Burton, <i>Esq;</i><br />
-<i>Dr</i> Simon Burton<br />
-<i>Rev.</i> Mr Thomas Burton, <i>M.A. Fellow of</i> Caius College, Cambridge<br />
-John Bury, jun. <i>Esq;</i><br />
-<i>Rev.</i> Mr Samuel Bury<br />
-Mr William Bush<br />
-<i>Rev.</i> Mr Samuel Butler<br />
-Mr Joseph Button, <i>of</i> Newcastle <i>upon</i> Tyne<br />
-<i>Hon.</i> Edward Byam, <i>Governour of</i> Antigua<br />
-Mr Edward Byam, <i>Merchant</i><br />
-Mr John Byrom<br />
-Mr Duncumb Bristow, <i>Merch.</i><br />
-Mr William Bradgate</p>
-
-<p class="pi4 p2">C</p>
-
-<p class="pn2"><i>His Grace the</i> Archbishop <i>of</i> Canterbury<br />
-<i>Right Hon. the Lord</i> Chancellor<br />
-<i>His Grace the</i> Duke <i>of</i> Chandois<br />
-<i>The Right Hon. the Earl of</i> Carlisle<br />
-<i>Right Hon.</i> Earl Cowper<br />
-<i>Rt. Rev. Lord Bishop of</i> Carlisle<br />
-<i>Rt. Rev. Lord Bishop of</i> Chichester<br />
-<i>Rt. Rev. Lord Bish. of</i> Clousert <i>in</i> Ireland<br />
-<i>Rt. Rev, Lord Bishop of</i> Cloyne<br />
-<i>Rt. Hon. Lord</i> Clinton<br />
-<i>Rt. Hon. Lord</i> Chetwynd<br />
-<i>Rt. Hon. Lord</i> James Cavendish<br />
-<i>The Hon. Lord</i> Cardross<br />
-<i>Rt. Hon. Lord</i> Castlemain<br />
-<i>Right Hon. Lord St.</i> Clare<br />
-Cornelius Callaghan, <i>Esq;</i><br />
-Mr Charles Callaghan<br />
-Felix Calvert, <i>of</i> Allbury, <i>Esq;</i><br />
-Peter Calvert, <i>of</i> Hunsdown <i>in</i> Hertfordshire, <i>Esq;</i><br />
-Mr William Calvert <i>of</i> Emanuel College, Cambridge<br />
-<i>Reverend</i> Mr John Cambden<br />
-John Campbell, <i>of</i> Stackpole-Court, <i>in the County of</i> Pembroke, <i>Esq;</i><br />
-Mrs Campbell, <i>of</i> Stackpole-Court<br />
-Mrs. Elizabeth Caper<br />
-Mr Dellillers Carbonel<br />
-Mr John Carleton<br />
-Mr Richard Carlton, <i>of</i> Chesterfield<br />
-Mr Nathaniel Carpenter<br />
-Henry Carr, <i>Esq;</i><br />
-John Carr, <i>Esq;</i><br />
-John Carruthers, <i>Esq;</i><br />
-<i>Rev. Dr.</i> George Carter, <i>Provost of</i> Oriel College<br />
-Mr Samuel Carter<br />
-<i>Honourable</i> Edward Carteret, <i>Esq;</i><br />
-Robert Cartes, jun. <i>in</i> Virginia, <i>Esq;</i><br />
-Mr William Cartlich<br />
-James Maccartney, <i>Esq;</i><br />
-Mr Cartwright, <i>of</i> Ainho<br />
-Mr William Cartwright, <i>of</i> Trinity College, Cambridge<br />
-<i>Reverend</i> Mr William Cary, <i>of</i> Bristol<br />
-Mr Lyndford Caryl<br />
-Mr John Case<br />
-Mr John Castle<br />
-<i>Reverend</i> Mr Cattle<br />
-<i>Hon.</i> William Cayley, <i>Consul at</i> Cadiz, <i>Esq;</i><br />
-William Chambers, <i>Esq;</i><br />
-Mr Nehemiah Champion<br />
-Mr Richard Champion<br />
-Matthew Chandler, <i>Esq;</i><br />
-Mr George Channel<br />
-Mr Channing<br />
-Mr Joseph Chappell, <i>Attorney at</i> Bristol<br />
-<span class="pagenum"><a name="Page_xxxviii" id="Page_xxxviii">[xxxviii]</a></span>Mr Rice Charlton, <i>Apothecary at</i> Bristol<br />
-St. John Charelton, <i>Esq;</i><br />
-Mr Richard Charelton<br />
-Mr Thomas Chase, <i>of</i> Lisbon, <i>Merchant</i><br />
-Robert Chauncey, <i>M. D.</i><br />
-Mr Peter Chauvel<br />
-Patricius Chaworth, <i>of</i> Ansley, <i>Esq;</i><br />
-Pole Chaworth <i>of the</i> Inner Temple, <i>Esq;</i><br />
-Mr William Cheselden, <i>Surgeon to her Majesty</i><br />
-James Chetham, <i>Esq;</i><br />
-Mr James Chetham<br />
-Charles Child, A. B. <i>of</i> Clare-Hall, <i>in</i> Cambridge, <i>Esq;</i><br />
-Mr Cholmely, <i>Gentleman Commoner of</i> New-College, Oxon<br />
-Thomas Church, <i>Esq;</i><br />
-<i>Reverend</i> Mr St. Clair<br />
-<i>Reverend</i> Mr Matthew Clarke<br />
-Mr William Clark<br />
-Bartholomew Clarke, <i>Esq;</i><br />
-Charles Clarke, <i>of</i> Lincolns-Inn, <i>Esq;</i><br />
-George Clarke, <i>Esq;</i><br />
-Samuel Clarke, <i>of the</i> Inner-Temple, <i>Esq;</i><br />
-<i>Reverend</i> Mr Alured Clarke, <i>Prebendary of</i> Winchester<br />
-<i>Rev.</i> John Clarke, <i>D. D. Dean of</i> Sarum<br />
-Mr John Clark, <i>A. B. of</i> Trinity College, Cambridge<br />
-Matthew Clarke, <i>M. D.</i><br />
-<i>Rev.</i> Mr Renb. Clarke, <i>Rector of</i> Norton, Leicestershire<br />
-<i>Rev.</i> Mr Robert Clarke, <i>of</i> Bristol<br />
-<i>Rev.</i> Samuel Clarke, <i>D. D.</i><br />
-Mr Thomas Clarke, <i>Merchant</i><br />
-Mr Thomas Clarke<br />
-<i>Rev.</i> Mr Clarkson, <i>of</i> Peter-House, Cambridge<br />
-Mr Richard Clay<br />
-William Clayton, <i>of</i> Marden, <i>Esq;</i><br />
-Samuel Clayton, <i>Esq;</i><br />
-Mr William Clayton<br />
-Mr John Clayton<br />
-Mr Thomas Clegg<br />
-Mr Richard Clements, <i>of</i> Oxford, <i>Bookseller</i><br />
-Theophilus Clements, <i>Esq;</i><br />
-Mr George Clifford, <i>jun. of</i> Amsterdam<br />
-George Clitherow, <i>Esq;</i><br />
-George Clive, <i>Esq;</i><br />
-<i>Dr.</i> Clopton, <i>of</i> Bury<br />
-Stephen Clutterbuck, <i>Esq;</i><br />
-Henry Coape, <i>Esq;</i><br />
-Mr Nathaniel Coatsworth<br />
-<i>Rev.</i> Dr. Cobden, <i>Chaplain to the Bishop of</i> London<br />
-<i>Hon. Col.</i> John Codrington, <i>of</i> Wraxall, Somersetshire<br />
-<i>Right Hon.</i> Marmaduke Coghill, <i>Esq;</i><br />
-Francis Coghlan, <i>Esq;</i><br />
-Sir Thomas Coke<br />
-Mr Charles Colborn<br />
-Benjamin Cole, <i>Gent.</i><br />
-Dr Edward Cole<br />
-Mr Christian Colebrandt<br />
-James Colebrooke, <i>Esq;</i><br />
-Mr William Coleman, <i>Merchant</i><br />
-Mr Edward Collet<br />
-Mrs Henrietta Collet<br />
-Mr John Collet<br />
-Mrs Mary Collett<br />
-Mr Samuel Collet<br />
-Mr Nathaniel Collier<br />
-Anthony Collins, <i>Esq;</i><br />
-Thomas Collins, <i>of</i> Greenwich, <i>M. D.</i><br />
-Mr Peter Collinson<br />
-Edward Colmore, <i>Fellow of</i> Magdalen College, Oxon<br />
-<i>Rev.</i> Mr John Colson<br />
-Mrs Margaret Colstock, <i>of</i> Chichester<br />
-<i>Capt.</i> John Colvil<br />
-Renè de la Combe, <i>Esq;</i><br />
-<i>Rev.</i> Mr John Condor<br />
-John Conduit, <i>Esq;</i><br />
-John Coningham, <i>M. D.</i><br />
-<i>His Excellency</i> William Conolly, <i>one of the Lords Justices of</i> Ireland<br />
-Mr Edward Constable, <i>of</i> Reading<br />
-<i>Rev.</i> Mr Conybeare, <i>M. A.</i><br />
-<i>Rev.</i> Mr James Cook<br />
-Mr John Cooke<br />
-Mr Benjamin Cook<br />
-William Cook, <i>B L. of St.</i> John’s College, Oxon<br />
-James Cooke, <i>Esq;</i><br />
-John Cooke, <i>Esq;</i><br />
-Mr Thomas Cooke<br />
-Mr William Cooke, <i>Fellow of St.</i> John’s College, Oxon<br />
-<i>Rev.</i> Mr Cooper, <i>of</i> North-Hall<br />
-Charles Cope, <i>Esq;</i><br />
-<i>Rev.</i> Mr Barclay Cope<br />
-Mr John Copeland<br />
-John Copland, <i>M. B.</i><br />
-Godfrey Copley, <i>Esq;</i><br />
-Sir Richard Corbet, <i>Bar.</i><br />
-<i>Rev.</i> Mr Francis Corbett<br />
-Mr Paul Corbett<br />
-Mr Thomas Corbet<br />
-Henry Cornelisen, <i>Esq;</i><br />
-<i>Rev.</i> Mr John Cornish<br />
-Mrs Elizabeth Cornwall<br />
-Library <i>of</i> Corpus Christi College, Cambridge<br />
-Mr William Cossley, <i>of</i> Bristol, <i>Bookseller</i><br />
-Mr Solomon du Costa<br />
-<i>Dr.</i> Henry Costard<br />
-<i>Dr.</i> Cotes, <i>of</i> Pomfret<br />
-Caleb Cotesworth, <i>M. D.</i><br />
-Peter Cottingham, <i>Esq;</i><br />
-Mr John Cottington<br />
-<i>Sir</i> John Hinde Cotton<br />
-Mr James Coulter<br />
-George Courthop, <i>of</i> Whiligh <i>in</i> Sussex, <i>Esq;</i><br />
-Mr Peter Courthope<br />
-Mr John Coussmaker, <i>jun.</i><br />
-Mr Henry Coward, <i>Merchant</i><br />
-Anthony Ashley Cowper, <i>Esq;</i><br />
-<i>The Hon.</i> Spencer Cowper, <i>Esq; One of the Justices of the Court of</i> Common Pleas<br />
-Mr Edward Cowper<br />
-<i>Rev.</i> Mr John Cowper<br />
-<i>Sir</i> Charles Cox<br />
-Samuel Cox, <i>Esq;</i><br />
-Mr Cox, <i>of</i> New Coll. Oxon<br />
-Mr Thomas Cox<br />
-Mr Thomas Cradock, <i>M. A.</i><br />
-<i>Rev.</i> Mr John Craig<br />
-<i>Rev.</i> Mr John Cranston, <i>Archdeacon of</i> Cloghor<br />
-John Crafter, <i>Esq;</i><br />
-Mr John Creech<br />
-James Creed, <i>Esq;</i><br />
-<i>Rev.</i> Mr William Crery<br />
-John Crew, <i>of</i> Crew Hall, <i>in</i> Cheshire, <i>Esq;</i><br />
-Thomas Crisp, <i>Esq;</i><br />
-Mr Richard Crispe<br />
-<i>Rev.</i> Mr Samuel Cuswick<br />
-Tobias Croft, <i>of</i> Trinity College, Cambridge<br />
-Mr John Crook<br />
-<i>Rev.</i> Dr Crosse, <i>Master of</i> Katherine Hall<br />
-Christopher Crowe, <i>Esq;</i><br />
-George Crowl, <i>Esq;</i><br />
-<i>Hon.</i> Nathaniel Crump, <i>Esq; of</i> Antigua<br />
-Mrs Mary Cudworth<br />
-<span class="pagenum"><a name="Page_xxxix" id="Page_xxxix">[xxxix]</a></span>Alexander Cunningham, <i>Esq;</i><br />
-Henry Cunningham, <i>Esq;</i><br />
-Mr Cunningham<br />
-Dr Curtis <i>of</i> Sevenoak<br />
-Mr William Curtis<br />
-Henry Curwen, <i>Esq;</i><br />
-Mr John Caswall, <i>of</i> London, <i>Merchant</i><br />
-<i>Dr</i> Jacob de Castro Sarmento</p>
-
-<p class="pi4 p2">D</p>
-
-<p class="pn2"><i>His Grace the Duke of</i> Devonshire<br />
-<i>His Grace the Duke of</i> Dorset<br />
-<i>Right Rev. Ld. Bishop of</i> Durham<br />
-<i>Right Rev. Ld. Bishop of St.</i> David<br />
-<i>Right Hon. Lord</i> Delaware<br />
-<i>Right Hon. Lord</i> Digby<br />
-<i>Right Rev. Lord Bishop of</i> Derry<br />
-<i>Right Rev. Lord Bishop of</i> Donne<br />
-<i>Rt. Rev. Lord Bishop of</i> Dromore<br />
-<i>Right Hon.</i> Dalhn, <i>Lord Chief Baron of</i> Ireland<br />
-Mr Thomas Dade<br />
-<i>Capt.</i> John Dagge<br />
-Mr Timothy Dallowe<br />
-Mr James Danzey, <i>Surgeon</i><br />
-<i>Rev. Dr</i> Richard Daniel, <i>Dean of</i> Armagh<br />
-Mr Danvers<br />
-<i>Sir</i> Coniers Darcy, <i>Knight of the</i> Bath<br />
-Mr Serjeant Darnel<br />
-Mr Joseph Dash<br />
-Peter Davall, <i>Esq;</i><br />
-Henry Davenant, <i>Esq;</i><br />
-Davies Davenport, <i>of the</i> Inner-Temple, <i>Esq;</i><br />
-<i>Sir</i> Jermyn Davers, <i>Bart.</i><br />
-<i>Capt.</i> Thomas Davers<br />
-Alexander Davie, <i>Esq;</i><br />
-<i>Rev. Dr.</i> Davies, <i>Master of</i> Queen’s College, Cambridge<br />
-Mr John Davies, <i>of</i> Christ-Church, Oxon<br />
-Mr Davies, <i>Attorney at Law</i><br />
-Mr William Dawkins, <i>Merch.</i><br />
-Rowland Dawkin, <i>of</i> Glamorganshire, <i>Esq;</i><br />
-Mr John Dawson<br />
-Edward Dawson, <i>Esq;</i><br />
-Mr Richard Dawson<br />
-William Dawsonne, <i>Esq;</i><br />
-Thomas Day, <i>Esq;</i><br />
-Mr John Day<br />
-Mr Nathaniel Day<br />
-Mr Deacon<br />
-Mr William Deane<br />
-Mr James Dearden, <i>of</i> Trinity College, Cambridge<br />
-Sir Matthew Deckers, <i>Bart.</i><br />
-Edward Deering, <i>Esq;</i><br />
-Simon Degge, <i>Esq;</i><br />
-Mr Staunton Degge, <i>A. B. of</i> Trinity Col. Cambridge<br />
-<i>Rev. Dr</i> Patrick Delaney<br />
-Mr Delhammon<br />
-<i>Rev.</i> Mr Denne<br />
-Mr William Denne<br />
-<i>Capt.</i> Jonathan Dennis<br />
-Daniel Dering, <i>Esq;</i><br />
-Jacob Desboverie, <i>Esq;</i><br />
-Mr James Deverell, <i>Surgeon in</i> Bristol<br />
-<i>Rev.</i> Mr John Diaper<br />
-Mr Rivers Dickenson<br />
-<i>Dr.</i> George Dickens, <i>of</i> Liverpool<br />
-<i>Hon.</i> Edward Digby, <i>Esq;</i><br />
-Mr Dillingham<br />
-Mr Thomas Dinely<br />
-Mr Samuel Disney, <i>of</i> Bennet College, Cambridge<br />
-Robert Dixon, <i>Esq;</i><br />
-Pierce Dodd, <i>M. D.</i><br />
-<i>Right Hon.</i> Geo. Doddinton, <i>Esq;</i><br />
-<i>Rev. Sir</i> John Dolben, <i>of</i> Findon, <i>Bart.</i><br />
-Nehemiah Donellan, <i>Esq;</i><br />
-Paul Doranda, <i>Esq;</i><br />
-James Douglas, <i>M. D.</i><br />
-Mr Richard Dovey, <i>A. B. of</i> Wadham College, Oxon<br />
-John Dowdal, <i>Esq;</i><br />
-William Mac Dowell, <i>Esq;</i><br />
-Mr Peter Downer<br />
-Mr James Downes<br />
-<i>Sir</i> Francis Henry Drake, <i>Knt.</i><br />
-William Drake, <i>of</i> Barnoldswick-Cotes, <i>Esq;</i><br />
-Mr Rich. Drewett, <i>of</i> Fareham<br />
-Mr Christopher Drisfield, <i>of</i> Christ-Church, Oxon<br />
-Edmund Dris, <i>A. M. Fellow of</i> Trinity Coll. Cambridge<br />
-George Drummond, <i>Esq; Lord Provost of</i> Edenburgh<br />
-Mr Colin Drummond, <i>Professor of Philosophy in the University of</i> Edinburgh<br />
-Henry Dry, <i>Esq;</i><br />
-Richard Ducane <i>Esq;</i><br />
-<i>Rev. Dr</i> Paschal Ducasse, <i>Dean of</i> Ferns<br />
-George Ducket, <i>Esq;</i><br />
-Mr Daniel Dufresnay<br />
-Mr Thomas Dugdale<br />
-Mr Humphry Duncalfe, <i>Merchant</i><br />
-Mr James Duncan<br />
-John Duncombe, <i>Esq;</i><br />
-Mr William Duncombe<br />
-John Dundass, <i>jun. of</i> Duddinstown, <i>Esq;</i><br />
-William Dunstar, <i>Esq;</i><br />
-James Dupont, <i>of</i> Trinity Coll. Cambridge</p>
-
-<p class="pi4 p2">E</p>
-
-<p class="pn2"><i>Right Rev. and Right Hon. Lord</i> Erskine<br />
-Theophilus, <i>Lord Bishop of</i> Elphin<br />
-Mr Thomas Eames<br />
-<i>Rev.</i> Mr. Jabez Earle<br />
-Mr William East<br />
-<i>Sir</i> Peter Eaton<br />
-Mr John Eccleston<br />
-James Eckerfall, <i>Esq;</i><br />
-&mdash;&mdash; Edgecumbe, <i>Esq;</i><br />
-<i>Rev.</i> Mr Edgley<br />
-<i>Rev. Dr</i> Edmundson, <i>President of</i> St. John’s Coll. Cambridge<br />
-Arthur Edwards, <i>Esq;</i><br />
-Thomas Edwards, <i>Esq;</i><br />
-Vigerus Edwards, <i>Esq;</i><br />
-<i>Capt.</i> Arthur Edwards<br />
-Mr Edwards<br />
-Mr William Elderton<br />
-Mrs Elizabeth Elgar<br />
-<i>Sir</i> Gilbert Eliot, <i>of</i> Minto, <i>Bart. one of the Lords of</i> Session<br />
-Mr John Elliot, <i>Merchant</i><br />
-George Ellis, <i>of</i> Barbadoes, <i>Esq;</i><br />
-Mr John Ellison, <i>of</i> Sheffield<br />
-<i>Sir</i> Richard Ellys, <i>Bart.</i><br />
-Library <i>of</i> Emanuel College, Cambridge<br />
-Francis Emerson, <i>Gent.</i><br />
-Thomas Emmerson, <i>Esq;</i><br />
-Mr Henry Emmet<br />
-Mr John Emmet<br />
-Thomas Empson, <i>of the</i> Middle-Temple, <i>Esq;</i><br />
-Mr Thomas Engeir<br />
-Mr Robert England<br />
-Mr Nathaniel English<br />
-<i>Rev.</i> Mr Ensly, <i>Minister of the</i> Scotch Church <i>in</i> Rotterdam<br />
-<span class="pagenum"><a name="Page_xl" id="Page_xl">[xl]</a></span>John Essington, <i>Esq;<br />
-Rev.</i> Mr Charles Este, <i>of</i> Christ-Church, Oxon<br />
-Mr Hugh Ethersey, <i>Apothecary</i><br />
-Henry Evans, <i>of</i> Surry, <i>Esq;</i><br />
-Isaac Ewer, <i>Esq;</i><br />
-Mr Charles Ewer<br />
-<i>Rev.</i> Mr Richard Exton<br />
-<i>Sir</i> John Eyles, <i>Bar.</i><br />
-<i>Sir</i> Joseph Eyles<br />
-<i>Right Hon. Sir</i> Robert Eyre, <i>Lord Chief Justice of the Common Pleas.</i><br />
-Edward Eyre, <i>Esq;</i><br />
-Henry Samuel Eyre, <i>Esq;</i><br />
-Kingsmill Eyre, <i>Esq;</i><br />
-Mr Eyre</p>
-
-<p class="pi4 p2">F</p>
-
-<p class="pn2"><i>Right Rev.</i> Josiah, <i>Lord Bishop of</i> Fernes <i>and</i> Loghlin<br />
-Den Heer Fagel<br />
-Mr Thomas Fairchild<br />
-Thomas Fairfax, <i>of the</i> Middle Temple, <i>Esq;</i><br />
-Mr John Falconer, <i>Merchant</i><br />
-Daniel Falkiner, <i>Esq;</i><br />
-Charles Farewell, <i>Esq;</i><br />
-Mr Thomas Farnaby, <i>of</i> Merton College, Oxon<br />
-Mr William Farrel<br />
-James Farrel, <i>Esq;</i><br />
-Thomas Farrer, <i>Esq;</i><br />
-Dennis Farrer, <i>Esq;</i><br />
-John Farrington, <i>Esq;</i><br />
-Mr Faukener<br />
-Mr Edward Faulkner<br />
-Francis Fauquiere, <i>Esq;</i><br />
-Charles De la Fay, <i>Esq;</i><br />
-Thomas De lay Fay, <i>Esq;</i><br />
-<i>Capt.</i> Lewis De la Fay<br />
-Nicholas Fazakerly, <i>Esq;</i><br />
-<i>Governour</i> Feake<br />
-Mr John Fell, <i>of</i> Attercliffe<br />
-Martyn Fellowes, <i>Esq;</i><br />
-Coston Fellows, <i>Esq;</i><br />
-Mr Thomas Fellows<br />
-Mr Francis Fennell<br />
-Mr Michael Fenwick<br />
-John Ferdinand, <i>of the</i> Inner-Temple, <i>Esq;</i><br />
-Mr James Ferne, <i>Surgeon</i><br />
-Mr John Ferrand, <i>of</i> Trinity College, Cambridge<br />
-Mr Daniel Mussaphia Fidalgo<br />
-Mr Fidler<br />
-<i>Hon.</i> Mrs Celia Fiennes<br />
-<i>Hon. and Rev.</i> Mr. Finch, <i>Dean of</i> York<br />
-<i>Hon.</i> Edward Finch, <i>Esq;</i><br />
-Mr John Finch<br />
-Philip Fincher <i>Esq;</i><br />
-Mr Michael Fitch, <i>of</i> Trinity College, Cambridge<br />
-Hon. John Fitz-Morris, <i>Esq;</i><br />
-Mr Fletcher<br />
-Martin Folkes, <i>Esq;</i><br />
-<i>Dr</i> Foot<br />
-Mr Francis Forester<br />
-John Forester, <i>Esq;</i><br />
-Mrs Alice Forth<br />
-Mr John Forthe<br />
-Mr Joseph Foskett<br />
-Mr Edward Foster<br />
-Mr Peter Foster<br />
-Peter Foulkes, <i>D. D. Canon of</i> Christ-Church, Oxon<br />
-<i>Rev. Dr.</i> Robert Foulkes<br />
-<i>Rev. Mr</i> Robert Foulks, <i>M. A.  Fellow of</i> Magdalen College, Cambridge<br />
-Mr Abel Founereau, <i>Merchant</i><br />
-Mr Christopher Fowler<br />
-Mr John Fowler, <i>of</i> Northamp.<br />
-Mr Joseph Fowler<br />
-<i>Hon. Sir</i> William Fownes, <i>Bar.</i><br />
-George Fox, <i>Esq;</i><br />
-Edward Foy, <i>Esq;</i><br />
-<i>Rev. Dr.</i> Frankland, <i>Dean of</i> Gloucester<br />
-Frederick Frankland, <i>Esq;</i><br />
-Mr Joseph Franklin<br />
-Mr Abraham Franks<br />
-Thomas Frederick, <i>Esq; Gentleman Commoner of</i> New College, Oxon<br />
-Thomas Freeke, <i>Esq;</i><br />
-Mr Joseph Freame<br />
-Richard Freeman, <i>Esq;</i><br />
-Mr Francis Freeman, <i>of</i> Bristol<br />
-Ralph Freke, <i>Esq;</i><br />
-Patrick French, <i>Esq;</i><br />
-Edward French, <i>M. D.</i><br />
-<i>Dr.</i> Frewin<br />
-John Freind, <i>M. D.</i><br />
-Mr Thomas Frost<br />
-Thomas Fry, <i>of</i> Hanham, Gloucestershire, <i>Esq;</i><br />
-Mr Rowland Fry, <i>Merchant</i><br />
-Francis Fuljam, <i>Esq;</i><br />
-<i>Rev.</i> Mr Fuller, <i>Fellow of</i> Emanuel College, Cambridge<br />
-Mr John Fuller<br />
-Thomas Fuller, <i>M. D.</i><br />
-Mr William Fullwood, <i>of</i> Huntingdon<br />
-<i>Rev.</i> James Fynney, <i>D. D. Prebendary of</i> Durham<br />
-<i>Capt.</i> Fyshe<br />
-Mr Francis Fayram, <i>Bookseller in</i> London</p>
-
-<p class="pi4 p2">G</p>
-
-<p class="pn2"><i>His Grace the Duke of</i> Grafton<br />
-<i>Right Hon. Earl of</i> Godolphin<br />
-<i>Right Hon. Lady</i> Betty Germain<br />
-<i>Right Hon. Lord</i> Garlet<br />
-<i>Right Rev. Bishop of</i> Gloucester<br />
-<i>Right Hon. Lord St.</i> George<br />
-<i>Rt. Hon. Lord Chief Baron</i> Gilbert<br />
-Mr Jonathan Gale, <i>of</i> Jamaica<br />
-Roger Gale, <i>Esq;</i><br />
-<i>His Excellency Monsieur</i> Galvao, <i>Envoy of</i> Portugal<br />
-James Gambier, <i>Esq;</i><br />
-Mr Joseph Gambol, <i>of</i> Barbadoes<br />
-Mr Joseph Gamonson<br />
-Mr Henry Garbrand<br />
-<i>Rev.</i> Mr Gardiner<br />
-Mr Nathaniel Garland<br />
-Mr Nathaniel Garland, <i>jun.</i><br />
-Mr Joas Garland<br />
-Mr James Garland<br />
-Mrs Anne Garland<br />
-Mr Edward Garlick<br />
-Mr Alexander Garrett<br />
-Mr John Gascoygne, <i>Merchant</i><br />
-<i>Rev. Dr</i> Gasketh<br />
-Mr Henry Gatham<br />
-Mr John Gay<br />
-Thomas Gearing, <i>Esq;</i><br />
-<i>Coll.</i> Gee<br />
-Mr Edward Gee, <i>of</i> Queen’s College, Cambridge<br />
-Mr Joshua Gee, <i>sen.</i><br />
-Mr Joshua Gee, <i>jun.</i><br />
-Richard Fitz-Gerald, <i>of</i> Gray’s-Inn, <i>Esq</i><br />
-Mr Thomas Gerrard<br />
-Edward Gibbon, <i>Esq;</i><br />
-John Gibbon, <i>Esq;</i><br />
-Mr Harry Gibbs<br />
-<i>Rev.</i> Mr Philip Gibbs<br />
-Thomas Gibson, <i>Esq;</i><br />
-Mr John Gibson<br />
-Mr Samuel Gideon<br />
-<i>Rev. Dr</i> Clandish Gilbert, <i>of</i> Trinity College, Dublin<br />
-Mr John Gilbert<br />
-John Girardos, <i>Esq;</i><br />
-Mr John Girl, <i>Surgeon</i><br />
-<span class="pagenum"><a name="Page_xli" id="Page_xli">[xli]</a></span><i>Rev.</i> Dr. Gilbert, <i>Dean of</i> Exeter, 4 Books<br />
-Mr Gisby, <i>Apothecary</i><br />
-Mr Richard Glanville<br />
-John Glover, <i>Esq;</i><br />
-Mr John Glover, <i>Merchant</i><br />
-Mr Thomas Glover, <i>Merchant</i><br />
-John Goddard, <i>Merchant, in</i> Rotterdam<br />
-Peter Godfrey, <i>Esq;</i><br />
-Mr Joseph Godfrey<br />
-<i>Capt.</i> John Godlee<br />
-Joseph Godman, <i>Esq;</i><br />
-<i>Capt.</i> Harry Goff<br />
-Mr Thomas Goldney<br />
-Jonathan Goldsmyth, <i>M.&nbsp;D.</i><br />
-<i>Rev.</i> Mr William Goldwin<br />
-&mdash;&mdash; Gooday, <i>Esq;</i><br />
-John Goodrick, <i>Esq; Fellow Commoner of</i> Trinity Coll. Cambridge<br />
-<i>Sir</i> Henry Goodrick, <i>Bart.</i><br />
-Mr Thomas Goodwin<br />
-<i>Sir</i> William Gordon, <i>Bar.</i><br />
-<i>Right Hon. Sir</i> Ralph Gore, <i>Bart.</i><br />
-Arthur Gore, <i>Esq;</i><br />
-Mr Francis Gore<br />
-Mr John Charles Goris<br />
-Rev. Mr William Gosling, <i>M.&nbsp;A.</i><br />
-William Goslin, <i>Esq;</i><br />
-Mr William Gossip, <i>A.&nbsp;B. of</i> Trin. Coll. Cambridge<br />
-John Gould, <i>jun. Esq;</i><br />
-Nathaniel Gould, <i>Esq;</i><br />
-Mr Thomas Gould<br />
-<i>Rev.</i> Mr Gowan, <i>of</i> Leyden<br />
-Richard Graham, <i>jun. Esq;</i><br />
-Mr George Graham<br />
-Mr Thomas Grainger<br />
-Mr Walter Grainger<br />
-Mr John Grant<br />
-<i>Monsieur</i> S’ Gravesande, <i>Professor of</i> Astronomy <i>and</i> Experim.  Philosophy <i>in</i> Leyden<br />
-<i>Dr</i> Gray<br />
-Mr Charles Gray <i>of</i> Colchester<br />
-Mr John Greaves<br />
-Mr Francis Green<br />
-<i>Dr</i> Green, <i>Professor of</i> Physick <i>in</i> Cambridge<br />
-Samuel Green, <i>Gent.</i><br />
-Mr George Green, <i>B.&nbsp;D.</i><br />
-Mr Peter Green<br />
-Mr Matthew Green<br />
-Mr Nathaniel Green, <i>Apothecary</i><br />
-Mr Stephen Greenhill, <i>of</i> Jesus College, Cambridge<br />
-Mr Arthur Greenhill<br />
-Mr Joseph Greenup<br />
-Mr Randolph Greenway, <i>of</i> Thavies Inn<br />
-Mr Thomas Gregg, <i>of the</i> Middle Temple<br />
-Mr Gregory, <i>Profess. of</i> Modern Hist. <i>in</i> Oxon<br />
-Mrs Katherine Gregory<br />
-Samuel Gray, <i>Esq;</i><br />
-Mr Richard Gray, <i>Merchant in</i> Rotterdam<br />
-Thomas Griffiths, <i>M.&nbsp;D.</i><br />
-Mr Stephen Griggman<br />
-Mr Renè Grillet<br />
-Mr Richard Grimes<br />
-Johannes Groeneveld, J.&nbsp;U. &amp; <i>M.&nbsp;D. and</i> Poliater Leidensis<br />
-<i>Rev.</i> Mr Grosvenor<br />
-Mr Richard Grosvenor<br />
-Mr Joseph Grove, <i>Merchant</i><br />
-Mr John Henry Grutzman, <i>Merchant</i><br />
-Mathurin Guiznard, <i>Esq;</i><br />
-<i>Sir</i> John Guise<br />
-<i>Rev.</i> Mr John Guise<br />
-Mr Ralph Gulston<br />
-Matthew Gundry, <i>Esq;</i><br />
-Nathaniel Gundry, <i>Esq;</i><br />
-Mrs Sarah Gunston<br />
-Charles Gunter Niccol, <i>Esq;</i><br />
-Thomas Gwillin, <i>Esq;</i><br />
-Marmaduke Gwynne, <i>Esq;</i><br />
-Roderick Gwynne, <i>Esq;</i><br />
-David Gausell, <i>Esq; of</i> Leyton Grange<br />
-Samuel Grey, <i>Esq;</i><br />
-Mr J. Grisson</p>
-
-<p class="pi4 p2">H.</p>
-
-<p class="pn2"><i>Right Hon.</i> Earl <i>of</i> Hertford<br />
-<i>Rt. Hon. Ld.</i> Herbert, <i>of</i> Cherbury<br />
-<i>Right Hon. Lord</i> Herbert<br />
-<i>Right Hon. Lord</i> Hervey<br />
-<i>Right Hon. Lord</i> Hunsdon<br />
-John Haddon, <i>M.&nbsp;B. of</i> Christ-Church, Oxon<br />
-Mr Haines<br />
-Mrs Mary Haines<br />
-Edward Haistwell, <i>Esq;</i><br />
-Othniel Haggett, <i>of</i> Barbadoes, <i>Esq;</i><br />
-Robert Hale, <i>Esq;</i><br />
-Mr Philip Hale<br />
-Mr Charles Hallied<br />
-Abraham Hall, <i>M.&nbsp;B.</i><br />
-<i>Dr.</i> Hall<br />
-Mr Henry Hall<br />
-Mr Jonathan Hall<br />
-Mr Matthew Hall<br />
-Francis Hall, <i>Esq; of</i> St. James’s Place<br />
-<i>Rev.</i> Mr Hales<br />
-William Hallet, <i>of</i> Exeter, <i>M.&nbsp;D.</i><br />
-Edmund Halley, <i>L.&nbsp;L.&nbsp;D.</i> Astro. Reg. &amp; Profess. <i>of</i> Modern Hist. <i>in</i> Ox. Savilian.<br />
-Edmund Hallsey, <i>Esq;</i><br />
-Mr John Hamerse<br />
-John Hamilton, <i>Esq;</i><br />
-Andrew Hamilton, <i>Esq;</i><br />
-Rev. Andrew Hamilton, <i>D.&nbsp;D. Arch-Deacon of</i> Raphoe<br />
-Mr William Hamilton, <i>Professor of Divinity in the University of</i> Edinburgh<br />
-Mr John Hamilton<br />
-Mr Thomas Hammond, <i>Bookseller in</i> York<br />
-Mrs Martha Hammond<br />
-Mr John Hand<br />
-<i>Rev.</i> Mr Hand, <i>Fellow of</i> Emanuel College, Cambridge<br />
-Mr Samuel Handly<br />
-Gabriel Hanger, <i>Esq;</i><br />
-James Hannott, <i>of</i> Spittle-Fields, <i>Esq;</i><br />
-Mr Han Hankey<br />
-Harbord Harbord, <i>of</i> Gunton <i>in</i> Norfolk, <i>Esq;</i><br />
-Richard Harcourt, <i>Esq;</i><br />
-Mr Thomas Hardey<br />
-John Harding, <i>Esq;</i><br />
-Sir William Hardress, <i>Bar.</i><br />
-Peter Hardwick, <i>M.&nbsp;D. of</i> Bristol<br />
-Mr Thomas Hardwick, <i>Attorney</i><br />
-<i>Rev.</i> Mr Jonathan Hardey<br />
-Henry Hare, <i>Esq;</i><br />
-Mr Hare, <i>of</i> Beckingham <i>in</i> Kent<br />
-Mr Mark Harford<br />
-Mr Trueman Harford<br />
-<i>Hon.</i> Edward Harley, <i>Esq;</i><br />
-<i>Capt.</i> Harlowe<br />
-Mr Henry Harmage<br />
-Mr Jeremiah Harman<br />
-Henry Harrington, <i>Esq;</i><br />
-Barrows Harris, <i>Esq;</i><br />
-James Harris, <i>Esq;</i><br />
-William Harris, <i>of</i> Sarum, <i>Esq;</i><br />
-<i>Rev.</i> Mr Dean Harris<br />
-Mr Thomas Harris<br />
-<i>Rev.</i> Mr Harris, <i>Professor of Modern History in</i> Cambridge<br />
-Mr Richard Harris<br />
-Mrs Barbara Harrison<br />
-Mr William Harrison<br />
-<i>Rev.</i> Mr Henry Hart<br />
-<span class="pagenum"><a name="Page_xlii" id="Page_xlii">[xlii]</a></span>Mr Moses Hart<br />
-<i>Sir</i> John Hartop, <i>Bart.</i><br />
-Mr Peter Harvey<br />
-Henry Harwood, <i>Esq;</i><br />
-John Harwood, <i>L.&nbsp;D.</i><br />
-Robert Prose Hassel, <i>Esq;</i><br />
-George Hatley, <i>Esq;</i><br />
-Mr William Havens<br />
-<i>Capt.</i> John Hawkins<br />
-Mr Mark Hawkins, <i>Surgeon</i><br />
-Mr Walter Hawksworth, <i>Merch.</i><br />
-Mr Francis Hawling<br />
-Mr John Huxley, <i>of</i> Sheffield<br />
-Mr Richard Hayden, <i>Merchant</i><br />
-Cherry Hayes, <i>M.&nbsp;A.</i><br />
-Mr Thompson Hayne<br />
-Mr Samuel Haynes<br />
-Mr Thomas Haynes<br />
-Mr John Hayward, <i>Surgeon</i><br />
-Mr Joseph Hayward, <i>of</i> Madera, <i>Merchant</i><br />
-<i>Rev. Sir</i> Francis Head, <i>Bart.</i><br />
-James Head, <i>Esq;</i><br />
-Thomas Heames, <i>Esq;</i><br />
-Edmund Heath, <i>Esq;</i><br />
-Thomas Heath, <i>Esq;</i><br />
-Mr Benjamin Heath<br />
-Cornelius Heathcote, <i>of</i> Cutthoy, <i>M.&nbsp;D.</i><br />
-Mr James Hamilton, <i>Merchant</i><br />
-Mr Thomas Hasleden<br />
-<i>Sir</i> Gilbert Heathcote<br />
-John Heathcote, <i>Esq;</i><br />
-William Heathcote, <i>Esq;</i><br />
-Mr Abraham Heaton<br />
-Anthony Heck, <i>Esq;</i><br />
-John Hedges, <i>Esq;</i><br />
-Mr Paul Heeger, jun. <i>Merch.</i><br />
-Dr Richard Heisham<br />
-Mr Jacob Henriques<br />
-Mr John Herbert, <i>Apothecary in</i> Coventry<br />
-George Hepburn, <i>M.&nbsp;D. of</i> Lynn-Regis<br />
-Mr Samuel Herring<br />
-Mr John Hetherington<br />
-Mr Richard Hett, <i>Bookseller</i><br />
-Fitz Heugh, <i>Esq;</i><br />
-Hewer Edgley Hewer, <i>Esq;</i><br />
-Robert Heysham, <i>Esq;</i><br />
-Mr Richard Heywood<br />
-Mr John Heywood<br />
-Mr Samuel Hibberdine<br />
-Nathaniel Hickman, <i>M.&nbsp;A.</i><br />
-Mr Samuel Hickman<br />
-<i>Rev.</i> Mr Hiffe, <i>Schoolmaster at</i> Kensington<br />
-Mr Banger Higgens<br />
-Mr Samuel Highland<br />
-Mr Joseph Highmore<br />
-Rev. Mr John Hildrop. <i>M.&nbsp;A. Master of the Free-School in</i> Marlborough<br />
-Mr Francis Hildyard, <i>Bookseller in</i> York<br />
-Mr Hilgrove<br />
-Mr James Hilhouse<br />
-John Hill, <i>Esq;</i><br />
-Mr John Hill<br />
-Mr Rowland Hill, <i>of St.</i> John’s College, Cambridge<br />
-Samuel Hill, <i>Esq;</i><br />
-Mr Humphrey Hill<br />
-<i>Rev.</i> Mr Richard Hill<br />
-Mr Peter St. Hill, <i>Surgeon</i><br />
-Mr William Hinchliff, <i>Bookseller</i><br />
-Mr Peter Hind<br />
-Benjamin Hinde, <i>of the</i> Inner-Temple, <i>Esq;</i><br />
-Robert Hinde, <i>Esq;</i><br />
-Mr Peter Hinde, <i>jun.</i><br />
-<i>Rev.</i> Mr Dean Hinton<br />
-Mr Robert Hirt<br />
-<i>Capt.</i> Joseph Hiscox, <i>Merchant</i><br />
-Mr William Hoare<br />
-Mr William Hobman<br />
-<i>Sir</i> Nathaniel Hodges<br />
-Mr Hodges, <i>M.&nbsp;A. of</i> Jesus College, Oxon<br />
-Mr Joseph Jory Hodges<br />
-Mr Hodgson, <i>Master of the</i> Mathematicks <i>in</i> Christ’s Hospital<br />
-Mr Hodson<br />
-Edward Hody, <i>M.&nbsp;D.</i><br />
-Mr Thomas Hook<br />
-Samuel Holden, <i>Esq;</i><br />
-Mr Adam Holden, <i>of</i> Greenwich<br />
-Rogers Holland, <i>Esq;</i><br />
-Mr James Holland, <i>Merchant</i><br />
-Richard Holland <i>M.&nbsp;D.</i><br />
-John Hollings, <i>M.&nbsp;D.</i><br />
-Mr Thomas Hollis<br />
-Mr John Hollister<br />
-Mr Edward Holloway<br />
-Mr Thomas Holmes<br />
-<i>Rev.</i> Mr Holmes, <i>Fellow of</i> Emanuel College, Cambridge<br />
-<i>Rev.</i> Mr Samuel Holt<br />
-Matthew Holworthy, <i>Esq;</i><br />
-Mr John Hook<br />
-Mr Le Hook<br />
-Mrs Elizabeth Hooke<br />
-John Hooker, <i>Esq;</i><br />
-Mr John Hoole<br />
-Mr Samuel Hoole<br />
-Mr Thomas Hope<br />
-Thomas Hopgood, <i>Gent.</i><br />
-<i>Sir</i> Richard Hopkins<br />
-Richard Hopwood, <i>M.&nbsp;D.</i><br />
-Mr Henry Horne<br />
-<i>Rev.</i> Mr John Horseley<br />
-Samuel Horseman, <i>M.&nbsp;D.</i><br />
-Mr Stephen Horseman<br />
-Mr Thomas Houghton<br />
-Mr Thomas Houlding<br />
-James How, <i>Esq;</i><br />
-John How, <i>of</i> Hans Cope, <i>Esq;</i><br />
-Mr John Howe<br />
-Mr Richard How<br />
-<i>Hon.</i> Edward Howard, <i>Esq;</i><br />
-William Howard, <i>Esq;</i><br />
-<i>Rev.</i> Dean Robert Howard<br />
-Thomas Hucks, <i>Esq;</i><br />
-Mr Hudsford, <i>of</i> Trinity Coll.  Oxon<br />
-<i>Capt.</i> Robert Hudson, <i>jun.</i><br />
-Mr John Hughes<br />
-Edward Hulse, <i>M.&nbsp;D.</i><br />
-<i>Sir</i> Gustavus Humes<br />
-<i>Rev.</i> Mr David Humphreys, <i>S.&nbsp;T.&nbsp;B. Fellow of</i> Trin. Coll. Cambridge<br />
-Maurice Hunt, <i>Esq;</i><br />
-Mr Hunt, <i>of</i> Hart-Hall, Oxon<br />
-Mr John Hunt<br />
-James Hunter, <i>Esq;</i><br />
-Mr William Hunter<br />
-Mr John Hussey, <i>of</i> Sheffield<br />
-Ignatius Hussey, <i>Esq;</i><br />
-<i>Rev.</i> Mr Christopher Hussey, <i>M.&nbsp;A. Rector of</i> West-Wickham <i>in</i> Kent<br />
-Thomas Hutchinson, <i>Esq; Fellow Commoner of</i> Sidney-College, Cambridge<br />
-<i>Rev.</i> Mr Hutchinson, <i>of</i> Hart-Hall, Oxon<br />
-Mr Sandys Hutchinson, <i>of</i> Trinity College, Cambridge<br />
-Mr Huxley, <i>M.&nbsp;A. of</i> Brazen Nose College, Oxon<br />
-Mr Thomas Hyam, <i>Merchant</i><br />
-Mr John Hyde<br />
-Mr Hyett, <i>Gent. Commoner of</i> Pembroke College, Oxon</p>
-
-<p class="pi4 p2">I</p>
-
-<p class="pn2"><i>Right Hon. the</i> Earl <i>of</i> Ilay<br />
-Edward Jackson, <i>Esq;</i><br />
-Mr Stephen Jackson, <i>Merchant</i><br />
-Mr Cuthbert Jackson<br />
-<i>Rev.</i> Mr. Peter Jackson<br />
-Mr Joshua Jackson<br />
-<span class="pagenum"><a name="Page_xliii" id="Page_xliii">[xliii]</a></span>John Jacob, <i>Esq;</i><br />
-Mr Jacobens<br />
-Joseph Jackson, <i>of</i> London, <i>Goldsmith</i><br />
-<i>Rev. Sir</i> George Jacobs, <i>of</i> Houghton <i>in</i> Norfolk<br />
-Mr Henry Jacomb<br />
-Mr John Jacques, <i>Apothecary in</i> Coventry<br />
-Mr Samuel Jacques, <i>Surgeon at</i> Uxbridge<br />
-William James, <i>Esq;</i><br />
-<i>Rev.</i> Mr David James, <i>Rector of</i> Wroughton, Bucks<br />
-Mr Benjamin James<br />
-Mr Robert James, <i>of St.</i> John’s, Oxon<br />
-<i>Sir</i> Theodore Janssen, <i>Bart.</i><br />
-Mr John Jarvis, <i>Surgeon at</i> Dartford <i>in</i> Kent<br />
-Mr Edward Jasper<br />
-Edward Jauncy, <i>of the Middle-Temple Esq;</i><br />
-Rev. Dr Richard Ibbetson<br />
-John Idle, <i>of the</i> Middle Temple, <i>Esq;</i><br />
-Mr Samuel Jeake<br />
-Mr Samuel Jebb<br />
-Mr David Jefferies<br />
-Rev. Mr Joseph Jefferies<br />
-Bartholomew Jeffrey, <i>of the</i> Middle Temple, <i>Esq;</i><br />
-Edward Jeffries, <i>Esq;</i><br />
-<i>Lady</i> Jekyll<br />
-Ralph Jenison, <i>Esq;</i> 2 Books<br />
-David Jenkins, <i>L.&nbsp;L.&nbsp;D. Chancellor of</i> Derry<br />
-Mr Jenkins<br />
-Mr Samuel Jennings, <i>of</i> Hull<br />
-Library <i>of</i> Jesus Coll. Cambridge<br />
-John Ingilby, <i>Esq;</i><br />
-Martin Innys, <i>of</i> Bristol, <i>Gent.</i><br />
-<i>Messieurs</i> William <i>and</i> John Innys <i>of</i> London, <i>Booksellers</i><br />
-Thomas Jobber, <i>Esq;</i><br />
-Robert Jocelyn, <i>Esq;</i><br />
-Rev. Mr Samuel Jocham<br />
-Oliver St. John, <i>Esq;</i><br />
-George Johnson, <i>Esq;</i><br />
-<i>Hon.</i> James Johnson, <i>Esq;</i><br />
-James Jurin, <i>M.&nbsp;D.</i><br />
-<i>Rev.</i> Mr Rob. Johnson. <i>S.&nbsp;T.&nbsp;B. Fellow of</i> Trinity College,<br />
-Cambridge<br />
-Mr Isaac Johnson<br />
-Mr Michael Johnson, <i>Merchant in</i> Rotterdam<br />
-Edward Jones, <i>Esq; Chancellor of the Diocese of St.</i> David’s<br />
-Mr Jones, <i>M.&nbsp;A. of</i> Jesus College, Oxon<br />
-Mr Jacob Jones<br />
-<i>Rev.</i> Mr James Jones, <i>Rector of</i> Cound, Salop<br />
-Mr Somerset Jones, <i>A.&nbsp;B. of</i> Christ-Church, Oxon<br />
-Mr John Jones, <i>Surgeon</i><br />
-Mr John Jope, <i>Fellow of</i> New College, Oxon<br />
-Charles Joy, <i>Esq;</i><br />
-Daniel Ivie, <i>Esq; of</i> Chelsea Hospital</p>
-
-<p class="pi4 p2">K</p>
-
-<p class="pn2"><i>His Grace the Duke of</i> Kingston<br />
-<i>Right Honourable</i> Gerrard, <i>Lord Viscount</i> Kingsale<br />
-<i>Right Reverend Lord Bishop of</i> Killale<br />
-<i>Rt. Rev. Lord Bishop of</i> Killdare<br />
-<i>Right Reverend Lord Bishop of</i> Killmore<br />
-<i>Rev.</i> Mr William Kay, <i>Rector of</i> Wigginton, Yorkshire<br />
-Benjamin Keene, <i>Esq;</i><br />
-<i>Hon. Major General</i> Kellum<br />
-Mr Thomas Kemp, <i>M.&nbsp;A of St.</i> John’s College, Oxon<br />
-Mr Robert Kendall<br />
-Mr Clayton Kendrick<br />
-John Kendrick, <i>Esq;</i><br />
-John Kemp, <i>of the</i> Middle Temple, <i>Esq;</i><br />
-Mr Chidrock Kent<br />
-Samuel Kent, <i>Esq;</i><br />
-<i>Rev</i> Mr Samuel Kerrick, <i>Fellow of</i> Christ Church College,<br />
-Cambridge.<br />
-Mr Kidbey<br />
-Mr Robert Kidd<br />
-<i>Library of</i> King’s College, Cambridge<br />
-Benjamin King, <i>of</i> Antigua, <i>Esq;</i><br />
-Mr Matthias King<br />
-Mrs Jane King<br />
-<i>Hon. Colonel</i> Pearcy Kirke<br />
-Mr Thomas Knap<br />
-<i>Rev.</i> Samuel Knight, <i>D.&nbsp;D. Prebendary of</i> Ely<br />
-Mr Robert Knight, <i>jun.</i><br />
-Francis Knowllyes, <i>Esq;</i><br />
-Mr Ralph Knox</p>
-
-<p class="pi4 p2">L</p>
-
-<p class="pn2"><i>Rt. Hon. Lord Viscount</i> Lonsdale<br />
-<i>Rt. Hon. Ld. Viscount</i> Lymington<br />
-<i>Rt. Rev. Lord Bishop of</i> London<br />
-<i>Right Rev. Lord Bishop of</i> Landaff<br />
-<i>Right Honourable Lord</i> Lyn<br />
-John Lade, <i>Esq;</i><br />
-Mr Hugh Langharne<br />
-Mr John Langford<br />
-Mr William Larkman<br />
-Mr William Lambe, <i>of</i> Exeter College, Oxon<br />
-Richard Langley, <i>Esq;</i><br />
-Mr Robert Lacy<br />
-James Lamb, <i>Esq;</i><br />
-<i>Rev.</i> Mr Thomas Lambert, <i>M.&nbsp;A. Vicar of</i> Ledburgh, Yorkshire<br />
-Mr Daniel Lambert<br />
-Mr John Lampe<br />
-Dr. Lane, <i>of</i> Hitchin <i>in</i> Hertfordshire<br />
-Mr Timothy Lane<br />
-<i>Rev.</i> Dr. Laney, <i>Master of</i> Pembroke Hall, Cambr. 2 Books<br />
-Mr Peter de Langley<br />
-<i>Rev.</i> Mr Nathaniel Lardner<br />
-Mr Larnoul<br />
-Mr Henry Lascelles, <i>of</i> Barbadoes, <i>Merchant</i><br />
-<i>Rev.</i> Mr John Laurence, <i>Rector of</i> Bishop’s Waremouth<br />
-Mr Roger Laurence, <i>M.&nbsp;A.</i><br />
-Mr Lavington<br />
-Mr William Law, <i>Professor of</i> Moral Philosophy <i>in the University of</i> Edinburgh<br />
-Mr John Lawton, <i>of the</i> Excise-Office<br />
-Mr Godfrey Laycock, <i>of</i> Hallifax<br />
-Mr Charles Leadbetter, <i>Teacher of the</i> Mathematicks<br />
-Mr James Leake, <i>Bookseller in</i> Bath<br />
-Stephen Martin Leak, <i>Esq;</i><br />
-<i>Rev.</i> Mr Lechmere<br />
-William Lee, <i>Esq;</i><br />
-Mr Lee, <i>of</i> Christ Church, Oxon<br />
-<i>Rev.</i> Mr John Lee<br />
-Mr William Leek<br />
-<i>Rev.</i> Mr Leeson<br />
-<span class="pagenum"><a name="Page_xliv" id="Page_xliv">[xliv]</a></span>Peter Legh, <i>of</i> Lyme <i>in</i> Cheshire, <i>Esq;</i><br />
-Robert Leguarre, <i>of</i> Gray’s-Inn, <i>Esq</i>;<br />
-Mr Lehunt<br />
-Mr&nbsp;John Lehunt, <i>of</i> Canterbury<br />
-Francis Leigh, <i>Esq</i>;<br />
-Mr&nbsp;John Leigh<br />
-Mr&nbsp;Percival Lewis<br />
-Mr&nbsp;Thomas Lewis<br />
-New College Library<br />
-<i>Sir</i> Henry Liddell, <i>Bar. of St.</i> Peter’s College, Cambridge<br />
-Henry Liddell, <i>Esq</i>;<br />
-Mr&nbsp;William Limbery<br />
-Robert Lindsay, <i>Esq</i>;<br />
-<i>Countess of</i> Lippe<br />
-<i>Rev.&nbsp;Dr.</i> James Lisle<br />
-<i>Rev.&nbsp;Mr</i> Lister<br />
-Mr&nbsp;George Livingstone, <i>One of the Clerks of</i> Session<br />
-Salisbury Lloyd, <i>Esq</i>;<br />
-<i>Rev.</i>&nbsp;Mr John Lloyd, <i>A.&nbsp;B. of</i> Jesus College<br />
-Mr&nbsp;Nathaniel Lloyd, <i>Merchant</i><br />
-Mr&nbsp;Samuel Lobb, <i>Bookseller at</i> Chelmsford<br />
-William Lock, <i>Esq</i>;<br />
-Mr&nbsp;James Lock, 2 Books<br />
-Mr&nbsp;Joshua Locke<br />
-Charles Lockier, <i>Esq</i>;<br />
-Richard Lockwood, <i>Esq</i>;<br />
-Mr&nbsp;Bartholom. Loftus, 9 Books<br />
-William Logan, <i>M.&nbsp;D.</i><br />
-Mr&nbsp;Moses Loman, <i>jun.</i><br />
-Mr Longley<br />
-Mr&nbsp;Benjamin Longuet<br />
-Mr&nbsp;Grey Longueville<br />
-Mr&nbsp;Robert Lord<br />
-Mrs&nbsp;Mary Lord<br />
-Mr&nbsp;Benjamin Lorkin<br />
-Mr&nbsp;William Loup<br />
-Richard Love, <i>of</i> Basing <i>in</i> Hants, <i>Esq</i>;<br />
-Mrs Love, <i>in</i> Laurence-Lane<br />
-Mr&nbsp;Joshua Lover, <i>of</i> Chichester<br />
-William Lowndes, <i>Esq</i>;<br />
-Charles Lowndes, <i>Esq</i>;<br />
-Mr&nbsp;Cornelius Lloyd<br />
-Robert Lucas, <i>Esq</i>;<br />
-<i>Coll.</i>&nbsp;Richard Lucas<br />
-<i>Sir</i>&nbsp;Bartlet Lucy<br />
-Edward Luckin, <i>Esq</i>;<br />
-Mr&nbsp;John Ludbey<br />
-Mr Luders, <i>Merchant</i><br />
-Lambert Ludlow, <i>Esq</i>;<br />
-William Ludlow, <i>Esq</i>;<br />
-Peter Ludlow, <i>Esq</i>;<br />
-John Lupton, <i>Esq</i>;<br />
-Nicholas Luke, <i>Esq</i>;<br />
-Lyonel Lyde, <i>Esq</i>;<br />
-<i>Dr.</i>&nbsp;George Lynch<br />
-Mr&nbsp;Joshua Lyons</p>
-
-<p class="pi4 p2">M.</p>
-
-<p class="pn2"><i>His&nbsp;Grace the Duke of</i> Montague<br />
-<i>His&nbsp;Grace the Duke of</i> Montrosse<br />
-<i>His&nbsp;Grace the Duke of</i> Manchester<br />
-<i>The&nbsp;Rt.&nbsp;Hon. Lord&nbsp;Viscount</i> Molesworth<br />
-<i>The&nbsp;Rt.&nbsp;Hon. Lord</i> Mansel<br />
-<i>The&nbsp;Rt.&nbsp;Hon. Ld.</i> Micklethwait<br />
-<i>The&nbsp;Rt.&nbsp;Rev. Ld.&nbsp;Bishop of</i> Meath<br />
-Mr Mace<br />
-Mr&nbsp;Joseph Macham, <i>Merchant</i><br />
-Mr&nbsp;John Machin, <i>Professor of</i> Astronomy <i>in</i> Gresham College<br />
-Mr Mackay<br />
-Mr Mackelcan<br />
-William Mackinen, <i>of</i> Antigua, <i>Esq</i>;<br />
-Mr&nbsp;Colin Mac&nbsp;Laurin, <i>Professor of the</i> Mathematicks <i>in the University of</i> Edinburgh<br />
-Galatius Macmahon, <i>Esq</i>;<br />
-Mr Madox, <i>Apothecary</i><br />
-<i>Rev.</i>&nbsp;Mr&nbsp;Isaac Madox, <i>Prebendary of</i> Chichester<br />
-Henry Mainwaring, <i>of</i> Over-Peover <i>in</i> Cheshire, <i>Esq</i>;<br />
-Mr&nbsp;Robert Mainwaring, <i>of</i> London, <i>Merchant</i><br />
-<i>Capt.</i> John Maitland<br />
-Mr&nbsp;Cecil Malcher<br />
-Sydenham Mallhust, <i>Esq</i>;<br />
-Richard Malone, <i>Esq</i>;<br />
-Mr&nbsp;Thomas Malyn<br />
-Mr&nbsp;John Mann<br />
-Mr&nbsp;William Man<br />
-<i>Dr.</i> Manaton<br />
-Mr&nbsp;John Mande<br />
-<i>Dr.</i>&nbsp;Bernard Mandeville<br />
-Mr&nbsp;James Mandy<br />
-<i>Rev.</i>&nbsp;Mr Bellingham Manleveror, <i>M.&nbsp;A. Rector of</i> Mahera<br />
-Isaac Manley, <i>Esq</i>;<br />
-Thomas Manley, <i>of the</i> Inner-Temple, <i>Esq</i>;<br />
-Mr&nbsp;John Manley<br />
-Mr&nbsp;William Manley<br />
-Mr&nbsp;Benjamin Manning<br />
-Rawleigh Mansel, <i>Esq</i>;<br />
-Henry March, <i>Esq</i>;<br />
-Mr&nbsp;John Marke<br />
-<i>Sir</i>&nbsp;George Markham<br />
-Mr&nbsp;John Markham, <i>Apothecary</i><br />
-Mr&nbsp;William Markes<br />
-Mr&nbsp;James Markwick<br />
-<i>Hon.</i>&nbsp;Thomas Marley, <i>Esq; one of his Majesty’s Sollicitors general of</i> Ireland<br />
-<i>Rev.</i>&nbsp;Mr George Marley<br />
-Mr&nbsp;Benjamin Marriot, <i>of the Exchequer</i><br />
-John Marsh, <i>Esq</i>;<br />
-Mr&nbsp;Samuel Marsh<br />
-Robert Marshall, <i>Esq; Recorder of</i> Clonmell<br />
-<i>Rev.</i>&nbsp;Mr Henry Marshall<br />
-<i>Rev.</i>&nbsp;Nathaniel Marshall, <i>D.&nbsp;D. Canon of</i> Windsor<br />
-Matthew Martin, <i>Esq</i>;<br />
-Thomas Martin, <i>Esq</i>;<br />
-Mr&nbsp;John Martin<br />
-Mr&nbsp;James Martin<br />
-Mr&nbsp;Josiah Martin<br />
-<i>Coll.</i>&nbsp;Samuel Martin, <i>of</i> Antigua<br />
-John Mason, <i>Esq</i>;<br />
-Mr&nbsp;John Mason, <i>of</i> Greenwich<br />
-Mr&nbsp;Charles Mason, <i>M.&nbsp;A.&nbsp;Fell.  of</i> Trin.&nbsp;Coll. Cambridge<br />
-Mr&nbsp;Cornelius Mason<br />
-<i>Dr.</i>&nbsp;Richard Middleton Massey<br />
-Mr&nbsp;Masterman<br />
-Robert Mather, <i>of the</i> Middle-Temple, <i>Esq</i>;<br />
-Mr&nbsp;William Mathews<br />
-Rev.&nbsp;Mr Mathew<br />
-Mr&nbsp;John Matthews<br />
-Mrs&nbsp;Hester Lumbroso de Mattos<br />
-<i>Rev.&nbsp;Dr.</i>&nbsp;Peter Maturin, <i>Dean of</i> Killala<br />
-William Maubry, <i>Esq</i>;<br />
-Mr&nbsp;Gamaliel Maud<br />
-<i>Rev.</i>&nbsp;Mr&nbsp;Peter Maurice, <i>Treasurer of the Ch. of</i> Bangor<br />
-Henry Maxwell, <i>Esq</i>;<br />
-John Maxwell, <i>jun. of</i> Pollock, <i>Esq</i>;<br />
-<i>Rev.</i>&nbsp;Dr.&nbsp;Robert Maxwell, <i>of</i> Fellow’s Hall, Ireland<br />
-Mr May<br />
-Mr&nbsp;Thomas Mayleigh<br />
-Thomas Maylin, <i>jun. Esq</i>;<br />
-<i>Hon.</i>&nbsp;Charles Maynard, <i>Esq</i>;<br />
-Thomas Maynard, <i>Esq</i>;<br />
-<i>Dr.</i>&nbsp;Richard Mayo<br />
-Mr&nbsp;Samuel Mayo<br />
-Samuel Mead, <i>Esq</i>;<br />
-Richard Mead, <i>M.&nbsp;D.</i><br />
-<i>Rev.</i>&nbsp;Mr Meadowcourt<br />
-<i>Rev.</i>&nbsp;Mr Richard Meadowcourt, <i>Fellow of</i> Merton Coll. Oxon<br />
-<span class="pagenum"><a name="Page_xlv" id="Page_xlv">[xlv]</a></span>Mr Mearson<br />
-Mr George Medcalfe<br />
-Mr David Medley, 3 Books<br />
-Charles Medlycott, <i>Esq;</i><br />
-<i>Sir</i> Robert Menzies, <i>of</i> Weem, <i>Bart.</i><br />
-Mr Thomas Mercer, <i>Merchant</i><br />
-John Merrill, <i>Esq;</i><br />
-Mr Francis Merrit<br />
-<i>Dr.</i> Mertins<br />
-Mr John Henry Mertins<br />
-<i>Library of</i> Merton College<br />
-Mr William Messe, Apothecary<br />
-Mr Metcalf<br />
-Mr Thomas Metcalf, <i>of</i> Trinity Coll. Cambridge<br />
-Mr Abraham Meure, <i>of</i> Leatherhead in Surrey<br />
-Mr John Mac Farlane<br />
-<i>Dr.</i> John Michel<br />
-<i>Dr.</i> Robert Michel, <i>of</i> Blandford<br />
-Mr Robert Michell<br />
-Nathaniel Micklethwait, <i>Esq;</i><br />
-Mr Jonathan Micklethwait, <i>Merchant</i><br />
-Mr John Midford, <i>Merchant</i><br />
-Mr Midgley<br />
-<i>Rev.</i> Mr Miller, 2 Books<br />
-<i>Rev.</i> Mr Milling, <i>of</i> the Hague<br />
-<i>Rev.</i> Mr Benjamin Mills<br />
-<i>Rev.</i> Mr Henry Mills, <i>Rector of</i> Meastham, <i>Head-Master of</i> Croyden-School<br />
-Thomas Milner, <i>Esq;</i><br />
-Charles Milner, <i>M.&nbsp;D.</i><br />
-Mr William Mingay<br />
-John Misaubin, <i>M.&nbsp;D.</i><br />
-Mrs Frances Mitchel<br />
-David Mitchell, <i>Esq;</i><br />
-Mr John Mitton<br />
-Mr Abraham de Moivre<br />
-John Monchton, <i>Esq;</i><br />
-Mr John Monk, <i>Apothecary</i><br />
-J. Monro, <i>M.&nbsp;D.</i><br />
-<i>Sir</i> William Monson, <i>Bart.</i><br />
-Edward Montagu, <i>Esq;</i><br />
-Colonel John Montagu<br />
-<i>Rev.</i> John Montague, <i>Dean of</i> Durham, <i>D.&nbsp;D.</i><br />
-Mr Francis Moor<br />
-Mr Jarvis Moore<br />
-Mr Richard Moore, <i>of</i> Hull, 3 Books<br />
-Mr William Moore<br />
-<i>Sir</i> Charles Mordaunt, <i>of</i> Walton, <i>in</i> Warwickshire<br />
-Mr Mordant, <i>Gentleman Commoner of</i> New College, Oxon<br />
-Charles Morgan, <i>Esq;</i><br />
-Francis Morgan, <i>Esq;</i><br />
-Morgan Morgan, <i>Esq;</i><br />
-<i>Rev.</i> Mr William Morland, <i>Fell. of</i> Trin. Coll. Cambr. 2 Books<br />
-Thomas Morgan, <i>M.&nbsp;D.</i><br />
-Mr John Morgan, <i>of</i> Bristol<br />
-Mr Benjamin Morgan, <i>High-Master of</i> St.&nbsp;Paul’s-School<br />
-<i>Hon. Coll.</i> Val. Morris, <i>of</i> Antigua<br />
-Mr Gael Morris<br />
-Mr John Morse, <i>of</i> Bristol<br />
-Hon. Ducey Morton, <i>Esq;</i><br />
-Mr Motte<br />
-Mr William Mount<br />
-<i>Coll.</i> Moyser<br />
-<i>Dr.</i> Edward Mullins<br />
-Mr Joseph Murden<br />
-Mr Mustapha<br />
-Robert Myddleton, <i>Esq;</i><br />
-Robert Myhil, <i>Esq;</i></p>
-
-<p class="pi4 p2">N</p>
-
-<p class="pn2"><i>His Grace the Duke of</i> Newcastle<br />
-<i>Rt. Rev. Ld. Bishop of</i> Norwich<br />
-Stephen Napleton, <i>M.&nbsp;D.</i><br />
-Mr Robert Nash, <i>M.&nbsp;A. Fellow of</i> Wadham College, Oxon<br />
-Mr Theophilus Firmin Nash<br />
-<i>Dr.</i> David Natto<br />
-Mr Anthony Neal<br />
-Mr Henry Neal, <i>of</i> Bristol<br />
-Hampson Nedham, <i>Esq; Gentleman Commoner of</i> Christ Church Oxon<br />
-<i>Rev. Dr.</i> Newcome, <i>Senior-Fellow of St.</i> John’s College, Cambridge, 6 Books<br />
-<i>Rev.</i> Mr Richard Newcome<br />
-Mr Henry Newcome<br />
-Mr Newland<br />
-<i>Rev.</i> Mr John Newey, <i>Dean of</i> Chichester<br />
-Mr Benjamin Newington, <i>M.&nbsp;A.</i><br />
-John Newington, <i>M.&nbsp;B. of</i> Greenwich in Kent<br />
-Mr Samuel Newman<br />
-Mrs Anne Newnham<br />
-Mr Nathaniel Newnham, <i>sen.</i><br />
-Mr Nathaniel Newnham, <i>jun.</i><br />
-Mr Thomas Newnham<br />
-Mrs Catherine Newnham<br />
-<i>Sir</i> Isaac Newton, 12 Books<br />
-<i>Sir</i> Michael Newton<br />
-Mr Newton<br />
-William Nicholas, <i>Esq;</i><br />
-John Nicholas, <i>Esq;</i><br />
-John Niccol, <i>Esq;</i><br />
-<i>General</i> Nicholson<br />
-Mr Samuel Nicholson<br />
-John Nicholson, <i>M.&nbsp;A. Rector of</i> Donaghmore<br />
-Mr Josias Nicholson, 3 Books<br />
-Mr James Nimmo, <i>Merchant of</i> Edinburgh<br />
-David Nixon, <i>Esq;</i><br />
-Mr George Noble<br />
-Stephen Noquiez, <i>Esq;</i><br />
-Mr Thomas Norman, <i>Bookseller at</i> Lewes<br />
-Mr Anthony Norris<br />
-Mr Henry Norris<br />
-<i>Rev.</i> Mr Edward Norton<br />
-Richard Nutley, <i>Esq;</i><br />
-Mr John Nutt, <i>Merchant</i></p>
-
-<p class="pi4 p2">O</p>
-
-<p class="pn2"><i>Right Hon. Lord</i> Orrery<br />
-<i>Rev.</i> Mr John Oakes<br />
-Mr William Ockenden<br />
-Mr Elias Ockenden<br />
-Mr Oddie<br />
-Crew Offley, <i>Esq;</i><br />
-Joseph Offley, <i>Esq;</i><br />
-William Ogbourne, <i>Esq;</i><br />
-<i>Sir</i> William Ogbourne<br />
-James Oglethorp, <i>Esq;</i><br />
-Mr William Okey<br />
-John Oldfield, <i>M.&nbsp;D.</i><br />
-Nathaniel Oldham, <i>Esq;</i><br />
-William Oliver, <i>M.&nbsp;D. of</i> Bath<br />
-John Olmins, <i>Esq;</i><br />
-Arthur Onslow, <i>Esq;</i><br />
-Paul Orchard, <i>Esq;</i><br />
-Robert Ord, <i>Esq;</i><br />
-John Orlebar, <i>Esq;</i><br />
-<i>Rev.</i> Mr George Osborne<br />
-<i>Rev.</i> Mr John Henry Ott<br />
-Mr James Ottey<br />
-Mr Jan. Oudam, <i>Merchant at</i> Rotterdam<br />
-Mr Overall<br />
-John Overbury, <i>Esq;</i><br />
-Mr Charles Overing<br />
-Mr Thomas Owen<br />
-Charles Owsley, <i>Esq;</i><br />
-Mr John Owen<br />
-Mr Thomas Oyles</p>
-
-<p class="pi4 p2">P</p>
-
-<p class="pn2"><i>Right Hon. Countess of</i> Pembroke, 10 Books<br />
-<i>Right Hon. Lord</i> Paisley<br />
-<span class="pagenum"><a name="Page_xlvi" id="Page_xlvi">[xlvi]</a></span><i>Right Hon. Lady</i> Paisley<br />
-<i>The Right Hon. Lord</i> Parker<br />
-Christopher Pack, <i>M.&nbsp;D.</i><br />
-Mr Samuel Parker, <i>Merchant at</i> Bristol<br />
-Mr Thomas Page, <i>Surgeon at</i> Bristol<br />
-<i>Sir</i> Gregory Page, <i>Bar.</i><br />
-William Palgrave, <i>M.&nbsp;D, Fellow of</i> Caius Coll. Cambridge<br />
-William Pallister, <i>Esq;</i><br />
-Thomas Palmer, <i>Esq;</i><br />
-Samuel Palmer, <i>Esq;</i><br />
-Henry Palmer, <i>Merchant</i><br />
-Mr John Palmer, <i>of</i> Coventry<br />
-Mr Samuel Palmer, <i>Surgeon</i><br />
-William Parker, <i>Esq;</i><br />
-Edmund Parker, <i>Gent.</i><br />
-<i>Rev.</i> Mr Henry Parker, <i>M.&nbsp;A.</i><br />
-Mr John Parker<br />
-Mr Samuel Parkes, <i>of Fort St.</i> George <i>in</i> East-India<br />
-Mr Daniel Parminter<br />
-Mr Parolet, <i>Attorney</i><br />
-<i>Rev.</i> Thomas Parn, <i>Fellow of</i> Trin. Coll. Cambr. 2 Books<br />
-<i>Rev.</i> Mr Thomas Parne, <i>Fellow of</i> Trin. Coll. Cambridge<br />
-<i>Rev.</i> Mr Henry Parratt, <i>M.&nbsp;A. Rector of</i> Holywell <i>in</i> Huntingtonshire<br />
-Thomas Parratt, <i>M.&nbsp;D.</i><br />
-Stannier Parrot, <i>Gent.</i><br />
-<i>Right Hon.</i> Benjamin Parry, <i>Esq;</i><br />
-Mr Parry, <i>of</i> Jesus Coll. Oxon <i>B.&nbsp;D.</i><br />
-Robert Paul, <i>of</i> Gray’s-Inn, <i>Esq;</i><br />
-Mr Josiah Paul, <i>Surgeon</i><br />
-Mr Paulin<br />
-Robert Paunceforte, <i>Esq;</i><br />
-Edward Pawlet, <i>of</i> Hinton St. George, <i>Esq;</i><br />
-Mr Henry Pawson, <i>of</i> York, <i>Merchant</i><br />
-Mr Payne<br />
-Mr Samuel Peach<br />
-Mr Marmaduke Peacock, <i>Merchant in</i> Rotterdam<br />
-Flavell Peake, <i>Esq;</i><br />
-<i>Capt.</i> Edward Pearce<br />
-<i>Rev.</i> Zachary Pearce, <i>D.&nbsp;D.</i><br />
-James Pearse, <i>Esq;</i><br />
-Thomas Pearson, <i>Esq;</i><br />
-John Peers, <i>Esq;</i><br />
-Mr Samuel Pegg, <i>of St.</i> John’s College, Cambridge<br />
-Mr Peirce, <i>Surgeon at</i> Bath<br />
-Mr Adam Peirce<br />
-Harry Pelham, <i>Esq;</i><br />
-James Pelham, <i>Esq;</i><br />
-Jeremy Pemberton, <i>of the</i> Inner-Temple, <i>Esq;</i><br />
-<i>Library of</i> Pembroke-Hall, Camb.<br />
-Mr Thomas Penn<br />
-Philip Pendock, <i>Esq;</i><br />
-Edward Pennant, <i>Esq;</i><br />
-<i>Capt.</i> Philip Pennington<br />
-Mr Thomas Penny<br />
-Mr Henry Penton<br />
-Mr Francis Penwarne, <i>at</i> Liskead <i>in</i> Cornwall<br />
-<i>Rev.</i> Mr Thomas Penwarne<br />
-Mr John Percevall<br />
-<i>Rev.</i> Mr Edward Percevall<br />
-Mr Joseph Percevall<br />
-<i>Rev. Dr.</i> Perkins, <i>Prebend. of</i> Ely<br />
-Mr Farewell Perry<br />
-Mr James Petit<br />
-Mr John Petit, <i>of</i> Aldgate<br />
-Mr John Petit, <i>of</i> Nicholas Lane<br />
-Mr John Petitt, <i>of</i> Thames-Street<br />
-<i>Honourable Coll.</i> Pettit, <i>of</i> Eltham <i>in</i> Kent<br />
-Mr Henry Peyton, <i>of St.</i> John’s College, Cambridge<br />
-Daniel Phillips, <i>M.&nbsp;D.</i><br />
-John Phillips, <i>Esq;</i><br />
-Thomas Phillips, <i>Esq;</i><br />
-Mr Gravet Phillips<br />
-William Phillips, <i>of</i> Swanzey, <i>Esq;</i><br />
-Mr Buckley Phillips<br />
-John Phillipson, <i>Esq;</i><br />
-William Phipps, <i>L.&nbsp;L.&nbsp;D.</i><br />
-Mr Thomas Phipps, <i>of</i> Trinity College, Cambridge<br />
-<i>The</i> Physiological <i>Library in the College of</i> Edinburgh<br />
-Mr Pichard<br />
-Mr William Pickard<br />
-Mr John Pickering<br />
-Robert Pigott, <i>of</i> Chesterton, <i>Esq;</i><br />
-Mr Richard Pike<br />
-Henry Pinfield, <i>of</i> Hampstead, <i>Esq;</i><br />
-Charles Pinfold, <i>L.&nbsp;L.&nbsp;D.</i><br />
-<i>Rev.</i> Mr. Pit, <i>of</i> Exeter College, Oxon<br />
-Mr Andrew Pitt<br />
-Mr Francis Place<br />
-Thomas Player, <i>Esq;</i><br />
-<i>Rev.</i> Mr Plimly<br />
-Mr William Plomer<br />
-William Plummer, <i>Esq;</i><br />
-Mr Richard Plumpton<br />
-John Plumptre, <i>Esq;</i><br />
-Fitz-Williams Plumptre, <i>M.&nbsp;D.</i><br />
-Henry Plumptre, <i>M.&nbsp;D.</i><br />
-John Pollen, <i>Esq;</i><br />
-Mr Joshua Pocock<br />
-Francis Pole, <i>of</i> Park-Hall, <i>Esq;</i><br />
-Mr Isaac Polock<br />
-Mr Benjamin Pomfret<br />
-Mr Thomas Pool, <i>Apothecary</i><br />
-Alexander Pope, <i>Esq;</i><br />
-Mr Arthur Pond<br />
-Mr Thomas Port<br />
-Mr John Porter<br />
-Mr Joseph Porter<br />
-Mr Thomas Potter, <i>of St.</i> John’s College, Oxon<br />
-Mr John Powel<br />
-&mdash;&mdash; Powis, <i>Esq;</i><br />
-Mr Daniel Powle<br />
-John Prat, <i>Esq;</i><br />
-Mr James Pratt<br />
-Mr Joseph Pratt<br />
-Mr Samuel Pratt<br />
-Mr Preston, <i>City-Remembrancer</i><br />
-Capt. John Price<br />
-<i>Rev.</i> Mr Samuel Price<br />
-Mr Nathaniel Primat<br />
-Dr. John Pringle<br />
-Thomas Prior, <i>Esq;</i><br />
-Mr Henry Proctor, <i>Apothecary</i><br />
-<i>Sir</i> John Pryse, <i>of</i> Newton Hill <i>in</i> Montgomeryshire<br />
-Mr Thomas Purcas<br />
-Mr Robert Purse<br />
-Mr John Putland<br />
-George Pye, <i>M.&nbsp;D.</i><br />
-Samuel Pye, <i>M.&nbsp;D.</i><br />
-Mr Samuel Pye, <i>Surgeon at</i> Bristol<br />
-Mr Edmund Pyle, <i>of</i> Lynn<br />
-Mr John Pine, <i>Engraver</i></p>
-
-<p class="pi4 p2">Q.</p>
-
-<p class="pn2"><i>His Grace the Duke of</i> Queenborough<br />
-<i>Rev.</i> Mr. Question, <i>M.&nbsp;A. of</i> Exeter College, Oxon<br />
-Jeremiah Quare, <i>Merchant</i></p>
-
-<p class="pi4 p2">R.</p>
-
-<p class="pn2"><i>His Grace the Duke of</i> Richmond<br />
-<i>The Rt. Rev. Ld. Bishop of</i> Raphoe<br />
-<i>The Rt. Hon. Lord</i> John Russel<br />
-<i>Rev.</i> Mr Walter Rainstorp, <i>of</i> Bristol<br />
-<span class="pagenum"><a name="Page_xlvii" id="Page_xlvii">[xlvii]</a></span>Mr John Ranby, <i>Surgeon</i><br />
-<i>Rev.</i> Mr Rand<br />
-Mr Richard Randall<br />
-<i>Rev.</i> Mr Herbert Randolph, <i>M.A.</i><br />
-Moses Raper, <i>Esq;</i><br />
-Matthew Raper, <i>Esq;</i><br />
-Mr William Rastrick, <i>of</i> Lynne<br />
-Mr Ratcliffe, <i>M.&nbsp;A. of</i> Pembroke College, Oxon<br />
-<i>Rev.</i> Mr John Ratcliffe<br />
-Anthony Ravell, <i>Esq;</i><br />
-Mr Richard Rawlins<br />
-Mr Robert Rawlinson <i>A.&nbsp;B. of</i> Trinity College, Cambr.<br />
-Mr Walter Ray<br />
-<i>Coll.</i> Hugh Raymond<br />
-<i>Rt. Hon. Sir</i> Robert Raymond, <i>Lord Chief Justice of the</i> King’s-Bench<br />
-Mr Alexander Raymond<br />
-Samuel Read, <i>Esq;</i><br />
-<i>Rev.</i> Mr James Read<br />
-Mr John Read, <i>Merchant</i><br />
-Mr William Read, <i>Merchant</i><br />
-Mr Samuel Read<br />
-Mrs Mary Reade<br />
-Mr Thomas Reddall<br />
-Mr Andrew Reid<br />
-Felix Renolds, <i>Esq;</i><br />
-John Renton, <i>of</i> Christ-Church, <i>Esq;</i><br />
-Leonard Reresby, <i>Esq;</i><br />
-Thomas Reve, <i>Esq;</i><br />
-Mr Gabriel Reve<br />
-William Reeves, <i>Merch. of</i> Bristol<br />
-Mr Richard Reynell, <i>Apothecary</i><br />
-Mr John Reynolds<br />
-Mr Richard Ricards<br />
-John Rich, <i>of</i> Bristol, <i>Esq;</i><br />
-Francis Richards, <i>M.&nbsp;B.</i><br />
-<i>Rev.</i> Mr Escourt Richards, <i>Prebend. of</i> Wells<br />
-<i>Rev.</i> Mr Richards, <i>Rector of</i> Llanvyllin, <i>in</i> Montgomeryshire<br />
-William Richardson, <i>of</i> Smally <i>in</i> Derbyshire, <i>Esq;</i><br />
-Mr Richard Richardson<br />
-Mr Thomas Richardson, <i>Apothecary</i><br />
-Edward Richier, <i>Esq;</i><br />
-Dudley Rider, <i>Esq;</i><br />
-Richard Rigby, <i>M.&nbsp;D.</i><br />
-Edward Riggs, <i>Esq;</i><br />
-Thomas Ripley, <i>Esq. Comptroller of his Majesty’s Works</i><br />
-<i>Sir</i> Thomas Roberts, <i>Bart.</i><br />
-Richard Roberts, <i>Esq;</i><br />
-<i>Capt.</i> John Roberts<br />
-Thomas Robinson, <i>Esq;</i><br />
-Matthew Robinson, <i>Esq;</i><br />
-Tancred Robinson, <i>M.&nbsp;D.</i><br />
-Nicholas Robinson, <i>M.&nbsp;D.</i><br />
-Christopher Robinson, <i>of</i> Sheffield, <i>A.&nbsp;M.</i><br />
-Mr Henry Robinson<br />
-Mr William Robinson<br />
-Mrs Elizabeth Robinson<br />
-John Rochfort, <i>Esq;</i><br />
-Mr Rodrigues<br />
-Mr Rocke<br />
-<i>Sir</i> John Rodes, <i>Bart.</i><br />
-Mr Francis Rogers<br />
-<i>Rev.</i> Mr Sam. Rogers, <i>of</i> Bristol<br />
-John Rogerson, <i>Esq; his Majesty’s General of</i> Ireland<br />
-Edmund Rolfe, <i>Esq;</i><br />
-Henry Roll, <i>Esq; Gent. Comm. of</i> New College, Oxon<br />
-<i>Rev.</i> Mr Samuel Rolleston, <i>Fell. of</i> Merton College, Oxon<br />
-Lancelot Rolleston, <i>of</i> Wattnal, <i>Esq;</i><br />
-Philip Ronayne, <i>Esq;</i><br />
-<i>Rev.</i> Mr de la Roque<br />
-Mr Benjamin Rosewell, <i>jun.</i><br />
-Joseph Rothery, <i>M.&nbsp;A. Arch-Deacon of</i> Derry<br />
-Guy Roussignac, <i>M.&nbsp;D.</i><br />
-Mr James Round<br />
-Mr William Roundell, <i>of</i> Christ Church, Oxon<br />
-Mr Rouse, <i>Merchant</i><br />
-Cuthbert Routh, <i>Esq;</i><br />
-John Rowe, <i>Esq;</i><br />
-Mr John Rowe<br />
-<i>Dr.</i> Rowel, <i>of</i> Amsterdam<br />
-John Rudge, <i>Esq;</i><br />
-Mr James Ruck<br />
-<i>Rev. Dr.</i> Rundle, <i>Prebendary of</i> Durham<br />
-Mr John Rust<br />
-John Rustatt, <i>Gent.</i><br />
-Mr Zachias Ruth<br />
-William Rutty, <i>M.&nbsp;D. Secretary of the Royal Society</i><br />
-Maltis Ryall, <i>Esq;</i></p>
-
-<p class="pi4 p2">S</p>
-
-<p class="pn2"><i>His Grace the Duke of St.</i> Albans<br />
-<i>Rt. Hon. Earl of</i> Sunderland<br />
-<i>Rt. Hon. Earl of</i> Scarborough<br />
-<i>Rt. Rev. Ld. Bp. of</i> Salisbury<br />
-<i>Rt. Rev. Lord Bishop of St.</i> Asaph<br />
-<i>Rt. Hon.</i> Thomas <i>Lord</i> Southwell<br />
-<i>Rt. Hon. Lord</i> Sidney<br />
-<i>Rt. Hon. Lord</i> Shaftsbury<br />
-<i>The Rt. Hon. Lord</i> Shelburn<br />
-<i>His Excellency Baron</i> Sollenthal, <i>Envoy extraordinary from the King of</i> Denmark<br />
-Mrs Margarita Sabine<br />
-Mr Edward Sadler, 2 Books<br />
-Thomas Sadler, <i>of the</i> Pell-Office, <i>Esq;</i><br />
-<i>Rev.</i> Mr Joseph Sager, <i>Canon of the Church of</i> Salisbury<br />
-Mr William Salkeld<br />
-Mr Robert Salter<br />
-<i>Lady</i> Vanaker Sambrooke<br />
-Jer. Sambrooke, <i>Esq;</i><br />
-John Sampson, <i>Esq;</i><br />
-<i>Dr.</i> Samuda<br />
-Mr John Samwaies<br />
-Alexander Sanderland, <i>M.&nbsp;D.</i><br />
-Samuel Sanders, <i>Esq;</i><br />
-William Sanders, <i>Esq;</i><br />
-<i>Rev.</i> Mr Daniel Sanxey<br />
-John Sargent, <i>Esq;</i><br />
-Mr Saunderson<br />
-Mr Charles Savage, <i>jun.</i><br />
-Mr John Savage<br />
-Mrs Mary Savage<br />
-<i>Rev.</i> Mr Samuel Savage<br />
-Mr William Savage<br />
-Jacob Sawbridge, <i>Esq;</i><br />
-John Sawbridge, <i>Esq;</i><br />
-Mr William Sawrey<br />
-Humphrey Sayer, <i>Esq;</i><br />
-Exton Sayer, <i>L.&nbsp;L.&nbsp;D. Chanceller of</i> Durham<br />
-<i>Rev.</i> Mr George Sayer, <i>Prebendary of</i> Durham<br />
-Mr Thomas Sayer<br />
-Herm. Osterdyk Schacht, <i>M.&nbsp;D.</i> &amp; <i>M. Theor. &amp; Pratt, in Acad.</i> Lug. Bat. Prof.<br />
-Meyer Schamberg, <i>M.&nbsp;D.</i><br />
-Mrs Schepers, <i>of</i> Rotterdam<br />
-<i>Dr.</i> Scheutcher<br />
-Mr Thomas Scholes<br />
-Mr Edward Score, <i>of</i> Exeter, <i>Bookseller</i><br />
-Thomas Scot, of Essex, <i>Esq;</i><br />
-Daniel Scott, <i>L.&nbsp;L.&nbsp;D.</i><br />
-<i>Rev.</i> Mr Scott, <i>Fellow of</i> Winton College<br />
-Mr Richard Scrafton, <i>Surgeon</i><br />
-Mr Flight Scurry, <i>Surgeon</i><br />
-<i>Rev.</i> Mr Thomas Seeker<br />
-<i>Rev</i> Mr Sedgwick<br />
-Mr Selwin<br />
-Mr Peter Serjeant<br />
-Mr John Serocol, <i>Merchant</i><br />
-<span class="pagenum"><a name="Page_xlviii" id="Page_xlviii">[xlviii]</a></span><i>Rev.</i> Mr Seward, <i>of</i> Hereford<br />
-Mr Joseph Sewel<br />
-Mr Thomas Sewell<br />
-Mr Lancelot Shadwell<br />
-Mr Arthur Shallet<br />
-Mr Edmund Shallet, <i>Consul at</i> Barcelona<br />
-Mr <i>Archdeacon</i> Sharp<br />
-James Sharp, <i>jun. Surgeon</i><br />
-<i>Rev.</i> Mr Thomas Sharp, <i>Arch-Deacon of</i> Northumberland<br />
-Mr John Shaw, <i>jun.</i><br />
-Mr Joseph Shaw<br />
-Mr Sheafe<br />
-Mr Edw. Sheldon, <i>of</i> Winstonly<br />
-Mr Shell<br />
-Mr Richard Shephard<br />
-Mr Shepherd <i>of</i> Trinity Coll. Oxon<br />
-Mrs Mary Shepherd<br />
-Mr William Sheppard<br />
-<i>Rev.</i> Mr William Sherlock, <i>M.&nbsp;A.</i><br />
-William Sherrard, <i>L.&nbsp;L.&nbsp;D.</i><br />
-John Sherwin, <i>Esq;</i><br />
-Mr Thomas Sherwood<br />
-Mr Thomas Shewell<br />
-Mr John Shipton, <i>Surgeon</i><br />
-Mr John Shipton, <i>sen.</i><br />
-Mr John Shipton, <i>jun.</i><br />
-Francis Shipwith, <i>Esq, Fellow Comm. of</i> Trinity Coll. Camb.<br />
-John Shish, <i>of</i> Greenwich <i>in</i> Kent, <i>Esq;</i><br />
-Mr Abraham Shreighly<br />
-John Shore, <i>Esq;</i><br />
-<i>Rev.</i> Mr Shove<br />
-Bartholomew Shower, <i>Esq;</i><br />
-Mr Thomas Sibley, <i>jun.</i><br />
-Mr Jacob Silver, <i>Bookseller in</i> Sandwich<br />
-Robert Simpson, <i>Esq; Beadle and Fellow of</i> Caius Coll. Cambr.<br />
-Mr Robert Simpson <i>Professor of the</i> Mathematicks <i>in the University of</i> Glascow<br />
-Henry Singleton, <i>Esq; Prime Sergeant of</i> Ireland<br />
-<i>Rev.</i> Mr John Singleton<br />
-<i>Rev.</i> Mr Rowland Singleton<br />
-Mr Singleton, <i>Surgeon</i><br />
-Mr Jonathan Sisson<br />
-Francis Sitwell, <i>of</i> Renishaw, <i>Esq;</i><br />
-Ralph Skerret, <i>D.&nbsp;D.</i><br />
-Thomas Skinner, <i>Esq;</i><br />
-Mr John Skinner<br />
-Mr Samuel Skinner, <i>jun.</i><br />
-Mr John Skrimpshaw<br />
-Frederic Slare, <i>M.&nbsp;D.</i><br />
-Adam Slater, <i>of</i> Chesterfield, <i>Surgeon</i><br />
-<i>Sir</i> Hans Sloane, <i>Bar.</i><br />
-William Sloane, <i>Esq;</i><br />
-William Sloper, <i>Esq;</i><br />
-William Sloper, <i>Esq, Fellow Commoner of</i> Trin. Coll. Cambr.<br />
-<i>Dr.</i> Sloper, <i>Chancellor of the Diocese of</i> Bristol<br />
-Mr Smart<br />
-Mr John Smibart<br />
-Robert Smith, <i>L.&nbsp;L.&nbsp;D. Professor of</i> Astronomy <i>in the University of</i> Cambridge, 22 Books<br />
-Robert Smith, <i>of</i> Bristol, <i>Esq;</i><br />
-William Smith, <i>of the</i> Middle-Temple, <i>Esq;</i><br />
-James Smith, <i>Esq;</i><br />
-Morgan Smith, <i>Esq;</i><br />
-<i>Rev.</i> Mr Smith, <i>of</i> Stone <i>in the County of</i> Bucks<br />
-John Smith, <i>Esq;</i><br />
-Mr John Smith<br />
-Mr John Smith, <i>Surgeon in</i> Coventry, 2 Books<br />
-Mr John Smith, <i>Surgeon in</i> Chichester<br />
-Mr Allyn Smith<br />
-Mr Joshua Smith<br />
-Mr Joseph Smith<br />
-<i>Rev.</i> Mr Elisha Smith, <i>of</i> Tid <i>St. Gyles’s, in the Isle of</i> Ely<br />
-Mr Ward Smith<br />
-Mr Skinner Smith<br />
-<i>Rev.</i> Mr George Smyth<br />
-Mr Snablin<br />
-<i>Dr.</i> Snell, <i>of</i> Norwich<br />
-Mr Samuel Snell<br />
-Mr William Snell<br />
-William Snelling, <i>Esq;</i><br />
-William Sneyd, <i>Esq;</i><br />
-Mr Ralph Snow<br />
-Mr Thomas Snow<br />
-Stephen Soame, <i>Esq; Fellow Commoner of</i> Sidney Coll. Cambr.<br />
-Cockin Sole, <i>Esq;</i><br />
-Joseph Somers, <i>Esq;</i><br />
-Mr Edwin Sommers, <i>Merchant</i><br />
-Mr Adam Soresby<br />
-Thomas Southby, <i>Esq;</i><br />
-Sontley South, <i>Esq;</i><br />
-Mr Sparrow<br />
-Mr Speke, <i>of</i> Wadham Coll. Ox.<br />
-<i>Rev.</i> Mr Joseph Spence<br />
-Mr Abraham Spooner<br />
-<i>Sir</i> Conrad Joachim Springel<br />
-Mr William Stammers<br />
-Mr Charles Stanhope<br />
-Mr Thomas Stanhope<br />
-<i>Sir</i> John Stanley<br />
-George Stanley, <i>Esq;</i><br />
-<i>Rev.</i> Dr. Stanley, <i>Dean of St.</i> Asaph<br />
-Mr John Stanly<br />
-Eaton Stannard, <i>Esq;</i><br />
-Thomas Stansal, <i>Esq;</i><br />
-Mr Samuel Stanton<br />
-Temple Stanyan, <i>Esq;</i><br />
-Mrs Mary Stanyforth<br />
-<i>Rev.</i> Mr Thomas Starges, <i>Rector of</i> Hadstock, Essex<br />
-Mr Benjamin Steel<br />
-Mr John Stebbing, <i>of St.</i> John’s College, Cambridge<br />
-Mr John Martis Stehelin, <i>Merch.</i><br />
-<i>Dr.</i> Steigerthal<br />
-Mr Stephens, <i>of</i> Gloucester<br />
-Mr Joseph Stephens<br />
-<i>Sir</i> James Steuart <i>of</i> Gutters, <i>Bar.</i><br />
-Mr Robert Steuart, <i>Professor of</i> Natural Philosophy, <i>in the University of</i> Edinburgh<br />
-<i>Rev.</i> Mr Stevens, <i>Fellow of</i> Corp. Chr. Coll. Cambridge<br />
-Mr John Stevens, <i>of</i> Trinity College, Oxon<br />
-<i>Rev.</i> Mr Bennet Stevenson<br />
-<i>Hon.</i> Richard Stewart, <i>Esq;</i><br />
-<i>Major</i> James Stewart<br />
-<i>Capt</i> Bartholomew Stibbs<br />
-Mr Denham Stiles<br />
-Mr Thomas Stiles, <i>sen.</i><br />
-Mr Thomas Stiles, <i>jun.</i><br />
-<i>Rev.</i> Mr Stillingfleet<br />
-Mr Edward Stillingfleet<br />
-Mr John Stillingfleet<br />
-Mr William Stith<br />
-Mr Stock, <i>of</i> Rochdall <i>in</i> Lancashire<br />
-Mr Stocton, <i>Watch-Maker</i><br />
-Mr Robert Stogdon<br />
-<i>Rev.</i> Mr Richard Stonehewer<br />
-Thomas Stoner, <i>Esq;</i><br />
-Mr George Story, <i>of</i> Trinity College, Cambridge<br />
-Mr Thomas Story<br />
-William Strahan, <i>L.&nbsp;L.&nbsp;D.</i><br />
-Mr Thomas Stratfield<br />
-<i>Rev. Dr.</i> Stratford, <i>Canon of</i> Christ Church, Oxford<br />
-<i>Capt.</i> William Stratton<br />
-<i>Rev.</i> Mr Streat<br />
-Samuel Strode, <i>Esq;</i><br />
-Mr George Strode<br />
-<span class="pagenum"><a name="Page_xlix" id="Page_xlix">[xlix]</a></span><i>Rev.</i> Mr John Strong<br />
-<i>Hon. Commodore</i> Stuart<br />
-Alexander Stuart, <i>M.&nbsp;D.</i><br />
-Charles Stuart, <i>M.&nbsp;D.</i><br />
-Lewis Stucly<br />
-Mr John Sturges, <i>of</i> Bloomsbury<br />
-Mr Sturgeon, <i>Surgeon in</i> Bury<br />
-<i>Hon. Lady</i> Suasso<br />
-Mr Gerrard Suffield<br />
-Mr William Sumner, <i>of</i> Windsor<br />
-<i>Sir</i> Robert Sutton, <i>Kt. of the</i> Bath<br />
-<i>Rev.</i> Mr John Sutton<br />
-Mr Gerrard Swartz<br />
-Mr Thomas Swayne<br />
-William Swinburn, <i>Esq;</i><br />
-<i>Rev.</i> Mr. John Swinton, <i>M.&nbsp;A.</i><br />
-Mr Joshua Symmonds, <i>Surgeon</i><br />
-<i>Rev.</i> Mr Edward Synge</p>
-
-<p class="pi4 p2">T.</p>
-
-<p class="pn2"><i>His Grace the Archbishop of</i> Tuam<br />
-<i>Right Hon. Earl of</i> Tankerville<br />
-<i>Rt. Hon. Ld. Viscount</i> Townshend, <i>One of His Majesty’s Principal Secretaries of State</i><br />
-<i>Right Honourable Lady Viscountess</i> Townshend<br />
-<i>Right Hon Ld Viscount</i> Tyrconnel<br />
-<i>The Honourable Lord</i> Trevor Charles Talbot, <i>Esq; Solicitor-General.</i><br />
-Francis Talbot, <i>Esq;</i><br />
-John Ivory Talbot, <i>Esq;</i><br />
-Mr George Talbot, <i>M.&nbsp;A.</i><br />
-Mr Talbot<br />
-Thomas Tanner, <i>D.&nbsp;D. Chancellor of</i> Norwich<br />
-Mr Thomas Tanner<br />
-Mr Tateham <i>of</i> Clapham<br />
-Mr Henry Tatham<br />
-Mr John Tatnall<br />
-Mr Arthur Tayldeur<br />
-Mr John Tayleur<br />
-Arthur Taylor, <i>Esq;</i><br />
-Joseph Taylor, <i>Esq;</i><br />
-Simon Taylor, <i>Esq;</i><br />
-<i>Rev.</i> Mr Abraham Taylor<br />
-Brook Taylor, <i>L.&nbsp;L.&nbsp;D.</i><br />
-William Tempest, <i>Esq;</i><br />
-William Tenison, <i>Esq;</i><br />
-<i>Dr.</i> Tenison<br />
-<i>Rev. Dr.</i> Terry, <i>Canon of</i> Christ Church, Oxon<br />
-Mr Theed, <i>Attorney</i><br />
-Mr Lewis Theobald<br />
-James Theobalds, <i>Esq;</i><br />
-Robert Thistlethwayte, <i>D.&nbsp;D. Warden of</i> Wadham Coll. Oxon<br />
-<i>Rev.</i> Mr Thomlinson<br />
-Richard Thompson Coley, <i>Esq;</i><br />
-<i>Rev.</i> Mr William Thompson<br />
-Mr William Thompson, <i>A.&nbsp;B. of</i> Trinity Coll. Cambridge<br />
-Mr Thoncas<br />
-Mr Thornbury, <i>Vicar of</i> Thame<br />
-<i>Sir</i> James Thornhill, 3 Books<br />
-Mr Thornhill<br />
-William Thornton, <i>Esq;</i><br />
-Mr Catlyn Thorowgood<br />
-Mr John Thorpe<br />
-William Thorseby, <i>Esq;</i><br />
-Mr William Thurlbourn, <i>Bookseller in</i> Cambridge<br />
-Mark Thurston, <i>Esq; Master in</i> Chancery<br />
-<i>Rev.</i> Mr William Tiffin, <i>of</i> Lynn<br />
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-
-<p class="pi4 p2">V</p>
-
-<p class="pn2"><i>Rt. Hon. Lord</i> Viscount Vane<br />
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-
-<p class="pi4 p2">W</p>
-
-<p class="pn2"><i>Rt. Hon. the Earl of</i> Winchelsea<br />
-<i>Rt. Rev. Lord Bishop of</i> Winchester<br />
-<i>Rev.</i> Mr Wade<br />
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-Thomas Wyndham, <i>Esq;</i><br />
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-
-<p class="pi4 p2">Y</p>
-
-<p class="pn2">Mr John Yardley, <i>Surg. in</i> Coven.<br />
-Mr Thomas Yates<br />
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-<i>Sir</i> William Yonge<br />
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-Nicholas Young, <i>of the</i> Inner-Temple, <i>Esq;</i><br />
-Hitch Young, <i>Esq;</i><br />
-<i>Rev.</i> Edward Young, <i>L.&nbsp;L.&nbsp;D.</i></p>
-
-</div>
-
-<p><span class="pagenum"><a name="Page_1" id="Page_1">[1]</a></span></p>
-
-<div class="chapter">
-
-<div class="figcenter">
-     <img src="images/ill-051.jpg" width="400" height="221"
-         alt=""
-         title="" />
-</div>
-
-<h2 class="p4">INTRODUCTION.</h2>
-
-<div>
-  <img class="dcap1" src="images/dt1.jpg" width="80" height="79" alt=""/>
-</div>
-<p class="cap13">THE manner, in which Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em>
-has published his philosophical discoveries,
-occasions them to lie very much
-concealed from all, who have not made
-the mathematics particularly their study.
-He once, indeed, intended to deliver,
-in a more familiar way, that part
-of his inventions, which relates to the system of the world;
-but upon farther consideration he altered his design. For as
-the nature of those discoveries made it impossible to prove
-them upon any other than geometrical principles; he apprehended,
-that those, who should not fully perceive the force
-of his arguments, would hardly be prevailed on to exchange
-their former sentiments for new opinions, so very different from<span class="pagenum"><a name="Page_2" id="Page_2">[2]</a></span>
-what were commonly received<a name="FNanchor_1_1" id="FNanchor_1_1"></a><a href="#Footnote_1_1" class="fnanchor">[1]</a>. He therefore chose rather
-to explain himself only to mathematical readers; and declined
-the attempting to instruct such in any of his principles, who,
-by not comprehending his method of reasoning, could not, at
-the first appearance of his discoveries, have been persuaded of
-their truth. But now, since Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em>’s doctrine
-has been fully established by the unanimous approbation of all,
-who are qualified to understand the same; it is without doubt
-to be wished, that the whole of his improvements in philosophy
-might be universally known. For this purpose therefore
-I drew up the following papers, to give a general notion of our
-great philosopher’s inventions to such, as are not prepared to
-read his own works, and yet might desire to be informed of
-the progress, he has made in natural knowledge; not doubting
-but there were many, besides those, whose turn of mind had
-led them into a course of mathematical studies, that would take
-great pleasure in tasting of this delightful fountain of science.</p>
-
-<p>2. <span class="smcap gesperrt">It</span> is a just remark, which has been made upon the human
-mind, that nothing is more suitable to it, than the contemplation
-of truth; and that all men are moved with a strong
-desire after knowledge; esteeming it honourable to excel
-therein; and holding it, on the contrary, disgraceful to mistake,
-err, or be in any way deceived. And this sentiment
-is by nothing more fully illustrated, than by the inclination
-of men to gain an acquaintance with the operations of nature;
-which disposition to enquire after the causes of things is<span class="pagenum"><a name="Page_3" id="Page_3">[3]</a></span>
-so general, that all men of letters, I believe, find themselves
-influenced by it. Nor is it difficult to assign a reason for this,
-if we consider only, that our desire after knowledge is an effect
-of that taste for the sublime and the beautiful in things,
-which chiefly constitutes the difference between the human
-life, and the life of brutes. These inferior animals partake
-with us of the pleasures, that immediately flow from the bodily
-senses and appetites; but our minds are furnished with a
-superior sense, by which we are capable of receiving various
-degrees of delight, where the creatures below us perceive no
-difference. Hence arises that pursuit of grace and elegance in
-our thoughts and actions, and in all things belonging to us,
-which principally creates imployment for the active mind of
-man. The thoughts of the human mind are too extensive
-to be confined only to the providing and enjoying of what is
-necessary for the support of our being. It is this taste, which
-has given rise to poetry, oratory, and every branch of literature
-and science. From hence we feel great pleasure in conceiving
-strongly, and in apprehending clearly, even where
-the passions are not concerned. Perspicuous reasoning appears
-not only beautiful; but, when set forth in its full
-strength and dignity, it partakes of the sublime, and not
-only pleases, but warms and elevates the soul. This is the
-source of our strong desire of knowledge; and the same
-taste for the sublime and the beautiful directs us to chuse
-particularly the productions of nature for the subject of our
-contemplation: our creator having so adapted our minds to
-the condition, wherein he has placed us, that all his visible<span class="pagenum"><a name="Page_4" id="Page_4">[4]</a></span>
-works, before we inquire into their make, strike us with
-the most lively ideas of beauty and magnificence.</p>
-
-<p>3. <span class="smcap gesperrt">But</span> if there be so strong a passion in contemplative
-minds for natural philosophy; all such must certainly receive a
-particular pleasure in being informed of Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em>’s
-discoveries, who alone has been able to make any great
-advancements in the true course leading to natural knowledge:
-whereas this important subject had before been usually
-attempted with that negligence, as cannot be reflected
-on without surprize. Excepting a very few, who, by
-pursuing a more rational method, had gained a little true
-knowledge in some particular parts of nature; the writers in
-this science had generally treated of it after such a manner, as
-if they thought, that no degree of certainty was ever to be hoped
-for. The custom was to frame conjectures; and if upon
-comparing them with things, there appeared some kind of agreement,
-though very imperfect, it was held sufficient. Yet
-at the same time nothing less was undertaken than intire systems,
-and fathoming at once the greatest depths of nature;
-as if the secret causes of natural effects, contrived and framed
-by infinite wisdom, could be searched out by the slightest
-endeavours of our weak understandings. Whereas the only
-method, that can afford us any prospect of success in this
-difficult work, is to make our enquiries with the utmost
-caution, and by very slow degrees. And after our most diligent
-labour, the greatest part of nature will, no doubt, for ever
-remain beyond our reach.</p>
-
-<p><span class="pagenum"><a name="Page_5" id="Page_5">[5]</a></span></p>
-
-<p>4. <span class="smcap gesperrt">This</span> neglect of the proper means to enlarge our
-knowledge, joined with the presumption to attempt, what
-was quite out of the power of our limited faculties, the Lord
-<span class="smcap">Bacon</span> judiciously observes to be the great obstruction to the
-progress of science<a name="FNanchor_2_2" id="FNanchor_2_2"></a><a href="#Footnote_2_2" class="fnanchor">[2]</a>. Indeed that excellent person was the first,
-who expresly writ against this way of philosophizing; and he
-has laid open at large the absurdity of it in his admirable treatise,
-intitled <span class="smcap">Novum organon scientiarum</span>; and has there
-likewise described the true method, which ought to be followed.</p>
-
-<p>5. <span class="smcap gesperrt">There</span> are, saith he, but two methods, that can be
-taken in the pursuit of natural knowledge. One is to make
-a hasty transition from our first and slight observations on
-things to general axioms, and then to proceed upon those
-axioms, as certain and uncontestable principles, without farther
-examination. The other method; (which he observes
-to be the only true one, but to his time unattempted;) is to
-proceed cautiously, to advance step by step, reserving the
-most general principles for the last result of our inquiries<a name="FNanchor_3_3" id="FNanchor_3_3"></a><a href="#Footnote_3_3" class="fnanchor">[3]</a>.
-Concerning the first of these two methods; where objections,
-which happen to appear against any such axioms taken up in
-haste, are evaded by some frivolous distinction, when the axiom
-it self ought rather to be corrected<a name="FNanchor_4_4" id="FNanchor_4_4"></a><a href="#Footnote_4_4" class="fnanchor">[4]</a>; he affirms, that
-the united endeavours of all ages cannot make it successful;
-because this original error in the first digestion of the mind
-(as he expresses himself) cannot afterwards be remedied<a name="FNanchor_5_5" id="FNanchor_5_5"></a><a href="#Footnote_5_5" class="fnanchor">[5]</a>:
-whereby he would signify to us, that if we set out in a<span class="pagenum"><a name="Page_6" id="Page_6">[6]</a></span>
-wrong way; no diligence or art, we can use, while we
-follow so erroneous a course, will ever bring us to our designed
-end. And doubtless it cannot prove otherwise; for
-in this spacious field of nature, if once we forsake the true
-path, we shall immediately lose our selves, and must for
-ever wander with uncertainty.</p>
-
-<p>6. <span class="smcap gesperrt">The</span> impossibility of succeeding in so faulty a method
-of philosophizing his Lordship endeavours to prove from the
-many false notions and prejudices, to which the mind of man
-is exposed<a name="FNanchor_6_6" id="FNanchor_6_6"></a><a href="#Footnote_6_6" class="fnanchor">[6]</a>. And since this judicious writer apprehends, that
-men are so exceeding liable to fall into these wrong tracts of
-thinking, as to incur great danger of being misled by them,
-even while they enter on the true course in pursuit of nature<a name="FNanchor_7_7" id="FNanchor_7_7"></a><a href="#Footnote_7_7" class="fnanchor">[7]</a>;
-I trust, I shall be excused, if, by insisting a little particularly
-upon this argument, I endeavour to remove whatever
-prejudice of this kind, might possibly entangle the mind
-of any of my readers.</p>
-
-<p>7. <span class="smcap gesperrt">His</span> Lordship has reduced these prejudices and false
-modes of conception under four distinct heads<a name="FNanchor_8_8" id="FNanchor_8_8"></a><a href="#Footnote_8_8" class="fnanchor">[8]</a>.</p>
-
-<p>8. <span class="smcap gesperrt">The</span> first head contains such, as we are subject to from
-the very condition of humanity, through the weakness both
-of our senses, and of the faculties of the mind<a name="FNanchor_9_9" id="FNanchor_9_9"></a><a href="#Footnote_9_9" class="fnanchor">[9]</a>; seeing, as
-this author well observes, the subtilty of nature far exceeds
-the greatest subtilty of our senses or acutest reasonings<a name="FNanchor_10_10" id="FNanchor_10_10"></a><a href="#Footnote_10_10" class="fnanchor">[10]</a>. One<span class="pagenum"><a name="Page_7" id="Page_7">[7]</a></span>
-of the false modes of conception, which he mentions under
-this head, is the forming to our selves a fanciful simplicity
-and regularity in natural things. This he illustrates
-by the following instances; the conceiving the planets to
-move in perfect circles; the adding an orb of fire to the other
-three elements, and the supposing each of these to exceed
-the other in rarity, just in a decuple proportion<a name="FNanchor_11_11" id="FNanchor_11_11"></a><a href="#Footnote_11_11" class="fnanchor">[11]</a>.
-And of the same nature is the assertion of <span class="smcap"><em class="gesperrt">Des Cartes</em></span>,
-without any proof, that all things are made up of three
-kinds of matter only<a name="FNanchor_12_12" id="FNanchor_12_12"></a><a href="#Footnote_12_12" class="fnanchor">[12]</a>. As also this opinion of another
-philosopher; that light, in passing through different mediums,
-was refracted, so as to proceed by that way, through
-which it would move more speedily, than through any other<a name="FNanchor_13_13" id="FNanchor_13_13"></a><a href="#Footnote_13_13" class="fnanchor">[13]</a>.
-The second erroneous turn of mind, taken notice of
-by his Lordship under this head, is, that all men are in some
-degree prone to a fondness for any notions, which they have
-once imbibed; whereby they often wrest things to reconcile
-them to those notions, and neglect the consideration of whatever
-will not be brought to an agreement with them; just as
-those do, who are addicted to judicial astrology, to the observation
-of dreams, and to such-like superstitions; who carefully
-preserve the memory of every incident, which serves to
-confirm their prejudices, and let slip out of their minds all instances,
-that make against them<a name="FNanchor_14_14" id="FNanchor_14_14"></a><a href="#Footnote_14_14" class="fnanchor">[14]</a>. There is also a farther impediment
-to true knowledge, mentioned under the same head by
-this noble writer, which is; that whereas, through the weakness
-and imperfection of our senses, many things are concealed.<span class="pagenum"><a name="Page_8" id="Page_8">[8]</a></span>
-from us, which have the greatest effect in producing natural
-appearances; our minds are ordinarily most affected by
-that, which makes the strongest impression on our organs
-of sense; whereby we are apt to judge of the real importance
-of things in nature by a wrong measure<a name="FNanchor_15_15" id="FNanchor_15_15"></a><a href="#Footnote_15_15" class="fnanchor">[15]</a>. So, because
-the figuration and the motion of bodies strike our senses more
-immediately than most of their other properties, <span class="smcap">Des Cartes</span>
-and his followers will not allow any other explication of natural
-appearances, than from the figure and motion of the parts
-of matter. By which example we see how justly his Lordship
-observes this cause of error to be the greatest of any<a name="FNanchor_16_16" id="FNanchor_16_16"></a><a href="#Footnote_16_16" class="fnanchor">[16]</a>;
-since it has given rise to a fundamental principle in a system
-of philosophy, that not long ago obtained almost an universal
-reputation.</p>
-
-<p>9. <span class="smcap gesperrt">These</span> are the chief branches of those obstructions to
-knowledge, which this author has reduced under his first
-head of false conceptions. The second head contains the
-errors, to which particular persons are more especially obnoxious<a name="FNanchor_17_17" id="FNanchor_17_17"></a><a href="#Footnote_17_17" class="fnanchor">[17]</a>.
-One of these is the consequence of a preceding observation:
-that as we are exposed to be captivated by any opinions,
-which have once taken possession of our minds; so in
-particular, natural knowledge has been much corrupted by
-the strong attachment of men to some one part of science,
-of which they reputed themselves the inventers, or about
-which they have spent much of their time; and hence have
-been apt to conceive it to be of greater use in the study of natural<span class="pagenum"><a name="Page_9" id="Page_9">[9]</a></span>
-philosophy than it was: like <span class="smcap">Aristotle</span>, who reduced
-his physics to logical disputations; and the chymists, who
-thought, that nature could be laid open only by the force
-of their fires<a name="FNanchor_18_18" id="FNanchor_18_18"></a><a href="#Footnote_18_18" class="fnanchor">[18]</a>. Some again are wholly carried away by an
-excessive veneration for antiquity; others, by too great fondness
-for the moderns; few having their minds so well balanced,
-as neither to depreciate the merit of the ancients, nor yet to
-despise the real improvements of later times<a name="FNanchor_19_19" id="FNanchor_19_19"></a><a href="#Footnote_19_19" class="fnanchor">[19]</a>. To this is
-added by his Lordship a difference in the genius of men,
-that some are most fitted to observe the similitude, there is in
-things, while others are more qualified to discern the particulars,
-wherein they disagree; both which dispositions of
-mind are useful: but to the prejudice of philosophy men are
-apt to run into excess in each; while one sort of genius dwells
-too much upon the gross and sum of things, and the other
-upon trifling minutenesses and shadowy distinctions<a name="FNanchor_20_20" id="FNanchor_20_20"></a><a href="#Footnote_20_20" class="fnanchor">[20]</a>.</p>
-
-<p>10. <span class="smcap gesperrt">Under</span> the third head of prejudices and false notions
-this writer considers such, as follow from the lax and indefinite
-use of words in ordinary discourse; which occasions great
-ambiguities and uncertainties in philosophical debates (as another
-eminent philosopher has since shewn more at large<a name="FNanchor_21_21" id="FNanchor_21_21"></a><a href="#Footnote_21_21" class="fnanchor">[21]</a>;) insomuch
-that this our author thinks a strict defining of terms to
-be scarce an infallible remedy against this inconvenience<a name="FNanchor_22_22" id="FNanchor_22_22"></a><a href="#Footnote_22_22" class="fnanchor">[22]</a>. And
-perhaps he has no small reason on his side: for the common
-inaccurate sense of words, notwithstanding the limitations
-given them by definitions, will offer it self so constantly to<span class="pagenum"><a name="Page_10" id="Page_10">[10]</a></span>
-the mind, as to require great caution and circumspection
-for us not to be deceived thereby. Of this we have a very
-eminent instance in the great disputes, that have been raised
-about the use of the word attraction in philosophy; of which
-we shall be obliged hereafter to make particular mention<a name="FNanchor_23_23" id="FNanchor_23_23"></a><a href="#Footnote_23_23" class="fnanchor">[23]</a>.
-Words thus to be guarded against are of two kinds. Some
-are names of things, that are only imaginary<a name="FNanchor_24_24" id="FNanchor_24_24"></a><a href="#Footnote_24_24" class="fnanchor">[24]</a>; such words
-are wholly to be rejected. But there are other terms, that allude
-to what is real, though their signification is confused<a name="FNanchor_25_25" id="FNanchor_25_25"></a><a href="#Footnote_25_25" class="fnanchor">[25]</a>.
-And these latter must of necessity be continued in use; but
-their sense cleared up, and freed, as much as possible, from
-obscurity.</p>
-
-<p>11. <span class="smcap gesperrt">The</span> last general head of these errors comprehends
-such, as follow from the various sects of false philosophies;
-which this author divides into three sorts, the sophistical, empirical,
-and superstitious<a name="FNanchor_26_26" id="FNanchor_26_26"></a><a href="#Footnote_26_26" class="fnanchor">[26]</a>. By the first of these he means
-a philosophy built upon speculations only without experiments<a name="FNanchor_27_27" id="FNanchor_27_27"></a><a href="#Footnote_27_27" class="fnanchor">[27]</a>;
-by the second, where experiments are blindly adhered
-to, without proper reasoning upon them<a name="FNanchor_28_28" id="FNanchor_28_28"></a><a href="#Footnote_28_28" class="fnanchor">[28]</a>; and by
-the third, wrong opinions of nature fixed in mens minds either
-through false religions, or from misunderstanding the
-declarations of the true<a name="FNanchor_29_29" id="FNanchor_29_29"></a><a href="#Footnote_29_29" class="fnanchor">[29]</a>.</p>
-
-<p>12. <span class="smcap gesperrt">These</span> are the four principal canals, by which this judicious
-author thinks, that philosophical errors have flowed in
-upon us. And he rightly observes, that the faulty method of<span class="pagenum"><a name="Page_11" id="Page_11">[11]</a></span>
-proceeding in philosophy, against which he writes<a name="FNanchor_30_30" id="FNanchor_30_30"></a><a href="#Footnote_30_30" class="fnanchor">[30]</a>, is so far
-from assisting us towards overcoming these prejudices; that
-he apprehends it rather suited to rivet them more firmly to the
-mind<a name="FNanchor_31_31" id="FNanchor_31_31"></a><a href="#Footnote_31_31" class="fnanchor">[31]</a>. How great reason then has his Lordship to call this
-way of philosophizing the parent of error, and the bane of
-all knowledge<a name="FNanchor_32_32" id="FNanchor_32_32"></a><a href="#Footnote_32_32" class="fnanchor">[32]</a>? For, indeed, what else but mistakes can so
-bold and presumptuous a treatment of nature produce? have
-we the wisdom necessary to frame a world, that we should
-think so easily, and with so slight a search to enter into the most
-secret springs of nature, and discover the original causes of
-things? what chimeras, what monsters has not this preposterous
-method brought forth? what schemes, or what hypothesis’s
-of the subtilest wits has not a stricter enquiry into nature not
-only overthrown, but manifested to be ridiculous and absurd?
-Every new improvement, which we make in this science, lets
-us see more and more the weakness of our guesses. Dr. <span class="smcap gesperrt">Harvey</span>,
-by that one discovery of the circulation of the blood, has
-dissipated all the speculations and reasonings of many ages upon
-the animal oeconomy. <span class="smcap gesperrt">Asellius</span>, by detecting the lacteal
-veins, shewed how little ground all physicians and philosophers
-had in conjecturing, that the nutritive part of the
-aliment was absorbed by the mouths of the veins spread upon
-the bowels: and then <span class="smcap">Pecquet</span>, by finding out the thoracic
-duct, as evidently proved the vanity of the opinion, which
-was persisted in after the lacteal vessels were known, that the
-alimental juice was conveyed immediately to the liver, and
-there converted into blood.</p>
-
-<p><span class="pagenum"><a name="Page_12" id="Page_12">[12]</a></span></p>
-
-<p>13. <span class="smcap gesperrt">As</span> these things set forth the great absurdity of proceeding
-in philosophy on conjectures, by informing us how far
-the operations of nature are above our low conceptions; so
-on the other hand, such instances of success from a more
-judicious method shew us, that our bountiful maker has
-not left us wholly without means of delighting our selves in
-the contemplation of his wisdom.  That by a just way of
-inquiry into nature, we could not fail of arriving at discoveries
-very remote from our apprehensions; the Lord <span class="smcap"><em class="gesperrt">Bacon</em></span> himself
-argues from the experience of mankind. If, says he, the
-force of guns should be described to any one ignorant of
-them, by their effects only, he might reasonably suppose, that
-those engines of destruction were only a more artificial composition,
-than he knew, of wheels and other mechanical
-powers: but it could never enter his thoughts, that their
-immense force should be owing to a peculiar substance,
-which would enkindle into so violent an explosion, as we
-experience in gunpowder: since he would no where see
-the least example of any such operation; except perhaps in
-earthquakes and thunder, which he would doubtless look
-upon as exalted powers of nature, greatly surpassing any art of
-man to imitate. In the same manner, if a stranger to the original
-of silk were shewn a garment made of it, he would be
-very far from imagining so strong a substance to be spun out
-of the bowels of a small worm; but must certainly believe
-it either a vegetable substance, like flax or cotton; or the natural
-covering of some animal, as wool is of sheep. Or had
-we been told, before the invention of the magnetic needle
-among us, that another people was in possession of a certain<span class="pagenum"><a name="Page_13" id="Page_13">[13]</a></span>
-contrivance, by which they were inabled to discover the position
-of the heavens, with vastly more ease, than we could
-do; what could have been imagined more, than that they
-were provided with some fitter astronomical instrument for
-this purpose than we? That any stone should have so amazing
-a property, as we find in the magnet, must have been
-the remotest from our thoughts<a name="FNanchor_33_33" id="FNanchor_33_33"></a><a href="#Footnote_33_33" class="fnanchor">[33]</a>.</p>
-
-<p>14. <span class="smcap gesperrt">But</span> what surprizing advancements in the knowledge
-of nature may be made by pursuing the true course in philosophical
-inquiries; when those searches are conducted by a
-genius equal to so divine a work, will be best understood by
-considering Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> discoveries. That my’s
-reader may apprehend as just a notion of these, as can be conveyed
-to him, by the brief account, which I intend to lay before
-him; I have set apart this introduction for explaining, in
-the fullest manner I am able, the principles, whereon Sir
-<em class="gesperrt"><span class="smcap">Isaac Newton</span></em> proceeds. For without a clear conception
-of these, it is impossible to form any true idea of the
-singular excellence of the inventions of this great philosopher.</p>
-
-<p>15. <span class="smcap gesperrt">The</span> principles then of this philosophy are; upon no consideration
-to indulge conjectures concerning the powers and
-laws of nature, but to make it our endeavour with all diligence
-to search out the real and true laws, by which the constitution
-of things is regulated. The philosopher’s first care must be
-to distinguish, what he sees to be within his power, from what<span class="pagenum"><a name="Page_14" id="Page_14">[14]</a></span>
-is beyond his reach; to assume no greater degree of knowledge,
-than what he finds himself possessed of; but to advance
-by slow and cautious steps; to search gradually into natural causes;
-to secure to himself the knowledge of the most immediate
-cause of each appearance, before he extends his views farther
-to causes more remote. This is the method, in which philosophy
-ought to be cultivated; which does not pretend to so great
-things, as the more airy speculations; but will perform abundantly
-more: we shall not perhaps seem to the unskilful to
-know so much, but our real knowledge will be greater. And
-certainly it is no objection against this method, that some others
-promise, what is nearer to the extent of our wishes: since
-this, if it will not teach us all we could desire to be informed
-of, will however give us some true light into nature; which no
-other can do. Nor has the philosopher any reason to think
-his labour lost, when he finds himself stopt at the cause first
-discovered by him, or at any other more remote cause, short
-of the original: for if he has but sufficiently proved any one
-cause, he has entered so far into the real constitution of things,
-has laid a safe foundation for others to work upon, and
-has facilitated their endeavours in the search after yet more
-distant causes; and besides, in the mean time he may apply
-the knowledge of these intermediate causes to many useful
-purposes. Indeed the being able to make practical deductions
-from natural causes, constitutes the great distinction
-between the true philosophy and the false. Causes assumed
-upon conjecture, must be so loose and undefined,
-that nothing particular can be collected from them. But those
-causes, which are brought to light by a strict examination<span class="pagenum"><a name="Page_15" id="Page_15">[15]</a></span>
-of things, will be more distinct. Hence it appears to have
-been no unuseful discovery, that the ascent of water in pumps
-is owing to the pressure of the air by its weight or spring;
-though the causes, which make the air gravitate, and render
-it elastic, be unknown: for notwithstanding we are ignorant
-of the original, whence these powers of the air are derived;
-yet we may receive much advantage from the bare
-knowledge of these powers. If we are but certain of the degree
-of force, wherewith they act, we shall know the extent of
-what is to be expected from them; we shall know the greatest
-height, to which it is possible by pumps to raise water; and
-shall thereby be prevented from making any useless efforts
-towards improving these instruments beyond the limits prescribed
-to them by nature; whereas without so much knowledge
-as this, we might probably have wasted in attempts of
-this kind much time and labour. How long did philosophers
-busy themselves to no purpose in endeavouring to perfect
-telescopes, by forming the glasses into some new figure; till
-Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> demonstrated, that the effects of telescopes
-were limited from another cause, than was supposed;
-which no alteration in the figure of the glasses could remedy?
-What method Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> himself has found for
-the improvement of telescopes shall be explained hereafter<a name="FNanchor_34_34" id="FNanchor_34_34"></a><a href="#Footnote_34_34" class="fnanchor">[34]</a>.
-But at present I shall proceed to illustrate, by some farther instances,
-this distinguishing character of the true philosophy, which
-we have now under consideration. It was no trifling discovery,
-that the contraction of the muscles of animals puts their
-limbs in motion, though the original cause of that contraction<span class="pagenum"><a name="Page_16" id="Page_16">[16]</a></span>
-remains a secret, and perhaps may always do so; for the
-knowledge of thus much only has given rise to many speculations
-upon the force and artificial disposition of the muscles,
-and has opened no narrow prospect into the animal fabrick.
-The finding out, that the nerves are great agents in this action,
-leads us yet nearer to the original cause, and yields us a
-wider view of the subject. And each of these steps affords us
-assistance towards restoring this animal motion, when impaired
-in our selves, by pointing out the seats of the injuries, to
-which it is obnoxious. To neglect all this, because we can
-hitherto advance no farther, is plainly ridiculous. It is
-confessed by all, that <span class="smcap"><em class="gesperrt">Galileo</em></span> greatly improved philosophy,
-by shewing, as we shall relate hereafter, that the power
-in bodies, which we call gravity, occasions them to move
-downwards with a velocity equably accelerated<a name="FNanchor_35_35" id="FNanchor_35_35"></a><a href="#Footnote_35_35" class="fnanchor">[35]</a>; and that
-when any body is thrown forwards, the same power obliges it
-to describe in its motion that line, which is called by geometers
-a parabola<a name="FNanchor_36_36" id="FNanchor_36_36"></a><a href="#Footnote_36_36" class="fnanchor">[36]</a>: yet we are ignorant of the cause, which makes
-bodies gravitate. But although we are unacquainted with
-the spring, whence this power in nature is derived, nevertheless
-we can estimate its effects. When a body falls perpendicularly,
-it is known, how long time it takes in descending from
-any height whatever: and if it be thrown forwards, we know
-the real path, which it describes; we can determine in what
-direction, and with what degree of swiftness it must be projected,
-in order to its striking against any object desired; and
-we can also ascertain the very force, wherewith it will strike.<span class="pagenum"><a name="Page_17" id="Page_17">[17]</a></span>
-Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> has farther taught, that this power of
-gravitation extends up to the moon, and causes that planet to
-gravitate as much towards the earth, as any of the bodies, which
-are familiar to us, would, if placed at the same distance<a name="FNanchor_37_37" id="FNanchor_37_37"></a><a href="#Footnote_37_37" class="fnanchor">[37]</a>:
-he has proved likewise, that all the planets gravitate towards
-the sun, and towards one another; and that their respective
-motions follow from this gravitation. All this he has demonstrated
-upon indisputable geometrical principles, which cannot
-be rendered precarious for want of knowing what it is, which
-causes these bodies thus mutually to gravitate: any more than
-we can doubt of the propensity in all the bodies about us, to
-descend towards the earth; or can call in question the forementioned
-propositions of <span class="smcap"><em class="gesperrt">Galileo</em></span>, which are built upon
-that principle. And as <span class="smcap"><em class="gesperrt">Galileo</em></span> has shewn more fully,
-than was known before, what effects were produced in the
-motion of bodies by their gravitation towards the earth; so
-Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span>, by this his invention, has much advanced
-our knowledge in the celestial motions. By discovering
-that the moon gravitates towards the sun, as well as towards
-the earth; he has laid open those intricacies in the moon’s
-motion, which no astronomer, from observations only, could
-ever find out<a name="FNanchor_38_38" id="FNanchor_38_38"></a><a href="#Footnote_38_38" class="fnanchor">[38]</a>: and one kind of heavenly bodies, the comets,
-have their motion now clearly ascertained; whereof we had
-before no true knowledge at all<a name="FNanchor_39_39" id="FNanchor_39_39"></a><a href="#Footnote_39_39" class="fnanchor">[39]</a>.</p>
-
-<p>16. <span class="smcap gesperrt">Doubtless</span> it might be expected, that such surprizing
-success should have silenced, at once, every cavil. But we<span class="pagenum"><a name="Page_18" id="Page_18">[18]</a></span>
-have seen the contrary. For because this philosophy professes
-modestly to keep within the extent of our faculties, and is
-ready to confess its imperfections, rather than to make any
-fruitless attempts to conceal them, by seeking to cover the defects
-in our knowledge with the vain ostentation of rash and
-groundless conjectures; hence has been taken an occasion to
-insinuate that we are led to miraculous causes, and the occult
-qualities of the schools.</p>
-
-<p>17. <span class="smcap gesperrt">But</span> the first of these accusations is very extraordinary.
-If by calling these causes miraculous nothing more is
-meant than only, that they often appear to us wonderful and
-surprizing, it is not easy to see what difficulty can be raised
-from thence; for the works of nature discover every where
-such proofs of the unbounded power, and the consummate
-wisdom of their author, that the more they are known, the
-more they will excite our admiration: and it is too manifest
-to be insisted on, that the common sense of the word miraculous
-can have no place here, when it implies what is above
-the ordinary course of things. The other imputation, that
-these causes are occult upon the account of our not perceiving
-what produces them, contains in it great ambiguity. That
-something relating to them lies hid, the followers of this
-philosophy are ready to acknowledge, nay desire it should
-be carefully remarked, as pointing out proper subjects for future
-inquiry. But this is very different from the proceeding
-of the schoolmen in the causes called by them occult. For
-as their occult qualities were understood to operate in a manner
-occult, and not apprehended by us; so they were obtruded<span class="pagenum"><a name="Page_19" id="Page_19">[19]</a></span>
-upon us for such original and essential properties in bodies,
-as made it vain to seek any farther cause; and a greater
-power was attributed to them, than any natural appearances
-authorized. For instance, the rise of water in pumps was ascribed
-to a certain abhorrence of a vacuum, which they thought
-fit to assign to nature. And this was so far a true observation,
-that the water does move, contrary to its usual course, into
-the space, which otherwise would be left void of any sensible
-matter; and, that the procuring such a vacuity was the apparent
-cause of the water’s ascent. But while we were not in
-the least informed how this power, called an abhorrence of a
-vacuum, produced the visible effects; instead of making any
-advancement in the knowledge of nature, we only gave
-an artificial name to one of her operations: and when the
-speculation was pushed so beyond what any appearances required,
-as to have it concluded, that this abhorrence of a vacuum
-was a power inherent in all matter, and so unlimited as
-to render it impossible for a vacuum to exist at all; it then
-became a much greater absurdity, in being made the foundation
-of a most ridiculous manner of reasoning; as at length
-evidently appeared, when it came to be discovered, that this
-rise of the water followed only from the pressure of the air,
-and extended it self no farther, than the power of that cause.
-The scholastic stile in discoursing of these occult qualities,
-as if they were essential differences in the very substances,
-of which bodies consisted, was certainly very absurd; by
-reason it tended to discourage all farther inquiry. But no
-such ill consequences can follow from the considering of
-any natural causes, which confessedly are not traced up to<span class="pagenum"><a name="Page_20" id="Page_20">[20]</a></span>
-their first original. How shall we ever come to the knowledge
-of the several original causes of things, otherwise than
-by storing up all intermediate causes which we can discover?
-Are all the original and essential properties of matter so very
-obvious, that none of them can escape our first view? This is
-not probable. It is much more likely, that, if some of the
-essential properties are discovered by our first observations, a
-stricter examination should bring more to light.</p>
-
-
-<p>18. <span class="smcap gesperrt">But</span> in order to clear up this point concerning the
-essential properties of matter, let us consider the subject a little
-distinctly. We are to conceive, that the matter, out of
-which the universe of things is formed, is furnished with certain
-qualities and powers, whereby it is rendered fit to answer
-the purposes, for which it was created. But every property,
-of which any particle of this matter is in it self possessed, and
-which is not barely the consequence of the union of this particle
-with other portions of matter, we may call an essential property:
-whereas all other qualities or attributes belonging to
-bodies, which depend on their particular frame and composition,
-are not essential to the matter, whereof such bodies are
-made; because the matter of these bodies will be deprived
-of those qualities, only by the dissolution of the body, without
-working any change in the original constitution of one
-single particle of this mass of matter. Extension we apprehend
-to be one of these essential properties, and impenetrability
-another. These two belong universally to all matter; and
-are the principal ingredients in the idea, which this word
-matter usually excites in the mind. Yet as the idea, marked<span class="pagenum"><a name="Page_21" id="Page_21">[21]</a></span>
-by this name, is not purely the creature of our own understandings,
-but is taken for the representation of a certain
-substance without us; if we should discover, that every part
-of the substance, in which we find these two properties,
-should likewise be endowed universally with any other essential
-qualities; all these, from the time they come to our notice,
-must be united under our general idea of matter. How
-many such properties there are actually in all matter we know
-not; those, of which we are at present apprized, have been
-found out only by our observations on things; how many
-more a farther search may bring to light, no one can say;
-nor are we certain, that we are provided with sufficient methods
-of perception to discern them all. Therefore, since we
-have no other way of making discoveries in nature, but by
-gradual inquiries into the properties of bodies; our first step
-must be to admit without distinction all the properties, which
-we observe; and afterwards we must endeavour, as far as we
-are able, to distinguish between the qualities, wherewith the
-very substances themselves are indued, and those appearances,
-which result from the structure only of compound bodies.
-Some of the properties, which we observe in things, are the
-attributes of particular bodies only; others universally belong
-to all, that fall under our notice. Whether some of the
-qualities and powers of particular bodies, be derived from different
-kinds of matter entring their composition, cannot, in
-the present imperfect state of our knowledge, absolutely be
-decided; though we have not yet any reason to conclude,
-but that all the bodies, with which we converse, are framed
-out of the very same kind of matter, and that their distinct<span class="pagenum"><a name="Page_22" id="Page_22">[22]</a></span>
-qualities are occasioned only by their structure; through the variety
-whereof the general powers of matter are caused to produce
-different effects. On the other hand, we should not hastily
-conclude, that whatever is found to appertain to all matter,
-which falls under our examination, must for that reason
-only be an essential property thereof, and not be derived from
-some unseen disposition in the frame of nature. Sir <span class="smcap"><em class="gesperrt">Isaac
-Newton</em></span> has found reason to conclude, that gravity is a property
-universally belonging to all the perceptible bodies in the
-universe, and to every particle of matter, whereof they are
-composed. But yet he no where asserts this property to be
-essential to matter. And he was so far from having any design
-of establishing it as such, that, on the contrary, he has
-given some hints worthy of himself at a cause for it<a name="FNanchor_40_40" id="FNanchor_40_40"></a><a href="#Footnote_40_40" class="fnanchor">[40]</a>; and expresly
-says, that he proposed those hints to shew, that he had
-no such intention<a name="FNanchor_41_41" id="FNanchor_41_41"></a><a href="#Footnote_41_41" class="fnanchor">[41]</a>.</p>
-
-<p>19. <span class="smcap gesperrt">It</span> appears from hence, that it is not easy to determine,
-what properties of bodies are essentially inherent in the
-matter, out of which they are made, and what depend upon
-their frame and composition. But certainly whatever properties
-are found to belong either to any particular systems of
-matter, or universally to all, must be considered in philosophy;
-because philosophy will be otherwise imperfect. Whether
-those properties can be deduced from some other appertaining
-to matter, either among those, which are already known,
-or among such as can be discovered by us, is afterwards to be
-sought for the farther improvement of our knowledge. But this<span class="pagenum"><a name="Page_23" id="Page_23">[23]</a></span>
-inquiry cannot properly have place in the deliberation about admitting
-any property of matter or bodies into philosophy; for
-that purpose it is only to be considered, whether the existence
-of such a property has been justly proved or not. Therefore
-to decide what causes of things are rightly received into natural
-philosophy, requires only a distinct and clear conception
-of what kind of reasoning is to be allowed of as convincing,
-when we argue upon the works of nature.</p>
-
-<p>20. <span class="smcap gesperrt">The</span> proofs in natural philosophy cannot be so absolutely
-conclusive, as in the mathematics. For the subjects of
-that science are purely the ideas of our own minds. They
-may be represented to our senses by material objects, but they
-are themselves the arbitrary productions of our own thoughts;
-so that as the mind can have a full and adequate knowledge
-of its own ideas, the reasoning in geometry can be rendered
-perfect. But in natural knowledge the subject of our contemplation
-is without us, and not so compleatly to be known:
-therefore our method of arguing must fall a little short of absolute
-perfection. It is only here required to steer a just course
-between the conjectural method of proceeding, against which
-I have so largely spoke; and demanding so rigorous a proof, as
-will reduce all philosophy to mere scepticism, and exclude all
-prospect of making any progress in the knowledge of nature.</p>
-
-<p>21. <span class="smcap gesperrt">The</span> concessions, which are to be allowed in this science,
-are by Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> included under a very
-few simple precepts.</p>
-
-<p><span class="pagenum"><a name="Page_24" id="Page_24">[24]</a></span></p>
-
-<p>22. <span class="smcap gesperrt">The</span> first is, that more causes are not to be received
-into philosophy, than are sufficient to explain the appearances
-of nature. That this rule is approved of unanimously, is evident
-from those expressions so frequent among all philosophers,
-that nature does nothing in vain; and that a variety
-of means, where fewer would suffice, is needless. And
-certainly there is the highest reason for complying with this
-rule. For should we indulge the liberty of multiplying,
-without necessity, the causes of things, it would reduce
-all philosophy to mere uncertainty; since the only proof,
-which we can have, of the existence of a cause, is the necessity
-of it for producing known effects. Therefore where
-one cause is sufficient, if there really should in nature be
-two, which is in the last degree improbable, we can have no
-possible means of knowing it, and consequently ought not to
-take the liberty of imagining, that there are more than one.</p>
-
-<p>23. <span class="smcap gesperrt">The</span> second precept is the direct consequence of the
-first, that to like effects are to be ascribed the same causes.
-For instance, that respiration in men and in brutes is brought
-about by the same means; that bodies descend to the earth
-here in <span class="smcap">Europe</span>, and in <span class="smcap">America</span> from the same principle;
-that the light of a culinary fire, and of the sun have the same
-manner of production; that the reflection of light is effected in
-the earth, and in the planets by the same power; and the like.</p>
-
-<p>24. <span class="smcap gesperrt">The</span> third of these precepts has equally evident reason
-for it. It is only, that those qualities, which in the same
-body can neither be lessened nor increased, and which belong<span class="pagenum"><a name="Page_25" id="Page_25">[25]</a></span>
-to all bodies that are in our power to make trial upon, ought
-to be accounted the universal properties of all bodies whatever.</p>
-
-<p>25. <span class="smcap gesperrt">In</span> this precept is founded that method of arguing by
-induction, without which no progress could be made in natural
-philosophy.  For as the qualities of bodies become
-known to us by experiments only; we have no other way of
-finding the properties of such bodies, as are out of our reach
-to experiment upon, but by drawing conclusions from those
-which fall under our examination. The only caution here
-required is, that the observations and experiments, we argue
-upon, be numerous enough, and that due regard be paid to
-all objections, that occur, as the Lord <span class="smcap">Bacon</span> very judiciously
-directs<a name="FNanchor_42_42" id="FNanchor_42_42"></a><a href="#Footnote_42_42" class="fnanchor">[42]</a>. And this admonition is sufficiently complied
-with, when by virtue of this rule we ascribe impenetrability
-and extension to all bodies, though we have no sensible
-experiment, that affords a direct proof of any of the celestial
-bodies being impenetrable; nor that the fixed stars
-are so much as extended.  For the more perfect our instruments
-are, whereby we attempt to find their visible magnitude,
-the less they appear; insomuch that all the sensible
-magnitude, which we observe in them, seems only to be an
-optical deception by the scattering of their light. However,
-I suppose no one will imagine they are without any magnitude,
-though their immense distance makes it undiscernable
-by us. After the same manner, if it can be proved, that all<span class="pagenum"><a name="Page_26" id="Page_26">[26]</a></span>
-bodies here gravitate towards the earth, in proportion to the
-quantity of solid matter in each; and that the moon gravitates
-to the earth likewise, in proportion to the quantity of matter
-in it; and that the sea gravitates towards the moon, and all
-the planets towards each other; and that the very comets have
-the same gravitating faculty; we shall have as great reason to
-conclude by this rule, that all bodies gravitate towards each
-other. For indeed this rule will more strongly hold in this
-case, than in that of the impenetrability of bodies; because
-there will more instances be had of bodies gravitating, than
-of their being impenetrable.</p>
-
-<p>25. <span class="smcap gesperrt">This</span> is that method of induction, whereon all philosophy
-is founded; which our author farther inforces by
-this additional precept, that whatever is collected from this
-induction, ought to be received, notwithstanding any conjectural
-hypothesis to the contrary, till such times as it shall be
-contradicted or limited by farther observations on nature.</p>
-
-<div class="figcenter">
-     <img src="images/ill-076.jpg" width="300" height="229"
-         alt=""
-         title="" />
-</div>
-
-</div>
-
-<p><span class="pagenum"><a name="Page_27" id="Page_27">[27]</a></span></p>
-
-<div class="chapter">
-
-<div class="figcenter">
-     <img src="images/ill-077.jpg" width="400" height="209"
-         alt=""
-         title="" />
-</div>
-
-<p class="pc xlarge"><em class="gesperrt">BOOK I</em>.</p>
-<p class="pc reduct"><span class="smcap">Concerning the</span></p>
-<p class="pc large">MOTION of BODIES</p>
-<p class="pc">IN GENERAL.</p>
-
-<hr class="d3" />
-
-<h2><a name="c27" id="c27"><span class="smcap">Chap. I.</span></a><br />
-Of the LAWS of MOTION.</h2>
-
-<div>
-  <img class="dcap1" src="images/dh1.jpg" width="80" height="79" alt=""/>
-</div>
-<p class="cap13">HAVING thus explained Sir <em class="gesperrt"><span class="smcap">Isaac
-Newton</span>’s</em> method of reasoning in
-philosophy, I shall now proceed to
-my intended account of his discoveries.
-These are contained in two treatises.
-In one of them, the <span class="smcap">Mathematical
-principles of natural philosophy</span>,
-his chief design is to shew by what laws the heavenly<span class="pagenum"><a name="Page_28" id="Page_28">[28]</a></span>
-motions are regulated; in the other, his <span class="smcap">Optics</span>, he discourses
-of the nature of light and colours, and of the action between
-light and bodies. This second treatise is wholly confined to
-the subject of light: except some conjectures proposed at the
-end concerning other parts of nature, which lie hitherto more
-concealed. In the other treatise our author was obliged to
-smooth the way to his principal intention, by explaining many
-things of a more general nature: for even some of the most
-simple properties of matter were scarce well established at that
-time. We may therefore reduce Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span>’s doctrine
-under three general heads; and I shall accordingly divide
-my account into three books. In the first I shall speak
-of what he has delivered concerning the motion of bodies,
-without regard to any particular system of matter; in the second
-I shall treat of the heavenly motions; and the third
-shall be employed upon light.</p>
-
-<p>2. <span class="smcap gesperrt">In</span> the first part of my design, we must begin with an
-account of the general laws of motion.</p>
-
-<p>3. <span class="smcap gesperrt">These</span> laws are some universal affections and properties
-of matter drawn from experience, which are made use
-of as axioms and evident principles in all our arguings upon the
-motion of bodies. For as it is the custom of geometers to
-assume in their demonstrations some propositions, without
-exhibiting the proof of them; so in philosophy, all our reasoning
-must be built upon some properties of matter, first admitted
-as principles whereon to argue. In geometry these axioms
-are thus assumed, on account of their being so evident<span class="pagenum"><a name="Page_29" id="Page_29">[29]</a></span>
-as to make any proof in form needless. But in philosophy
-no properties of bodies can be in this manner received for self-evident;
-since it has been observed above, that we can conclude
-nothing concerning matter by any reasonings upon its
-nature and essence, but that we owe all the knowledge, we
-have thereof, to experience. Yet when our observations on
-matter have inform’d us of some of its properties, we may securely
-reason upon them in our farther inquiries into nature.
-And these laws of motion, of which I am here to speak, are
-found so universally to belong to bodies, that there is no motion
-known, which is not regulated by them. These are by
-Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> reduced to three<a name="FNanchor_43_43" id="FNanchor_43_43"></a><a href="#Footnote_43_43" class="fnanchor">[43]</a>.</p>
-
-<p><a name="c29a" id="c29a">4.</a> <span class="smcap gesperrt">The</span> first law is, that all bodies have such an indifference
-to rest, or motion, that if once at rest they remain so, till disturbed
-by some power acting upon them: but if once put
-in motion, they persist in it; continuing to move right forwards
-perpetually, after the power, which gave the motion,
-is removed; and also preserving the same degree of velocity
-or quickness, as was first communicated, not stopping or remitting
-their course, till interrupted or otherwise disturbed by
-some new power impressed.</p>
-
-<p><a name="c29b" id="c29b">5.</a> <span class="smcap gesperrt">The</span> second law of motion is, that the alteration of the
-state of any body, whether from rest to motion, or from motion
-to rest, or from one degree of motion to another, is always
-proportional to the force impressed. A body at rest, when<span class="pagenum"><a name="Page_30" id="Page_30">[30]</a></span>
-acted upon by any power, yields to that power, moving in
-the same line, in which the power applied is directed; and
-moves with a less or greater degree of velocity, according to
-the degree of the power; so that twice the power shall communicate
-a double velocity, and three times the power a
-threefold velocity. If the body be moving, and the power
-impressed act upon the body in the direction of its motion,
-the body shall receive an addition to its motion, as great as
-the motion, into which that power would have put it from a
-state of rest; but if the power impressed upon a moving body
-act directly opposite to its former motion, that power shall
-then take away from the body’s motion, as much as in the other
-case it would have added to it. Lastly, if the power be
-impressed obliquely, there will arise an oblique motion differing
-more or less from the former direction, according as
-the new impression is greater or less. For example, if the body
-A (in fig. 1.) be moving in the direction A&nbsp;B, and when it is
-at the point A, a power be impressed upon it in the direction
-A&nbsp;C, the body shall from henceforth neither move in its first
-direction A&nbsp;B, nor in the direction of the adventitious power,
-but shall take a course as A&nbsp;D between them: and if the
-power last impressed be just equal to that, which first gave
-to the body its motion; the line A&nbsp;D shall pass in the middle
-between A&nbsp;B and A&nbsp;C, dividing the angle under B&nbsp;A&nbsp;C into
-two equal parts; but if the power last impressed be greater
-than the first, the line A&nbsp;D shall incline most to A&nbsp;C; whereas
-if the last impression be less than the first, the line A&nbsp;D shall
-incline most to A&nbsp;B. To be more particular, the situation of<span class="pagenum"><a name="Page_31" id="Page_31">[31]</a></span>
-the line A&nbsp;D is always to be determined after this manner.
-Let A&nbsp;E be the space, which the body would have moved
-through in the line A&nbsp;B during any certain portion of time;
-provided that body, when at A, had received no second impulse.
-Suppose likewise, that A&nbsp;F is the part of the line A&nbsp;C,
-through which the body would have moved during an equal
-portion of time, if it had been at rest in A, when it received
-the impulse in the direction A&nbsp;C: then if from E be drawn
-a line parallel to, or equidistant from A&nbsp;C, and from F another
-line parallel to A&nbsp;B, those two lines will meet in the
-line A&nbsp;D.</p>
-
-<p><a name="c31" id="c31">6.</a> <span class="smcap gesperrt">The</span> third and last of these laws of motion is, that
-when any body acts upon another, the action of that body
-upon the other is equalled by the contrary reaction of that
-other body upon the first.</p>
-
-<p>7. <span class="smcap gesperrt">These</span> laws of motion are abundantly confirmed by
-this, that all the deductions made from them, in relation to
-the motion of bodies, how complicated soever, are found to
-agree perfectly with observation. This shall be shewn more
-at large in the next chapter. But before we proceed to so
-diffusive a proof; I chuse here to point out those appearances
-of bodies, whereby the laws of motion are first suggested
-to us.</p>
-
-<p>8. <span class="smcap gesperrt">Daily</span> observation makes it appear to us, that any
-body, which we once see at rest, never puts it self into fresh<span class="pagenum"><a name="Page_32" id="Page_32">[32]</a></span>
-motion; but continues always in the same place, till removed
-by some power applied to it.</p>
-
-<p>9. <span class="smcap gesperrt">Again</span>, whenever a body is once in motion, it continues
-in that motion some time after the moving power has quitted
-it, and it is left to it self. Now if the body continue to move
-but a single moment, after the moving power has left it, there
-can no reason be assigned, why it should ever stop without
-some external force. For it is plain, that this continuance of
-the motion is caused only by the body’s having already moved,
-the sole operation of the power upon the body being the
-putting it in motion; therefore that motion continued will equally
-be the cause of its farther motion, and so on without
-end. The only doubt that can remain, is, whether this motion
-communicated continues intire, after the power, that caused
-it, ceases to act; or whether it does not gradually languish and
-decrease. And this suspicion cannot be removed by a transient
-and slight observation on bodies, but will be fully cleared
-up by those more accurate proofs of the laws of motion,
-which are to be considered in the next chapter.</p>
-
-<p>10. <span class="smcap gesperrt">Lastly</span>, bodies in motion appear to affect a straight
-course without any deviation, unless when disturbed by some
-adventitious power acting upon them. If a body be thrown
-perpendicularly upwards or downwards, it appears to continue
-in the same straight line during the whole time of its motion.
-If a body be thrown in any other direction, it is found to deviate
-from the line, in which it began to move, more and<span class="pagenum"><a name="Page_33" id="Page_33">[33]</a></span>
-more continually towards the earth, whither it is directed
-by its weight: but since, when the weight of a body does
-not alter the direction of its motion, it always moves in
-a straight line, without doubt in this other case the body’s,
-declining from its first course is no more, than what is caused
-by its weight alone. As this appears at first sight to be
-unquestionable, so we shall have a very distinct proof thereof
-in the next chapter, where the oblique motion of bodies will
-be particularly considered.</p>
-
-<p>11. <span class="smcap gesperrt">Thus</span> we see how the first of the laws of motion
-agrees with what appears to us in moving bodies. But
-here occurs this farther consideration, that the real and absolute
-motion of any body is not visible to us: for we
-are our selves also in constant motion along with the
-earth whereon we dwell; insomuch that we perceive bodies
-to move so far only, as their motion is different from
-our own. When a body appears to us to lie at rest, in
-reality it only continues the motion, it has received, without
-putting forth any power to change that motion. If we
-throw a body in the course or direction, wherein we are
-carried our selves; so much motion as we seem to have
-given to the body, so much we have truly added to the
-motion, it had, while it appeared to us to be at rest. But
-if we impel a body the contrary way, although the body
-appears to us to have received by such an impulse as much
-motion, as when impelled the other way; yet in this case we
-have taken from the body so much real motion, as we seem
-to have given it. Thus the motion, which we see in bodies,<span class="pagenum"><a name="Page_34" id="Page_34">[34]</a></span>
-is not their real motion, but only relative with respect to us;
-and the forementioned observations only shew us, that this
-first law of motion has place in this relative or apparent
-motion. However, though we cannot make any observation
-immediately on the absolute motion of bodies, yet by
-reasoning upon what we observe in visible motion, we can
-discover the properties and effects of real motion.</p>
-
-<p>12. <span class="smcap gesperrt">With</span> regard to this first law of motion, which is
-now under consideration, we may from the foregoing observations
-most truly collect, that bodies are disposed to continue
-in the absolute motion, which they have once received,
-without increasing or diminishing their velocity. When a
-body appears to us to lie at rest, it really preserves without
-change the motion, which it has in common with our selves:
-and when we put it into visible motion, and we see it continue
-that motion; this proves, that the body retains that degree
-of its absolute motion, into which it is put by our acting
-upon it: if we give it such an apparent motion, which adds
-to its real motion, it preserves that addition; and if our acting
-on the body takes off from its real motion, it continues
-afterwards to move with no more real motion, than we have
-left it.</p>
-
-<p>13. <span class="smcap gesperrt">Again</span>, we do not observe in bodies any disposition or
-power within themselves to change the direction of their motion;
-and if they had any such power, it would easily be discovered.
-For suppose a body by the structure or disposition
-of its parts, or by any other circumstance in its make, was indued<span class="pagenum"><a name="Page_35" id="Page_35">[35]</a></span>
-with a power of moving it self; this self-moving principle,
-which should be thus inherent in the body, and not
-depend on any thing external, must change the direction
-wherein it would act, as often as the position of the body
-was changed: so that for instance, if a body was lying before
-me in such a position, that the direction, wherein this
-principle disposes the body to move, was pointed directly from
-me; if I then gradually turned the body about, the direction
-of this self-moving principle would no longer be pointed directly
-from me, but would turn about along with the body.
-Now if any body, which appears to us at rest, were furnished
-with any such self-moving principle; from the body’s appearing
-without motion we must conclude, that this self-moving
-principle lies directed the same way as the earth is carrying
-the body; and such a body might immediately be put
-into visible motion only by turning it about in any degree,
-that this self-moving principle might receive a different direction.</p>
-
-<p>14. <span class="smcap gesperrt">From</span> these considerations it very plainly follows,
-that if a body were once absolutely at rest; not being furnished
-with any principle, whereby it could put it self into
-motion, it must for ever continue in the same place, till acted
-upon by something external: and also that when a body is put
-into motion, it has no power within it self to make any
-change in the direction of that motion; and consequently
-that the body must move on straight forward without declining
-any way whatever. But it has before been shewn, that
-bodies do not appear to have in themselves any power to<span class="pagenum"><a name="Page_36" id="Page_36">[36]</a></span>
-change the velocity of their motion: therefore this first law
-of motion has been illustrated and confirmed, as much as can
-be from the transient observations, which have here been discoursed
-upon; and in the next chapter all this will be farther
-established by more correct observations.</p>
-
-<p>15. <span class="smcap gesperrt">But</span> I shall now pass to the second law of motion;
-wherein, when it is asserted, that the velocity, with which
-any body is moved by the action of a power upon it, is proportional
-to that power; the degree of power is supposed to
-be measured by the greatness of the body, which it can move
-with a given celerity. So that the sense of this law is, that
-if any body were put into motion with that degree of swiftness,
-as to pass in one hour the length of a thousand yards;
-the power, which would give the same degree of velocity to
-a body twice as great, would give this lesser body twice the
-velocity, causing it to describe in the same space of an hour
-two thousand yards. But by a body twice as great as another,
-I do not here mean simply of twice the bulk, but one that
-contains a double quantity of solid matter.</p>
-
-<p>16. <span class="smcap gesperrt">Why</span> the power, which can move a body twice as great
-as another with the same degree of velocity, should be called
-twice as great as the power, which can give the lesser body
-the same velocity, is evident. For if we should suppose the
-greater body to be divided into two equal parts, each equal
-to the lesser body, each of these halves will require the same
-degree of power to move them with the velocity of the lesser
-body, as the lesser body it self requires; and therefore both<span class="pagenum"><a name="Page_37" id="Page_37">[37]</a></span>
-those halves, or the whole greater body, will require the
-moving power to be doubled.</p>
-
-<p>17. <span class="smcap gesperrt">That</span> the moving power being in this sense doubled,
-should just double likewise the velocity of the same body,
-seems near as evident, if we consider, that the effect of the
-power applied must needs be the same, whether that power
-be applied to the body at once, or in parts. Suppose then the
-double power not applied to the body at once, but half of it
-first, and afterwards the other half; it is not conceivable for
-what reason the half last applied should come to have a different
-effect upon the body, from that which is applied first;
-as it must have, if the velocity of the body was not just doubled
-by the application of it. So far as experience can determine,
-we see nothing to favour such a supposition. We cannot
-indeed (by reason of the constant motion of the earth)
-make trial upon any body perfectly at rest, whereby to see
-whether a power applied in that case would have a different
-effect, from what it has, when the body is already moving;
-but we find no alteration in the effect of the same power on
-account of any difference there may be in the motion of the
-body, when the power is applied. The earth does not always
-carry bodies with the same degree of velocity; yet we
-find the visible effects of any power applied to the same body
-to be, at all times the very same: and a bale of goods, or
-other moveable body lying in a ship is as easily removed
-from place to place, while the ship is under sail, if its motion
-be steady, as when it is fixed at anchor.</p>
-
-<p><span class="pagenum"><a name="Page_38" id="Page_38">[38]</a></span></p>
-
-<p>18. <span class="smcap gesperrt">Now</span> this experience is alone sufficient to shew to us
-the whole of this law of motion.</p>
-
-<p>19. <span class="smcap gesperrt">Since</span> we find, that the same power will always produce
-the same change in the motion of any body, whether
-that body were before moving with a swifter or slower motion;
-the change wrought in the motion of a body depends
-only on the power applied to it, without any regard to the
-body’s former motion: and therefore the degree of motion,
-which the body already possesses, having no influence on the
-power applied to disturb its operation, the effects of the
-same power will not only be the same in all degrees of motion
-of the body; but we have likewise no reason to doubt,
-but that a body perfectly at rest would receive from any power
-as much motion, as would be equivalent to the effect of the
-same power applied to that body already in motion.</p>
-
-<p>20. <span class="smcap gesperrt">Again</span>, suppose a body being at rest, any number of
-equal powers should be successively applied to it; pushing it
-forward from time to time in the same course or direction.
-Upon the application of the first power the body would begin
-to move; when the second power was applied, it appears from
-what has been said, that the motion of the body would become
-double; the third power would treble the motion of the
-body; and so on, till after the operation of the last power the
-motion of the body would be as many times the motion,
-which the first power gave it, as there are powers in number.
-and the effect of this number of powers will be always the<span class="pagenum"><a name="Page_39" id="Page_39">[39]</a></span>
-same, without any regard to the space of time taken up in
-applying them: so that greater or lesser intervals between
-the application of each of these powers will produce no difference
-at all in their effects. Since therefore the distance of
-time between the action of each power is of no consequence;
-without doubt the effect will still be the same, though the
-powers should all be applied at the very same instant; or although
-a single power should be applied equal in strength to
-the collective force of all these powers. Hence it plainly follows,
-that the degree of motion, into which any body will
-be put out of a state of rest by any power, will be proportional
-to that power. A double power will give twice the velocity,
-a treble power three times the velocity, and so on. The
-foregoing reasoning will equally take place, though the body
-were not supposed to be at rest, when the powers began to
-be applied to it; provided the direction, in which the powers
-were applied, either conspired with the action of the body, or
-was directly opposite to it. Therefore if any power be applied
-to a moving body, and act upon the body either in
-the direction wherewith the body moves, so as to accelerate
-the body; or if it act directly opposite to the motion of the
-body, so as to retard it: in both these cases the change of
-motion will be proportional to the power applied; nay, the
-augmentation of the motion in one case, and the diminution
-thereof in the other, will be equal to that degree of
-motion, into which the same power would put the body, had
-it been at rest, when the power was applied.</p>
-
-<p><span class="pagenum"><a name="Page_40" id="Page_40">[40]</a></span></p>
-
-<p>21. <span class="smcap gesperrt">Farther</span>, a power may be so applied to a moving
-body, as to act obliquely to the motion of the body. And
-the effects of such an oblique motion may be deduced from
-this observation; that as all bodies are continually moving along
-with the earth, we see that the visible effects of the same
-power are always the same, in whatever direction the power
-acts: and therefore the visible effects of any power upon a
-body, which seems only to be at rest, is always to appearance
-the same as the real effect would be upon a body truly at rest.
-Now suppose a body were moving along the line A&nbsp;B (in
-fig. 2.) and the eye accompanied it with an equal motion in
-the line C&nbsp;D equidistant from A&nbsp;B; so that when the body is
-at A, the eye shall be at C, and when the body is advanced to
-E in the line A&nbsp;B, the eye shall be advanced to F in the line
-C&nbsp;D, the distances A&nbsp;E and C&nbsp;F being equal. It is evident,
-that here the body will appear to the eye to be at rest; and
-the line F&nbsp;E&nbsp;G drawn from the eye through the body shall seem
-to the eye to be immoveable; though as the body and eye
-move forward together, this line shall really also move; so
-that when the body shall be advanced to H and the eye to K,
-the line F&nbsp;E&nbsp;G shall be transferred into the situation K&nbsp;H&nbsp;L,
-this line K&nbsp;H&nbsp;L being equidistant from F&nbsp;E&nbsp;G. Now if the body
-when at E were to receive an impulse in the direction of
-the line F&nbsp;E&nbsp;G; while the eye is moving on from F to K and
-carrying along with it the line F&nbsp;E&nbsp;G, the body will appear to
-the eye to move along this line F&nbsp;E&nbsp;G: for this is what has just
-now been said; that while bodies are moving along with the
-earth, and the spectator’s eye partakes of the same motion,
-the effect of any power upon the body will appear to be what<span class="pagenum"><a name="Page_41" id="Page_41">[41]</a></span>
-it would really have been, had the body been truly at rest,
-when the power was applied. From hence it follows, that
-when the eye is advanced to K, the body will appear somewhere
-in the line K&nbsp;H&nbsp;L. Suppose it appear in M; then it is
-manifest, from what has been premised at the beginning of
-this paragraph, that the distance H&nbsp;M is equal to what the
-body would have run upon the line E&nbsp;G, during the time,
-wherein the eye has passed from F to K, provided that the body
-had been at rest, when acted upon in E. If it be farther
-asked, after what manner the body has moved from E to M?
-I answer, through a straight line; for it has been shewn above
-in the explication of the first law of motion, that a moving
-body, from the time it is left to it self, will proceed on in
-one continued straight line.</p>
-
-<p>22. <span class="smcap gesperrt">If</span> E&nbsp;N be taken equal to H&nbsp;M and N&nbsp;M be drawn;
-since H&nbsp;M is equidistant from E&nbsp;N, N&nbsp;M will be equidistant
-from E&nbsp;H. Therefore the effect of any power upon a moving
-body, when that power acts obliquely to the motion of the
-body, is to be determined in this manner. Suppose the body
-is moving along the straight line A&nbsp;E&nbsp;B, if when the body is
-come to E, a power gives it an impulse in the direction of the
-line E&nbsp;G, to find what course the body will afterwards take
-we must proceed thus. Take in E&nbsp;B any length E&nbsp;H, and in
-E&nbsp;G take such a length E&nbsp;N, that if the body had been at rest
-in E, the power applied to it would have caused it to move
-over E&nbsp;N in the same space of time, as it would have employed
-in passing over E&nbsp;H, if the power had not acted at all upon it.
-Then draw H&nbsp;L equidistant from E&nbsp;G, and N&nbsp;M equidistant<span class="pagenum"><a name="Page_42" id="Page_42">[42]</a></span>
-from E&nbsp;B. After this, if a line be drawn from E to the
-point M, where these two lines meet, the line E&nbsp;M will be the
-course into which the body will be put by the action of the
-power upon it at E.</p>
-
-<p>23. <span class="smcap gesperrt">A mathematical</span> reader would here expect in
-some particulars more regular demonstrations; but as I do
-not at present address my self to such, so I hope, what I have
-now written will render my meaning evident enough to those,
-who are unacquainted with that kind of reasoning.</p>
-
-<p>24. <span class="smcap gesperrt">Now</span> as we have been shewing, that some actual
-force is necessary either to put bodies out of a state of rest into
-motion, or to change the motion, which they have once
-received; it is proper here to observe, that this quality in bodies,
-whereby they preserve their present state, with regard
-to motion or rest, till some active force disturb them, is called
-the <span class="smcap"><em class="gesperrt">vis inertiae</em></span> of matter: and by this property, matter,
-sluggish and unactive of it self, retains all the power impressed
-upon it, and cannot be made to cease from action, but
-by the opposition of as great a power, as that which first moved
-it. By the degree of this <span class="smcap"><em class="gesperrt">vis inertiae</em></span>, or power of inactivity,
-as we shall henceforth call it, we primarily judge of
-the quantity of solid matter in each body; for as this quality is
-inherent in all the bodies, upon which we can make any trial,
-we conclude it to be a property essential to all matter; and
-as we yet know no reason to suppose, that bodies are composed
-of different kinds of matter, we rather presume, that
-the matter of all bodies is the same; and that the degree of<span class="pagenum"><a name="Page_43" id="Page_43">[43]</a></span>
-this power of inactivity is in every body proportional to the
-quantity of the solid matter in it. But although we have no
-absolute proof, that all the matter in the universe is uniform,
-and possesses this power of inactivity in the same degree; yet
-we can with certainty compare together the different degrees
-of this power of inactivity in different bodies. Particularly
-this power is proportional to the weight of bodies, as Sir <em class="gesperrt"><span class="smcap">Isaac
-Newton</span></em> has demonstrated<a name="FNanchor_44_44" id="FNanchor_44_44"></a><a href="#Footnote_44_44" class="fnanchor">[44]</a>. However, notwithstanding
-that this power of inactivity in any body can be more certainly
-known, than the quantity of solid matter in it; yet since
-there is no reason to suspect that one is not proportional to the
-other, we shall hereafter speak without hesitation of the quantity
-of matter in bodies, as the measure of the degree of their
-power of inactivity.</p>
-
-<p>25. <span class="smcap gesperrt">This</span> being established, we may now compare the
-effects of the same power upon different bodies, as hitherto
-we have shewn the effects of different powers upon the
-same body. And here if we limit the word motion to the
-peculiar sense given to it in philosophy, we may comprehend
-all that is to be said upon this head under one short precept;
-that the same power, to whatever body it is applied, will always
-produce the same degree of motion. But here motion
-does not signify the degree of celerity or velocity with which
-a body moves, in which sense only we have hitherto used it;
-but it is made use of particularly in philosophy to signify the
-force with which a body moves: as if two bodies A and B being<span class="pagenum"><a name="Page_44" id="Page_44">[44]</a></span>
-in motion, twice the force would be required to stop A as
-to stop B, the motion of A would be esteemed double the
-motion of B. In moving bodies, these two things are carefully
-to be distinguished; their velocity or celerity, which is
-measured by the space they pass through during any determinate
-portion of time; and the quantity of their motion, or
-the force, with which they will press against any resistance.
-Which force, when different bodies move with the same velocity,
-is proportional to the quantity of solid matter in the
-bodies; but if the bodies are equal, this force is proportional
-to their respective velocities, and in other cases it is proportional
-both to the quantity of solid matter in the body, and
-also to its velocity. To instance in two bodies A and B: if A be
-twice as great as B, and they have both the same velocity, the
-motion of A shall be double the motion of B; and if the bodies
-be equal, and the velocity of A be twice that of B, the
-motion of A shall likewise be double that of B; but if A be
-twice as large as B, and move twice as swift, the motion of A
-will be four times the motion of B; and lastly, if A be twice
-as large as B, and move but half as fast, the degree of their
-motion shall be the same.</p>
-
-<p>26. <span class="smcap gesperrt">This</span> is the particular sense given to the word motion
-by philosophers, and in this sense of the word the same power
-always produces the same quantity or degree of motion. If
-the same power act upon two bodies A and B, the velocities,
-it shall give to each of them, shall be so adjusted to the respective
-bodies, that the same degree of motion shall be produced
-in each. If A be twice as great as B, its velocity shall be half<span class="pagenum"><a name="Page_45" id="Page_45">[45]</a></span>
-that of B; if A has three times as much solid matter as B, the
-velocity of A shall be one third of the velocity of B; and generally
-the velocity given to A shall bear the same proportion
-to the velocity given to B, as the quantity of solid matter contained
-in the body B bears to the quantity of solid matter contained
-in A.</p>
-
-<p>27. <span class="smcap gesperrt">The</span> reason of all this is evident from what has gone
-before. If a power were applied to B, which should bear
-the same proportion to the power applied to A, as the body B
-bears to A, the bodies B and A would both receive the same
-velocity; and the velocity, which B will receive from this
-power, will bear the same proportion to the velocity, which
-it would receive from the action of the power applied to A,
-as the former of these powers bears to the latter: that is,
-the velocity, which A receives from the power applied to it,
-will bear to the velocity, which B would receive from
-the same power, the same proportion as the body B bears
-to A.</p>
-
-<p>28. <span class="smcap gesperrt">From</span> hence we may now pass to the third law of
-motion, where this distinction between the velocity of a body
-and its whole motion is farther necessary to be regarded, as
-shall immediately be shewn; after having first illustrated the
-meaning of this law by a familiar instance. If a stone or other
-load be drawn by a horse; the load re-acts upon the horse,
-as much as the horse acts upon the load; for the harness,
-which is strained between them, presses against the horse as
-much as against the load; and the progressive motion of the<span class="pagenum"><a name="Page_46" id="Page_46">[46]</a></span>
-horse forward is hindred as much by the load, as the motion
-of the load is promoted by the endeavour of the horse: that
-is, if the horse put forth the same strength, when loosened
-from the load, he would move himself forwards with greater
-swiftness in proportion to the difference between the weight
-of his own body and the weight of himself and load together.</p>
-
-<p>29. <span class="smcap gesperrt">This</span> instance will afford some general notion of the
-meaning of this law. But to proceed to a more philosophical
-explication: if a body in motion strike against another at
-rest, let the body striking be ever so small, yet shall it communicate
-some degree of motion to the body it strikes against,
-though the less that body be in comparison of that it impinges
-upon, and the less the velocity is, with which it moves,
-the smaller will be the motion communicated. But whatever
-degree of motion it gives to the resting body, the same it
-shall lose it self. This is the necessary consequence of the
-forementioned power of inactivity in matter. For suppose
-the two bodies equal, it is evident from the time they meet,
-both the bodies are to be moved by the single motion of the
-first; therefore the body in motion by means of its power of
-inactivity retaining the motion first given it, strikes upon the
-other with the same force, wherewith it was acted upon it
-self: but now both the bodies being to be moved by that
-force, which before moved one only, the ensuing velocity
-will be the same, as if the power, which was applied to one
-of the bodies, and put it into motion, had been applied to
-both; whence it appears, that they will proceed forwards,<span class="pagenum"><a name="Page_47" id="Page_47">[47]</a></span>
-with half the velocity, which the body first in motion had:
-that is, the body first moved will have lost half its motion,
-and the other will have gained exactly as much. This rule
-is just, provided the bodies keep contiguous after meeting; as
-they would always do, if it were not for a certain cause that
-often intervenes, and which must now be explained. Bodies
-upon striking against each other, suffer an alteration in their
-figure, having their parts pressed inwards by the stroke, which
-for the most part recoil again afterwards, the bodies endeavouring
-to recover their former shape. This power, whereby
-bodies are inabled to regain their first figure, is usually called
-their elasticity, and when it acts, it forces the bodies from
-each other, and causes them to separate. Now the effect of
-this elasticity in the present case is such, that if the bodies are
-perfectly elastic, so as to recoil with as great a force as they
-are bent with, that they recover their figure in the same space
-of time, as has been taken up in the alteration made in it by
-their compression together; then this power will separate the
-bodies as swiftly, as they before approached, and acting upon
-both equally, upon the body first in motion contrary to
-the direction in which it moves, and upon the other as much
-in the direction of its motion, it will take from the first, and
-add to the other equal degrees of velocity: so that the power
-being strong enough to separate them with as great a velocity,
-as they approached with, the first will be quite stopt, and
-that which was at rest, will receive all the motion of the
-other. If the bodies are elastic in a less degree, the first will
-not lose all its motion, nor will the other acquire the motion
-of the first, but fall as much short of it, as the other retains.<span class="pagenum"><a name="Page_48" id="Page_48">[48]</a></span>
-For this rule is never deviated from, that though the degree
-of elasticity determines how much more than half its velocity
-the body first in motion shall lose; yet in every case the
-loss in the motion of this body shall be transferred to the other,
-that other body always receiving by the stroke as much motion,
-as is taken from the first.</p>
-
-<p>30. This is the case of a body striking directly against an
-equal body at rest, and the reasoning here used is fully confirmed
-by experience. There are many other cases of bodies
-impinging against one another: but the mention of these
-shall be reserved to the next chapter, where we intend to be
-more particular and diffusive in the proof of these laws of motion,
-than we have been here.</p>
-
-</div>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c48" id="c48"><span class="smcap">Chap. II.</span></a><br />
-Farther proofs of the <span class="smcap">Laws of Motion</span>.</h2>
-
-<p class="drop-cap06"><span class="gesperrt">HAVING</span> in the preceding chapter deduced the three
-laws of motion, delivered by our great philosopher,
-from the most obvious observations, that suggest them to us;
-I now intend to give more particular proofs of them, by recounting
-some of the discoveries which have been made in
-philosophy before Sir Isaac Newton. For as they were
-all collected by reasoning upon those laws; so the conformity
-of these discoveries to experience makes them so many proofs
-of the truth of the principles, from which they were derived.</p>
-
-<p><span class="pagenum"><a name="Page_49" id="Page_49">[49]</a></span></p>
-
-<p><a name="c49" id="c49"></a>2. <span class="smcap gesperrt">Let</span> us begin with the subject, which concluded the
-last chapter. Although the body in motion be not equal to
-the body at rest, on which it strikes; yet the motion after
-the stroke is to be estimated in the same manner as above.
-Let A (in fig. 3.) be a body in motion towards another body
-B lying at rest. When A is arrived at B, it cannot proceed
-farther without putting B into motion; and what motion it
-gives to B, it must lose it self, that the whole degree of motion
-of A and B together, if neither of the bodies be elastic,
-shall be equal, after the meeting of the bodies, to the single
-motion of A before the stroke. Therefore, from what has
-been said above, it is manifest, that as soon as the two bodies
-are met, they will move on together with a velocity, which
-will bear the same proportion to the original velocity of A, as
-the body A bears to the sum of both the bodies.</p>
-
-<p>3. <span class="smcap gesperrt">If</span> the bodies are elastic, so that they shall separate after
-the stroke, A must lose a greater part of its motion, and
-the subsequent motion of B will be augmented by this elasticity,
-as much as the motion of A is diminished by it. The
-elasticity acting equally between both the bodies, it will communicate
-to each the same degree of motion; that is, it will
-separate the bodies by taking from the body A and adding to
-the body B different degrees of velocity, so proportioned to
-their respective quantities of matter, that the degree of motion,
-wherewith A separates from B, shall be equal to the degree
-of motion, wherewith B separates from A. It follows
-therefore, that the velocity taken from A by the elasticity
-bears to the velocity, which the same elasticity adds to B, the<span class="pagenum"><a name="Page_50" id="Page_50">[50]</a></span>
-same proportion, as B bears to A: consequently the velocity,
-which the elasticity takes from A, will bear the same proportion
-to the whole velocity, wherewith this elasticity causes the
-two bodies to separate from each other, as the body B bears to
-the sum of the two bodies A and B; and the velocity, which
-is added to B by the elasticity, bears to the velocity, wherewith
-the bodies separate, the same proportion, as the body A
-bears to the sum of the two bodies A and B. Thus is found,
-how much the elasticity takes from the velocity of A, and
-adds to the velocity of B; provided the degree of elasticity be
-known, whereby to determine the whole velocity wherewith
-the bodies separate from each other after the stroke<a name="FNanchor_45_45" id="FNanchor_45_45"></a><a href="#Footnote_45_45" class="fnanchor">[45]</a>.</p>
-
-<p>4. <span class="smcap gesperrt">After</span> this manner is determined in every case the result
-of a body in motion striking against another at rest. The
-same principles will also determine the effects, when both
-bodies are in motion.</p>
-
-<p>5. <span class="smcap gesperrt">Let</span> two equal bodies move against each other with equal
-swiftness. Then the force, with which each of them
-presses forwards, being equal when they strike; each pressing
-in its own direction with the same energy, neither shall
-surmount the other, but both be stopt, if they be not elastic:
-for if they be elastic, they shall from thence recover new motion,
-and recede from each other, as swiftly as they met, if
-they be perfectly elastic; but more slowly, if less so. In the
-same manner, if two bodies of unequal bigness strike against
-each other, and their velocities be so related, that the velocity<span class="pagenum"><a name="Page_51" id="Page_51">[51]</a></span>
-of the lesser body shall exceed the velocity of the greater in
-the same proportion, as the greater body exceeds the lesser (for
-instance, if one body contains twice the solid matter as the other,
-and moves but half as fast) two such bodies will entirely
-suppress each other’s motion, and remain from the time of
-their meeting fixed; if, as before, they are not elastic: but,
-if they are so in the highest degree, they shall recede again,
-each with the same velocity, wherewith they met. For this
-elastic power, as in the preceding case, shall renew their motion,
-and pressing equally upon both, shall give the same motion
-to both; that is, shall cause the velocity, which the lesser
-body receives, to bear the same proportion to the velocity,
-which the greater receives, as the greater body bears to the
-lesser: so that the velocities shall bear the same proportion to
-each other after the stroke, as before. Therefore if the bodies,
-by being perfectly elastic, have the sum of their velocities
-after the stroke equal to the sum of their velocities before the
-stroke, each body after the stroke will receive its first velocity.
-And the same proportion will hold likewise between the
-velocities, wherewith they go off, though they are elastic but
-in a less degree; only then the velocity of each will be less in
-proportion to the defect of elasticity.</p>
-
-<p>6. <span class="smcap gesperrt">If</span> the velocities, wherewith the bodies meet, are not
-in the proportion here supposed; but if one of the bodies, as
-A, has a swifter velocity in comparison to the velocity of the
-other; then the effect of this excess of velocity in the body A
-must be joined to the effect now mentioned, after the manner
-of this following example. Let A be twice as great as B, and<span class="pagenum"><a name="Page_52" id="Page_52">[52]</a></span>
-move with the same swiftness as B. Here A moves with twice
-that degree of swiftness, which would answer to the forementioned
-proportion. For A being double to B, if it moved
-but with half the swiftness, wherewith B advances, it has been
-just now shewn, that the two bodies upon meeting would
-stop, if they were not elastic; and if they were elastic, that
-they would each recoil, so as to cause A to return with half
-the velocity, wherewith B would return. But it is evident
-from hence, that B by encountring A will annul half its velocity,
-if the bodies be not elastic; and the future motion of the
-bodies will be the same, as if A had advanced against B at
-rest with half the velocity here assigned to it. If the bodies
-be elastic, the velocity of A and B after the stroke may be thus
-discovered. As the two bodies advance against each other,
-the velocity, with which they meet, is made up of the velocities
-of both bodies added together. After the stroke their
-elasticity will separate them again. The degree of elasticity
-will determine what proportion the velocity, wherewith they
-separate, must bear to that, wherewith they meet. Divide
-this velocity, with which the bodies separate into two parts,
-that one of the parts bear to the other the same proportion, as
-the body A bears to B; and ascribe the lesser part to the greater
-body A, and the greater part of the velocity to the lesser
-body B. Then take the part ascribed to A from the common
-velocity, which A and B would have had after the stroke, if
-they had not been elastic; and add the part ascribed to B to
-the same common velocity. By this means the true velocities
-of A and B after the stroke will be made known.</p>
-
-<p><span class="pagenum"><a name="Page_53" id="Page_53">[53]</a></span></p>
-
-<p>7. <span class="smcap gesperrt">If</span> the bodies are perfectly elastic, the great <span class="smcap"><em class="gesperrt">Huygens</em></span>
-has laid down this rule for finding their motion after concourse<a name="FNanchor_46_46" id="FNanchor_46_46"></a><a href="#Footnote_46_46" class="fnanchor">[46]</a>.
-Any straight line C&nbsp;D (in fig. 4, 5.) being drawn,
-let it be divided in E, that C&nbsp;E bear the same proportion to
-E&nbsp;D, as the swiftness of A bore to the swiftness of B before the
-stroke. Let the same line C&nbsp;D be also divided in F, that C&nbsp;F
-bear the same proportion to F&nbsp;D, as the body B bears to the
-body A. Then F&nbsp;G being taken equal to F&nbsp;E, if the point G
-falls within the line C&nbsp;D, both the bodies shall recoil after the
-stroke, and the velocity, wherewith the body A shall return,
-will bear the same proportion to the velocity, wherewith B
-shall return, as G&nbsp;C bears to G&nbsp;D; but if the point G falls without
-the line C&nbsp;D, then the bodies after their concourse shall
-both proceed to move the same way, and the velocity of A
-shall bear to the velocity of B the same proportion, that G&nbsp;C
-bears to G&nbsp;D, as before.</p>
-
-<p>8. <span class="smcap gesperrt">If</span> the body B had stood still, and received the impulse
-of the other body A upon it; the effect has been already explained
-in the case, when the bodies are not elastic. And
-when they are elastic, the result of their collision is found by
-combining the effect of the elasticity with the other effect, in
-the same manner as in the last case.</p>
-
-<p>9. <span class="smcap gesperrt">When</span> the bodies are perfectly elastic, the rule of
-<span class="smcap"><em class="gesperrt">Huygens</em></span><a name="FNanchor_47_47" id="FNanchor_47_47"></a><a href="#Footnote_47_47" class="fnanchor">[47]</a> here is to divide the line C&nbsp;D (fig. 6.) in E as
-before, and to take E&nbsp;G equal to E&nbsp;D. And by these points<span class="pagenum"><a name="Page_54" id="Page_54">[54]</a></span>
-thus found, the motion of each body after the stroke is determined,
-as before.</p>
-
-<p>10. <span class="smcap gesperrt">In</span> the next place, suppose the bodies A and B were
-both moving the same way, but A with a swifter motion, so
-as to overtake B, and strike against it. The effect of the percussion
-or stroke, when the bodies are not elastic, is discovered
-by finding the common motion, which the two bodies
-would have after the stroke, if B were at rest, and A were to
-advance against it with a velocity equal to the excess of the
-present velocity of A above the velocity of B; and by adding
-to this common velocity thus found the velocity of B.</p>
-
-<p>11. <span class="smcap gesperrt">If</span> the bodies are elastic, the effect of the elasticity is
-to be united with this other, as in the former cases.</p>
-
-<p>12. <span class="smcap gesperrt">When</span> the bodies are perfectly elastic, the rule of
-<span class="smcap">Huygens</span><a name="FNanchor_48_48" id="FNanchor_48_48"></a><a href="#Footnote_48_48" class="fnanchor">[48]</a> in this case is to prolong C&nbsp;D (fig. 7.) and to
-take in it thus prolonged C&nbsp;E in the same proportion to E&nbsp;D,
-as the greater velocity of A bears to the lesser velocity of B;
-after which F&nbsp;G being taken equal to F&nbsp;E, the velocities of the
-two bodies after the stroke will be determined, as in the two
-preceding cases.</p>
-
-<p>13. <span class="smcap gesperrt">Thus</span> I have given the sum of what has been written
-concerning the effects of percussion, when two bodies
-freely in motion strike directly against each other; and the
-results here set down, as the consequence of our reasoning<span class="pagenum"><a name="Page_55" id="Page_55">[55]</a></span>
-from the laws of motion, answer most exactly to experience.
-A particular set of experiments has been invented to make
-trial of these effects of percussion with the greatest exactness.
-But I must defer these experiments, till I have explained the
-nature of pendulums<a name="FNanchor_49_49" id="FNanchor_49_49"></a><a href="#Footnote_49_49" class="fnanchor">[49]</a>. I shall therefore now proceed to describe
-some of the appearances, which are caused in bodies
-from the influence of the power of gravity united with the
-general laws of motion; among which the motion of the
-pendulum will be included.</p>
-
-<p><a name="c55" id="c55">14.</a> <span class="smcap gesperrt">The</span> most simple of these appearances is, when bodies
-fall down merely by their weight. In this case the body
-increases continually its velocity, during the whole time of its
-fall, and that in the very same proportion as the time increases.
-For the power of gravity acts constantly on the body with
-the same degree of strength: and it has been observed above
-in the first law of motion, that a body being once in motion
-will perpetually preserve that motion without the continuance
-of any external influence upon it: therefore, after a body has
-been once put in motion by the force of gravity, the body
-would continue that motion, though the power of gravity
-should cease to act any farther upon it; but, if the power of
-gravity continues still to draw the body down, fresh degrees
-of motion must continually be added to the body; and the
-power of gravity acting at all times with the same strength,
-equal degrees of motion will constantly be added in equal
-portions of time.</p>
-
-<p><span class="pagenum"><a name="Page_56" id="Page_56">[56]</a></span></p>
-
-<p>15. <span class="smcap gesperrt">This</span> conclusion is not indeed absolutely true: for we
-shall find hereafter<a name="FNanchor_50_50" id="FNanchor_50_50"></a><a href="#Footnote_50_50" class="fnanchor">[50]</a>, that the power of gravity is not of the
-same strength at all distances from the center of the earth. But
-nothing of this is in the least sensible in any distance, to which
-we can convey bodies. The weight of bodies is the very same
-to sense upon the highest towers or mountains, as upon the
-level ground; so that in all the observations we can make,
-the forementioned proportion between the velocity of a falling
-body and the time, in which it has been descending, obtains
-without any the least perceptible difference.</p>
-
-<p>16. <span class="smcap gesperrt">From</span> hence it follows, that the space, through which
-a body falls, is not proportional to the time of the fall; for
-since the body increases its velocity, a greater space will be
-passed over in the same portion of time at the latter part of the
-fall, than at the beginning. Suppose a body let fall from the
-point A (in fig. 8.) were to descend from A to B in any portion
-of time; then if in an equal portion of time it were to
-proceed from B to C; I say, the space B&nbsp;C is greater than A&nbsp;B;
-so that the time of the fall from A to C being double the time
-of the fall from A to B, A&nbsp;C shall be more than double of A&nbsp;B.</p>
-
-<p>17. <span class="smcap gesperrt">The</span> geometers have proved, that the spaces, through
-which bodies fall thus by their weight, are just in a duplicate
-or two-fold proportion of the times, in which the body has
-been falling. That is, if we were to take the line D&nbsp;E in the
-same proportion to A&nbsp;B, as the time, which the body has imployed
-in falling from A to C, bears to the time of the fall<span class="pagenum"><a name="Page_57" id="Page_57">[57]</a></span>
-from A to B; then A&nbsp;C will be to D&nbsp;E in the same proportion.
-In particular, if the time of the fall through A&nbsp;C be twice the
-time of the fall through A&nbsp;B; then D&nbsp;E will be twice A&nbsp;B, and
-A&nbsp;C twice D&nbsp;E; or A&nbsp;C four times A&nbsp;B. But if the time of the
-fall through A&nbsp;C had been thrice the time of the fall through
-A&nbsp;B; D&nbsp;E would have been treble of A&nbsp;B, and A&nbsp;C treble of
-D&nbsp;E; that is, A&nbsp;C would have been equal to nine times A&nbsp;B.</p>
-
-<p><a name="c57" id="c57">18.</a> <span class="smcap gesperrt">If</span> a body fall obliquely, it will approach the ground
-by slower degrees, than when it falls perpendicularly. Suppose
-two lines A&nbsp;B, A&nbsp;C (in fig. 9.) were drawn, one perpendicular,
-and the other oblique to the ground D&nbsp;E: then if a
-body were to descend in the slanting line A&nbsp;C; because the
-power of gravity draws the body directly downwards, if the
-line A&nbsp;C supports the body from falling in that manner, it
-must take off part of the effect of the power of gravity; so
-that in the time, which would have been sufficient for the
-body to have fallen through the whole perpendicular line A&nbsp;B,
-the body shall not have passed in the line A&nbsp;C a length equal
-to A&nbsp;B; consequently the line A&nbsp;C being longer than A&nbsp;B,
-the body shall most certainly take up more time in passing
-through A&nbsp;C, than it would have done in falling perpendicularly
-down through A&nbsp;B.</p>
-
-<p>19. <span class="smcap gesperrt">The</span> geometers demonstrate, that the time, in which
-the body will descend through the oblique straight line A&nbsp;C,
-bears the same proportion to the time of its descent through
-the perpendicular A&nbsp;B, as the line it self A&nbsp;C bears to A&nbsp;B.
-And in respect to the velocity, which the body will have acquired<span class="pagenum"><a name="Page_58" id="Page_58">[58]</a></span>
-in the point C, they likewise prove, that the length of
-the time imployed in the descent through A&nbsp;C so compensates
-the diminution of the influence of gravity from the obliquity
-of this line, that though the force of the power of gravity on
-the body is opposed by the obliquity of the line A&nbsp;C, yet the
-time of the body’s descent shall be so much prolonged, that
-the body shall acquire the very same velocity in the point C,
-as it would have got at the point B by falling perpendicularly
-down.</p>
-
-<p><a name="c58a" id="c58a">20.</a> <span class="smcap gesperrt">If</span> a body were to descend in a crooked line, the time
-of its descent cannot be determined in so simple a manner;
-but the same property, in relation to the velocity, is demonstrated
-to take place in all cases: that is, in whatever line the
-body descends, the velocity will always be answerable to the
-perpendicular height, from which the body has fell. For instance,
-suppose the body A (in fig. 10.) were hung by a
-string to the pin B. If this body were let fall, till it came to
-the point C perpendicularly under B, it will have moved from
-A to C in the arch of a circle. Then the horizontal line A&nbsp;D
-being drawn, the velocity of the body in C will be the same,
-as if it had fallen from the point D directly down to C.</p>
-
-<p><a name="c58b" id="c58b">21.</a> <span class="smcap gesperrt">If</span> a body be thrown perpendicularly upward with any
-force, the velocity, wherewith the body ascends, shall
-continually diminish, till at length it be wholly taken away;
-and from that time the body will begin to fall down again,
-and pass over a second time in its descent the line, wherein it
-ascended; falling through this line with an increasing velocity
-in such a manner, that in every point thereof, through<span class="pagenum"><a name="Page_59" id="Page_59">[59]</a></span>
-which it falls, it shall have the very same velocity, as it had in
-the same place, when it ascended; and consequently shall come
-down into the place, whence it first ascended, with the velocity
-which was at first given to it. Thus if a body were thrown
-perpendicularly up in the line A&nbsp;B (in fig. II.) with such a
-force, as that it should stop at the point B, and there begin
-to fall again; when it shall have arrived in its descent to any
-point as C in this line, it shall there have the same velocity,
-as that wherewith it passed by this point C in its ascent; and
-at the point A it shall have gained as great a velocity, as
-that wherewith it was first thrown upwards. As this is demonstrated
-by the geometrical writers; so, I think, it will
-appear evident, by considering only, that while the body descends,
-the power of gravity must act over again, in an inverted
-order, all the influence it had on the body in its ascent;
-so as to give again to the body the same degrees of velocity,
-which it had taken away before.</p>
-
-<p>22. <span class="smcap gesperrt">After</span> the same manner, if the body were thrown
-upwards in the oblique straight line C&nbsp;A (in fig. 9.) from the
-point C, with such a degree of velocity as just to reach the
-point A; it shall by its own weight return again through the
-line A&nbsp;C by the same degrees, as it ascended.</p>
-
-<p><a name="c59" id="c59">23.</a> <span class="smcap gesperrt">And</span> lastly, if a body were thrown with any velocity
-in a line continually incurvated upwards, the like effect will
-be produced upon its return to the point, whence it was
-thrown. Suppose for instance, the body A (in fig. 12.) were
-hung by a string A&nbsp;B. Then if this body be impelled any<span class="pagenum"><a name="Page_60" id="Page_60">[60]</a></span>
-way, it must move in the arch of a circle. Let it receive such
-an impulse, as shall cause it to move in the arch A&nbsp;C; and let
-this impulse be of such strength, that the body may be carried
-from A as far as D, before its motion is overcome by its
-weight: I say here, that the body forthwith returning from
-D, shall come again into the point A with the same velocity,
-as that wherewith it began to move.</p>
-
-<p><a name="c60" id="c60">24.</a> <span class="smcap gesperrt">It</span> will be proper in this place to observe concerning
-the power of gravity, that its force upon any body does not
-at all depend upon the shape of the body; but that it continues
-constantly the same without any variation in the same
-body, whatever change be made in the figure of the body: and
-if the body be divided into any number of pieces, all those
-pieces shall weigh just the same, as they did, when united
-together in one body: and if the body be of a uniform contexture,
-the weight of each piece will be proportional to its
-bulk. This has given reason to conclude, that the power of
-gravity acts upon bodies in proportion to the quantity of matter
-in them. Whence it should follow, that all bodies must
-fall from equal heights in the same space of time. And as
-we evidently see the contrary in feathers and such like substances,
-which fall very slowly in comparison of more solid
-bodies; it is reasonable to suppose, that some other cause concurs
-to make so manifest a difference. This cause has been
-found by particular experiments to be the air. The experiments
-for this purpose are made thus. They set up a very
-tall hollow glass; within which near the top they lodge a feather
-and some very ponderous body, usually a piece of gold,<span class="pagenum"><a name="Page_61" id="Page_61">[61]</a></span>
-this metal being the most weighty of any body known to us.
-This glass they empty of the air contained within it, and by
-moving a wire, which passes through the top of the glass, they
-let the feather and the heavy body fall together; and it is always
-found, that as the two bodies begin to descend at the
-same time, so they accompany each other in the fall, and
-come to the bottom at the very same instant, as near as the eye
-can judge. Thus, as far as this experiment can be depended
-on, it is certain, that the effect of the power of gravity upon
-each body is proportional to the quantity of solid matter, or to
-the power of inactivity in each body. For in the limited
-sense, which we have given above to the word motion, it has
-been shown, that the same force gives to all bodies the same
-degree of motion, and different forces communicate different
-degrees of motion proportional to the respective powers<a name="FNanchor_51_51" id="FNanchor_51_51"></a><a href="#Footnote_51_51" class="fnanchor">[51]</a>. In
-this case, if the power of gravity were to act equally upon the
-feather, and upon the more solid body, the solid body would
-descend so much slower than the feather, as to have no greater
-degree of motion than the feather: but as both bodies descend
-with equal swiftness, the degree of motion in the solid
-body is greater than in the feather, bearing the same proportion
-to it, as the quantity of matter in the solid body to the
-quantity of matter in the feather. Therefore the effect of
-gravity on the solid body is greater than on the feather, in proportion
-to the greater degree of motion communicated; that
-is, the effect of the power of gravity on the solid body bears
-the same proportion to its effect on the feather, as the quantity<span class="pagenum"><a name="Page_62" id="Page_62">[62]</a></span>
-of matter in the solid body bears to the quantity of matter
-in the feather. Thus it is the proper deduction from this experiment,
-that the power of gravity acts not on the surface of bodies
-only, but penetrates the bodies themselves most intimately,
-and operates alike on every particle of matter in them. But
-as the great quickness, with which the bodies fall, leaves it
-something uncertain, whether they do descend absolutely in
-the same time, or only so nearly together, that the difference
-in their swift motion is not discernable to the eye; this property
-of the power of gravity, which has here been deduced
-from this experiment, is farther confirmed by pendulums,
-whose motion is such, that a very minute difference would
-become sufficiently sensible. This will be farther discoursed
-on in another place<a name="FNanchor_52_52" id="FNanchor_52_52"></a><a href="#Footnote_52_52" class="fnanchor">[52]</a>; but here I shall make use of the principle
-now laid down to explain the nature of what is called
-the center of gravity in bodies.</p>
-
-<p><a name="c62" id="c62">25.</a> <span class="smcap gesperrt">The</span> center of gravity is that point, by which if a
-body be suspended, it shall hang at rest in any situation. In
-a globe of a uniform texture the center of gravity is the same
-with the center of the globe; for as the parts of the globe on
-every side of its center are similarly disposed, and the power
-of gravity acts alike on every part; it is evident, that the parts
-of the globe on each side of the center are drawn with equal
-force, and therefore neither side can yield to the other; but
-the globe, if supported at its center, must of necessity hang
-at rest. In like manner, if two equal bodies A and B (in<span class="pagenum"><a name="Page_63" id="Page_63">[63]</a></span>
-fig. 13.) be hung at the extremities of an inflexible rod C&nbsp;D,
-which should have no weight; these bodies, if the rod be
-supported at its middle E, shall equiponderate; and the rod
-remain without motion. For the bodies being equal and at
-the same distance from the point of support E, the power of
-gravity will act upon each with equal strength, and in all respects
-under the same circumstances; therefore the weight of
-one cannot overcome the weight of the other. The weight
-of A can no more surmount the weight of B, than the weight
-of B can surmount the weight of A. Again, suppose a body
-as A&nbsp;B (in fig. 14.) of a uniform texture in the form of a
-roller, or as it is more usually called a cylinder, lying horizontally.
-If a straight line be drawn between C and D, the
-centers of the extreme circles of this cylinder; and if this
-straight line, commonly called the axis of the cylinder, be
-divided into two equal parts in E: this point E will be the
-center of gravity of the cylinder. The cylinder being a uniform
-figure, the parts on each side of the point E are equal, and
-situated in a perfectly similar manner; therefore this cylinder,
-if supported at the point E, must hang at rest, for the
-same reason as the inflexible rod above-mentioned will remain
-without motion, when suspended at its middle point. And
-it is evident, that the force applied to the point E, which
-would uphold the cylinder, must be equal to the cylinder’s
-weight. Now suppose two cylinders of equal thickness A&nbsp;B
-and C&nbsp;D to be joined together at C&nbsp;B, so that the two axis’s
-E&nbsp;F, and F&nbsp;G lie in one straight line. Let the axis E&nbsp;F be divided
-into two equal parts at H, and the axis F&nbsp;G into two<span class="pagenum"><a name="Page_64" id="Page_64">[64]</a></span>
-equal parts at I. Then because the cylinder A&nbsp;B would be
-upheld at rest by a power applied in H equal to the weight of
-this cylinder, and the cylinder C&nbsp;D would likewise be upheld
-by a power applied in I equal to the weight of this cylinder;
-the whole cylinder A&nbsp;D will be supported by these two powers:
-but the whole cylinder may likewise be supported by a power
-applied to K, the middle point of the whole axis E&nbsp;G, provided
-that power be equal to the weight of the whole cylinder. It
-is evident therefore, that this power applied in K will produce
-the same effect, as the two other powers applied in H and I. It
-is farther to be observed, that H&nbsp;K is equal to half F&nbsp;G, and
-K&nbsp;I equal to half E&nbsp;F; for E&nbsp;K being equal to half E&nbsp;G, and E&nbsp;H
-equal to half E&nbsp;F, the remainder H&nbsp;K must be equal to half
-the remainder F&nbsp;G; so likewise G&nbsp;K being equal to half G&nbsp;E,
-and G&nbsp;I equal to half G&nbsp;F, the remainder I&nbsp;K must be equal to
-half the remainder E&nbsp;F. It follows therefore, that H&nbsp;K bears
-the same proportion to K&nbsp;I, as F&nbsp;G bears to E&nbsp;F. Besides, I
-believe, my readers will perceive, and it is demonstrated in
-form by the geometers, that the whole body of the cylinder
-C&nbsp;D bears the same proportion to the whole body of the cylinder
-A&nbsp;B, as the axis F&nbsp;G bears to the axis E&nbsp;F<a name="FNanchor_53_53" id="FNanchor_53_53"></a><a href="#Footnote_53_53" class="fnanchor">[53]</a>. But hence
-it follows, that in the two powers applied at H and I, the
-power applied at H bears the same proportion to the power
-applied at I, as K&nbsp;I bears to K&nbsp;H. Now suppose two strings
-H&nbsp;L and I&nbsp;M extended upwards, one from the point H and the
-other from I, and to be laid hold on by two powers, one
-strong enough to hold up the cylinder A&nbsp;B, and the other of<span class="pagenum"><a name="Page_65" id="Page_65">[65]</a></span>
-strength sufficient to support the cylinder C&nbsp;D. Here as these
-two powers uphold the whole cylinder, and therefore produce
-an effect, equal to what would have been produced by
-a power applied to the point K of sufficient force to sustain the
-whole cylinder: it is manifest, that if the cylinder be taken
-away, the axis only being left, and from the point K a string,
-as K&nbsp;N, be extended, which shall be drawn down by a power
-equivalent to the weight of the cylinder, this power shall act
-against the other two powers, as much as the cylinder acted
-against them; and consequently these three powers shall be
-upon a balance, and hold the axis H&nbsp;I fixed between them.
-But if these three powers preserve a mutual balance, the
-two powers applied to the strings H&nbsp;L and I&nbsp;M are a balance
-to each other; the power applied to the string H&nbsp;L bearing
-the same proportion to the power applied to the string I&nbsp;M,
-as the distance I&nbsp;K bears to the distance K&nbsp;H.  Hence it farther
-appears, that if an inflexible rod A&nbsp;B (in fig. 15.) be
-suspended by any point C not in the middle thereof; and if
-at A the end of the shorter arm be hung a weight, and at B
-the end of the longer arm be also hung a weight less than
-the other, and that the greater of these weights bears to the
-lesser the same proportion, as the longer arm of the rod bears
-to the shorter; then these two weights will equiponderate:
-for a power applied at C equal to both these weights will support
-without motion the rod thus charged; since here nothing
-is changed from the preceding case but the situation
-of the powers, which are now placed on the contrary
-sides of the line, to which they are fixed. Also for the<span class="pagenum"><a name="Page_66" id="Page_66">[66]</a></span>
-same reason, if two weights A and B (in fig. 16.) were connected
-together by an inflexible rod C&nbsp;D, drawn from C the
-center of gravity of A to D the center of gravity of B; and
-if the rod C&nbsp;D were to be so divided in E, that the part D&nbsp;E
-bear the same proportion to the other part C&nbsp;E, as the weight
-A bears to the weight B: then this rod being supported at E
-will uphold the weights, and keep them at rest without motion.
-This point E, by which the two bodies A and B will be
-supported, is called their common center of gravity. And if
-a greater number of bodies were joined together, the point, by
-which they could all be supported, is called the common center
-of gravity of them all. Suppose (in fig. 17.) there were three
-bodies A, B, C, whose respective centers of gravity were joined
-by the three lines D&nbsp;E, D&nbsp;F, E&nbsp;F: the line D&nbsp;E being so divided
-in G, that D&nbsp;G bear the same proportion to G&nbsp;E, as B bears to
-A; G is the center of gravity common to the two bodies A
-and B; that is, a power equal to the weight of both the bodies
-applied to G would support them, and the point G is
-pressed as much by the two weights A and B, as it would be,
-if they were both hung together at that point. Therefore,
-if a line be drawn from G to F, and divided in H, so that G&nbsp;H
-bear the same proportion to H&nbsp;F, as the weight C bears to
-both the weights A and B, the point H will be the common
-center of gravity of all the three weights; for H would be
-their common center of gravity, if both the weights A and B
-were hung together at G, and the point G is pressed as much
-by them in their present situation, as it would be in that case.
-In the same manner from the common center of these three<span class="pagenum"><a name="Page_67" id="Page_67">[67]</a></span>
-weights, you might proceed to find the common center, if a
-fourth weight were added, and by a gradual progress might
-find the common center of gravity belonging to any number
-of weights whatever.</p>
-
-<p>26. <span class="smcap gesperrt">As</span> all this is the obvious consequence of the proposition
-laid down for assigning the common center of gravity of
-any two weights, by the same proposition the center of gravity
-of all figures is found. In a triangle, as A&nbsp;B&nbsp;C (in
-fig. 18.) the center of gravity lies in the line drawn from the
-middle point of any one of the sides to the opposite angle,
-as the line B&nbsp;D is drawn from D the middle of the line A&nbsp;C to
-the opposite angle B<a name="FNanchor_54_54" id="FNanchor_54_54"></a><a href="#Footnote_54_54" class="fnanchor">[54]</a>; so that if from the middle of either
-of the other sides, as from the point E in the side A&nbsp;B, a line
-be drawn, as E&nbsp;C, to the opposite angle; the point F, where
-this line crosses the other line B&nbsp;D, will be the center of gravity
-of the triangle<a name="FNanchor_55_55" id="FNanchor_55_55"></a><a href="#Footnote_55_55" class="fnanchor">[55]</a>. Likewise D&nbsp;F is equal to half F&nbsp;B, and
-E&nbsp;F equal to half F&nbsp;C<a name="FNanchor_56_56" id="FNanchor_56_56"></a><a href="#Footnote_56_56" class="fnanchor">[56]</a>. In a hemisphere, as A&nbsp;B&nbsp;C (fig. 19.)
-if from D the center of the base the line D&nbsp;B be erected perpendicular
-to that base, and this line be so divided in E, that
-D&nbsp;E be equal to three fifths of B&nbsp;E, the point E is the center of
-gravity of the hemisphere<a name="FNanchor_57_57" id="FNanchor_57_57"></a><a href="#Footnote_57_57" class="fnanchor">[57]</a>.</p>
-
-<p>27. <span class="smcap gesperrt">It</span> will be of use to observe concerning the center of
-gravity of bodies; that since a power applied to this center
-alone can support a body against the power of gravity, and<span class="pagenum"><a name="Page_68" id="Page_68">[68]</a></span>
-hold it fixed at rest; the effect of the power of gravity on a
-body is the same, as if that whole power were to exert itself
-on the center of gravity only. Whence it follows, that, when
-the power of gravity acts on a body suspended by any point,
-if the body is so suspended, that the center of gravity of the
-body can descend; the power of gravity will give motion to
-that body, otherwise not: or if a number of bodies are so
-connected together, that, when any one is put into motion,
-the rest shall, by the manner of their being joined, receive
-such motion, as shall keep their common center of gravity at
-rest; then the power of gravity shall not be able to produce
-any motion in these bodies, but in all other cases it will.
-Thus, if the body A&nbsp;B (in fig. 20, 21.) whose center of gravity
-is C, be hung on the point A, and the center C be perpendicularly
-under A (as in fig. 20.) the weight of the body
-will hold it still without motion, because the center C
-cannot descend any lower. But if the body be removed into
-any other situation, where the center C is not perpendicularly
-under A (as in fig. 21.) the body by its weight will
-be put into motion towards the perpendicular situation of its
-center of gravity. Also if two bodies A, B (in fig. 22.) be
-joined together by the rod C&nbsp;D lying in an horizontal situation,
-and be supported at the point E; if this point be the
-center of gravity common to the two bodies, their weight
-will not put them into motion; but if this point E is not their
-common center of gravity, the bodies will move; that part
-of the rod C&nbsp;D descending, in which the common center of
-gravity is found. So in like manner, if these two bodies were
-connected together by any more complex contrivance; yet<span class="pagenum"><a name="Page_69" id="Page_69">[69]</a></span>
-if one of the bodies cannot move without so moving the
-other, that their common center of gravity shall rest, the
-weight of the bodies will not put them in motion, otherwise
-it will.</p>
-
-<p><a name="c69" id="c69">28.</a> <span class="smcap gesperrt">I shall</span> proceed in the next place to speak of the mechanical
-powers. These are certain instruments or machines,
-contrived for the moving great weights with small force; and
-their effects are all deducible from the observation we have
-just been making. They are usually reckoned in number
-five; the lever, the wheel and axis, the pulley, the wedge,
-and the screw; to which some add the inclined plane. As
-these instruments have been of very ancient use, so the celebrated
-<em class="gesperrt"><span class="smcap">Archimedes</span></em> seems to have been the first, who discovered
-the true reason of their effects. This, I think, may be
-collected from what is related of him, that some expressions,
-which he used to denote the unlimited force of these instruments,
-were received as very extraordinary paradoxes:
-whereas to those, who had understood the cause of their
-great force, no expressions of that kind could have appeared
-surprizing.</p>
-
-<p>29. <span class="smcap gesperrt">All</span> the effects of these powers may be judged of by
-this one rule, that, when two weights are applied to any of
-these instruments, the weights will equiponderate, if, when
-put into motion, their velocities will be reciprocally proportional
-to their respective weights. And what is said of weights,
-must of necessity be equally understood of any other forces<span class="pagenum"><a name="Page_70" id="Page_70">[70]</a></span>
-equivalent to weights, such as the force of a man’s arm, a
-stream of water, or the like.</p>
-
-<p>30. <span class="smcap gesperrt">But</span> to comprehend the meaning of this rule, the
-reader must know, what is to be understood by reciprocal
-proportion; which I shall now endeavour to explain, as distinctly
-as I can; for I shall be obliged very frequently to
-make use of this term. When any two things are so related,
-that one increases in the same proportion as the other, they are
-directly proportional. So if any number of men can perform
-in a determined space of time a certain quantity of any work,
-suppose drain a fish-pond, or the like; and twice the number
-of men can perform twice the quantity of the same work,
-in the same time; and three times the number of men can
-perform as soon thrice the work; here the number of men
-and the quantity of the work are directly proportional. On
-the other hand, when two things are so related, that one decreases
-in the same proportion, as the other increases, they
-are said to be reciprocally proportional. Thus if twice the
-number of men can perform the same work in half the time,
-and three times the number of men can finish the same in a
-third part of the time; then the number of men and the
-time are reciprocally proportional. We shewed above<a name="FNanchor_58_58" id="FNanchor_58_58"></a><a href="#Footnote_58_58" class="fnanchor">[58]</a> how
-to find the common center of gravity of two bodies, there
-the distances of that common center from the centers of gravity
-of the two bodies are reciprocally proportional to the respective
-bodies.  For C&nbsp;E in fig. 16. being in the same proportion<span class="pagenum"><a name="Page_71" id="Page_71">[71]</a></span>
-to E&nbsp;D, as B bears to A; C&nbsp;E is so much greater in
-proportion than E&nbsp;D, as A is less in proportion than B.</p>
-
-<p>31. <span class="smcap gesperrt">Now</span> this being understood, the reason of the rule
-here stated will easily appear. For if these two bodies were
-put in motion, while the point E rested, the velocity, wherewith
-A would move, would bear the same proportion to the
-velocity, wherewith B would move, as E&nbsp;C bears to E&nbsp;D. The
-velocity therefore of each body, when the common center
-of gravity rests, is reciprocally proportional to the body. But
-we have shewn above<a name="FNanchor_59_59" id="FNanchor_59_59"></a><a href="#Footnote_59_59" class="fnanchor">[59]</a>, that if two bodies are so connected together,
-that the putting them in motion will not move their
-common center of gravity; the weight of those bodies will
-not produce in them any motion. Therefore in any of these
-mechanical engines, if, when the bodies are put into motion,
-their velocities are reciprocally proportional to their respective
-weights, whereby the common center of gravity would remain
-at rest; the bodies will not receive any motion from their
-weight, that is, they will equiponderate. But this perhaps
-will be yet more clearly conceived by the particular description
-of each mechanical power.</p>
-
-<p><a name="c71" id="c71">32.</a> <span class="smcap gesperrt">The</span> lever was first named above. This is a bar made
-use of to sustain and move great weights. The bar is applied
-in one part to some strong support; as the bar A&nbsp;B (in
-fig. 23, 24.) is applied at the point C to the support D. In
-some other part of the bar, as E, is applied the weight to be
-sustained or moved; and in a third place, as F, is applied another
-weight or equivalent force, which is to sustain or move<span class="pagenum"><a name="Page_72" id="Page_72">[72]</a></span>
-the weight at E. Now here, if, when the level should be
-put in motion, and turned upon the point C, the velocity,
-wherewith the point F would move, bears the same proportion
-to the velocity, wherewith the point E would move, as
-the weight at E bears to the weight or force at F; then the
-lever thus charged will have no propensity to move either
-way. If the weight or other force at F be not so great as to
-bear this proportion, the weight at E will not be sustained;
-but if the force at F be greater than this, the weight at E will
-be surmounted. This is evident from what has been said
-above<a name="FNanchor_60_60" id="FNanchor_60_60"></a><a href="#Footnote_60_60" class="fnanchor">[60]</a>, when the forces at E and F are placed (as in fig. 23.)
-on different sides of the support D. It will appear also equally
-manifest in the other case, by continuing the bar B&nbsp;C in
-fig. 24. on the other side of the support D, till C&nbsp;G be equal
-to C&nbsp;F, and by hanging at G a weight equivalent to the power
-at F; for then, if the power at F were removed, the two
-weights at G and E would counterpoize each other, as in
-the former case: and it is evident, that the point F will
-be lifted up by the weight at G with the same degree of
-force, as by the other power applied to F; since, if the
-weight at E were removed, a weight hung at F equal to
-that at G would balance the lever, the distances C&nbsp;G and
-C&nbsp;F being equal.</p>
-
-<p>33. <span class="smcap gesperrt">If</span> the two weights, or other powers, applied to the
-lever do not counterbalance each other; a third power may
-be applied in any place proposed of the lever, which shall<span class="pagenum"><a name="Page_73" id="Page_73">[73]</a></span>
-hold the whole in a just counterpoize. Suppose (in fig. 25.)
-the two powers at E and F did not equiponderate, and it were
-required to apply a third power to the point G, that might be
-sufficient to balance the lever. Find what power in F would
-just counterbalance the power in E; then if the difference
-between this power and that, which is actually applied at F,
-bear the same proportion to the third power to be applied at
-G, as the distance C&nbsp;G bears to C&nbsp;F; the lever will be counterpoized
-by the help of this third power, if it be so applied
-as to act the same way with the power in F, when that power
-is too small to counterbalance the power in E; but otherwise
-the power in G must be so applied, as to act against the
-power in F. In like manner, if a lever were charged with three,
-or any greater number of weights or other powers, which did
-not counterpoize each other, another power might be applied
-in any place proposed, which should bring the whole to a
-just balance. And what is here said concerning a plurality of
-powers, may be equally applied to all the following cases.</p>
-
-<p>34. <span class="smcap gesperrt">If</span> the lever should consist of two arms making an
-angle at the point C (as in fig. 26.) yet if the forces are applied
-perpendicularly to each arm, the same proportion will
-hold between the forces applied, and the distances of the center,
-whereon the lever rests, from the points to which they
-are applied. That is, the weight at E will be to the force in
-F in the same proportion, as C&nbsp;F bears to C&nbsp;E.</p>
-
-<p>35. <span class="smcap gesperrt">But</span> whenever the forces applied to the lever act obliquely
-to the arm, to which they are applied (as in fig. 27.)<span class="pagenum"><a name="Page_74" id="Page_74">[74]</a></span>
-then the strength of the forces is to be estimated by lines let
-fall from the center of the lever to the directions, wherein the
-forces act. To balance the levers in fig. 27, the weight or
-other force at F will bear the same proportion to the weight
-at E, as the distance C&nbsp;E bears to C&nbsp;G the perpendicular let fall
-from the point C upon the line, which denotes the direction
-wherein the force applied to F acts: for here, if the lever be
-put into motion, the power applied to F will begin to move in
-the direction of the line F&nbsp;G; and therefore its first motion will
-be the same, as the motion of the point G.</p>
-
-<p>36. <span class="smcap gesperrt">When</span> two weights hang upon a lever, and the point,
-by which the lever is supported, is placed in the middle between
-the two weights, that the arms of the lever are both
-of equal length; then this lever is particularly called a balance;
-and equal weights equiponderate as in common scales.
-When the point of support is not equally distant from both
-weights, it constitutes that instrument for weighing, which
-is called a steelyard. Though both in common scales, and the
-steelyard, the point, on which the beam is hung, is not usually
-placed just in the same straight line with the points, that
-hold the weights, but rather a little above (as in fig. 28.)
-where the lines drawn from the point C, whereon the beam
-is suspended, to the points E and F, on which the weights are
-hung, do not make absolutely one continued line. If the
-three points E, C, and F were in one straight line, those weights,
-which equiponderated, when the beam hung horizontally,
-would also equiponderate in any other situation.</p>
-
-<div class="figcenter">
-     <img src="images/ill-125.jpg" width="400" height="513"
-         alt=""
-         title="" />
-</div>
-
-<p>But we see in these instruments, when they are charged with weights,
-<span class="pagenum"><a name="Page_75" id="Page_75">[75]</a></span>which equiponderate with the beam hanging horizontally;
-that, if the beam be inclined either way, the weight most
-elevated surmounts the other, and descends, causing the beam
-to swing, till by degrees it recovers its horizontal position.
-This effect arises from the forementioned structure: for by
-this structure these instruments are levers composed of two
-arms, which make an angle at the point of support (as in
-fig. 29, 30.) the first of which represents the case of the
-common balance, the second the case of the steelyard. In
-the first, where C&nbsp;E and C&nbsp;F are equal, equal weights hung
-at E and F will equiponderate, when the points E and F are
-in an horizontal situation. Suppose the lines E&nbsp;G and F&nbsp;H to
-be perpendicular to the horizon, then they will denote the directions,
-wherein the forces applied to E and F act. Therefore
-the proportion between the weights at E and F, which
-shall equiponderate, are to be judged of by perpendiculars,
-as C&nbsp;I, C&nbsp;K, let fall from C upon E&nbsp;G and F&nbsp;H: so that the
-weights being equal, the lines C&nbsp;I, C&nbsp;K, must be equal also,
-when the weights equiponderate. But I believe my readers
-will easily see, that since C&nbsp;E and C&nbsp;F are equal, the lines
-C&nbsp;I and C&nbsp;K will be equal, when the points E and F are horizontally
-situated.</p>
-
-<p>37. <span class="smcap gesperrt">If</span> this lever be set into any other position (as in
-fig. 31.) then the weight, which is raised highest, will outweigh
-the other. Here, if the point F be raised higher than
-E, the perpendicular C&nbsp;K will be longer than C&nbsp;I: and therefore
-the weights would equiponderate, if the weight at F<span class="pagenum"><a name="Page_76" id="Page_76">[76]</a></span>
-were less than the weight at E. But the weight at F is equal
-to that at E; therefore is greater, than is necessary to counterbalance
-the weight at E, and consequently will outweigh it,
-and draw the beam of the lever down.</p>
-
-<p>38. <span class="smcap gesperrt">In</span> like manner in the case of the steelyard (fig. 32.)
-if the weights at E and F are so proportioned, as to equiponderate,
-when the points E and F are horizontally situated;
-then in any other situation of this lever the weight, which is
-raised highest, will preponderate. That is, if in the horizontal
-situation of the points E and F the weight at F bears
-the same proportion to the weight at E, as C&nbsp;I bears to C&nbsp;K;
-then, if the point F be raised higher than E (as in fig. 32.)
-the weight at F shall bear a greater proportion to the weight
-at E, than C&nbsp;I bears to C&nbsp;K.</p>
-
-<p>39. <span class="smcap gesperrt">Farther</span> a lever may be hung upon an axis, and
-then the two arms of the lever need not be continuous, but
-fixed to different parts of this axis; as in fig. 33, where
-the axis A&nbsp;B is supported by its two extremities A and B. To
-this axis one arm of the lever is fixed at the point C, the other
-at the point D. Now here, if a weight be hung at E, the
-extremity of that arm, which is fixed to the axis at the point
-C; and another weight be hung at F, the extremity of the
-arm, which is fixed on the axis at D; then these weights
-will equiponderate, when the weight at E bears the same
-proportion to the weight at F, as the arm D&nbsp;F bears to
-C&nbsp;E.</p>
-
-<p><span class="pagenum"><a name="Page_77" id="Page_77">[77]</a></span></p>
-
-<p>40. <span class="smcap gesperrt">This</span> is the case, if both the arms are perpendicular
-to the axis, and lie (as the geometers express themselves)
-in the same plane; or, in other words, if the arms are so fixed
-perpendicularly upon the axis, that, when one of them
-lies horizontally, the other shall also be horizontal.  If either
-arm stand not perpendicular to the axis; then, in determining
-the proportion between the weights, instead of the
-length of that arm, you must use the perpendicular let fall
-upon the axis from the extremity of that arm.  If the arms
-are not so fixed as to become horizontal, at the same time;
-the method of assigning the proportion between the weights
-is analogous to that made use of above in levers, which make
-an angle at the point, whereon they are supported.</p>
-
-<p><a name="c77" id="c77">41.</a> <span class="smcap gesperrt">From</span> this case of the lever hung on an axis, it is easy
-to make a transition to another mechanical power, the
-wheel and axis.</p>
-
-<p>42. <span class="smcap gesperrt">This</span> instrument is a wheel fixed on a roller, the
-roller being supported at each extremity so as to turn
-round freely with the wheel, in the manner represented in
-fig. 34, where A&nbsp;B is the wheel, C&nbsp;D the roller, and E&nbsp;F its
-two supports. Now suppose a weight G hung by a cord
-wound round the roller, and another weight H hung by a
-cord wound about the wheel the contrary way: that these
-weights may support each other, the weight H must bear the
-same proportion to the weight G, as the thickness of the roller
-bears to the diameter of the wheel.</p>
-
-<p><span class="pagenum"><a name="Page_78" id="Page_78">[78]</a></span></p>
-
-<p>43. <span class="smcap gesperrt">Suppose</span> the line <i>k&nbsp;l</i> to be drawn through the middle
-of the roller; and from the place of the roller, where
-the cord, on which the weight G hangs, begins to leave the
-roller, as at <i>m</i>, let the line<i> m&nbsp;n</i> be drawn perpendicularly to
-<i>k&nbsp;l</i>; and from the point, where the cord holding the weight
-H begins to leave the wheel, as at <i>o</i>, let the line <i>o&nbsp;p</i> be drawn
-perpendicular to <i>k&nbsp;l</i>. This being done, the two lines <i>o&nbsp;p</i>
-and <i>m&nbsp;n</i> represent two arms of a lever fixed on the axis <i>k&nbsp;l</i>;
-consequently the weight H will bear to the weight G the same
-proportion, as <i>m&nbsp;n</i> bears to <i>o&nbsp;p</i>. But <i>m&nbsp;n</i> bears the same proportion
-to <i>o&nbsp;p</i>, as the thickness of the roller bears to the diameter
-of the wheel; for <i>m&nbsp;n</i> is half the thickness of the roller,
-and <i>o&nbsp;p</i> half the diameter of the wheel.</p>
-
-<p>44. <span class="smcap gesperrt">If</span> the wheel be put into motion, and turned once
-round, that the cord, on which the weight G hangs, be
-wound once more round the axis; then at the same time the
-cord, whereon the weight H hangs, will be wound off from
-the wheel one circuit. Therefore the velocity of the weight
-G will bear the same proportion to the velocity of the weight
-H, as the circumference of the roller to the circumference of
-the wheel. But the circumference of the roller bears the same
-proportion to the circumference of the wheel, as the thickness
-of the roller bears to the diameter of the wheel, consequently
-the velocity of the weight G bears to the velocity
-of the weight H the same proportion, as the thickness of
-the roller bears to the diameter of the wheel, which is the
-proportion that the weight H bears to the weight G. Therefore
-as before in the lever, so here also the general rule laid<span class="pagenum"><a name="Page_79" id="Page_79">[79]</a></span>
-down above is verified, that the weights equiponderate, when
-their velocities would be reciprocally proportional to their
-respective weights.</p>
-
-<p>45. <span class="smcap gesperrt">In</span> like manner, if on the same axis two wheels of different
-sizes are fixed (as in fig. 35.) and a weight hung on
-each; the weights will equiponderate, if the weight hung on
-the greater wheel bear the same proportion to the weight hung
-on the lesser, as the diameter of the lesser wheel bears to the
-diameter of the greater.</p>
-
-<p>46. <span class="smcap gesperrt">It</span> is usual to join many wheels together in the same
-frame, which by the means of certain teeth, formed in the circumference
-of each wheel, shall communicate motion to each
-other. A machine of this nature is represented in fig. 36. Here
-A&nbsp;B&nbsp;C is a winch, upon which is fixed a small wheel D indented
-with teeth, which move in the like teeth of a larger wheel
-E&nbsp;F fixed on the axis G&nbsp;H. Let this axis carry another wheel
-I, which shall move in like manner a greater wheel K&nbsp;L fixed
-on the axis M&nbsp;N. Let this axis carry another small wheel O,
-which after the same manner shall turn about a larger wheel
-P&nbsp;Q fixed on the roller R&nbsp;S, on which a cord shall be wound,
-that holds a weight, as T. Now the proportion required between
-the weight T and a power applied to the winch at A
-sufficient to support the weight, will most easily be estimated,
-by computing the proportion, which the velocity of the point
-A would bear to the velocity of the weight. If the winch be
-turned round, the point A will describe a circle as A&nbsp;V. Suppose
-the wheel E&nbsp;F to have ten times the number of teeth, as<span class="pagenum"><a name="Page_80" id="Page_80">[80]</a></span>
-the wheel D; then the winch must turn round ten times to
-carry the wheel E&nbsp;F once round. If wheel K&nbsp;L has also ten
-times the number of teeth, as I, the wheel I must turn round
-ten times to carry the wheel K&nbsp;L once round; and consequently
-the winch A&nbsp;B&nbsp;C must turn round an hundred times
-to turn the wheel K&nbsp;L once round. Lastly, if the wheel P&nbsp;Q
-has ten times the number of teeth, as the wheel O, the winch
-must turn about one thousand times in order to turn the wheel
-P&nbsp;Q, or the roller R&nbsp;S once round. Therefore here the point
-A must have gone over the circle A&nbsp;V a thousand times, in order
-to lift the weight T through a space equal to the circumference
-of the roller R&nbsp;S: whence it follows, that the power
-applied at A will balance the weight T, if it bear the same
-proportion to it, as the circumference of the roller to one
-thousand times the circle A&nbsp;V; or the same proportion as half
-the thickness of the roller bears to one thousand times A&nbsp;B.</p>
-
-<p><a name="c80" id="c80">47.</a> <span class="smcap gesperrt">I shall</span> now explain the effect of the pulley. Let
-a weight hang by a pulley, as in fig. 37. Here it is evident,
-that the power A, by which the weight B is supported,
-must be equal to the weight; for the cord C&nbsp;D is equally
-strained between them; and if the weight B move, the power
-A must move with equal velocity. The pulley E has no other
-effect, than to permit the power A to act in another direction,
-than it must have done, if it had been directly applied to support
-the weight without the intervention of any such instrument.</p>
-
-<p>48. <span class="smcap gesperrt">Again</span>, let a weight be supported, as in fig. 38;
-where the weight A is fixed to the pulley B, and the cord, by<span class="pagenum"><a name="Page_81" id="Page_81">[81]</a></span>
-which the weight is upheld, is annexed by one extremity to a
-hook C, and at the other end is held by the power D. Here
-the weight is supported by a cord doubled; insomuch that
-although the cord were not strong enough to hold the weight
-single, yet being thus doubled it might support it. If the
-end of the cord held by the power D were hung on the hook
-C, as well as the other end; then, when both ends of the cord
-were tied to the hook, it is evident, that the hook would
-bear the whole weight; and each end of the string would
-bear against the hook with the force of half the weight only,
-seeing both ends together bear with the force of the whole.
-Hence it is evident, that, when the power D holds one end of
-the weight, the force, which it must exert to support the
-weight, must be equal to just half the weight. And the same
-proportion between the weight and power might be collected
-from comparing the respective velocities, with which they
-would move; for it is evident, that the power must move
-through a space equal to twice the distance of the pulley from
-the hook, in order to lift the pulley up to the hook.</p>
-
-<p>49. <span class="smcap gesperrt">It</span> is equally easy to estimate the effect, when many
-pulleys are combined together, as in fig. 39, 40; in the first
-of which the under set of pulleys, and consequently the
-weight is held by six strings; and in the latter figure by five:
-therefore in the first of these figures the power to support the
-weight, must be one sixth part only of the weight, and in
-the latter figure the power must be one fifth part.</p>
-
-<p><span class="pagenum"><a name="Page_82" id="Page_82">[82]</a></span></p>
-
-<p>50. <span class="smcap gesperrt">There</span> are two other ways of supporting a weight
-by pulleys, which I shall particularly consider.</p>
-
-<p>51. <span class="smcap gesperrt">One</span> of these ways is represented in fig. 41. Here the
-weight being connected to the pulley B, a power equal to
-half the weight A would support the pulley C, if applied immediately
-to it. Therefore the pulley C is drawn down
-with a force equal to half the weight A. But if the pulley D
-were to be immediately supported by half the force, with
-which the pulley C is drawn down, this pulley D will uphold
-the pulley C; so that if the pulley D be upheld with a force
-equal to one fourth part of the weight A, that force will support
-the weight. But, for the same reason as before, if the
-power in E be equal to half the force necessary to uphold the
-pulley D; this pulley, and consequently the weight A, will
-be upheld: therefore, if the power in E be one eighth part
-of the weight A, it will support the weight.</p>
-
-<p>52. <span class="smcap gesperrt">Another</span> way of applying pulleys to a weight is
-represented in fig. 42. To explain the effect of pulleys thus
-applied, it will be proper to consider different weights hanging,
-as in fig. 43. Here, if the power and weights balance each
-other, the power A is equal to the weight B; the weight C is
-equal to twice the power A, or the weight B; and for the same
-reason the weight D is equal to twice the weight C, or equal
-to four times the power A. It is evident therefore, that all
-the three weights B, C, D together are equal to seven times the
-power A. But if these three weights were joined in one, they
-would produce the case of fig. 40: so that in that figure the<span class="pagenum"><a name="Page_83" id="Page_83">[83]</a></span>
-weight A, where there are three pulleys, is seven times the
-power B. If there had been but two pulleys, the weight would
-have been three times the power; and if there had been four
-pulleys, the weight would have been fifteen times the power.</p>
-
-<p><a name="c83a" id="c83a">53.</a> <span class="smcap gesperrt">The</span> wedge is next to be considered. The form of
-this instrument is sufficiently known. When it is put under
-any weight (as in fig. 44.) the force, with which the wedge
-will lift the weight, when drove under it by a blow upon the
-end A&nbsp;B, will bear the same proportion to the force, wherewith
-the blow would act on the weight, if directly applied to
-it; as the velocity, which the wedge receives from the blow,
-bears to the velocity, wherewith the weight is lifted by the
-wedge.</p>
-
-<p><a name="c83b" id="c83b">54.</a> <span class="smcap gesperrt">The</span> screw is the fifth mechanical power. There are
-two ways of applying this instrument. Sometimes it is screwed
-into a hole, as in fig. 45, where the screw A&nbsp;B is screwed
-through the plank C&nbsp;D. Sometimes the screw is applied to
-the teeth of a wheel, as in fig. 46, where the thread of the
-screw A&nbsp;B turns in the teeth of a wheel C&nbsp;D. In both these
-cases, if a bar, as A&nbsp;E, be fixed to the end A of the screw; the
-force, wherewith the end B of the screw in fig. 45 is
-forced down, and the force, wherewith the teeth of the
-wheel C&nbsp;D in fig. 44 are held, bears the same proportion
-to the power applied to the end E of the bar; as the velocity,
-wherewith the end E will move, when the screw is turned,
-bears to the velocity, wherewith the end B of the screw in fig.
-43, or the teeth of the wheel C&nbsp;D in fig. 46, will be moved.</p>
-
-<p><span class="pagenum"><a name="Page_84" id="Page_84">[84]</a></span></p>
-
-<p><a name="c84" id="c84">55.</a> <span class="smcap gesperrt">The</span> inclined plane affords also a means of raising
-a weight with less force, than what is equal to the weight it
-self. Suppose it were required to raise the globe A (in fig.
-47.) from the ground B&nbsp;C up to the point, whose perpendicular
-height from the ground is E&nbsp;D. If this globe be drawn
-along the slant D&nbsp;F, less force will be required to raise it, than
-if it were lifted directly up. Here if the force applied to the
-globe bear the same proportion only to its weight, as E&nbsp;D bears
-to F&nbsp;D, it will be sufficient to hold up the globe; and therefore
-any addition to that force will put it in motion, and draw
-it up; unless the globe, by pressing against the plane, whereon
-it lies, adhere in some degree to the plane. This indeed
-it must always do more or less, since no plane can be made so
-absolutely smooth as to have no inequalities at all; nor yet so
-infinitely hard, as not to yield in the least to the pressure of the
-weight. Therefore the globe cannot be laid on such a plane,
-whereon it will slide with perfect freedom, but they must in
-some measure rub against each other; and this friction will
-make it necessary to imploy a certain degree of force more,
-than what is necessary to support the globe, in order to give
-it any motion. But as all the mechanical powers are subject
-in some degree or other to the like impediment from friction;
-I shall here only shew what force would be necessary to sustain
-the globe, if it could lie upon the plane without causing
-any friction at all. And I say, that if the globe were
-drawn by the cord G&nbsp;H, lying parallel to the plane D&nbsp;F; and
-the force, wherewith the cord is pulled, bear the same
-proportion to the weight of the globe, as E&nbsp;D bears to D&nbsp;F;<span class="pagenum"><a name="Page_85" id="Page_85">[85]</a></span>
-this force will sustain the globe. In order to the making
-proof of this, let the cord G&nbsp;H be continued on, and turned
-over the pulley I, and let the weight K be hung to it.
-Now I say, if this weight bears the same proportion to
-the globe A, as D&nbsp;E bears to D&nbsp;F, the weight will support
-the globe. I think it is very manifest, that the center of the
-globe A will lie in one continued line with the cord H&nbsp;G. Let
-L be the center of the globe, and M the center of gravity of
-the weight K. In the first place let the weight hang so, that
-a line drawn from L to M shall lie horizontally; and I say,
-if the globe be moved either up or down the plane D&nbsp;F, the
-weight will so move along with it, that the center of gravity
-common to both the weights shall continue in this line L&nbsp;M,
-and therefore shall in no case descend. To prove this more
-fully, I shall depart a little from the method of this treatise,
-and make use of a mathematical proportion or two: but they
-are such, as any person, who has read <span class="smcap"><em class="gesperrt">Euclid’s Elements</em></span>,
-will fully comprehend; and are in themselves so evident, that,
-I believe, my readers, who are wholly strangers to geometrical
-writings, will make no difficulty of admitting them. This
-being premised, let the globe be moved up, till its center be
-at G, then will M the center of gravity of the weight K be
-sunk to N; so that M&nbsp;N shall be equal to G&nbsp;L. Draw N&nbsp;G
-crossing the line M&nbsp;L in O; then I say, that O is the common
-center of gravity of the two weights in this their new situation.
-Let G&nbsp;P be drawn perpendicular to M&nbsp;L; then G&nbsp;L will
-bear the same proportion to G&nbsp;P, as D&nbsp;F bears to D&nbsp;E; and
-M&nbsp;N being equal to G&nbsp;L, M&nbsp;N will bear the same proportion<span class="pagenum"><a name="Page_86" id="Page_86">[86]</a></span>
-to G&nbsp;P, as D&nbsp;F bears to D&nbsp;E. But N&nbsp;O bears the same proportion
-to O&nbsp;G, as M&nbsp;N bears to G&nbsp;P; consequently N&nbsp;O will bear
-the same proportion to O&nbsp;G, as D&nbsp;F bears to D&nbsp;E. In the last
-place, the weight of the globe A bears the same proportion to
-the other weight K, as D&nbsp;F bears to D&nbsp;E; therefore N&nbsp;O bears
-the same proportion to O&nbsp;G, as the weight of the globe A bears
-to the weight K. Whence it follows, that, when the center
-of the globe A is in G, and the center of gravity of the weight
-K is in N, O will be the center of gravity common to both
-the weights. After the same manner, if the globe had been
-caused to descend, the common center of gravity would have
-been found in this line M&nbsp;L. Since therefore no motion of
-the globe either way will make the common center of gravity
-descend, it is manifest, from what has been said above, that
-the weights A and K counterpoize each other.</p>
-
-<p><a name="c86a" id="c86a">56.</a> <span class="smcap gesperrt">I shall</span> now consider the case of pendulums. A
-pendulum is made by hanging a weight to a line, so that it
-may swing backwards and forwards. This motion the geometers
-have very carefully considered, because it is the most
-commodious instrument of any for the exact measurement of
-time.</p>
-
-<p><a name="c86b" id="c86b">57.</a> <span class="smcap gesperrt">I have</span> observed already<a name="FNanchor_61_61" id="FNanchor_61_61"></a><a href="#Footnote_61_61" class="fnanchor">[61]</a>, that if a body hanging
-perpendicularly by a string, as the body A (in fig. 48.) hangs
-by the string A&nbsp;B, be put so into motion, as to be made to ascend
-up the circular arch A&nbsp;C; then as soon as it has arrived<span class="pagenum"><a name="Page_87" id="Page_87">[87]</a></span>
-at the highest point, to which the motion, that the body has
-received, will carry it; it will immediately begin to descend,
-and at A will receive again as great a degree of motion, as it
-had at first. This motion therefore will carry the body up
-the arch A&nbsp;D, as high as it ascended before in the arch A&nbsp;C.
-Consequently in its return through the arch D&nbsp;A it will acquire
-again at A its original velocity, and advance a second time up
-the arch A&nbsp;C as high as at first; by this means continuing without
-end its reciprocal motion. It is true indeed, that in fact
-every pendulum, which we can put in motion, will gradually
-lessen its swing, and at length stop, unless there be some
-power constantly applied to it, whereby its motion shall be
-renewed; but this arises from the resistance, which the body
-meets with both from the air, and the string by which it is
-hung: for as the air will give some obstruction to the progress
-of the body moving through it; so also the string, whereon
-the body hangs, will be a farther impediment; for this string
-must either slide on the pin, whereon it hangs, or it must bend
-to the motion of the weight; in the first there must be some
-degree of friction, and in the latter the string will make some
-resistance to its inflection. However, if all resistance could
-be removed, the motion of a pendulum would be perpetual.</p>
-
-<p>58. <span class="smcap gesperrt">But</span> to proceed, the first property, I shall take notice
-of in this motion, is, that the greater arch the pendulous
-body moves through, the greater time it takes up: though
-the length of time does not increase in so great a proportion
-as the arch. Thus if C&nbsp;D be a greater arch, and E&nbsp;F a lesser,
-where C&nbsp;A is equal to A&nbsp;D, and E&nbsp;A equal to A&nbsp;F; the body,<span class="pagenum"><a name="Page_88" id="Page_88">[88]</a></span>
-when it swings through the greater arch C&nbsp;D, shall take up in
-its swing from C to D a longer time than in swinging from E
-to F, when it moves only in that lesser arch; or the time in
-which the body let fall from C will descend through the arch
-C&nbsp;A is greater than the time, in which it will descend through
-the arch E&nbsp;A, when let fall from E. But the first of these
-times will not hold the same proportion to the latter, as the
-first arch C&nbsp;A bears to the other arch E&nbsp;A; which will appear
-thus. Let C&nbsp;G and E&nbsp;H be two horizontal lines. It has been
-remarked above<a name="FNanchor_62_62" id="FNanchor_62_62"></a><a href="#Footnote_62_62" class="fnanchor">[62]</a>, that the body in falling through the arch
-C&nbsp;A will acquire as great a velocity at the point A, as it would
-have gained by falling directly down through G&nbsp;A; and in
-falling through the arch E&nbsp;A it will acquire in the point A only
-that velocity, which it would have got in falling through
-H&nbsp;A. Therefore, when the body descends through the greater
-arch C&nbsp;A, it shall gain a greater velocity, than when it passes
-only through the lesser; so that this greater velocity will in
-some degree compensate the greater length of the arch.</p>
-
-<p>59. <span class="smcap gesperrt">The</span> increase of velocity, which the body acquires
-in falling from a greater height, has such an effect, that, if
-straight lines be drawn from A to C and E, the body would
-fall through the longer straight line C&nbsp;A just in the same time,
-as through the shorter straight line E&nbsp;A. This is demonstrated
-by the geometers, who prove, that if any circle, as A&nbsp;B&nbsp;C&nbsp;D
-(fig. 49.) be placed in a perpendicular situation; a body
-shall fall obliquely through every line, as A&nbsp;B drawn from the
-lowest point A in the circle to any other point in the circumference<span class="pagenum"><a name="Page_89" id="Page_89">[89]</a></span>
-just in the same time, as would be imployed by the
-body in falling perpendicularly down through the diameter
-C&nbsp;A. But the time in which the body will descend through
-the arch, is different from the time, which it would take up
-in falling through the line A&nbsp;B.</p>
-
-<p>60. <span class="smcap gesperrt">It</span> has been thought by some, that because in very
-small arches this correspondent straight line differs but little
-from the arch itself; therefore the descent through this
-straight line would be performed in such small arches nearly
-in the same time as through the arches themselves: so that
-if a pendulum were to swing in small arches, half the time
-of a single swing would be nearly equal to the time, in which
-a body would fall perpendicularly through twice the length
-of the pendulum. That is, the whole time of the swing, according
-to this opinion, will be four fold the time required
-for the body to fall through half the length of the pendulum;
-because the time of the body’s falling down twice the
-length of the pendulum is half the time required for the fall
-through one quarter of this space, that is through half the
-pendulum’s length. However there is here a mistake; for
-the whole time of the swing, when the pendulum moves
-through small arches, bears to the time required for a body
-to fall down through half the length of the pendulum very
-nearly the same proportion, as the circumference of a circle
-bears to its diameter; that is very nearly the proportion of
-355 to 113, or little more than the proportion of 3 to 1.
-If the pendulum takes so great a swing, as to pass over an arch
-equal to one sixth part of the whole circumference of the<span class="pagenum"><a name="Page_90" id="Page_90">[90]</a></span>
-circle, it will swing 115 times, while it ought according to
-this proportion to have swung 117 times; so that, when it
-swings in so large an arch, it loses something less than two
-swings in an hundred. If it swing through 1/10 only of the
-circle, it shall not lose above one vibration in 160. If it
-swing in 1/20 of the circle, it shall lose about one vibration in
-690. If its swing be confined to 1/40 of the whole circle, it
-shall lose very little more than one swing in 2600. And
-if it take no greater a swing than through 1/60 of the whole circle,
-it shall not lose one swing in 5800.</p>
-
-<p>61. <span class="smcap gesperrt">Now</span> it follows from hence, that, when pendulums
-swing in small arches, there is very nearly a constant proportion
-observed between the time of their swing, and the time,
-in which a body would fall perpendicularly down through
-half their length. And we have declared above, that the
-spaces, through which bodies fall, are in a two fold proportion
-of the times, which they take up in falling<a name="FNanchor_63_63" id="FNanchor_63_63"></a><a href="#Footnote_63_63" class="fnanchor">[63]</a>. Therefore
-in pendulums of different lengths, swinging through small
-arches, the lengths of the pendulums are in a two fold or
-duplicate proportion of the times, they take in swinging;
-so that a pendulum of four times the length of another shall
-take up twice the time in each swing, one of nine times the
-length will make one swing only for three swings of the
-shorter, and so on.</p>
-
-<p>62. <span class="smcap gesperrt">This</span> proportion in the swings of different pendulums
-not only holds in small arches; but in large ones also,<span class="pagenum"><a name="Page_91" id="Page_91">[91]</a></span>
-provided they be such, as the geometers call similar; that
-is, if the arches bear the same proportion to the whole circumferences
-of their respective circles. Suppose (in fig. 48.)
-A&nbsp;B, C&nbsp;D to be two pendulums. Let the arch E&nbsp;F be described
-by the motion of the pendulum A&nbsp;B, and the arch G&nbsp;H
-be described by the pendulum C&nbsp;D; and let the arch E&nbsp;F bear
-the same proportion to the whole circumference, which
-would be formed by turning the pendulum A&nbsp;B quite round
-about the point A, as the arch G&nbsp;H bears to the whole circumference,
-that would be formed by turning the pendulum
-C&nbsp;D quite round the point C. Then I say, the proportion,
-which the length of the pendulum A&nbsp;B bears to the
-length of the pendulum C&nbsp;D, will be two fold of the proportion,
-which the time taken up in the description of the arch
-E&nbsp;F bears to the time employed in the description of the arch
-G&nbsp;H.</p>
-
-<p><a name="c91" id="c91">63.</a> <span class="smcap gesperrt">Thus</span> pendulums, which swing in very small arches,
-are nearly an equal measure of time. But as they are not such
-an equal measure to geometrical exactness; the mathematicians
-have found out a method of causing a pendulum so to swing,
-that, if its motion were not obstructed by any resistance, it
-would always perform each swing in the same time, whether
-it moved through a greater, or a lesser space. This was first
-discovered by the great <span class="smcap"><em class="gesperrt">Huygens</em></span>, and is as follows. Upon
-the straight line A&nbsp;B (in fig. 49.) let the circle C&nbsp;D&nbsp;E be so
-placed, as to touch the straight line in the point C. Then let
-this circle roll along upon the straight line A&nbsp;B, as a coach-wheel
-rolls along upon the ground. It is evident, that, as<span class="pagenum"><a name="Page_92" id="Page_92">[92]</a></span>
-soon as ever the circle begins to move, the point C in the circle
-will be lifted off from the straight line A&nbsp;B; and in the
-motion of the circle will describe a crooked course, which is
-represented by the line C&nbsp;F&nbsp;G&nbsp;H. Here the part C&nbsp;H of the
-straight line included between the two extremities C and H
-of the line C&nbsp;F&nbsp;G&nbsp;H will be equal to the whole circumference
-of the circle C&nbsp;D&nbsp;E; and if C&nbsp;H be divided into two equal
-parts at the point I, and the straight line I&nbsp;K be drawn perpendicular
-to C&nbsp;H, this line I&nbsp;K will be equal to the diameter
-of the circle C&nbsp;D&nbsp;E. Now in this line if a body were to be
-let fall from the point H, and were to be carried by its weight
-down the line H&nbsp;G&nbsp;K, as far as the point K, which is the lowest
-point of the line C&nbsp;F&nbsp;G&nbsp;H; and if from any other point G a
-body were to be let fall in the same manner; this body,
-which falls from G, will take just the same time in coming to
-K, as the body takes up, which falls from H. Therefore if
-a pendulum can be so hung, that the ball shall move in the
-line A&nbsp;G&nbsp;F&nbsp;E, all its swings, whether long or short, will be performed
-in the same time; for the time, in which the ball
-will descend to the point K, is always half the time of the
-whole swing. But the ball of a pendulum will be made to
-swing in this line by the following means. Let K&nbsp;I (in fig.
-52.) be prolonged upwards to L, till I&nbsp;L is equal to I&nbsp;K.
-Then let the line L&nbsp;M&nbsp;H equal and like to K&nbsp;H be applied, as
-in the figure between the points L and H, so that the point
-which in this line L&nbsp;M&nbsp;H answers to the point H in the line
-K&nbsp;H shall be applied to the point L, and the point answering
-to the point K shall be applied to the point H. Also let such
-another line L&nbsp;N&nbsp;C be applied between L and C in the same<span class="pagenum"><a name="Page_93" id="Page_93">[93]</a></span>
-manner. This preparation being made; if a pendulum be
-hung at the point L of such a length, that the ball thereof
-shall reach to K; and if the string shall continually bend against
-the lines H&nbsp;M&nbsp;L and L&nbsp;N&nbsp;C, as the pendulum swings
-to and fro; by this means the ball shall constantly keep in
-the line C&nbsp;K&nbsp;H.</p>
-
-<p><a name="c93" id="c93">64.</a> <span class="smcap gesperrt">Now</span> in this pendulum, as all the swings, whether
-long or short, will be performed in the same time; so the time
-of each will exactly bear the same proportion to the time required
-for a body to fall perpendicularly down, through half
-the length of the pendulum, that is from I to K, as the circumference
-of a circle bears to its diameter.</p>
-
-<p>65. <span class="smcap gesperrt">It</span> may from hence be understood in some measure,
-why, when pendulums swing in circular arches, the times of
-their swings are nearly equal, if the arches are small, though
-those arches be of very unequal lengths; for if with the semidiameter
-L&nbsp;K the circular arch O&nbsp;K&nbsp;P be described, this arch
-in the lower part of it will differ very little from the line
-C&nbsp;K&nbsp;H.</p>
-
-<p>66. <span class="smcap gesperrt">It</span> may not be amiss here to remark, that a body
-will fall in this line C&nbsp;K&nbsp;H (fig. 53.) from C to any other
-point, as Q or R in a shorter space of time, than if it moved
-through the straight line drawn from C to the other point;
-or through any other line whatever, that can be drawn between
-these two points.</p>
-
-<p><span class="pagenum"><a name="Page_94" id="Page_94">[94]</a></span></p>
-
-<p>67. <span class="smcap gesperrt">But</span> as I have observed, that the time, which a pendulum
-takes in swinging, depends upon its length; I shall
-now say something concerning the way, in which this length
-of the pendulum is to be estimated. If the whole ball of the
-pendulum could be crouded into one point, this length, by
-which the motion of the pendulum is to be computed, would
-be the length of the string or rod. But the ball of the pendulum
-must have a sensible magnitude, and the several parts
-of this ball will not move with the same degree of swiftness;
-for those parts, which are farthest from the point, whereon
-the pendulum is suspended, must move with the greatest velocity.
-Therefore to know the time in which the pendulum
-swings, it is necessary to find that point of the ball, which
-moves with the same degree of velocity, as if the whole ball
-were to be contracted into that point.</p>
-
-<p><a name="c94" id="c94">68.</a> <span class="smcap gesperrt">This</span> point is not the center of gravity, as I shall now
-endeavour to shew. Suppose the pendulum A&nbsp;B (in fig. 54.)
-composed of an inflexible rod A&nbsp;C and ball C&nbsp;B, to be fixed
-on the point A, and lifted up into an horizontal situation.
-Here if the rod were not fixed to the point A, the body C&nbsp;B
-would descend directly with the whole force of its weight;
-and each part of the body would move down with the same
-degree of swiftness. But when the rod is fixed at the point
-A, the body must fall after another manner; for the parts
-of the body must move with different degrees of velocity,
-the parts more remote from A descending with a swifter motion,
-than the parts nearer to A; so that the body will receive
-a kind of rolling motion while it descends. But it has
-been observed above, that the effect of gravity upon any body
-is the same, as if the whole force were exerted on the body’s
-center of gravity<a name="FNanchor_64_64" id="FNanchor_64_64"></a><a href="#Footnote_64_64" class="fnanchor">[64]</a>.</p>
-
-<div class="figcenter">
-     <img src="images/ill-147.jpg" width="400" height="499"
-         alt=""
-         title="" />
-</div>
-
-<p><span class="pagenum"><a name="Page_95" id="Page_95">[95]</a></span></p>
-
-<p>Since therefore the power of gravity
-in drawing down the body must also communicate to it the
-rolling motion just described; it seems evident, that the center
-of gravity of the body cannot be drawn down as swiftly,
-as when the power of gravity has no other effect to produce
-on the body, than merely to draw it downward. If therefore
-the whole matter of the body C&nbsp;B could be crouded into
-its center of gravity, so that being united into one point, this
-rolling motion here mentioned might give no hindrance to
-its descent; this center would descend faster, than it can now
-do. And the point, which now descends as fast, as if the
-whole matter or the body C&nbsp;B were crouded into it, will be
-farther removed from the point A, than the center of gravity
-of the body C&nbsp;B.</p>
-
-<p>69. <span class="smcap gesperrt">Again</span>, suppose the pendulum A&nbsp;B (in fig. 55.) to
-hang obliquely. Here the power of gravity will operate less
-upon the ball of the pendulum, than before: but the line D&nbsp;E
-being drawn so, as to stand perpendicular to the rod A&nbsp;C of
-the pendulum; the force of gravity upon the body C&nbsp;B,
-now it is in this situation, will produce the same effect, as
-if the body were to glide down an inclined plane in the position
-of D&nbsp;E. But here the motion of the body, when the
-rod is fixed to the point A, will not be equal to the uninterrupted
-descent of the body down this plane; for the body<span class="pagenum"><a name="Page_96" id="Page_96">[96]</a></span>
-will here also receive the same kind of rotation in its motion,
-as before; so that the motion of the center of gravity will in
-like manner be retarded; and the point, which here descends
-with that degree of swiftness, which the body would
-have, if not hindered by being fixed to the point A; that is,
-the point, which descends as fast, as if the whole body were
-crouded into it, will be as far removed from the point A, as
-before.</p>
-
-<p>70. <span class="smcap gesperrt">This</span> point, by which the length of the pendulum is
-to be estimated, is called the center of oscillation. And the
-mathematicians have laid down general directions, whereby
-to find this center in all bodies. If the globe A&nbsp;B (in fig. 56.)
-be hung by the string C&nbsp;D, whose weight need not be regarded,
-the center of oscillation is found thus. Let the
-straight line drawn from C to D be continued through the
-globe to F. That it will pass through the center of the globe
-is evident. Suppose E to be this center of the globe; and
-take the line G of such a length, that it shall bear the same
-proportion to E&nbsp;D, as E&nbsp;D bears to E&nbsp;C. Then E&nbsp;H being
-made equal to ⅖ of G, the point H shall be the center of oscillation<a name="FNanchor_65_65" id="FNanchor_65_65"></a><a href="#Footnote_65_65" class="fnanchor">[65]</a>.
-If the weight of the rod C&nbsp;D is too considerable
-to be neglected, divide C&nbsp;D (fig. 57) in I, that D&nbsp;I be equal
-to ⅓, part of C&nbsp;D; and take K in the same proportion to C&nbsp;I, as
-the weight of the globe A&nbsp;B to the weight of the rod C&nbsp;D.
-Then having found H, the center of oscillation of the globe, as
-before, divide I&nbsp;K in I, so that I&nbsp;L shall bear the same proportion<span class="pagenum"><a name="Page_97" id="Page_97">[97]</a></span>
-to L&nbsp;H, as the line C&nbsp;H bears to K; and L shall be
-the center of oscillation of the whole pendulum.</p>
-
-<p>71. <span class="smcap gesperrt">This</span> computation is made upon supposition, that the
-center of oscillation of the rod C&nbsp;D, if that were to swing alone
-without any other weight annexed, would be the point I.
-And this point would be the true center of oscillation, so far
-as the thickness of the rod is not to be regarded. If any one
-chuses to take into consideration the thickness of the rod, he
-must place the center of oscillation thereof so much below
-the point I, that eight times the distance of the center from
-the point I shall bear the same proportion to the thickness of
-the rod, as the thickness of the rod bears to its length C&nbsp;D<a name="FNanchor_66_66" id="FNanchor_66_66"></a><a href="#Footnote_66_66" class="fnanchor">[66]</a>.</p>
-
-<p>72. <span class="smcap gesperrt">It</span> has been observed above, that when a pendulum
-swings in an arch of a circle, as here in fig. 58, the pendulum
-A&nbsp;B swings in the circular arch C&nbsp;D; if you draw an horizontal
-line, as E&nbsp;F, from the place whence the pendulum is
-let fall, to the line A&nbsp;G, which is perpendicular to the horizon:
-then the velocity, which the pendulum will acquire in coming
-to the point G, will be the same, as any body would acquire
-in falling directly down from F to G. Now this is to be
-understood of the circular arch, which is described by the center
-of oscillation of the pendulum. I shall here farther observe,
-that if the straight line E&nbsp;G be drawn from the point,
-whence the pendulum falls, to the lowest point of the arch;
-in the same or in equal pendulums the velocity, which the<span class="pagenum"><a name="Page_98" id="Page_98">[98]</a></span>
-pendulum acquires in G, is proportional to this line: that is, if
-the pendulum, after it has descended from E to G, be taken
-back to H, and let fall from thence, and the line H&nbsp;G be
-drawn; the velocity, which the pendulum shall acquire in
-G by its descent from H, shall bear the same proportion to
-the velocity, which it acquires in falling from E to G, as the
-straight line H&nbsp;G bears to the straight line E&nbsp;G.</p>
-
-<p><a name="c98" id="c98">73.</a> <span class="smcap gesperrt">We</span> may now proceed to those experiments upon the
-percussion of bodies, which I observed above might be
-made with pendulums. This expedient for examining the
-effects of percussion was first proposed by our late great
-architect Sir <span class="smcap"><em class="gesperrt">Christopher Wren</em></span>. And it is as follows.
-Two balls, as A and B (in fig. 59.) either equal or unequal,
-are hung by two strings from two points C and D, so
-that, when the balls hang down without motion, they shall
-just touch each other, and the strings be parallel. Here if
-one of these balls be removed to any distance from its perpendicular
-situation, and then let fall to descend and strike against
-the other; by the last preceding paragraph it will be
-known, with what velocity this ball shall return into its first
-perpendicular situation, and consequently with what force it
-shall strike against the other ball; and by the height to which
-this other ball ascends after the stroke, the velocity communicated
-to this ball will be discovered. For instance, let the
-ball A be taken up to E, and from thence be let fall to strike
-against B, passing over in its descent the circular arch E&nbsp;F.
-By this impulse let B fly up to G, moving through the circular
-arch H&nbsp;G. Then E&nbsp;I and G&nbsp;K being drawn horizontally,<span class="pagenum"><a name="Page_99" id="Page_99">[99]</a></span>
-the ball A will strike against B with the velocity, which it
-would acquire in falling directly down from I; and the ball
-B has received a velocity, wherewith, if it had been thrown
-directly upward, it would have ascended up to K. Likewise
-if straight lines be drawn from E to F and from H to G, the
-velocity of A, wherewith it strikes, will bear the same proportion
-to the velocity, which B has received by the blow, as
-the straight line E&nbsp;F bears to the straight line H&nbsp;G. In the
-same manner by noting the place to which A ascends after the
-stroke, its remaining velocity may be compared with that,
-wherewith it struck against B. Thus may be experimented
-the effects of the body A striking against B at rest. If both
-the bodies are lifted up, and so let fall as to meet and impinge
-against each other just upon the coming of both into their
-perpendicular situation; by observing the places into which
-they move after the stroke, the effects of their percussion in
-all these cases may be found in the same manner as before.</p>
-
-<p>74. <span class="smcap gesperrt">Sir <em class="gesperrt">Isaac Newton</em></span> has described these experiments;
-and has shewn how to improve them to a greater exactness by
-making allowance for the resistance, which the air gives to
-the motion of the balls<a name="FNanchor_67_67" id="FNanchor_67_67"></a><a href="#Footnote_67_67" class="fnanchor">[67]</a>. But as this resistance is exceeding
-small, and the manner of allowing for it is delivered by himself
-in very plain terms, I need not enlarge upon it here. I
-shall rather speak to a discovery, which he made by these experiments
-upon the elasticity of bodies. It has been explained
-above<a name="FNanchor_68_68" id="FNanchor_68_68"></a><a href="#Footnote_68_68" class="fnanchor">[68]</a>, that when two bodies strike, if they be not elastic,<span class="pagenum"><a name="Page_100" id="Page_100">[100]</a></span>
-they remain contiguous after the stroke; but that if they are
-elastic, they separate, and that the degree of their elasticity
-determines the proportion between the celerity wherewith
-they separate, and the celerity wherewith they meet. Now
-our author found, that the degree of elasticity appeared in
-the same bodies always the same, with whatever degree of
-force they struck; that is, the celerity wherewith they separated,
-always bore the same proportion to the celerity
-wherewith they met: so that the elastic power in all the bodies,
-he made trial upon, exerted it self in one constant proportion
-to the compressing force. Our author made trial
-with balls of wool bound up very compact, and found the
-celerity with which they receded, to bear about the proportion
-of 5 to 9 to the celerity wherewith they met; and in
-steel he found nearly the same proportion; in cork the elasticity
-was something less; but in glass much greater; for the
-celerity, wherewith balls of that material separated after percussion,
-he found to bear the proportion of 15 to 16 to the
-celerity wherewith they met<a name="FNanchor_69_69" id="FNanchor_69_69"></a><a href="#Footnote_69_69" class="fnanchor">[69]</a>.</p>
-
-<p><a name="c100" id="c100">75.</a> <span class="smcap gesperrt">I shall</span> finish my discourse on pendulums, with
-this farther observation only, that the center of oscillation is
-also the center of another force. If a body be fixed to any
-point, and being put in motion turns round it; the body, if
-uninterrupted by the power of gravity or any other means,
-will continue perpetually to move about with the same equable
-motion.  Now the force, with which such a body<span class="pagenum"><a name="Page_101" id="Page_101">[101]</a></span>
-moves, is all united in the point, which in relation to the
-power of gravity is called the center of oscillation. Let the
-cylinder A&nbsp;B&nbsp;C&nbsp;D (in fig. 60.) whose axis is E&nbsp;F, be fixed to
-the point E. And supposing the point E to be that on which
-the cylinder is suspended, let the center of oscillation be
-found in the axis E&nbsp;F, as has been explained above<a name="FNanchor_70_70" id="FNanchor_70_70"></a><a href="#Footnote_70_70" class="fnanchor">[70]</a>. Let G
-be that center: then I say, that the force, wherewith this cylinder
-turns round the point E, is so united in the point G, that
-a sufficient force applied in that point shall stop the motion of
-the cylinder, in such a manner, that the cylinder should immediately
-remain without motion, though it were to be loosened
-from the point E at the same instant, that the impediment
-was applied to G: whereas, if this impediment had been
-applied to any other point of the axis, the cylinder would
-turn upon the point, where the impediment was applied. If
-the impediment had been applied between E and G, the cylinder
-would so turn on the point, where the impediment
-was applied, that the end B&nbsp;C would continue to move on
-the same way it moved before along with the whole cylinder;
-but if the impediment were applied to the axis farther off from
-E than G, the end A&nbsp;D of the cylinder would start out of its
-present place that way in which the cylinder moved. From
-this property of the center of oscillation, it is also called the
-center of percussion. That excellent mathematician, Dr. <span class="smcap">Brook
-Taylor</span>, has farther improved this doctrine concerning the
-center of percussion, by shewing, that if through this point
-G a line, as G&nbsp;H&nbsp;I, be drawn perpendicular to E&nbsp;F, and lying<span class="pagenum"><a name="Page_102" id="Page_102">[102]</a></span>
-in the course of the body’s motion; a sufficient power applied
-to any point of this line will have the same effect, as the
-like power applied to G<a name="FNanchor_71_71" id="FNanchor_71_71"></a><a href="#Footnote_71_71" class="fnanchor">[71]</a>: so that as we before shewed the
-center of percussion within the body on its axis; by this means
-we may find this center on the surface of the body also, for
-it will be where this line H&nbsp;I crosses that surface.</p>
-
-<p><a name="c102" id="c102">76.</a> <span class="smcap gesperrt">I shall</span> now proceed to the last kind of motion, to
-be treated on in this place, and shew what line the power of
-gravity will cause a body to describe, when it is thrown forwards
-by any force. This was first discovered by the great
-<span class="smcap"><em class="gesperrt">Galileo</em></span>, and is the principle, upon which engineers
-should direct the shot of great guns. But as in this case bodies
-describe in their motion one of those lines, which in geometry
-are called conic sections; it is necessary here to premise
-a description of those lines. In which I shall be the
-more particular, because the knowledge of them is not only
-necessary for the present purpose, but will be also required
-hereafter in some of the principal parts of this treatise.</p>
-
-<p>77. <span class="smcap gesperrt">The</span> first lines considered by the ancient geometers
-were the straight line and the circle. Of these they composed
-various figures, of which they demonstrated many properties,
-and resolved divers problems concerning them. These
-problems they attempted always to resolve by the describing
-straight lines and circles. For instance, let a square A&nbsp;B&nbsp;C&nbsp;D
-(fig. 61.) be proposed, and let it be required to make another<span class="pagenum"><a name="Page_103" id="Page_103">[103]</a></span>
-square in any assigned proportion to this. Prolong one
-side, as D&nbsp;A, of this square to E, till A&nbsp;E bear the same proportion
-to A&nbsp;D, as the new square is to bear to the square A&nbsp;C.
-If the opposite side B&nbsp;C of the square A&nbsp;C be also prolonged
-to F, till B&nbsp;F be equal to A&nbsp;E, and E&nbsp;F be afterwards drawn,
-I suppose my readers will easily conceive, that the figure A&nbsp;B&nbsp;F&nbsp;E
-will bear to the square A&nbsp;B&nbsp;C&nbsp;D the same proportion, as the line
-A&nbsp;E bears to the line A&nbsp;D. Therefore the figure A&nbsp;B&nbsp;F&nbsp;E will
-be equal to the new square, which is to be found, but is not
-it self a square, because the side A&nbsp;E is not of the same length
-with the side E&nbsp;F. But to find a square equal to the figure
-A&nbsp;B&nbsp;F&nbsp;E you must proceed thus. Divide the line D&nbsp;E into two
-equal parts in the point G, and to the center G with the interval
-G&nbsp;D describe the circle D&nbsp;H&nbsp;E&nbsp;I; then prolong the line A&nbsp;B,
-till it meets the circle in K; and make the square A&nbsp;K&nbsp;L&nbsp;M, which
-square will be equal to the figure A&nbsp;B&nbsp;F&nbsp;E, and bear to the square
-A&nbsp;B&nbsp;C&nbsp;D the same proportion, as the line A&nbsp;E bears to A&nbsp;D.</p>
-
-<p>78. <span class="smcap gesperrt">I shall</span> not proceed to the proof of this, having
-only here set it down as a specimen of the method of resolving
-geometrical problems by the description of straight lines
-and circles. But there are some problems, which cannot be
-resolved by drawing straight lines or circles upon a plane. For
-the management therefore of these they took into consideration
-solid figures, and of the solid figures they found that,
-which is called a cone, to be the most useful.</p>
-
-<p><span class="pagenum"><a name="Page_104" id="Page_104">[104]</a></span></p>
-
-<p>79. <span class="smcap gesperrt">A cone</span> is thus defined by <span class="smcap">Euclide</span> in his elements
-of geometry<a name="FNanchor_72_72" id="FNanchor_72_72"></a><a href="#Footnote_72_72" class="fnanchor">[72]</a>. If to the straight line A&nbsp;B (in fig. 62.)
-another straight line, as A&nbsp;C, be drawn perpendicular, and the
-two extremities B and C be joined by a third straight line
-composing the triangle A&nbsp;C&nbsp;B (for so every figure is called,
-which is included under three straight lines) then the two
-points A and B being held fixed, as two centers, and the triangle
-A&nbsp;C&nbsp;B being turned round upon the line A&nbsp;B, as on an axis;
-the line A&nbsp;C will describe a circle, and the figure A&nbsp;C&nbsp;B will
-describe a cone, of the form represented by the figure B&nbsp;C&nbsp;D&nbsp;E&nbsp;F
-(fig. 63.) in which the circle C&nbsp;D&nbsp;E&nbsp;F is usually called the
-base of the cone, and B the vertex.</p>
-
-<p>80. <span class="smcap gesperrt">Now</span> by this figure may several problems be resolved,
-which cannot by the simple description of straight lines and
-circles upon a plane. Suppose for instance, it were required
-to make a cube, which should bear any assigned proportion
-to some other cube named. I need not here inform my readers,
-that a cube is the figure of a dye. This problem was
-much celebrated among the ancients, and was once inforced
-by the command of an oracle.  This problem may be performed
-by a cone thus. First make a cone from a triangle,
-whose side A&nbsp;C shall be half the length of the side B&nbsp;C
-Then on the plane A&nbsp;B&nbsp;C&nbsp;D (fig. 64.) let the line E&nbsp;F be
-exhibited equal in length to the side of the cube proposed;
-and let the line F&nbsp;G be drawn perpendicular to E&nbsp;F, and of
-such a length, that it bear the same proportion to E&nbsp;F, as the<span class="pagenum"><a name="Page_105" id="Page_105">[105]</a></span>
-cube to be sought is required to bear to the cube proposed.
-Through the points E, F, and G let the circle F&nbsp;H&nbsp;I be described.
-Then let the line E&nbsp;F be prolonged beyond F to K, that F&nbsp;K
-be equal to F&nbsp;E, and let the triangle F&nbsp;K&nbsp;L, having all its sides
-F&nbsp;K, K&nbsp;L, L&nbsp;F equal to each other, be hung down perpendicularly
-from the plane A&nbsp;B&nbsp;C&nbsp;D. After this, let another plane
-M&nbsp;N&nbsp;O&nbsp;P be extended through the point L, so as to be equidistant
-from the former plane A&nbsp;B&nbsp;C&nbsp;D, and in this plane let
-the line Q&nbsp;L&nbsp;R be drawn so, as to be equidistant from the line
-E&nbsp;F&nbsp;K. All this being thus prepared, let such a cone, as was
-above directed to be made, be so applied to the plane M&nbsp;N&nbsp;O&nbsp;P,
-that it touch this plane upon the line Q&nbsp;R, and that the vertex
-of the cone be applied to the point L. This cone, by cutting
-through the first plane A&nbsp;B&nbsp;C&nbsp;D, will cross the circle F&nbsp;H&nbsp;I before
-described. And if from the point S, where the surface
-of this cone intersects the circle, the line S&nbsp;T be drawn so, as
-to be equidistant from the line E&nbsp;F; the line F&nbsp;T will be equal
-to the side of the cube sought: that is, if there be two cubes
-or dyes formed, the side of one being equal to E&nbsp;F, and the
-side of the other equal to F&nbsp;T; the former of these cubes shall
-bear the same proportion to the latter, as the line E&nbsp;F bears
-to F&nbsp;G.</p>
-
-<p>81. <span class="smcap gesperrt">Indeed</span> this placing a cone to cut through a plane is
-not a practicable method of resolving problems. But when
-the geometers had discovered this use of the cone, they applied
-themselves to consider the nature of the lines, which
-will be produced by the intersection of the surface of a cone<span class="pagenum"><a name="Page_106" id="Page_106">[106]</a></span>
-and a plane; whereby they might be enabled both to reduce
-these kinds of solutions to practice, and also to render their
-demonstrations concise and elegant.</p>
-
-<p><a name="c106" id="c106">82.</a> <span class="smcap gesperrt">Whenever</span> the plane, which cuts the cone, is equidistant
-from another plane, that touches the cone on the side;
-(which is the case of the present figure;) the line, wherein
-the plane cuts the surface of the cone, is called a parabola.
-But if the plane, which cuts the cone, be so inclined to this
-other, that it will pass quite through the cone (as in fig. 65.)
-such a plane by cutting the cone produces the figure called
-an ellipsis, in which we shall hereafter shew the earth and
-other planets to move round the sun. If the plane, which
-cuts the cone, recline the other way (as in fig. 66.) so as not
-to be parallel to any plane, whereon the cone can lie, nor yet
-to cut quite through the cone; such a plane shall produce in
-the cone a third kind of line, which is called an hyperbola.
-But it is the first of these lines named the parabola, wherein
-bodies, that are thrown obliquely, will be carried by the force
-of gravity; as I shall here proceed to shew, after having first
-directed my readers how to describe this sort of line upon a
-plane, by which the form of it may be seen.</p>
-
-<p>83. <span class="smcap gesperrt">To</span> any straight line A&nbsp;B (fig. 67.) let a straight ruler
-C&nbsp;D be so applied, as to stand against it perpendicularly. Upon
-the edge of this ruler let another ruler E&nbsp;F be so placed, as to
-move along upon the edge of the first ruler C&nbsp;D, and keep always
-perpendicular to it. This being so disposed, let any
-point, as G, be taken in the line A&nbsp;B, and let a string equal<span class="pagenum"><a name="Page_107" id="Page_107">[107]</a></span>
-in length to the ruler E&nbsp;F be fastened by one end to the point
-G, and by the other to the extremity F of the ruler E&nbsp;F. Then
-if the string be held down to the ruler E&nbsp;F by a pin H, as is
-represented in the figure; the point of this pin, while the
-ruler E&nbsp;F moves on the ruler C&nbsp;D, shall describe the line I&nbsp;K&nbsp;L,
-which will be one part of the curve line, whose description
-we were here to teach: and by applying the rulers in the like
-manner on the other side of the line A&nbsp;B, we may describe
-the other part I&nbsp;M of this line. If the distance C&nbsp;G be equal
-to half the line E&nbsp;F in fig. 64, the line M&nbsp;I&nbsp;L will be that very
-line, wherein the plane A&nbsp;B&nbsp;C&nbsp;D in that figure cuts the cone.</p>
-
-<p>84. <span class="smcap gesperrt">The</span> line A&nbsp;I is called the axis of the parabola M&nbsp;I&nbsp;L,
-and the point G is called the focus.</p>
-
-<p>85. <span class="smcap gesperrt">Now</span> by comparing the effects of gravity upon falling
-bodies, with what is demonstrated of this figure by the geometers,
-it is proved, that every body thrown obliquely is
-carried forward in one of these lines, the axis whereof is perpendicular to the horizon.</p>
-
-<p>86. <span class="smcap gesperrt">The</span> geometers demonstrate, that if a line be drawn to
-touch a parabola in any point, as the line A&nbsp;B (in fig. 68.) touches
-the parabola C&nbsp;D, whose axis is Y&nbsp;Z, in the point E; and several
-lines F&nbsp;G, H&nbsp;I, K&nbsp;L be drawn parallel to the axis of the parabola:
-then the line F&nbsp;G will be to H&nbsp;I in the duplicate proportion of
-E&nbsp;F to E&nbsp;H, and F&nbsp;G to K&nbsp;L in the duplicate proportion of E&nbsp;F
-to E&nbsp;K; likewise H&nbsp;I to K&nbsp;L in the duplicate proportion of E&nbsp;H
-to E&nbsp;K. What is to be understood by duplicate or two-fold<span class="pagenum"><a name="Page_108" id="Page_108">[108]</a></span>
-proportion, has been already explained<a name="FNanchor_73_73" id="FNanchor_73_73"></a><a href="#Footnote_73_73" class="fnanchor">[73]</a>. Accordingly I
-mean here, that if the line M be taken to bear the same proportion
-to E&nbsp;H, as E&nbsp;H bears to E&nbsp;F, H&nbsp;I will bear the same
-proportion to F&nbsp;G, as M bears to E&nbsp;F; and if the line N bears
-the same proportion to E&nbsp;K, as E&nbsp;K bears to E&nbsp;F, K&nbsp;L will bear
-the same proportion to F&nbsp;G, as N bears to E&nbsp;F; or if the line
-O bear the same proportion to E&nbsp;K, as E&nbsp;K bears to E&nbsp;H, K&nbsp;L
-will bear the same proportion to H&nbsp;I, as O bears to E&nbsp;H.</p>
-
-<p>87. <span class="smcap gesperrt">This</span> property is essential to the parabola, being
-so connected with the nature of the figure, that every line
-possessing this property is to be called by this name.</p>
-
-<p>88. <span class="smcap gesperrt">Now</span> suppose a body to be thrown from the point A
-(in fig. 69.) towards B in the direction of the line A&nbsp;B. This
-body, if left to it self, would move on with a uniform motion
-through this line A&nbsp;B. Suppose the eye of a spectator to
-be placed at the point C just under the point A; and let us
-imagine the earth to be so put into motion along with the
-body, as to carry the spectator’s eye along the line C&nbsp;D parallel
-to A&nbsp;B; and that the eye would move on with the same velocity,
-wherewith the body would proceed in the line A&nbsp;B, if
-it were to be left to move without any disturbance from its
-gravitation towards the earth. In this case if the body moved
-on without being drawn towards the earth, it would appear
-to the spectator to be at rest.  But if the power of gravity
-exerted it self on the body, it would appear to the spectator<span class="pagenum"><a name="Page_109" id="Page_109">[109]</a></span>
-to fall directly down. Suppose at the distance of time,
-wherein the body by its own progressive motion would have
-moved from A to E, it should appear to the spectator to
-have fallen through a length equal to E&nbsp;F: then the body at
-the end of this time will actually have arrived at the point F.
-If in the space of time, wherein the body would have moved
-by its progressive motion from A to G, it would have appeared
-to the spectator to have fallen down the space G&nbsp;H:
-then the body at the end of this greater interval of time
-will be arrived at the point H. Now if the line A&nbsp;F&nbsp;H&nbsp;I be
-that, through which the body actually passes; from what
-has here been said, it will follow, that this line is one of those,
-which I have been describing under the name of the parabola.
-For the distances E&nbsp;F, G&nbsp;H, through which the body is
-seen to fall, will increase in the duplicate proportion of the
-times<a name="FNanchor_74_74" id="FNanchor_74_74"></a><a href="#Footnote_74_74" class="fnanchor">[74]</a>; but the lines A&nbsp;E, A&nbsp;G will be proportional to the
-times wherein they would have been described by the single
-progressive motion of the body: therefore the lines E&nbsp;F, G&nbsp;H
-will be in the duplicate proportion of the lines A&nbsp;F, A&nbsp;G; and
-the line A&nbsp;F&nbsp;H&nbsp;I possesses the property of the parabola.</p>
-
-<p>89. <span class="smcap gesperrt">If</span> the earth be not supposed to move along with the
-body, the case will be a little different. For the body being
-constantly drawn directly towards the center of the earth,
-the body in its motion will be drawn in a direction a little oblique
-to that, wherein it would be drawn by the earth in motion,
-as before supposed. But the distance to the center of the<span class="pagenum"><a name="Page_110" id="Page_110">[110]</a></span>
-earth bears so vast a proportion to the greatest length, to which
-we can throw bodies, that this obliquity does not merit any
-regard. From the sequel of this discourse it may indeed be
-collected, what line the body being thrown thus would be
-found to describe, allowance being made for this obliquity of
-the earth’s action<a name="FNanchor_75_75" id="FNanchor_75_75"></a><a href="#Footnote_75_75" class="fnanchor">[75]</a>. This is the discovery of Sir <span class="smcap">Is. Newton</span>;
-but has no use in this place. Here it is abundantly sufficient
-to consider the body as moving in a parabola.</p>
-
-<p>90. <span class="smcap gesperrt">The</span> line, which a projected body describes, being
-thus known, practical methods have been deduced from
-hence for directing the shot of great guns to strike any object
-desired. This work was first attempted by <span class="smcap"><em class="gesperrt">Galileo</em></span>,
-and soon after farther improved by his scholar <span class="smcap"><em class="gesperrt">Torricelli</em></span>;
-but has lately been rendred more complete by the great
-Mr. <span class="smcap"><em class="gesperrt">Cotes</em></span>, whose immature death is an unspeakable loss to
-mathematical learning. If it be required to throw a body
-from the point A (in fig. 70.) so as to strike the point B;
-through the points A, B draw the straight line C&nbsp;D, and erect
-the line A&nbsp;E perpendicular to the horizon, and of four times
-the height, from which a body must fall to acquire the velocity,
-wherewith the body is intended to be thrown. Through
-the points A and E describe a circle, that shall touch the line
-C&nbsp;D in the point A. Then from the point B draw the line
-B&nbsp;F perpendicular to the horizon, intersecting the circle in the
-points G and H. This being done, if the body be projected
-directly towards either of these points G or H, it shall fall upon
-the point B; but with this difference, that, if it be thrown<span class="pagenum"><a name="Page_111" id="Page_111">[111]</a></span>
-in the direction A&nbsp;G, it shall sooner arrive at B, than if it were
-projected in the direction A&nbsp;H. When the body is projected
-in the direction A&nbsp;G; the time, it will take up in arriving at
-B, will bear the same proportion to the time, wherein it would
-fall down through one fourth part of A&nbsp;E, as A&nbsp;G bears to
-half A&nbsp;E. But when the body is thrown in the direction of
-A&nbsp;H, the time of its passing to B will bear the same proportion
-to the time, wherein it would fall through one fourth part
-of A&nbsp;E, as A&nbsp;H bears to half A&nbsp;E.</p>
-
-<p>91. <span class="smcap gesperrt">If</span> the line A&nbsp;I be drawn so as to divide the angle under
-E&nbsp;A&nbsp;D in the middle, and the line I&nbsp;K be drawn perpendicular
-to the horizon; this line will touch the circle in the
-point I, and if the body be thrown in the direction A&nbsp;I, it
-will fall upon the point K: and this point K is the farthest
-point in the line A&nbsp;D, which the body can be made to strike,
-without increasing its velocity.</p>
-
-<p>92. <span class="smcap gesperrt">The</span> velocity, wherewith the body every where
-moves, may be found thus. Suppose the body to move in
-the parabola A&nbsp;B (fig. 71.) Erect A&nbsp;C perpendicular to the
-horizon, and equal to the height, from which a body must
-fall to acquire the velocity, wherewith the body sets out from
-A. If you take any points as D and E in the parabola, and
-draw D&nbsp;F and E&nbsp;G parallel to the horizon; the velocity of the
-body in D will be equal to what a body will acquire in falling
-down by its own weight through C&nbsp;F, and in E the velocity
-will be the same, as would be acquired in falling through
-C&nbsp;G. Thus the body moves slowest at the highest point H
-of the parabola; and at equal distances from this point will<span class="pagenum"><a name="Page_112" id="Page_112">[112]</a></span>
-move with equal swiftness, and descend from that highest
-point through the line H&nbsp;B altogether like to the line A&nbsp;H in
-which it ascended; abating only the resistance of the air,
-which is not here considered. If the line H&nbsp;I be drawn from
-the highest point H parallel to the horizon, A&nbsp;I will be equal
-to ¼ of B&nbsp;G in fig. 70, when the body is projected in the direction
-A&nbsp;G, and equal to ¼ of B&nbsp;H, when the body is thrown in
-the direction A&nbsp;H provided A&nbsp;D be drawn horizontally.</p>
-
-<p><a name="c112" id="c112">93.</a> <span class="smcap gesperrt">Thus</span> I have recounted the principal discoveries,
-which had been made concerning the motion of bodies by
-Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em>’s</span> predecessors; all these discoveries, by
-being found to agree with experience, contributing to establish
-the laws of motion, from whence they were deduced.
-I shall therefore here finish what I had to say upon those
-laws; and conclude this chapter with a few words concerning
-the distinction which ought to be made between absolute
-and relative motion. For some have thought fit to confound
-them together; because they observe the laws of motion to
-take place here on the earth, which is in motion, after the same
-manner as if it were at rest. But Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> has
-been careful to distinguish between the relative and absolute
-consideration both of motion and time<a name="FNanchor_76_76" id="FNanchor_76_76"></a><a href="#Footnote_76_76" class="fnanchor">[76]</a>. The astronomers
-anciently found it necessary to make this distinction in time.
-Time considered in it self passes on equably without relation to
-any thing external, being the proper measure of the continuance
-and duration of all things. But it is most frequently conceived
-of by us under a relative view to some succession in<span class="pagenum"><a name="Page_113" id="Page_113">[113]</a></span>
-sensible things, of which we take cognizance.  The succession
-of the thoughts in our own minds is that, from whence
-we receive our first idea of time, but is a very uncertain measure
-thereof; for the thoughts of some men flow on much
-more swiftly, than the thoughts of others; nor does the same
-person think equally quick at all times. The motions of the
-heavenly bodies are more regular; and the eminent division
-of time into night and day, made by the sun, leads us to
-measure our time by the motion of that luminary: nor do we
-in the affairs of life concern our selves with any inequality,
-which there may be in that motion; but the space of time
-which comprehends a day and night is rather supposed to be
-always the same.  However astronomers anciently found
-these spaces of time not to be always of the same length, and
-have taught how to compute their differences.  Now the
-time, when so equated as to be rendered perfectly equal, is
-the true measure of duration, the other not. And therefore
-this latter, which is absolutely true time, differs from the
-other, which is only apparent. And as we ordinarily make
-no distinction between apparent time, as measured by the
-sun, and the true; so we often do not distinguish in our usual
-discourse between the real, and the apparent or relative
-motion of bodies; but use the same words for one, as we
-should for the other.  Though all things about us are really
-in motion with the earth; as this motion is not visible, we
-speak of the motion of every thing we see, as if our selves
-and the earth stood still. And even in other cases, where we
-discern the motion of bodies, we often speak of them not in
-relation to the whole motion we see, but with regard to other<span class="pagenum"><a name="Page_114" id="Page_114">[114]</a></span>
-bodies, to which they are contiguous. If any body were lying
-on a table; when that table shall be carried along, we
-say the body rests upon the table, or perhaps absolutely, that
-the body is at rest. However philosophers must not reject all
-distinction between true and apparent motions, any more than
-astronomers do the distinction between true and vulgar time;
-for there is as real a difference between them, as will appear
-by the following consideration. Suppose all the bodies of
-the universe to have their courses stopped, and reduced to
-perfect rest. Then suppose their present motions to be again
-restored; this cannot be done without an actual impression
-made upon some of them at least. If any of them be
-left untouched, they will retain their former state, that is,
-still remain at rest; but the other bodies, which are
-wrought upon, will have changed their former state of rest,
-for the contrary state of motion. Let us now suppose the
-bodies left at rest to be annihilated, this will make no alteration
-in the state of the moving bodies; but the effect
-of the impression, which was made upon them, will still
-subsist. This shews the motion they received to be an absolute
-thing, and to have no necessary dependence upon
-the relation which the body said to be in motion has to any
-other body<a name="FNanchor_77_77" id="FNanchor_77_77"></a><a href="#Footnote_77_77" class="fnanchor">[77]</a>.</p>
-
-<p>94. <span class="smcap gesperrt">Besides</span> absolute and relative motion are distinguishable
-by their Effects. One effect of motion is, that bodies,
-when moved round any center or axis, acquire a certain<span class="pagenum"><a name="Page_115" id="Page_115">[115]</a></span>
-power, by which they forcibly press themselves from that center
-or axis of motion. As when a body is whirled about in a
-sling, the body presses against the sling, and is ready to fly
-out as soon as liberty is given it. And this power is proportional
-to the true, not relative motion of the body round such
-a center or axis. Of this Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> gives the following
-instance<a name="FNanchor_78_78" id="FNanchor_78_78"></a><a href="#Footnote_78_78" class="fnanchor">[78]</a>. If a pail or such like vessel near full of water
-be suspended by a string of sufficient length, and be turned
-about till the string be hard twisted. If then as soon as the
-vessel and water in it are become still and at rest, the vessel be
-nimbly turned about the contrary way the string was twisted,
-the vessel by the strings untwisting it self shall continue its motion
-a long time. And when the vessel first begins to turn, the
-water in it shall receive little or nothing of the motion of the
-vessel, but by degrees shall receive a communication of motion,
-till at last it shall move round as swiftly as the vessel it
-self. Now the definition of motion, which <span class="smcap"><em class="gesperrt">Des&nbsp;Cartes</em></span> has
-given us upon this principle of making all motion meerly relative,
-is this: that motion, is a removal of any body from its
-vicinity to other bodies, which were in immediate contact
-with it, and are considered as at rest<a name="FNanchor_79_79" id="FNanchor_79_79"></a><a href="#Footnote_79_79" class="fnanchor">[79]</a>. And if this be compared
-with what he soon after says, that there is nothing real
-or positive in the body moved, for the sake of which we
-ascribe motion to it, which is not to be found as well in the
-contiguous bodies, which are considered as at rest<a name="FNanchor_80_80" id="FNanchor_80_80"></a><a href="#Footnote_80_80" class="fnanchor">[80]</a>; it will
-follow from thence, that we may consider the vessel as at rest<span class="pagenum"><a name="Page_116" id="Page_116">[116]</a></span>
-and the water as moving in it: and the water in respect of
-the vessel has the greatest motion, when the vessel first begins
-to turn, and loses this relative motion more and more, till at
-length it quite ceases. But now, when the vessel first begins
-to turn, the surface of the water remains smooth and flat, as
-before the vessel began to move; but as the motion of the
-vessel communicates by degrees motion to the water, the surface
-of the water will be observed to change, the water subsiding
-in the middle and rising at the edges: which elevation
-of the water is caused by the parts of it pressing from the axis,
-they move about; and therefore this force of receding from
-the axis of motion depends not upon the relative motion of
-the water within the vessel, but on its absolute motion; for
-it is least, when that relative motion is greatest, and greatest,
-when that relative motion is least, or none at all.</p>
-
-<p>95. <span class="smcap gesperrt">Thus</span> the true cause of what appears in the surface
-of this water cannot be assigned, without considering the
-water’s motion within the vessel. So also in the system of the
-world, in order to find out the cause of the planetary motions,
-we must know more of the real motions, which belong
-to each planet, than is absolutely necessary for the uses
-of astronomy. If the astronomer should suppose the earth to
-stand still, he could ascribe such motions to the celestial bodies,
-as should answer all the appearances; though he would
-not account for them in so simple a manner, as by attributing
-motion to the earth. But the motion of the earth must of
-necessity be considered, before the real causes, which actuate
-the planetary system, can be discovered.</p>
-
-<hr class="chap" />
-
-</div>
-
-<p><span class="pagenum"><a name="Page_117" id="Page_117">[117]</a></span></p>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c117" id="c117"><span class="smcap"><span class="gesperrt">Chap</span>. III.</span></a><br />
-Of CENTRIPETAL FORCES.</h2>
-
-<p class="drop-cap04"><span class="gesperrt">WE</span> have just been describing in the preceding chapter
-the effects produced on a body in motion, from its
-being continually acted upon by a power always equal in
-strength, and operating in parallel directions<a name="FNanchor_81_81" id="FNanchor_81_81"></a><a href="#Footnote_81_81" class="fnanchor">[81]</a>. But bodies
-may be acted upon by powers, which in different places shall
-have different degrees of force, and whose several directions
-shall be variously inclined to each other. The most simple
-of these in respect to direction is, when the power is
-pointed constantly to one center. This is truly the case of
-that power, whose effects we described in the foregoing chapter;
-though the center of that power is so far removed, that
-the subject then before us is most conveniently to be considered
-in the light, wherein we have placed it: But Sir <span class="smcap">Isaac
-Newton</span> has considered very particularly this other case of
-powers, which are constantly directed to the same center. It
-is upon this foundation, that all his discoveries in the system
-of the world are raised. And therefore, as this subject bears
-so very great a share in the philosophy, of which I am discoursing,
-I think it proper in this place to take a short view
-of some of the general effects of these powers, before we
-come to apply them particularly to the system of the world.</p>
-
-<p><span class="pagenum"><a name="Page_118" id="Page_118">[118]</a></span></p>
-
-<p>2. <span class="smcap gesperrt">These</span> powers or forces are by Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em>
-called centripetal; and their first effect is to cause the body, on
-which they act, to quit the straight course, wherein it would
-proceed if undisturbed, and to describe an incurvated line,
-which shall always be bent towards the center of the force.
-It is not necessary, that such a power should cause the body
-to approach that center. The body may continue to recede
-from the center of the power, notwithstanding its being drawn
-by the power; but this property must always belong to its
-motion, that the line, in which it moves, will continually be
-concave towards the center, to which the power is directed.
-Suppose A (in fig. 72.) to be the center of a force. Let a
-body in B be moving in the direction of the straight line B&nbsp;C,
-in which line it would continue to move, if undisturbed; but
-being attracted by the centripetal force towards A, the body
-must necessarily depart from this line B&nbsp;C, and being drawn
-into the curve line B&nbsp;D, must pass between the lines A&nbsp;B and
-B&nbsp;C. It is evident therefore, that the body in B being gradually
-turned off from the straight line B&nbsp;C, it will at first be
-convex toward the line B&nbsp;C, and consequently concave towards
-the point A: for these centripetal powers are supposed
-to be in strength proportional to the power of gravity, and,
-like that, not to be able after the manner of an impulse to turn
-the body sensibly out of its course into a different one in an instant,
-but to take up some space of time in producing a visible
-effect. That the curve will always continue to have its
-concavity towards A may thus appear. In the line B&nbsp;C near
-to B take any point as E, from which the line E&nbsp;F&nbsp;G may be so<span class="pagenum"><a name="Page_119" id="Page_119">[119]</a></span>
-drawn, as to touch the curve line B&nbsp;D in some point as F. Now
-when the body is come to F, if the centripetal power were immediately
-to be suspended, the body would no longer continue
-to move in a curve line, but being left to it self would
-forthwith reassume a straight course; and that straight course
-would be in the line F&nbsp;G: for that line is in the direction of
-the body’s motion at the point F. But the centripetal force
-continuing its energy, the body will be gradually drawn from
-this line F&nbsp;G so as to keep in the line F&nbsp;D, and make that line
-near the point F to be convex toward F&nbsp;G, and concave toward
-A. After the same manner the body may be followed on in
-its course through the line B&nbsp;D, and every part of that line be
-shewn to be concave toward the point A.</p>
-
-<p>3. <span class="smcap gesperrt">This</span> then is the constant character belonging to those
-motions, which are carried on by centripetal forces; that the
-line, wherein the body moves, is throughout concave towards
-the center of the force. In respect to the successive distances
-of the body from the center there is no general rule to be laid
-down; for the distance of the body from the center may either
-increase, or decrease, or even keep always the same. The
-point A (in fig. 73.) being the center of a centripetal force,
-let a body at B set out in the direction of the straight line B&nbsp;C
-perpendicular to the line A&nbsp;B drawn from A to B. It will be
-easily conceived, that there is no other point in the line B&nbsp;C so
-near to A, as the point B; that A&nbsp;B is the shortest of all the
-lines, which can be drawn from A to any part of the line B&nbsp;C;
-all other lines, as A&nbsp;D, or A&nbsp;E, drawn from A to the line B&nbsp;C
-being longer than A&nbsp;B.  Hence it follows, that the body setting<span class="pagenum"><a name="Page_120" id="Page_120">[120]</a></span>
-out from B, if it moved in the line B&nbsp;C, it would recede
-more and more from the point A. Now as the operation of
-a centripetal force is to draw a body towards the center of
-the force: if such a force act upon a resting body, it must
-necessarily put that body so into motion, as to cause it to
-move towards the center of the force: if the body were of
-it self moving towards that center, the centripetal force
-would accelerate that motion, and cause it to move faster
-down: but if the body were in such a motion, as being left
-to itself it would recede from this center, it is not necessary,
-that the action of a centripetal power upon it should
-immediately compel the body to approach the center, from
-which it would otherwise have receded; the centripetal
-power is not without effect, if it cause the body to recede
-more slowly from that center, than otherwise it would have
-done. Thus in the case before us, the smallest centripetal
-power, if it act on the body, will force it out of the line B&nbsp;C,
-and cause it to pass in a bent line between B&nbsp;C and the point
-A, as has been before explained. When the body, for instance,
-has advanced to the line A&nbsp;D, the effect of the centripetal
-force discovers it self by having removed the body out
-of the line B&nbsp;C, and brought it to cross the line A&nbsp;D somewhere
-between A and D: suppose at F. Now A&nbsp;D being
-longer than A&nbsp;B, A&nbsp;F may also be longer than A&nbsp;B. The centripetal
-power may indeed be so strong, that A&nbsp;F shall be
-shorter than A&nbsp;B; or it may be so evenly balanced with the
-progressive motion of the body, that A&nbsp;F and A&nbsp;B shall be just
-equal: and in this last case, when the centripetal force is of
-that strength, as constantly to draw the body as much toward<span class="pagenum"><a name="Page_121" id="Page_121">[121]</a></span>
-the center, as the progressive motion would carry it off, the
-body will describe a circle about the center A, this center of
-the force being also the center of the circle.</p>
-
-<p>4. <span class="smcap gesperrt">If</span> the body, instead of setting out in the line B&nbsp;C perpendicular
-to A&nbsp;B, had set out in another line B&nbsp;G more inclined
-towards the line A&nbsp;B, moving in the curve line B&nbsp;H;
-then as the body, if it were to continue its motion in the line
-B&nbsp;G, would for some time approach the center A; the centripetal
-force would cause it to make greater advances toward
-that center. But if the body were to set out in the line B&nbsp;I reclined
-the other way from the perpendicular B&nbsp;C, and were to
-be drawn by the centripetal force into the curve line B&nbsp;K; the
-body, notwithstanding any centripetal force, would for some
-time recede from the center; since some part at least of the
-curve line B&nbsp;K lies between the line B&nbsp;I and the perpendicular B&nbsp;C.</p>
-
-<p>5. <span class="smcap gesperrt">Thus</span> far we have explained such effects, as attend
-every centripetal force. But as these forces may be very different
-in regard to the different degrees of strength, wherewith
-they act upon bodies in different places; I shall now proceed
-to make mention in general of some of the differences
-attending these centripetal motions.</p>
-
-<p>6. <span class="smcap gesperrt">To</span> reassume the consideration of the last mentioned
-case. Suppose a centripetal power directed toward the point
-A (in fig. 74.) to act on a body in B, which is moving in
-the direction of the straight line B&nbsp;C, the line B&nbsp;C reclining
-off from A&nbsp;B. If from A the straight lines A&nbsp;D, A&nbsp;E, A&nbsp;F are<span class="pagenum"><a name="Page_122" id="Page_122">[122]</a></span>
-drawn at pleasure to the line C&nbsp;B; the line C&nbsp;B being prolonged
-beyond B to G, it appears that A&nbsp;D is inclined to the line
-G&nbsp;C more obliquely, than A&nbsp;B is inclined to it, A&nbsp;E is inclined
-more obliquely than A&nbsp;D, and A&nbsp;F more than A&nbsp;E. To
-speak more correctly, the angle under A&nbsp;D&nbsp;G is less than that
-under A&nbsp;B&nbsp;G, the angle under A&nbsp;E&nbsp;G less than that under
-A&nbsp;D&nbsp;G, and the angle under A&nbsp;F&nbsp;G less than that under A&nbsp;E&nbsp;G.
-Now suppose the body to move in the curve line B&nbsp;H&nbsp;I&nbsp;K.
-Then it is here likewise evident, that the line B&nbsp;H&nbsp;I&nbsp;K being
-concave towards A, and convex towards the line B&nbsp;C,
-it is more and more turned off from the line B&nbsp;C; so
-that in the point H the line A&nbsp;H will be less obliquely inclined
-to the curve line B&nbsp;H&nbsp;I&nbsp;K, than the same line A&nbsp;H&nbsp;D is inclined
-to B&nbsp;C at the point D; at the point I the inclination of the
-line A&nbsp;I to the curve line will be more different from the inclination
-of the same line A&nbsp;I&nbsp;E to the line B&nbsp;C, at the point E;
-and in the points K and F the difference of inclination will be
-still greater; and in both the inclination at the curve will be
-less oblique, than at the straight line B&nbsp;C. But the straight
-line A&nbsp;B is less obliquely inclined to B&nbsp;G, than A&nbsp;D is inclined
-towards D&nbsp;G: therefore although the line A&nbsp;H be less obliquely
-inclined towards the curve H&nbsp;B, than the same line A&nbsp;H&nbsp;D is
-inclined towards D&nbsp;G; yet it is possible, that the inclination
-at H may be more oblique, than the inclination at B. The inclination
-at H may indeed be less oblique than the other, or
-they may be both the same. This depends upon the degree
-of strength, wherewith the centripetal force exerts it self,
-during the passage of the body from B to H. After the same
-manner the inclinations at I and K depend entirely on the degree<span class="pagenum"><a name="Page_123" id="Page_123">[123]</a></span>
-of strength, wherewith the centripetal force acts on the
-body in its passage from H to K: if the centripetal force be
-weak enough, the lines A&nbsp;H and A&nbsp;I drawn from the center A
-to the body at H and at I shall be more obliquely inclined to
-the curve, than the line A&nbsp;B is inclined towards B&nbsp;G. The centripetal
-force may be of that strength as to render all these inclinations
-equal, or if stronger, the inclinations at I and K
-will be less oblique than at B. Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> has particularly
-shewn, that if the centripetal power decreases after
-a certain manner with the increase of distance, a body may
-describe such a curve line, that all the lines drawn from the
-center to the body shall be equally inclined to that curve line.<a name="FNanchor_82_82" id="FNanchor_82_82"></a><a href="#Footnote_82_82" class="fnanchor">[82]</a>
-But I do not here enter into any particulars, my present intention
-being only to shew, that it is possible for a body to be
-acted upon by a force continually drawing it down towards a
-center, and yet that the body shall continue to recede from
-that center; for here as long as the lines A&nbsp;H, A&nbsp;I, &amp;c drawn
-from the center A to the body do not become less oblique to
-the curve, in which the body moves; so long shall those lines
-perpetually increase, and consequently the body shall more
-and more recede from the center.</p>
-
-<p>7. <span class="smcap gesperrt">But</span> we may observe farther, that if the centripetal
-power, while the body increases its distance from the center,
-retain sufficient strength to make the lines drawn from the
-center to the body to become at length less oblique to the
-curve; then if this diminution of the obliquity continue, till<span class="pagenum"><a name="Page_124" id="Page_124">[124]</a></span>
-at last the line drawn from the center to the body shall cease
-to be obliquely inclined to the curve, and shall become perpendicular
-thereto; from this instant the body shall no longer
-recede from the center, but in its following motion it shall
-again descend, and shall describe a curve line in all respects
-like to that, which it has described already; provided the
-centripetal power, every where at the same distance from the
-center, acts with the same strength. So we observed in the
-preceding chapter, that, when the motion of a projectile became
-parallel to the horizon, the projectile no longer ascended,
-but forthwith directed its course downwards, descending
-in a line altogether like that, wherein it had before ascended<a name="FNanchor_83_83" id="FNanchor_83_83"></a><a href="#Footnote_83_83" class="fnanchor">[83]</a>.</p>
-
-<p>8. <span class="smcap gesperrt">This</span> return of the body may be proved by the following
-proposition: that if the body in any place, suppose at
-I, were to be stopt, and be thrown directly backward with the
-velocity, wherewith it was moving forward in that point I;
-then the body, by the action of the centripetal force upon it,
-would move back again over the path I&nbsp;H&nbsp;B, in which it had
-before advanced forward, and would arrive again at the point
-B in the same space of time, as was taken up in its passage
-from B to I; the velocity of the body at its return to the point
-B being the same, as that wherewith it first set out from that
-point. To give a full demonstration of this proposition,
-would require that use of mathematics, which I here purpose
-to avoid; but, I believe, it will appear in great measure
-evident from the following considerations.</p>
-
-<p><span class="pagenum"><a name="Page_125" id="Page_125">[125]</a></span></p>
-
-<p>9. <span class="smcap gesperrt">Suppose</span> (in fig. 75.) that a body were carried after
-the following manner through the bent figure A&nbsp;B&nbsp;C&nbsp;D&nbsp;E&nbsp;F,
-composed of the straight lines A&nbsp;B, B&nbsp;C, C&nbsp;D, D&nbsp;E, E&nbsp;F. First
-let it be moving in the line A&nbsp;B, from A towards B, with any
-uniform velocity. At B let the body receive an impulse directed
-toward some point, as G, taken within the concavity
-of the figure.  Now whereas this body, when once moving
-in the straight line A&nbsp;B, will continue to move on in this line,
-so long as it shall be left to it self; but being disturbed at the
-point B in its motion by the impulse, which there acts upon
-it, it will be turned out of this line A&nbsp;B into some other straight
-line, wherein it will afterwards continue to move, as long as it
-shall be left to itself. Therefore let this impulse have strength
-sufficient to turn the body into the line B&nbsp;C. Then let the
-body move on undisturbed from B to C, but at C let it receive
-another impulse pointed toward the same point G, and of sufficient
-strength to turn the body into the line C&nbsp;D. At D let
-a third impulse, directed like the rest to the point G, turn the
-body into the line D&nbsp;E. And at E let another impulse, directed
-likewise to the point G, turn the body into the line E&nbsp;F.
-Now, I say, if the body while moving in the line E&nbsp;F
-be stopt, and turned back again in this line with the same
-velocity, as that wherewith it was moving forward in this line;
-then by the repetition of the former impulse at E the body will
-be turned into the line E&nbsp;D, and move in it from E to D with
-the same velocity as before it moved with from D to E; by
-the repetition of the impulse at D, when the body shall
-have returned to that point, it will be turned into the line
-D&nbsp;C; and by the repetition of the other impulses at C and B<span class="pagenum"><a name="Page_126" id="Page_126">[126]</a></span>
-the body will be brought back again into the line B&nbsp;A, with
-the velocity, wherewith it first moved in that line.</p>
-
-<p>10. <span class="smcap gesperrt">This</span> I prove as follows. Let D&nbsp;E and F&nbsp;E be continued
-beyond E. In D&nbsp;E thus continued take at pleasure the
-length E&nbsp;H, and let H&nbsp;I be so drawn, as to be equidistant from
-the line G&nbsp;E. Then, by what has been written upon the second
-law of motion<a name="FNanchor_84_84" id="FNanchor_84_84"></a><a href="#Footnote_84_84" class="fnanchor">[84]</a>, it follows, that after the impulse on
-the body in E it will move through E&nbsp;I in the same time, as
-it would have imployed in moving from E to H, with the velocity
-which it had in the line D&nbsp;E. In F&nbsp;E prolonged take
-E&nbsp;K equal to E&nbsp;I, and draw K&nbsp;L equidistant from G&nbsp;E. Then,
-because the body is thrown back in the line F&nbsp;E with the same
-velocity as that wherewith it went forward in that line; if,
-when the body was returned to E, it were permitted to go
-straight on, it would pass through E&nbsp;K in the same time, as it
-took up in passing through E&nbsp;I, when it went forward in the
-line E&nbsp;F. But, if at the body’s return to the point E, such an
-impulse directed toward the point D were to be given it, whereby
-it should be turned into the line D&nbsp;E; I say, that the
-impulse necessary to produce this effect must be equal to
-that, which turned the body out of the line D&nbsp;E into E&nbsp;F;
-and that the velocity, with which the body will return into
-the line E&nbsp;D, is the same, as that wherewith it before moved
-through this line from D to E. Because E&nbsp;K is equal to E&nbsp;I, and
-K&nbsp;L and H&nbsp;I, being each equidistant from G&nbsp;E, are by consequence
-equidistant from each other; it follows, that the two<span class="pagenum"><a name="Page_127" id="Page_127">[127]</a></span>
-triangular figures I&nbsp;E&nbsp;H and K&nbsp;E&nbsp;L are altogether like and equal
-to each other. If I were writing to mathematicians, I might
-refer them to some proportions in the elements of <span class="smcap">Euclid</span>
-for the proof of this<a name="FNanchor_85_85" id="FNanchor_85_85"></a><a href="#Footnote_85_85" class="fnanchor">[85]</a> but as I do not here address my self to
-such, so I think this assertion will be evident enough without
-a proof in form; at least I must desire my readers to receive
-it as a proposition true in geometry. But these two triangular
-figures being altogether like each other and equal; as E&nbsp;K
-is equal to E&nbsp;I, so E&nbsp;L is equal to E&nbsp;H, and K&nbsp;L equal to H&nbsp;I.
-Now the body after its return to E being turned out of the line
-F&nbsp;E into E&nbsp;D by an impulse acting upon it in E, after the manner
-above expressed; the body will receive such a velocity by
-this impulse, as will carry it through E&nbsp;L in the same time, as it
-would have imployed in passing through E&nbsp;K, if it had gone
-on in that line undisturbed. And it has already been observed,
-that the time, in which the body would pass over E&nbsp;K
-with the velocity wherewith it returns, is equal to the time
-it took up in going forward from E to I; that is, equal to the
-time, in which it would have gone through E&nbsp;H with the velocity,
-wherewith it moved from D to E. Therefore the time,
-in which the body will pass through E&nbsp;L after its return into
-the line E&nbsp;D, is the same, as would have been taken up by
-the body in passing through E&nbsp;H with the velocity, wherewith
-the body first moved in the line D&nbsp;E. Since therefore
-E&nbsp;L and E&nbsp;H are equal, the body returns into the line D&nbsp;E with
-the velocity, which it had before in that line. Again I say,
-the second impulse in E is equal to the first. By what has<span class="pagenum"><a name="Page_128" id="Page_128">[128]</a></span>
-been said on the second law of motion concerning the effect of
-oblique impulses<a name="FNanchor_86_86" id="FNanchor_86_86"></a><a href="#Footnote_86_86" class="fnanchor">[86]</a>, it will be understood, that the impulse in E,
-whereby the body was turned out of the line D&nbsp;E into the line
-E&nbsp;F, is of such strength, that if the body had been at rest,
-when this impulse had acted upon it, this impulse would have
-communicated so much motion to the body, as would have
-carried it through a length equal to H&nbsp;I, in the time wherein
-the body would have passed from E to H, or in the time
-wherein it passed from E to I. In the same manner, on the return
-of the body, the impulse in E, whereby the body is turned
-out of the line F&nbsp;E into E&nbsp;D, is of such strength, that if it
-had acted on the body at rest, it would have caused the body
-to move through a length equal to K&nbsp;L, in the same time, as
-the body would imploy in passing through E&nbsp;K with the velocity,
-wherewith it returns in the line F&nbsp;E. Therefore the second
-impulse, had it acted on the body at rest, would have
-caused it to move through a length equal to K&nbsp;L in the same
-space of time, as would be taken up by the body in passing
-through a length equal to H&nbsp;I, were the first impulse to act on
-the body when at rest. That is, the effects of the first and
-second impulse on the body when at rest would be the same;
-for K&nbsp;L and H&nbsp;I are equal: consequently the second impulse
-is equal to the first.</p>
-
-<p>11. <span class="smcap gesperrt">Thus</span> if the body be returned through F&nbsp;E with the
-velocity, wherewith it moved forward; we have shewn how
-by the repetition of the impulse, which acted on it at E, the<span class="pagenum"><a name="Page_129" id="Page_129">[129]</a></span>
-body will return again into the line D&nbsp;E with the velocity,
-which it had before in that line. By the same process of reasoning
-it may be proved, that, when the body is returned
-back to D, the impulse, which before acted on the body at
-that point, will throw the body into the line D&nbsp;C with the velocity,
-which it first had in that line; and the other impulses
-being successively repeated, the body will at length be brought
-back again into the line B&nbsp;A with the velocity, wherewith it
-set out in that line.</p>
-
-<p>12. <span class="smcap gesperrt">Thus</span> these impulses, by acting over again in an inverted
-order all their operation on the body, bring it back again
-through the path, in which it had proceeded forward. And
-this obtains equally, whatever be the number of the straight
-lines, whereof this curve figure is composed. Now by a method
-of reasoning, which Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> makes great
-use of, and which he introduced into geometry, thereby
-greatly inriching that science<a name="FNanchor_87_87" id="FNanchor_87_87"></a><a href="#Footnote_87_87" class="fnanchor">[87]</a>; we might make a transition
-from this figure composed of a number of straight lines to a
-figure of one continued curvature, and from a number of separate
-impulses repeated at distinct intervals to a continual
-centripetal force, and shew, that, because what has been
-here advanced holds universally true, whatever be the number
-of straight lines, whereof the curve figure A&nbsp;C&nbsp;F is composed,
-and howsoever frequently the impulses at the angles of
-this figure are repeated; therefore the same will still remain
-true, although this figure should be converted into one of a
-continued curvature, and these distinct impulses should be<span class="pagenum"><a name="Page_130" id="Page_130">[130]</a></span>
-changed into a continual centripetal force. But as the explaining
-this method of reasoning is foreign to my present design;
-so I hope my readers, after what has been said, will find no
-difficulty in receiving the proposition laid down above: that, if
-the body, which has moved through the curve line B&nbsp;H&nbsp;I (in fig.
-74.) from B to I, when it is come to I, be thrown directly back
-with the same velocity as that, wherewith it proceeded forward,
-the centripetal force, by acting over again all its operation on
-the body, shall bring the body back again in the line I&nbsp;H&nbsp;B:
-and as the motion of the body in its course from B to I was every
-where in such a manner oblique to the line drawn from the
-center to the body, that the centripetal power acted in some
-degree against the body’s motion, and gradually diminished it;
-so in the return of the body, the centripetal power will every
-where draw the body forward, and accelerate its motion by
-the same degrees, as before it retarded it.</p>
-
-<p>13. <span class="smcap gesperrt">This</span> being agreed, suppose the body in K to have the
-line A&nbsp;K no longer obliquely inclined to its motion. In this case,
-if the body be turned back, in the manner we have been considering,
-it must be directed back perpendicularly to A&nbsp;K.
-But if it had proceeded forward, it would likewise have moved
-in a direction perpendicular to A&nbsp;K; consequently, whether
-it move from this point K backward or forward, it must
-describe the same kind of course. Therefore since by being
-turned back it will go over again the line K&nbsp;I&nbsp;H&nbsp;B; if it be permitted
-to go forward, the line K&nbsp;L, which it shall describe,
-will be altogether similar to the line K&nbsp;H&nbsp;B.</p>
-
-<p><span class="pagenum"><a name="Page_131" id="Page_131">[131]</a></span></p>
-
-<p>14. <span class="smcap gesperrt">In</span> like manner we may determine the nature of the
-motion, if the line, wherein the body sets out, be inclined (as
-in fig. 76.) down toward the line B&nbsp;A drawn between the
-body and the center. If the centripetal power so much increases
-in strength, as the body approaches, that it can bend
-the path, in which the body moves, to that degree, as to cause
-all the lines as A&nbsp;H, A&nbsp;I, A&nbsp;K to remain no less oblique to the
-motion of the body, than A&nbsp;B is oblique to B&nbsp;C; the body
-shall continually more and more approach the center. But
-if the centripetal power increases in so much less a degree, as
-to permit the line drawn from the center to the body, as it accompanies
-the body in its motion, at length to become more
-and more erect to the curve wherein the body moves, and in
-the end, suppose at K, to become perpendicular thereto; from
-that time the body shall rise again. This is evident from what
-has been said above; because for the very same reason here also
-the body shall proceed from the point K to describe a line altogether
-similar to the line, in which it has moved from B to K.
-Thus, as it was observed of the pendulum in the preceding chapter<a name="FNanchor_88_88" id="FNanchor_88_88"></a><a href="#Footnote_88_88" class="fnanchor">[88]</a>,
-that all the time it approaches towards being perpendicular
-to the horizon, it more and more descends; but, as soon as it
-is come into that perpendicular situation, it immediately rises
-again by the same degrees, as it descended by before: so here
-the body more and more approaches the center all the time it
-is moving from B to K; but thence forward it rises from the
-center again by the same degrees, as it approached by before.</p>
-
-<p><span class="pagenum"><a name="Page_132" id="Page_132">[132]</a></span></p>
-
-<p>15. <span class="smcap gesperrt">If</span> (in fig. 77.) the line B&nbsp;C be perpendicular to A&nbsp;B; then
-it has been observed above<a name="FNanchor_89_89" id="FNanchor_89_89"></a><a href="#Footnote_89_89" class="fnanchor">[89]</a>, that the centripetal power may
-be so balanced with the progressive motion of the body, that
-the body may keep moving round the center A constantly at
-the same distance; as a body does, when whirled about any
-point, to which it is tyed by a string. If the centripetal power
-be too weak to produce this effect, the motion of the body
-will presently become oblique to the line drawn from itself to
-the center, after the manner of the first of the two cases,
-which we have been considering. If the centripetal power
-be stronger, than what is required to carry the body in a circle,
-the motion of the body will presently fall in with the second
-of the cases, we have been considering.</p>
-
-<p>16. <span class="smcap gesperrt">If</span> the centripetal power so change with the change of
-distance, that the body, after its motion has become oblique
-to the line drawn from itself to the center, shall again become
-perpendicular thereto; which we have shewn to be possible
-in both the cases treated of above; then the body shall in its
-subsequent motion return again to the distance of A&nbsp;B, and
-from that distance take a course similar to the former: and
-thus, if the body move in a space free from all resistance,
-which has been here all along supposed; it shall continue in
-a perpetual motion about the center, descending and ascending
-alternately therefrom. If the body setting out from B (in
-fig. 78.) in the line B&nbsp;C perpendicular to A&nbsp;B, describe the line
-B&nbsp;D&nbsp;E, which in D shall be oblique to the line A&nbsp;D, but in E
-shall again become erect to A&nbsp;E drawn from the body in E to the
-center A; then from this point E the body shall describe the
-line E&nbsp;F&nbsp;G altogether like to the line B&nbsp;D&nbsp;E, and at G shall be
-at the same distance from A, as it was at B. But likewise the
-line A&nbsp;G shall be erect to the body’s motion. Therefore the
-body shall proceed to describe from G the line G&nbsp;H&nbsp;I altogether
-similar to the line G&nbsp;F&nbsp;E, and at I have the same distance
-from the center, as it had at E; and also have the line A&nbsp;I erect
-to its motion: so that its following motion must be in the line
-I&nbsp;K&nbsp;L similar to I&nbsp;H&nbsp;G, and the distance A&nbsp;L equal to A&nbsp;G. Thus
-the body will go on in a perpetual round without ceasing, alternately
-inlarging and contracting its distance from the center.</p>
-
-<div class="figcenter">
-     <img src="images/ill-187.jpg" width="400" height="512"
-         alt=""
-         title="" />
-</div>
-
-<p><span class="pagenum"><a name="Page_133" id="Page_133">[133]</a></span></p>
-
-<p>17. <span class="smcap gesperrt">If</span> it so happen, that the point E fall upon the line B&nbsp;A
-continued beyond A; then the point G will fall on B, I on E,
-and L also on B; so that the body will describe in this case a
-simple curve line round the center A, like the line B&nbsp;D&nbsp;E&nbsp;F in
-fig. 79, in which it will continually revolve from B to E
-and from E to B without end.</p>
-
-<p>18. <span class="smcap gesperrt">If</span> A&nbsp;E in fig. 78 should happen to be perpendicular
-to A&nbsp;B, in this case also a simple line will be described; for the
-point G will fall on the line B&nbsp;A prolonged beyond A, the
-point I on the line A&nbsp;E prolonged beyond A, and the point L
-on B: so that the body will describe a line like the curve line
-B&nbsp;E&nbsp;G&nbsp;I in fig. 80, in which the opposite points B and G
-are equally distant from A, and the opposite points E and I
-are also equally distant from the same point A.</p>
-
-<p><span class="pagenum"><a name="Page_134" id="Page_134">[134]</a></span></p>
-
-<p>19. <span class="smcap gesperrt">In</span> other cases the line described will have a more
-complex figure.</p>
-
-<p>20. <span class="smcap gesperrt">Thus</span> we have endeavoured to shew how a body,
-while it is constantly attracted towards a center, may notwithstanding
-by its progressive motion keep it self from falling
-down to that center; but describe about it an endless circuit,
-sometimes approaching toward that center, and at other
-times as much receding from the same.</p>
-
-<p>21. <span class="smcap gesperrt">But</span> here we have supposed, that the centripetal power
-is of equal strength every where at the same distance from the
-center. And this is the case of that centripetal power, which
-will hereafter be shewn to be the cause, that keeps the planets
-in their courses.  But a body may be kept on in a perpetual
-circuit round a center, although the centripetal power have
-not this property. Indeed a body may by a centripetal force
-be kept moving in any curve line whatever, that shall have its
-concavity turned every where towards the center of the force.</p>
-
-<p>22. <span class="smcap gesperrt">To</span> make this evident I shall first propose the case of a
-body moving through the incurvated figure A&nbsp;B&nbsp;C&nbsp;D&nbsp;E (in fig. 81.)
-which is composed of the straight lines A&nbsp;B, B&nbsp;C, C&nbsp;D, D&nbsp;E, and
-E&nbsp;A; the motion being carried on in the following manner.
-Let the body first move in the line A&nbsp;B with any uniform velocity.
-When it is arrived at the point B, let it receive an impulse
-directed toward any point F taken within the figure;
-and let the impulse be of that strength as to turn the body out<span class="pagenum"><a name="Page_135" id="Page_135">[135]</a></span>
-of the line A&nbsp;B into the line B&nbsp;C. The body after this impulse,
-while left to itself, will continue moving in the line B&nbsp;C.
-At C let the body receive another impulse directed towards
-the same point F, of such strength, as to turn the body from
-the line B&nbsp;C into the line C&nbsp;D. At D let the body by another
-impulse, directed likewise to the point F, be turned out of the
-line C&nbsp;D into D&nbsp;E. And at E let another impulse, directed toward
-the point F, turn the body from the line D&nbsp;E into E&nbsp;A.
-Thus we see how a body may be carried through the figure
-A&nbsp;B&nbsp;C&nbsp;D&nbsp;E by certain impulses directed always toward the same
-center, only by their acting on the body at proper intervals,
-and with due degrees of strength.</p>
-
-<p>23. <span class="smcap gesperrt">But</span> farther, when the body is come to the point A, if
-it there receive another impulse directed like the rest toward the
-point F, and of such a degree of strength as to turn the body
-into the line A&nbsp;B, wherein it first moved; I say that the body
-shall return into this line with the same velocity, as it had at first.</p>
-
-<p>24. <span class="smcap gesperrt">Let</span> A&nbsp;B be prolonged beyond B at pleasure, suppose to
-G; and from G let G&nbsp;H be drawn, which if produced should
-always continue equidistant from B&nbsp;F, or, according to the
-more usual phrase, let G&nbsp;H be drawn parallel to B&nbsp;F. Then
-it appears, from what has been said upon the second law of
-motion<a name="FNanchor_90_90" id="FNanchor_90_90"></a><a href="#Footnote_90_90" class="fnanchor">[90]</a>, that in the time, wherein the body would have moved
-from B to G, had it not received a new impulse in B, by the
-means of that impulse it will have acquired a velocity, which
-will carry it from B to H. After the same manner, if C&nbsp;I be<span class="pagenum"><a name="Page_136" id="Page_136">[136]</a></span>
-taken equal to B&nbsp;H, and I&nbsp;K be drawn equidistant from or parallel
-to C&nbsp;F; the body will have moved from C to K with the
-velocity, which it has in the line C&nbsp;D, in the same time, as it
-would have employed in moving from C to I with the velocity,
-it had in the line B&nbsp;C. Therefore since C&nbsp;I and B&nbsp;H are equal,
-the body will move through C&nbsp;K in the same time, as it would
-have taken up in moving from B to G with the original velocity,
-wherewith it moved through the line A&nbsp;B. Again, D&nbsp;L
-being taken equal to C&nbsp;K and L&nbsp;M drawn parallel to D&nbsp;F; for
-the same reason as before the body will move through D&nbsp;M with
-the velocity, which it has in the line D&nbsp;E, in the same time,
-as it would imploy in moving through B&nbsp;G with its original velocity.
-In the last place, if E&nbsp;N be taken equal to D&nbsp;M, and
-N&nbsp;O be drawn parallel to E&nbsp;F; likewise if A&nbsp;P be taken equal
-to E&nbsp;O, and P&nbsp;Q be drawn parallel to A&nbsp;F: then the body with
-the velocity, wherewith it returns into the line A&nbsp;B, will pass
-through A&nbsp;Q in the same time, as it would have imployed in
-passing through B&nbsp;G with its original velocity.  Now as all
-this follows directly from what has above been delivered, concerning
-the effect of oblique impulses impressed upon bodies
-in motion; so we must here observe farther, that it can be
-proved by geometry, that A&nbsp;Q will always be equal to E&nbsp;G.
-The proof of this I am obliged, from the nature of my present
-design, to omit; but this geometrical proportion being
-granted, it follows, that the body has returned into the line
-A&nbsp;B with the velocity, which it had, when it first moved in
-that line; for the velocity, with which it returns into the line
-A&nbsp;B, will carry it over the line A&nbsp;Q in the same time, as would<span class="pagenum"><a name="Page_137" id="Page_137">[137]</a></span>
-have been taken up in its passing over an equal line B&nbsp;G with
-the original velocity.</p>
-
-<p>25. <span class="smcap gesperrt">Thus</span> we have found, how a body may be carried round
-the figure A&nbsp;B&nbsp;C&nbsp;D&nbsp;E by the action of certain impulses upon it
-which should all be pointed toward one center. And we likewise
-see, that when the body is brought back again to the
-point, whence it first set out; if it there meet with an impulse
-sufficient to turn it again into the line, wherein it moved
-at first, its original velocity will be again restored; and by
-the repetition of the same impulses, the body will be carried
-again in the same round. Therefore if these impulses, which
-act on the body at the points B, C, D, E, and A, continue always
-the same, the body will make round this figure innumerable
-revolutions.</p>
-
-<p>26. <span class="smcap gesperrt">The</span> proof, which we have here made use of, holds the
-same in any number of straight lines, whereof the figure A&nbsp;B&nbsp;D
-should be composed; and therefore by the method of reasoning
-referred to above<a name="FNanchor_91_91" id="FNanchor_91_91"></a><a href="#Footnote_91_91" class="fnanchor">[91]</a> we are to conclude, that what has here
-been said upon this rectilinear figure, will remain true, if this
-figure were changed into one of a continued curvature, and
-instead of distinct impulses acting by intervals at the angles of
-this figure, we had a continual centripetal force. We have
-therefore shewn, that a body may be carried round in any
-curve figure A&nbsp;B&nbsp;C ( fig. 82.) which shall every where be
-concave towards any one point as D, by the continual action<span class="pagenum"><a name="Page_138" id="Page_138">[138]</a></span>
-of a centripetal power directed to that point, and when it is
-returned to the point, from whence it set out, it shall recover
-again the velocity, with which it departed from that point.
-It is not indeed always necessary, that it should return again
-into its first course; for the curve line may have some such
-figure as the line A&nbsp;B&nbsp;C&nbsp;D&nbsp;B&nbsp;E in fig. 83. In this curve line,
-if the body set out from B in the direction B&nbsp;F, and moved
-through the line B&nbsp;C&nbsp;D, till it returned to B; here the body
-would not enter again into the line B&nbsp;C&nbsp;D, because the two
-parts B&nbsp;D and B&nbsp;C of the curve line make an angle at the point
-B: so that the centripetal power, which at the point B could
-turn the body from the line B&nbsp;F into the curve, will not be
-able to turn the body into the line B&nbsp;C from the direction, in
-which it returns to the point B; a forceable impulse must be
-given the body in the point B to produce that effect.</p>
-
-<p>27. <span class="smcap gesperrt">If</span> at the point B, whence the body sets out, the curve
-line return into it self (as in fig. 82;) then the body, upon
-its arrival again at B, may return into its former course,
-and thus make an endless circuit about the center of the centripetal
-power.</p>
-
-<p>28. <span class="smcap gesperrt">What</span> has here been said, I hope, will in some measure
-enable my readers to form a just idea of the nature of
-these centripetal motions.</p>
-
-<p>29. <span class="smcap gesperrt">I have</span> not attempted to shew, how to find particularly,
-what kind of centripetal force is necessary to carry a body in
-any curve line proposed. This is to be deduced from the degree<span class="pagenum"><a name="Page_139" id="Page_139">[139]</a></span>
-of curvature, which the figure has in each point of it,
-and requires a long and complex mathematical reasoning.
-However I shall speak a little to the first proportion, which
-Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> lays down for this purpose. By this
-proposition, when a body is found moving in a curve line, it
-may be known, whether the body be kept in its course by a
-power always pointed toward the same center; and if it be so,
-where that center is placed. The proposition is this: that if
-a line be drawn from some fixed point to the body, and remaining
-by one extream united to that point, it be carried
-round along with the body; then, if the power, whereby
-the body is kept in its course, be always pointed to this fixed
-point as a center, this line will move over equal spaces in equal
-portions of time. Suppose a body were moving through the
-curve line A&nbsp;B&nbsp;C&nbsp;D (in fig. 84.) and passed over the arches A&nbsp;B,
-B&nbsp;C, C&nbsp;D in equal portions of time; then if a point, as E, can
-be found, from whence the line E&nbsp;A being drawn to the body
-in A, and accompanying the body in its motion, it shall make
-the spaces E&nbsp;A&nbsp;B, E&nbsp;B&nbsp;C, and E&nbsp;C&nbsp;D equal, over which it passes,
-while the body describes the arches A&nbsp;B, B&nbsp;C, and C&nbsp;D:
-and if this hold the same in all other arches, both great and
-small, of the curve line A&nbsp;B&nbsp;C&nbsp;D, that these spaces are always
-equal, where the times are equal; then is the body kept in
-this line by a power always pointed to E as a center.</p>
-
-<p>30. <span class="smcap gesperrt">The</span> principle, upon which Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> has
-demonstrated this, requires but small skill in geometry to comprehend.
-I shall therefore take the liberty to close the present<span class="pagenum"><a name="Page_140" id="Page_140">[140]</a></span>
-chapter with an explication of it; because such an example
-will give the clearest notion of our author’s method of applying
-mathematical reasoning to these philosophical subjects.</p>
-
-<p>31. <span class="smcap gesperrt">He</span> reasons thus. Suppose a body set out from the point
-A (in fig. 85.) to move in the straight line A&nbsp;B; and after it
-had moved for some time in that line, it were to receive an
-impulse directed to some point as C. Let it receive that impulse
-at D; and thereby be turned into the line D&nbsp;E; and let
-the body after this impulse take the same length of time in
-passing from D to E, as it imployed in the passing from A to
-D. Then the straight lines C&nbsp;A, C&nbsp;D, and C&nbsp;E being drawn,
-Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> proves, that the and triangular spaces
-C&nbsp;A&nbsp;D and C&nbsp;D&nbsp;E are equal. This he does in the following
-manner.</p>
-
-<p>32. <span class="smcap gesperrt">Let</span> E&nbsp;F be drawn parallel to C&nbsp;D. Then, from what has
-been said upon the second law of motion<a name="FNanchor_92_92" id="FNanchor_92_92"></a><a href="#Footnote_92_92" class="fnanchor">[92]</a>, it is evident, that
-since the body was moving in the line A&nbsp;B, when it received
-the impulse in the direction D&nbsp;C; it will have moved after
-that impulse through the line D&nbsp;E in the same time, as it would
-have taken up in moving through D&nbsp;F, provided it had received
-no disturbance in D. But the time of the body’s moving
-from D to E is supposed to be equal to the time of its moving
-through A&nbsp;D; therefore the time, which the body would
-have imployed in moving through D&nbsp;F, had it not been disturbed
-in D, is equal to the time, wherein it moved through
-A&nbsp;D: consequently D&nbsp;F is equal in length to A&nbsp;D; for if the<span class="pagenum"><a name="Page_141" id="Page_141">[141]</a></span>
-body had gone on to move through the line A&nbsp;B without interruption,
-it would have moved through all parts thereof
-with the same velocity, and have passed over equal parts of
-that line in equal portions of time. Now C&nbsp;F being drawn,
-since A&nbsp;D and D&nbsp;F are equal, the triangular space C&nbsp;D&nbsp;F is equal
-to the triangular space C&nbsp;A&nbsp;D. Farther, the line E&nbsp;F being
-parallel to C&nbsp;D, it is proved by <span class="smcap">Euclid</span>, that the triangle
-C&nbsp;E&nbsp;D is equal to the triangle C&nbsp;F&nbsp;D<a name="FNanchor_93_93" id="FNanchor_93_93"></a><a href="#Footnote_93_93" class="fnanchor">[93]</a>: therefore the triangle
-C&nbsp;E&nbsp;D is equal to the triangle C&nbsp;A&nbsp;D.</p>
-
-<p>33. <span class="smcap gesperrt">After</span> the same manner, if the body receive at E another
-impulse directed toward the point C, and be turned by
-that impulse into the line E&nbsp;G; if it move afterwards from E to
-G in the same space of time, as was taken up by its motion from
-D to E, or from A to D; then C&nbsp;G being drawn, the triangle
-C&nbsp;E&nbsp;G is equal to C&nbsp;D&nbsp;E. A third impulse at G directed as the
-two former to C, whereby the body shall be turned into the
-line G&nbsp;H, will have also the like effect with the rest. If the
-body move over G&nbsp;H in the same time, as it took up in moving
-over E&nbsp;G, the triangle C&nbsp;G&nbsp;H will be equal to the triangle
-C&nbsp;E&nbsp;G. Lastly, if the body at H be turned by a fresh impulse
-directed toward C into the line H&nbsp;I, and at I by another impulse
-directed also to C be turned into the line I&nbsp;K; and if the
-body move over each of the lines H&nbsp;I, and I&nbsp;K in the same
-time, as it imployed in moving over each of the preceding
-lines A&nbsp;D, D&nbsp;E, E&nbsp;G, and G&nbsp;H: then each of the triangles
-C&nbsp;H&nbsp;I, and C&nbsp;I&nbsp;K will be equal to each of the preceding. Likewise<span class="pagenum"><a name="Page_142" id="Page_142">[142]</a></span>
-as the time, in which the body moves over A&nbsp;D&nbsp;E, is
-equal to the time of its moving over E&nbsp;G&nbsp;H, and to the time
-of its moving over H&nbsp;I&nbsp;K; the space C&nbsp;A&nbsp;D&nbsp;E will be equal to
-the space C&nbsp;E&nbsp;G&nbsp;H, and to the space C&nbsp;H&nbsp;I&nbsp;K. In the same
-manner as the time, in which the body moved over A&nbsp;D&nbsp;E&nbsp;G
-is equal to the time of its moving over G&nbsp;H&nbsp;I&nbsp;K, so the space
-C&nbsp;A&nbsp;D&nbsp;E&nbsp;G will be equal to the space C&nbsp;G&nbsp;H&nbsp;I&nbsp;K.</p>
-
-<p>34. <span class="smcap gesperrt">From</span> this principle Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> demonstrates
-the proposition mentioned above, by that method of arguing
-introduced by him into geometry, whereof we have before
-taken notice<a name="FNanchor_94_94" id="FNanchor_94_94"></a><a href="#Footnote_94_94" class="fnanchor">[94]</a>, by making according to the principles of that
-method a transition from this incurvated figure composed of
-straight lines, to a figure of continued curvature; and by
-shewing, that since equal spaces are described in equal times
-in this present figure composed of straight lines, the same relation
-between the spaces described and the times of their description
-will also have place in a figure of one continued
-curvature. He also deduces from this proposition the reverse
-of it; and proves, that whenever equal spaces are continually
-described; the body is acted upon by a centripetal force
-directed to the center, at which the spaces terminate.</p>
-
-<hr class="chap" />
-
-</div>
-
-<p><span class="pagenum"><a name="Page_143" id="Page_143">[143]</a></span></p>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c143" id="c143"><span class="smcap">Chap. IV.</span></a><br />
-Of the RESISTANCE of FLUIDS.</h2>
-
-<p class="drop-cap06"><span class="gesperrt">BEFORE</span> the cause can be discovered, which keeps the
-planets in motion, it is necessary first to know, whether
-the space, wherein they move, is empty and void, or filled
-with any quantity of matter. It has been a prevailing
-opinion, that all space contains in it matter of some kind or
-other; so that where no sensible matter is found, there was
-yet a subtle fluid substance by which the space was filled up;
-even so as to make an absolute plenitude. In order to examine
-this opinion, Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> has largely considered
-the effects of fluids upon bodies moving in them.</p>
-
-<p>2. <span class="smcap gesperrt">These</span> effects he has reduced under these three heads.
-In the first place he shews how to determine in what manner
-the resistance, which bodies suffer, when moving in a fluid,
-gradually increases in proportion to the space, they describe
-in any fluid; to the velocity, with which they describe it;
-and to the time they have been in motion. Under the second
-head he considers what degree of resistance different
-bodies moving in the same fluid undergo, according to the
-different proportion between the density of the fluid and the
-density of the body. The densities of bodies, whether fluid
-or solid, are measured by the quantity of matter, which is
-comprehended under the same magnitude; that body being<span class="pagenum"><a name="Page_144" id="Page_144">[144]</a></span>
-the most dense or compact, which under the same bulk contains
-the greatest quantity of solid matter, or which weighs
-most, the weight of every body being observed above to be
-proportional to the quantity of matter in it<a name="FNanchor_95_95" id="FNanchor_95_95"></a><a href="#Footnote_95_95" class="fnanchor">[95]</a>. Thus water is
-more dense than cork or wood, iron more dense than water,
-and gold than iron. The third particular Sir <span class="smcap"><em class="gesperrt">Is. Newton</em></span>
-considers concerning the resistance of fluids is the influence,
-which the diversity of figure in the resisted body has upon its
-resistance.</p>
-
-<p>3. <span class="smcap gesperrt">For</span> the more perfect illustration of the first of these
-heads, he distinctly shews the relation between all the particulars
-specified upon three different suppositions. The first
-is, that the same body be resisted more or less in the simple
-proportion to its velocity; so that if its velocity be doubled,
-its resistance shall become threefold. The second is of the
-resistance increasing in the duplicate proportion of the velocity;
-so that, if the velocity of a body be doubled, its resistance
-shall be rendered four times; and if the velocity be
-trebled, nine times as great as at first. But what is to be understood
-by duplicate proportion has been already explained<a name="FNanchor_96_96" id="FNanchor_96_96"></a><a href="#Footnote_96_96" class="fnanchor">[96]</a>.
-The third supposition is, that the resistance increases
-partly in the single proportion of the velocity, and partly in
-the duplicate proportion thereof.</p>
-
-<p>4. <span class="smcap gesperrt">In</span> all these suppositions, bodies are considered under
-two respects, either as moving, and opposing themselves<span class="pagenum"><a name="Page_145" id="Page_145">[145]</a></span>
-against the fluid by that power alone, which is essential to
-them, of resisting to the change of their state from rest to
-motion, or from motion to rest, which we have above called
-their power of inactivity; or else, as descending or ascending,
-and so having the power of gravity combined with
-that other power. Thus our author has shewn in all those
-three suppositions, in what manner bodies are resisted in an
-uniform fluid, when they move with the aforesaid progressive
-motion<a name="FNanchor_97_97" id="FNanchor_97_97"></a><a href="#Footnote_97_97" class="fnanchor">[97]</a>; and what the resistance is, when they ascend or
-descend perpendicularly<a name="FNanchor_98_98" id="FNanchor_98_98"></a><a href="#Footnote_98_98" class="fnanchor">[98]</a>. And if a body ascend or descend
-obliquely, and the resistance be singly proportional to the velocity,
-it is shewn how the body is resisted in a fluid of an uniform
-density, and what line it will describe<a name="FNanchor_99_99" id="FNanchor_99_99"></a><a href="#Footnote_99_99" class="fnanchor">[99]</a>, which is determined
-by the measurement of the hyperbola, and appears
-to be no other than that line, first considered in particular
-by Dr. <span class="smcap gesperrt"><em class="gesperrt">Barrow</em></span><a name="FNanchor_100_100" id="FNanchor_100_100"></a><a href="#Footnote_100_100" class="fnanchor">[100]</a>, which is now commonly known
-by the name of the logarithmical curve. In the supposition
-that the resistance increases in the duplicate proportion
-of the velocity, our author has not given us the line
-which would be described in an uniform fluid; but has instead
-thereof discussed a problem, which is in some sort the
-reverse; to find the density of the fluid at all altitudes, by
-which any given curve line may be described; which problem
-is so treated by him, as to be applicable to any kind of
-resistance whatever<a name="FNanchor_101_101" id="FNanchor_101_101"></a><a href="#Footnote_101_101" class="fnanchor">[101]</a>. But here not unmindful of practice,
-he shews that a body in a fluid of uniform density, like the<span class="pagenum"><a name="Page_146" id="Page_146">[146]</a></span>
-air, will describe a line, which approaches towards an hyperbola;
-that is, its motion will be nearer to that curve line
-than to the parabola. And consequent upon this remark, he
-shews how to determine this hyperbola by experiment, and
-briefly resolves the chief of those problems relating to projectiles,
-which are in use in the art of gunnery, in this curve<a name="FNanchor_102_102" id="FNanchor_102_102"></a><a href="#Footnote_102_102" class="fnanchor">[102]</a>;
-as <span class="smcap"><em class="gesperrt">Torricelli</em></span> and others have done in the parabola<a name="FNanchor_103_103" id="FNanchor_103_103"></a><a href="#Footnote_103_103" class="fnanchor">[103]</a>,
-whose inventions have been explained at large above<a name="FNanchor_104_104" id="FNanchor_104_104"></a><a href="#Footnote_104_104" class="fnanchor">[104]</a>.</p>
-
-<p>5. <span class="smcap gesperrt">Our</span> author has also handled distinctly that particular
-sort of motion, which is described by pendulums<a name="FNanchor_105_105" id="FNanchor_105_105"></a><a href="#Footnote_105_105" class="fnanchor">[105]</a>; and
-has likewise considered some few cases of bodies moving in
-resisting fluids round a center, to which they are impelled by
-a centripetal force, in order to give an idea of those kinds of
-motions<a name="FNanchor_106_106" id="FNanchor_106_106"></a><a href="#Footnote_106_106" class="fnanchor">[106]</a>.</p>
-
-<p>6. <span class="smcap gesperrt">The</span> treating of the resistance of pendulums has given
-him an opportunity of inserting into another part of
-his work some speculations upon the motions of them without
-resistance, which have a very peculiar elegance; where
-in he treats of them as moved by a gravitation acting in
-the law, which he shews to belong to the earth below its
-surface<a name="FNanchor_107_107" id="FNanchor_107_107"></a><a href="#Footnote_107_107" class="fnanchor">[107]</a>; performing in this kind of gravitation, where the
-force is proportional to the distance from the center, all that
-<span class="smcap">Huygens</span> had before done in the common supposition of
-its being uniform, and acting in parallel lines<a name="FNanchor_108_108" id="FNanchor_108_108"></a><a href="#Footnote_108_108" class="fnanchor">[108]</a>.</p>
-
-<p><span class="pagenum"><a name="Page_147" id="Page_147">[147]</a></span></p>
-
-<p>7. <span class="smcap gesperrt">Huygens</span> at the end of his treatise of the cause of
-gravity<a name="FNanchor_109_109" id="FNanchor_109_109"></a><a href="#Footnote_109_109" class="fnanchor">[109]</a> informs us, that he likewise had carried his speculations
-on the first of these suppositions, of the resistance in
-fluids being proportional to the velocity of the body, as far as
-our author.  But finding by experiment that the second was
-more conformable to nature, he afterwards made some progress
-in that, till he was stopt, by not being able to execute to his
-wish what related to the perpendicular descent of bodies; not
-observing that the measurement of the curve line, he made
-use of to explain it by, depended on the hyperbola. Which
-oversight may well be pardoned in that great man, considering
-that our author had not been pleased at that time to
-communicate to the publick his admirable discourse of the
-<span class="smcap">quadrature</span> or <span class="smcap">measurement of curve lines</span>, with which he
-has since obliged the world: for without the use of that
-treatise, it is I think no injury even to our author’s unparalleled
-abilities to believe, it would not have been easy for
-himself to have succeeded so happily in this and many other
-parts of his writings.</p>
-
-<p><a name="c147" id="c147">8.</a> <span class="smcap gesperrt">What Huygens</span> found by experiment, that bodies
-were in reality resisted in the duplicate proportion of their velocity,
-agrees with the reasoning of our author<a name="FNanchor_110_110" id="FNanchor_110_110"></a><a href="#Footnote_110_110" class="fnanchor">[110]</a>, who distinguishes
-the resistance, which fluids give to bodies by the tenacity
-of their parts, and the friction between them and the body,
-from that, which arises from the power of inactivity, with
-which the constituent particles of fluids are endued like all<span class="pagenum"><a name="Page_148" id="Page_148">[148]</a></span>
-other portions of matter, by which power the particles of fluids
-like other bodies make resistance against being put into motion.</p>
-
-<p>9. <span class="smcap gesperrt">The</span> resistance, which arises from the friction of the
-body against the parts of the fluid, must be very inconsiderable;
-and the resistance, which follows from the tenacity of
-the parts of fluids, is not usually very great, and does not
-depend much upon the velocity of the body in the fluid;
-for as the parts of the fluid adhere together with a certain
-degree of force, the resistance, which the body receives from
-thence, cannot much depend upon the velocity, with which
-the body moves; but like the power of gravity, its effect must
-be proportional to the time of its acting. This the reader
-may find farther explained by Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> himself
-in the postscript to a discourse published by me in <span class="smcap">the philosophical
-transactions</span>, N<sup>o</sup> 371. The principal resistance,
-which most fluids give to bodies, arises from the power of
-inactivity in the parts of the fluids, and this depends upon the
-velocity, with which the body moves, on a double account.
-In the first place, the quantity of the fluid moved out of
-place by the moving body in any determinate space of time
-is proportional to the velocity, wherewith the body moves;
-and in the next place, the velocity with which each particle of
-the fluid is moved, will also be proportional to the velocity of
-the body: therefore since the resistance, which any body makes
-against being put into motion, is proportional both to the quantity
-of matter moved and the velocity it is moved with; the
-resistance, which a fluid gives on this account, will be doubly increased
-with the increase of the velocity in the moving body;<span class="pagenum"><a name="Page_149" id="Page_149">[149]</a></span>
-that is, the resistance will be in a two-fold or duplicate proportion
-of the velocity, wherewith the body moves through the
-fluid.</p>
-
-<p>10. <span class="smcap gesperrt">Farther</span> it is most manifest, that this latter kind
-of resistance increasing with the increase of velocity, even
-in a greater degree than the velocity it self increases, the
-swifter the body moves, the less proportion the other species
-of resistance will bear to this: nay that this part of the resistance
-may be so much augmented by a due increase of velocity,
-till the former resistances shall bear a less proportion to
-this, than any that might be assigned.  And indeed experience
-shews, that no other resistance, than what arises from
-the power of inactivity in the parts of the fluid, is of moment,
-when the body moves with any considerable swiftness.</p>
-
-<p><a name="c149" id="c149">11.</a> <span class="smcap gesperrt">There</span> is besides these yet another species of resistance,
-found only in such fluids, as, like our air, are elastic.
-Elasticity belongs to no fluid known to us beside the air. By
-this property any quantity of air may be contracted into a
-less space by a forcible pressure, and as soon as the compressing
-power is removed, it will spring out again to its
-former dimensions. The air we breath is held to its present
-density by the weight of the air above us.  And as this incumbent
-weight, by the motion of the winds, or other causes,
-is frequently varied (which appears by the barometer;)
-so when this weight is greatest, we breath a more dense air
-than at other times. To what degree the air would expand
-it self by its spring, if all pressure were removed, is not<span class="pagenum"><a name="Page_150" id="Page_150">[150]</a></span>
-known, nor yet into how narrow a compass it is capable
-of being compressed. Mr. <span class="smcap">Boyle</span> found it by experiment
-capable both of expansion and compression to such a degree,
-that he could cause a quantity of air to expand it self over a
-space some hundred thousand times greater, than the space to
-which he could confine the same quantity<a name="FNanchor_111_111" id="FNanchor_111_111"></a><a href="#Footnote_111_111" class="fnanchor">[111]</a>. But I shall
-treat more fully of this spring in the air hereafter<a name="FNanchor_112_112" id="FNanchor_112_112"></a><a href="#Footnote_112_112" class="fnanchor">[112]</a>. I am
-now only to consider what resistance to the motion of bodies
-arises from it.</p>
-
-<p><a name="c150" id="c150">12.</a> <span class="smcap gesperrt">But</span> before our author shews in what manner this
-cause of resistance operates, he proposes a method, by which
-fluids may be rendered elastic, demonstrating that if their
-particles be provided with a power of repelling each other,
-which shall exert it self with degrees of strength reciprocally
-proportional to the distances between the centers of
-the particles; that then such fluids will observe the same
-rule in being compressed, as our air does, which is this, that
-the space, into which it yields upon compression, is reciprocally
-proportional to the compressing weight<a name="FNanchor_113_113" id="FNanchor_113_113"></a><a href="#Footnote_113_113" class="fnanchor">[113]</a>. The term
-reciprocally proportional has been explained above<a name="FNanchor_114_114" id="FNanchor_114_114"></a><a href="#Footnote_114_114" class="fnanchor">[114]</a>. And if
-the centrifugal force of the particles acted by other laws, such
-fluids would yield in a different manner to compression<a name="FNanchor_115_115" id="FNanchor_115_115"></a><a href="#Footnote_115_115" class="fnanchor">[115]</a>.</p>
-
-<p>13. <span class="smcap gesperrt">Whether</span> the particles of the air be endued with
-such a power, by which they can act upon each other out
-of contact, our author does not determine, but leaves that<span class="pagenum"><a name="Page_151" id="Page_151">[151]</a></span>
-to future examination, and to be discussed by philosophers.
-Only he takes occasion from hence to consider the resistance
-in elastic fluids, under this notion; making remarks, as
-he passes along, upon the differences, which will arise, if their
-elasticity be derived from any other fountain<a name="FNanchor_116_116" id="FNanchor_116_116"></a><a href="#Footnote_116_116" class="fnanchor">[116]</a>. And this, I
-think, must be confessed to be done by him with great judgment;
-for this is far the most reasonable account, which has
-been given of this surprizing power, as must without doubt be
-freely acknowledged by any one, who in the least considers
-the insufficiency of all the other conjectures, which have
-been framed; and also how little reason there is to deny to
-bodies other powers, by which they may act upon each other
-at a distance, as well as that of gravity; which we shall hereafter
-shew to be a property universally belonging to all the
-bodies of the universe, and to all their parts<a name="FNanchor_117_117" id="FNanchor_117_117"></a><a href="#Footnote_117_117" class="fnanchor">[117]</a>. Nay we actually
-find in the loadstone a very apparent repelling, as well as
-an attractive power. But of this more in the conclusion of
-this discourse.</p>
-
-<p>14. <span class="smcap gesperrt">By</span> these steps our author leads the way to explain
-the resistance, which the air and such like fluids will give
-to bodies by their elasticity; which resistance he explains
-thus. If the elastic power of the fluid were to be varied
-so, as to be always in the duplicate proportion of the
-velocity of the resisted body, it is shewn that then the
-resistance derived from the elasticity, would increase in the
-duplicate proportion of the velocity; in so much that the<span class="pagenum"><a name="Page_152" id="Page_152">[152]</a></span>
-whole resistance would be in that proportion, excepting only
-that small part, which arises from the friction between the
-body and the parts of the fluid. From whence it follows,
-that because the elastic power of the same fluid does in
-truth continue the same, if the velocity of the moving body be
-diminished, the resistance from the elasticity, and therefore
-the whole resistance, will decrease in a less proportion, than the
-duplicate of the velocity; and if the velocity be increased, the
-resistance from the elasticity will increase in a less proportion,
-than the duplicate of the velocity, that is in a less proportion,
-than the resistance made by the power of inactivity of the
-parts of the fluid. And from this foundation is raised the proof
-of a property of this resistance, given by the elasticity in common
-with the others from the tenacity and friction of the
-parts of the fluid; that the velocity may be increased, till this
-resistance from the fluid’s elasticity shall bear no considerable
-proportion to that, which is produced by the power of inactivity
-thereof<a name="FNanchor_118_118" id="FNanchor_118_118"></a><a href="#Footnote_118_118" class="fnanchor">[118]</a>. From whence our author draws this conclusion;
-that the resistance of a body, which moves very swiftly
-in an elastic fluid, is near the same, as if the fluid were
-not elastic; provided the elasticity arises from the centrifugal
-power of the parts of the medium, as before explained, especially
-if the velocity be so great, that this centrifugal power
-shall want time to exert it self<a name="FNanchor_119_119" id="FNanchor_119_119"></a><a href="#Footnote_119_119" class="fnanchor">[119]</a>. But it is to be observed,
-that in the proof of all this our author proceeds upon the supposition
-of this centrifugal power in the parts of the fluid; but
-if the elasticity be caused by the expansion of the parts in the<span class="pagenum"><a name="Page_153" id="Page_153">[153]</a></span>
-manner of wool compressed, and such like bodies, by which
-the parts of the fluid will be in some measure entangled
-together, and their motion be obstructed, the fluid will
-be in a manner tenacious, and give a resistance upon that account
-over and above what depends upon its elasticity only<a name="FNanchor_120_120" id="FNanchor_120_120"></a><a href="#Footnote_120_120" class="fnanchor">[120]</a>;
-and the resistance derived from that cause is to be
-judged of in the manner before set down.</p>
-
-<p>15. <span class="smcap gesperrt">It</span> is now time to pass to the second part of this theory;
-which is to assign the measure of resistance, according
-to the proportion between the density of the body and the
-density of the fluid. What is here to be understood by the
-word density has been explained above<a name="FNanchor_121_121" id="FNanchor_121_121"></a><a href="#Footnote_121_121" class="fnanchor">[121]</a>. For this purpose
-as our author before considered two distinct cases of bodies
-moving in mediums; one when they opposed themselves to
-the fluid by their power of inactivity only, and another
-when by ascending or descending their weight was combined
-with that other power: so likewise, the fluids themselves
-are to be regarded under a double capacity; either
-as having their parts at rest, and disposed freely without restraint,
-or as being compressed together by their own
-weight, or any other cause.</p>
-
-<p><a name="c153" id="c153">16.</a> <span class="smcap gesperrt">In</span> the first case, if the parts of the fluid be wholly
-disingaged from one another, so that each particle is at liberty
-to move all ways without any impediment, it is shewn,
-that if a globe move in such a fluid, and the globe and particles<span class="pagenum"><a name="Page_154" id="Page_154">[154]</a></span>
-of the fluid are endued with perfect elasticity; so that
-as the globe impinges upon the particles of it, they shall
-bound off and separate themselves from the globe, with the
-same velocity, with which the globe strikes upon them; then
-the resistance, which the globe moving with any known velocity
-suffers, is to be thus determined. From the velocity
-of the globe, the time, wherein it would move over two
-third parts of its own diameter with that velocity, will be
-known. And such proportion as the density of the fluid bears
-to the density of the globe, the same the resistance given to
-the globe will bear to the force, which acting, like the power
-of gravity, on the globe without intermission during the space
-of time now mentioned, would generate in the globe the
-same degree of motion, as that wherewith it moves in the
-fluid<a name="FNanchor_122_122" id="FNanchor_122_122"></a><a href="#Footnote_122_122" class="fnanchor">[122]</a>. But if neither the globe nor the particles of the
-fluid be elastic, so that the particles, when the globe
-strikes against them, do not rebound from it, then the
-resistance will be but half so much<a name="FNanchor_123_123" id="FNanchor_123_123"></a><a href="#Footnote_123_123" class="fnanchor">[123]</a>. Again, if the particles
-of the fluid and the globe are imperfectly elastic, so
-that the particles will spring from the globe with part only
-of that velocity wherewith the globe impinges upon them;
-then the resistance will be a mean between the two preceding
-cases, approaching nearer to the first or second, according
-as the elasticity is more or less<a name="FNanchor_124_124" id="FNanchor_124_124"></a><a href="#Footnote_124_124" class="fnanchor">[124]</a>.</p>
-
-<p>17. <span class="smcap gesperrt">The</span> elasticity, which is here ascribed to the particles
-of the fluid, is not that power of repelling one another,<span class="pagenum"><a name="Page_155" id="Page_155">[155]</a></span>
-when out of contact, by which, as has before been mentioned,
-the whole fluid may be rendred elastic; but such
-an elasticity only, as many solid bodies have of recovering
-their figure, whenever any forcible change is made in it, by
-the impulse of another body or otherwise. Which elasticity
-has been explained above at large<a name="FNanchor_125_125" id="FNanchor_125_125"></a><a href="#Footnote_125_125" class="fnanchor">[125]</a>.</p>
-
-<p><a name="c155a" id="c155a">18.</a> <span class="smcap gesperrt">This</span> is the case of discontinued fluids, where the body,
-by pressing against their particles, drives them before
-itself, while the space behind the body is left empty. But
-in fluids which are compressed, so that the parts of them removed
-out of place by the body resisted immediately retire
-behind the body, and fill that space, which in the other case
-is left vacant, the resistance is still less; for a globe in such a
-fluid which shall be free from all elasticity, will be resisted
-but half as much as the least resistance in the former case<a name="FNanchor_126_126" id="FNanchor_126_126"></a><a href="#Footnote_126_126" class="fnanchor">[126]</a>.
-But by elasticity I now mean that power, which renders the
-whole fluid so; of which if the compressed fluid be possessed,
-in the manner of the air, then the resistance will be greater
-than by the foregoing rule; for the fluid being capable in some
-degree of condensation, it will resemble so far the case of uncompressed
-fluids<a name="FNanchor_127_127" id="FNanchor_127_127"></a><a href="#Footnote_127_127" class="fnanchor">[127]</a>. But, as has been before related, this difference
-is most considerable in slow motions.</p>
-
-<p><a name="c155b" id="c155b">19.</a> <span class="smcap gesperrt">In</span> the next place our author is particular in determining
-the degrees of resistance accompanying bodies of
-different figures; which is the last of the three heads, we<span class="pagenum"><a name="Page_156" id="Page_156">[156]</a></span>
-divided the whole discourse of resistance into. And in this
-disquisition he finds a very surprizing and unthought of difference,
-between free and compressed fluids. He proves,
-that in the former kind, a globe suffers but half the resistance,
-which the cylinder, that circumscribes the globe, will
-do, if it move in the direction of its axis<a name="FNanchor_128_128" id="FNanchor_128_128"></a><a href="#Footnote_128_128" class="fnanchor">[128]</a>. But in the latter
-he proves, that the globe and cylinder are resisted alike<a name="FNanchor_129_129" id="FNanchor_129_129"></a><a href="#Footnote_129_129" class="fnanchor">[129]</a>.
-And in general, that let the shape of bodies be
-ever so different, yet if the greatest sections of the bodies
-perpendicular to the axis of their motion be equal, the
-bodies will be resisted equally<a name="FNanchor_130_130" id="FNanchor_130_130"></a><a href="#Footnote_130_130" class="fnanchor">[130]</a>.</p>
-
-<p>20. <span class="smcap gesperrt">Pursuant</span> to the difference found between the resistance
-of the globe and cylinder in rare and uncompressed
-fluids, our author gives us the result of some other inquiries
-of the same nature. Thus of all the frustums of a cone,
-that can be described upon the same base and with the same
-altitude, he shews how to find that, which of all others
-will be the least resisted, when moving in the direction of
-its axis<a name="FNanchor_131_131" id="FNanchor_131_131"></a><a href="#Footnote_131_131" class="fnanchor">[131]</a>. And from hence he draws an easy method of altering
-the figure of any spheroidical solid, so that its capacity
-may be enlarged, and yet the resistance of it diminished<a name="FNanchor_132_132" id="FNanchor_132_132"></a><a href="#Footnote_132_132" class="fnanchor">[132]</a>:
-a note which he thinks may not be useless to ship-wrights.
-He concludes with determining the solid, which
-will be resisted the least that is possible, in these discontinued
-fluids<a name="FNanchor_133_133" id="FNanchor_133_133"></a><a href="#Footnote_133_133" class="fnanchor">[133]</a>.</p>
-
-<p><span class="pagenum"><a name="Page_157" id="Page_157">[157]</a></span></p>
-
-<p>21. <span class="smcap gesperrt">That</span> I may here be understood by readers unacquainted
-with mathematical terms, I shall explain what I
-mean by a frustum of a cone, and a spheroidical solid. A
-cone has been defined above. A frustum is what remains,
-when part of the cone next the vertex is cut away by a section
-parallel to the base of the cone, as in fig. 86. A spheroid
-is produced from an ellipsis, as a sphere or globe is made
-from a circle. If a circle turn round on its diameter, it describes
-by its motion a sphere; so if an ellipsis (which figure
-has been defined above, and will be more fully explained
-hereafter<a name="FNanchor_134_134" id="FNanchor_134_134"></a><a href="#Footnote_134_134" class="fnanchor">[134]</a>) be turned round either upon the longest or
-shortest line, that can be drawn through the middle of it,
-there will be described a kind of oblong or flat sphere, as
-in fig. 87. Both these figures are called spheroids, and any
-solid resembling these I here call spheroidical.</p>
-
-<p>22. <span class="smcap gesperrt">If</span> it should be asked, how the method of altering
-spheroidical bodies, here mentioned, can contribute to the
-facilitating a ship’s motion, when I just above affirmed,
-that the figure of bodies, which move in a compressed
-fluid not elastic, has no relation to the augmentation or diminution
-of the resistance; the reply is, that what was
-there spoken relates to bodies deep immerged into such fluids,
-but not of those, which swim upon the surface of them;
-for in this latter case the fluid, by the appulse of the anterior
-parts of the body, is raised above the level of the
-surface, and behind the body is sunk somewhat below; so<span class="pagenum"><a name="Page_158" id="Page_158">[158]</a></span>
-that by this inequality in the superficies of the fluid, that
-part of it, which at the head of the body is higher than
-the fluid behind, will resist in some measure after the
-manner of discontinued fluids<a name="FNanchor_135_135" id="FNanchor_135_135"></a><a href="#Footnote_135_135" class="fnanchor">[135]</a>, analogous to what was before
-observed to happen in the air through its elasticity,
-though the body be surrounded on every side by it<a name="FNanchor_136_136" id="FNanchor_136_136"></a><a href="#Footnote_136_136" class="fnanchor">[136]</a>. And
-as far as the power of these causes extends, the figure of the
-moving body affects its resistance; for it is evident, that the
-figure, which presses least directly against the parts of the fluid,
-and so raises least the surface of a fluid not elastic, and least
-compresses one that is elastic, will be least resisted.</p>
-
-<p>23. <span class="smcap gesperrt">The</span> way of collecting the difference of the resistance
-in rare fluids, which arises from the diversity of figure, is
-by considering the different effect of the particles of the fluid
-upon the body moving against them, according to the different
-obliquity of the several parts of the body upon which
-they respectively strike; as it is known, that any body impinging
-against a plane obliquely, strikes with a less force,
-than if it fell upon it perpendicularly; and the greater the
-obliquity is, the weaker is the force. And it is the same
-thing, if the body be at rest, and the plane move against it<a name="FNanchor_137_137" id="FNanchor_137_137"></a><a href="#Footnote_137_137" class="fnanchor">[137]</a>.</p>
-
-<p><a name="c158" id="c158">24.</a> <span class="smcap gesperrt">That</span> there is no connexion between the figure
-of a body and its resistance in compressed fluids, is proved
-thus. Suppose A&nbsp;B&nbsp;C&nbsp;D (in fig. 88.) to be a canal, having such a
-fluid, water for instance, running through it with an equable<span class="pagenum"><a name="Page_159" id="Page_159">[159]</a></span>
-velocity; and let any body E, by being placed in the axis
-of the canal, hinder the passage of the water. It is evident,
-that the figure of the fore part of this body will
-have little influence in obstructing the water’s motion, but
-the whole impediment will arise from the space taken up
-by the body, by which it diminishes the bore of the canal,
-and straightens the passage of the water<a name="FNanchor_138_138" id="FNanchor_138_138"></a><a href="#Footnote_138_138" class="fnanchor">[138]</a>. But proportional
-to the obstruction of the water’s motion, will be
-the force of the water upon the body E<a name="FNanchor_139_139" id="FNanchor_139_139"></a><a href="#Footnote_139_139" class="fnanchor">[139]</a>. Now suppose
-both orifices of the canal to be closed, and the water in it
-to remain at rest; the body E to move, so that the parts
-of the water may pass by it with the same degree of velocity,
-as they did before; it is beyond contradiction, that the pressure
-of the water upon the body, that is, the resistance
-it gives to its motion, will remain the same; and therefore
-will have little connexion with the figure of the body<a name="FNanchor_140_140" id="FNanchor_140_140"></a><a href="#Footnote_140_140" class="fnanchor">[140]</a>.</p>
-
-<p>25. <span class="smcap gesperrt">By</span> a method of reasoning drawn from the same fountain
-is determined the measure of resistance these compressed
-fluids give to bodies, in reference to the proportion between
-the density of the body and that of the fluid. This shall be
-explained particularly in my comment on Sir <span class="smcap"><em class="gesperrt">Is. Newton</em></span>’s
-mathematical principles of natural philosophy; but is not a
-proper subject to be insisted on farther in this place.</p>
-
-<p>26. <span class="smcap gesperrt">We</span> have now gone through all the parts of this
-theory. There remains nothing more, but in few words to
-mention the experiments, which our author has made, both<span class="pagenum"><a name="Page_160" id="Page_160">[160]</a></span>
-with bodies falling perpendicularly through water, and the
-air<a name="FNanchor_141_141" id="FNanchor_141_141"></a><a href="#Footnote_141_141" class="fnanchor">[141]</a>, and with pendulums<a name="FNanchor_142_142" id="FNanchor_142_142"></a><a href="#Footnote_142_142" class="fnanchor">[142]</a>: all which agree with the theory.
-In the case of falling bodies, the times of their fall determined
-by the theory come out the same, as by observation, to a
-surprizing exactness; in the pendulums, the rod, by which
-the ball of the pendulum hangs, suffers resistance as well as
-the ball, and the motion of the ball being reciprocal, it communicates
-such a motion to the fluid, as increases the resistance,
-but the deviation from the theory is no more, than
-what may reasonably follow from these causes.</p>
-
-<p>27. <span class="smcap gesperrt">By</span> this theory of the resistance of fluids, and these experiments,
-our author decides the question so long agitated
-among natural philosophers, whether all space is absolutely
-full of matter. The Aristotelians and Cartesians both assert
-this plenitude; the Atomists have maintained the contrary.
-Our author has chose to determine this question by his theory
-of resistance, as shall be explained in the following chapter.</p>
-
-<div class="figcenter">
-     <img src="images/ill-216.jpg" width="300" height="170"
-         alt=""
-         title="" />
-</div>
-
-</div>
-
-<p><span class="pagenum"><a name="Page_161" id="Page_161">[161]</a></span></p>
-
-<div class="chapter">
-
-<div class="figcenter">
-     <img src="images/ill-217.jpg" width="400" height="207"
-         alt=""
-         title="" />
-</div>
-
-<p class="pc xlarge"><em class="gesperrt">BOOK II</em>.</p>
-<p class="pc reduct"><span class="smcap">Concerning the</span></p>
-<p class="pc large">SYSTEM of the WORLD.</p>
-
-<hr class="d3" />
-
-<h2><a name="c161" id="c161"><span class="smcap">Chap. I.</span></a><br />
-That the Planets move in a space empty of
-all sensible matter.</h2>
-
-<div>
-  <img class="dcap1" src="images/di2.jpg" width="80" height="81" alt=""/>
-</div>
-<p class="cap09">I HAVE now gone through the
-first part of my design, and have explained,
-as far as the nature of my
-undertaking would permit, what
-Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> has delivered
-in general concerning the motion
-of bodies. It follows now to speak
-of the discoveries, he has made in the system of the world;<span class="pagenum"><a name="Page_162" id="Page_162">[162]</a></span>
-and to shew from him what cause keeps the heavenly bodies
-in their courses. But it will be necessary for the use of
-such, as are not skilled in astronomy, to premise a brief description
-of the planetary system.</p>
-
-<p><a name="c162" id="c162">2.</a> <span class="smcap gesperrt">This</span> system is disposed in the following manner. In
-the middle is placed the sun. About him six globes continually
-roll. These are the primary planets; that which
-is nearest to the sun is called Mercury, the next Venus,
-next to this is our earth, the next beyond is Mars, after
-him Jupiter, and the outermost of all Saturn. Besides these
-there are discovered in this system ten other bodies, which
-move about some of these primary planets in the same
-manner, as they move round the sun.  These are called
-secondary planets.  The most conspicuous of them is the
-moon, which moves round our earth; four bodies move in
-like manner round Jupiter; and five round Saturn. Those
-which move about Jupiter and Saturn, are usually called
-satellites; and cannot any of them be seen without a telescope.
-It is not impossible, but there may be more secondary
-planets, beside these; though our instruments
-have not yet discovered any other.  This disposition of
-the planetary or solar system is represented in fig. 89.</p>
-
-<p>3. <span class="smcap gesperrt">The</span> same planet is not always equally distant from
-the sun. But the middle distance of Mercury is between
-⅕ and ⅖ of the distance of the earth from the sun; Venus
-is distant from the sun almost ¾ of the distance of the
-earth; the middle distance of Mars is something more than
-half as much again, as the distance of the earth; Jupiter’s
-middle distance exceeds five times the distance of the
-earth, by between ⅕ and 1/6 part of this distance; Saturn’s
-middle distance is scarce more than 9½ times the distance
-between the earth and sun; but the middle distance between
-the earth and sun is about 217⅛ times the sun’s semidiameter.</p>
-
-<div class="figcenter">
-     <img src="images/ill-219.jpg" width="400" height="510"
-         alt=""
-         title="" />
-</div>
-
-<p><span class="pagenum"><a name="Page_163" id="Page_163">[163]</a></span></p>
-
-<p>4. <span class="smcap gesperrt">All</span> these planets move one way, from west to
-east; and of the primary planets the most remote is longest
-in finishing its course round the sun. The period
-of Saturn falls short only sixteen days of 29 years and
-a half. The period of Jupiter is twelve years wanting about
-50 days. The period of Mars falls short of two years
-by about 43 days. The revolution of the earth constitutes
-the year. Venus performs her period in about 224½ days,
-and Mercury in about 88 days.</p>
-
-<p>5. <span class="smcap gesperrt">The</span> course of each planet lies throughout in one
-plane or flat surface, in which the sun is placed; but they do
-not all move in the same plane, though the different planes,
-in which they move, cross each other in very small angles.
-They all cross each other in lines, which pass through the
-sun; because the sun lies in the plane of each orbit. This
-inclination of the several orbits to each other is represented in
-fig. 90. The line, in which the plane of any orbit crosses
-the plane of the earth’s motion, is called the line of the nodes
-of that orbit.</p>
-
-<p><span class="pagenum"><a name="Page_164" id="Page_164">[164]</a></span></p>
-
-<p>6. <span class="smcap gesperrt">Each</span> planet moves round the sun in the line, which
-we have mentioned above<a name="FNanchor_143_143" id="FNanchor_143_143"></a><a href="#Footnote_143_143" class="fnanchor">[143]</a> under the name of ellipsis; which
-I shall here shew more particularly how to describe. I have
-there said how it is produced in the cone. I shall now shew
-how to form it upon a plane. Fix upon any plane two pins,
-as at A and B in fig. 91. To these tye a string A&nbsp;C&nbsp;B of any
-length. Then apply a third pin D so to the string, as to hold
-it strained; and in that manner carrying this pin about, the
-point of it will describe an ellipsis. If through the points A,
-B the straight line E&nbsp;A&nbsp;B&nbsp;F be drawn, to be terminated at
-the ellipsis in the points E and F, this is the longest line
-of any, that can be drawn within the figure, and is called
-the greater axis of the ellipsis. The line G&nbsp;H, drawn
-perpendicular to this axis E&nbsp;F, so as to pass through the
-middle of it, is called the lesser axis. The two points A
-and B are called focus’s. Now each planet moves round
-the sun in a line of this kind, so that the sun is found in
-one focus. Suppose A to be the place of the sun. Then E
-is the point, wherein the planet will be nearest of all to the
-sun, and at F it will be most remote. The point E is called
-the perihelion of the planet, and F the aphelion. In G
-and H the planet is said to be in its middle or mean distance;
-because the distance A&nbsp;G or A&nbsp;H is truly the middle between
-A&nbsp;E the least, and A&nbsp;F the greatest distance. In fig. 92.
-is represented how the greater axis of each orbit is situated in
-respect of the rest. The proportion between the greatest and
-least distances of the planet from the sun is very different
-in the different planets.</p>
-
-<div class="figcenter">
-     <img src="images/ill-223.jpg" width="400" height="499"
-         alt=""
-         title="" />
-</div>
-
-<p>In Saturn the proportion of the
-<span class="pagenum"><a name="Page_165" id="Page_165">[165]</a></span>greatest distance to the least is something less, than the proportion
-of 9 to 8, but much nearer to this, than to the proportion
-of 10 to 9. In Jupiter this proportion is a little greater,
-than that of 11 to 10. In Mars it exceeds the proportion of
-6 to 5. In the earth it is about the proportion of 30 to 29.
-In Venus it is near to that of 70 to 69. And in Mercury it
-comes not a great deal short of the proportion of 3 to 2.</p>
-
-<div class="floatright">
-     <img src="images/ill-225.jpg" width="100" height="167"
-         alt=""
-         title="" />
-</div>
-
-<p>7. <span class="smcap gesperrt">Each</span> of these planets so moves through its ellipsis, that
-the line drawn from the sun to the planet, by accompanying
-the planet in its motion, will describe about the sun equal spaces
-in equal times, after the manner spoke of in the chapter of
-centripetal forces<a name="FNanchor_144_144" id="FNanchor_144_144"></a><a href="#Footnote_144_144" class="fnanchor">[144]</a>. There is also a certain relation between
-the greater axis’s of these ellipsis’s, and the times, in which
-the planets perform their revolutions through them.  Which
-relation may be expressed thus. Let the period
-of one planet be denoted by the letter A, the
-greater axis of its orbit by D; let the period
-of another planet be denoted by B, and the
-greater axis of this planet’s orbit by E.  Then
-if C be taken to bear the same proportion to B,
-as B bears to A; likewise if F be taken to bear the same proportion
-to E, as E bears to D; and G taken to bear the same
-proportion likewise to F, as E bears to D; then A shall bear
-the same proportion to C, as D bears to G.</p>
-
-<p>8. <span class="smcap gesperrt">The</span> secondary planets move round their respective
-primary, much in the same manner as the primary do round<span class="pagenum"><a name="Page_166" id="Page_166">[166]</a></span>
-the sun. But the motions of these shall be more fully explained
-hereafter<a name="FNanchor_145_145" id="FNanchor_145_145"></a><a href="#Footnote_145_145" class="fnanchor">[145]</a>. And there is, besides the planets, another
-sort of bodies, which in all probability move round the sun;
-I mean the comets. The farther description of which bodies
-I also leave to the place, where they are to be particularly
-treated on<a name="FNanchor_146_146" id="FNanchor_146_146"></a><a href="#Footnote_146_146" class="fnanchor">[146]</a>.</p>
-
-<p>9. <span class="smcap gesperrt">Far</span> without this system the fixed stars are placed.
-These are all so remote from us, that we seem almost incapable
-of contriving any means to estimate their distance. Their
-number is exceeding great. Besides two or three thousand,
-which we see with the naked eye, telescopes open to our view
-vast numbers; and the farther improved these instruments
-are, we still discover more and more. Without doubt these
-are luminous globes, like our sun, and ranged through the
-wide extent of space; each of which, it is to be supposed,
-perform the same office, as our sun, affording light and heat
-to certain planets moving about them. But these conjectures
-are not to be pursued in this place.</p>
-
-<p>10. <span class="smcap gesperrt">I shall</span> therefore now proceed to the particular design
-of this chapter, and shew, that there is no sensible matter
-lodged in the space where the planets move.</p>
-
-<p><a name="c166" id="c166">11.</a> <span class="smcap gesperrt">That</span> they suffer no sensible resistance from any
-such matter, is evident from the agreement between the observations
-of astronomers in different ages, with regard to the
-time, in which the planets have been found to perform their<span class="pagenum"><a name="Page_167" id="Page_167">[167]</a></span>
-periods. But it was the opinion of <span class="smcap">Des&nbsp;Cartes</span><a name="FNanchor_147_147" id="FNanchor_147_147"></a><a href="#Footnote_147_147" class="fnanchor">[147]</a>, that the
-planets might be kept in their courses by the means of a fluid
-matter, which continually circulating round should carry
-the planets along with it.  There is one appearance that
-may seem to favour this opinion; which is, that the sun turns
-round its own axis the same way, as the planets move.  The
-earth also turns round its axis the same way, as the moon
-moves round the earth. And the planet Jupiter turns upon
-its axis the same way, as his satellites revolve round him. It
-might therefore be supposed, that if the whole planetary region
-were filled with a fluid matter, the sun, by turning round on
-its own axis, might communicate motion first to that part of
-the fluid, which was contiguous, and by degrees propagate
-the like motion to the parts more remote. After the same
-manner the earth might communicate motion to this fluid, to
-a distance sufficient to carry round the moon, and Jupiter communicate
-the like to the distance of its satellites.  Sir <span class="smcap"><em class="gesperrt">Isaac
-Newton</em></span> has particularly examined what might be the result
-of such a motion as this<a name="FNanchor_148_148" id="FNanchor_148_148"></a><a href="#Footnote_148_148" class="fnanchor">[148]</a>; and he finds, that the velocities,
-with which the parts of this fluid will move in different distances
-from the center of the motion, will not agree with the
-motion observed in different planets: for instance, that the
-time of one intire circulation of the fluid, wherein Jupiter
-should swim, would bear a greater proportion to the time of
-one intire circulation of the fluid, where the earth is; than the
-period of Jupiter bears to the period of the earth. But he
-also proves<a name="FNanchor_149_149" id="FNanchor_149_149"></a><a href="#Footnote_149_149" class="fnanchor">[149]</a>, that the planet cannot circulate in such a fluid,<span class="pagenum"><a name="Page_168" id="Page_168">[168]</a></span>
-so as to keep long in the same course, unless the planet and
-the contiguous fluid are of the same density, and the planet
-be carried along with the same degree of motion, as the fluid.
-There is also another remark made upon this motion by our
-author; which is, that some vivifying force will be continually
-necessary at the center of the motion<a name="FNanchor_150_150" id="FNanchor_150_150"></a><a href="#Footnote_150_150" class="fnanchor">[150]</a>. The sun in particular,
-by communicating motion to the ambient fluid, will
-lose from it self as much motion, as it imparts to the fluid;
-unless some acting principle reside in the sun to renew its
-motion continually. If the fluid be infinite, this gradual loss
-of motion would continue till the whole should stop<a name="FNanchor_151_151" id="FNanchor_151_151"></a><a href="#Footnote_151_151" class="fnanchor">[151]</a>; and
-if the fluid were limited, this loss of motion would continue,
-till there would remain no swifter a revolution in the sun,
-than in the utmost part of the fluid; so that the whole
-would turn together about the axis of the sun, like one solid
-globe<a name="FNanchor_152_152" id="FNanchor_152_152"></a><a href="#Footnote_152_152" class="fnanchor">[152]</a>.</p>
-
-<p><a name="c168" id="c168">12.</a> <span class="smcap gesperrt">It</span> is farther to be observed, that as the planets do not
-move in perfect circles round the sun; there is a greater distance
-between their orbits in some places, than in others. For
-instance, the distance between the orbit of Mars and Venus is
-near half as great again in one part of their orbits, as in the
-opposite place. Now here the fluid, in which the earth
-should swim, must move with a less rapid motion, where
-there is this greater interval between the contiguous orbits; but
-on the contrary, where the space is straitest, the earth moves
-more slowly, than where it is widest<a name="FNanchor_153_153" id="FNanchor_153_153"></a><a href="#Footnote_153_153" class="fnanchor">[153]</a>.</p>
-
-<p><span class="pagenum"><a name="Page_169" id="Page_169">[169]</a></span></p>
-
-<p>13. <span class="smcap gesperrt">Farther</span>, if this our globe of earth swam in a fluid
-of equal density with the earth it self, that is, in a fluid more
-dense than water; all bodies put in motion here upon the
-earth’s surface must suffer a great resistance from it; where
-as, by Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span>’s experiments mentioned in the
-preceding chapter, bodies, that fell perpendicularly down
-through the air, felt about 1/860 part only of the resistance,
-which bodies suffered that fell in like manner through water.</p>
-
-<p><a name="c169" id="c169">14.</a> Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> applies these experiments yet
-farther, and examines by them the general question concerning
-the absolute plenitude of space. According to the Aristotelians,
-all space was full without any the least vacuities whatever.
-<span class="smcap">DesCartes</span> embraced the same opinion, and therefore
-supposed a subtile fluid matter, which should pervade all bodies,
-and adequately fill up their pores. The Atomical philosophers,
-who suppose all bodies both fluid and solid to be composed
-of very minute but solid atoms, assert that no fluid, how
-subtile soever the particles or atoms whereof it is composed
-should be, can ever cause an absolute plenitude; because it
-is impossible that any body can pass through the fluid without
-putting the particles of it into such a motion, as to separate
-them, at least in part, from one another, and so perpetually
-to cause small vacuities; by which these Atomists endeavour
-to prove, that a vacuum, or some space empty of all
-matter, is absolutely necessary to be in nature. Sir <span class="smcap"><em class="gesperrt">Isaac
-Newton</em></span> objects against the filling of space with such a subtile
-fluid, that all bodies in motion must be unmeasurably resisted<span class="pagenum"><a name="Page_170" id="Page_170">[170]</a></span>
-by a fluid so dense, as absolutely to fill up all the space,
-through which it is spread. And lest it should be thought,
-that this objection might be evaded by ascribing to this fluid
-such very minute and smooth parts, as might remove all adhesion
-or friction between them, whereby all resistance
-would be lost, which this fluid might otherwise give to bodies
-moving in it; Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> proves, in the
-manner above related, that fluids resist from the power of
-inactivity of their particles; and that water and the air resist
-almost entirely on this account: so that in this subtile
-fluid, however minute and lubricated the particles, which
-compose it, might be; yet if the whole fluid was as dense as
-water, it would resist very near as much as water does; and
-whereas such a fluid, whose parts are absolutely close together
-without any intervening spaces, must be a great deal
-more dense than water, it must resist more than water in
-proportion to its greater density; unless we will suppose the
-matter, of which this fluid is composed, not to be endued
-with the same degree of inactivity as other matter. But if
-you deprive any substance of the property so universally belonging
-to all other matter, without impropriety of speech
-it can scarce be called by this name.</p>
-
-<p>15. Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> made also an experiment to try in
-particular, whether the internal parts of bodies suffered any resistance.
-And the result did indeed appear to favour some small
-degree of resistance; but so very little, as to leave it doubtful,
-whether the effect did not arise from some other latent cause<a name="FNanchor_154_154" id="FNanchor_154_154"></a><a href="#Footnote_154_154" class="fnanchor">[154]</a>.</p>
-
-<hr class="chap" />
-
-</div>
-
-<p><span class="pagenum"><a name="Page_171" id="Page_171">[171]</a></span></p>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c171a" id="c171a"><span class="smcap">Chap. II.</span></a><br />
-Concerning the cause, which keeps in motion
-the primary planets.</h2>
-
-<p class="drop-cap08"><a name="c171b" id="c171b">SINCE</a> the planets move in a void space and are free
-from resistance; they, like all other bodies, when
-once in motion, would move on in a straight line without
-end, if left to themselves. And it is now to be explained
-what kind of action upon them carries them round the sun.
-Here I shall treat of the primary planets only, and discourse
-of the secondary apart in the next chapter. It has been
-just now declared, that these primary planets move so about
-the sun, that a line extended from the sun to the planet, will,
-by accompanying the planet in its motion, pass over equal spaces
-in equal portions of time<a name="FNanchor_155_155" id="FNanchor_155_155"></a><a href="#Footnote_155_155" class="fnanchor">[155]</a>. And this one property in the
-motion of the planets proves, that they are continually acted
-on by a power directed perpetually to the sun as a center. This
-therefore is one property of the cause, which keeps the
-planets in their courses, that it is a centripetal power, whose
-center is the sun.</p>
-
-<p><a name="c171c" id="c171c">2.</a> <span class="smcap gesperrt">Again</span>, in the chapter upon centripetal forces<a name="FNanchor_156_156" id="FNanchor_156_156"></a><a href="#Footnote_156_156" class="fnanchor">[156]</a> it
-was observ’d, that if the strength of the centripetal power
-was suitably accommodated every where to the motion of
-any body round a center, the body might be carried in<span class="pagenum"><a name="Page_172" id="Page_172">[172]</a></span>
-any bent line whatever, whose concavity should be every
-where turned towards the center of the force. It was farther
-remarked, that the strength of the centripetal force,
-in each place, was to be collected from the nature of the
-line, wherein the body moved<a name="FNanchor_157_157" id="FNanchor_157_157"></a><a href="#Footnote_157_157" class="fnanchor">[157]</a>. Now since each planet
-moves in an ellipsis, and the sun is placed in one focus;
-Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> deduces from hence, that the strength
-of this power is reciprocally in the duplicate proportion of the
-distance from the sun. This is deduced from the properties,
-which the geometers have discovered in the ellipsis. The process
-of the reasoning is not proper to be enlarged upon here;
-but I shall endeavour to explain what is meant by the reciprocal
-duplicate proportion. Each of the terms reciprocal proportion,
-and duplicate proportion, has been already defined<a name="FNanchor_158_158" id="FNanchor_158_158"></a><a href="#Footnote_158_158" class="fnanchor">[158]</a>.
-Their sense when thus united is as follows. Suppose the planet
-moved in the orbit A&nbsp;B&nbsp;C (in fig. 93.) about the sun in S.
-Then, when it is said, that the centripetal power, which acts on
-the planet in A, bears to the power acting on it in B a proportion,
-which is the reciprocal of the duplicate proportion of the
-distance S&nbsp;A to the distance S&nbsp;B; it is meant that the power
-in A bears to the power in B the duplicate of the proportion
-of the distance S&nbsp;B to the distance S&nbsp;A. The reciprocal duplicate
-proportion may be explained also by numbers as follows.
-Suppose several distances to bear to each other proportions
-expressed by the numbers 1, 2, 3, 4, 5; that is, let the
-second distance be double the first, the third be three times,
-the fourth four times, and the fifth five times as great as the<span class="pagenum"><a name="Page_173" id="Page_173">[173]</a></span>
-first. Multiply each of these numbers by it self, and 1 multiplied
-by 1 produces still 1, 2 multiplied by 2 produces 4, 3
-by 3 makes 9, 4 by 4 makes 16, and 5 by 5 gives 25. This
-being done, the fractions ¼, 1/9, 1/16, 1/25, will respectively express
-the proportion, which the centripetal power in each of the
-following distances bears to the power at the first distance: for
-in the second distance, which is double the first, the centripetal
-power will be one fourth part only of the power at the
-first distance; at the third distance the power will be one
-ninth part only of the first power; at the fourth distance,
-the power will be but one sixteenth part of the first; and at
-the fifth distance, one twenty fifth part of the first power.</p>
-
-<p>3. <span class="smcap gesperrt">Thus</span> is found the proportion, in which this centripetal
-power decreases, as the distance from the sun increases, within
-the compass of one planet’s motion. How it comes to pass,
-that the planet can be carried about the sun by this centripetal
-power in a continual round, sometimes rising from the sun,
-then descending again as low, and from thence be carried
-up again as far remote as before, alternately rising and falling
-without end; appears from what has been written above concerning
-centripetal forces: for the orbits of the planets resemble
-in shape the curve line proposed in § 17 of the chapter
-on these forces<a name="FNanchor_159_159" id="FNanchor_159_159"></a><a href="#Footnote_159_159" class="fnanchor">[159]</a>.</p>
-
-<p>4. <span class="smcap gesperrt">But</span> farther, in order to know whether this centripetal
-force extends in the same proportion throughout, and consequently
-whether all the planets are influenced by the very same<span class="pagenum"><a name="Page_174" id="Page_174">[174]</a></span>
-power, our author proceeds thus. He inquires what relation
-there ought to be between the periods of the different planets,
-provided they were acted upon by the same power decreasing
-throughout in the forementioned proportion; and he finds,
-that the period of each in this case would have that very relation
-to the greater axis of its orbit, as I have declared above<a name="FNanchor_160_160" id="FNanchor_160_160"></a><a href="#Footnote_160_160" class="fnanchor">[160]</a>
-to be found in the planets by the observations of astronomers.
-And this puts it beyond question, that the different planets are
-pressed towards the sun, in the same proportion to their distances,
-as one planet is in its several distances. And thence
-in the last place it is justly concluded, that there is such a
-power acting towards the sun in the foresaid proportion at all
-distances from it.</p>
-
-<p>5. <span class="smcap gesperrt">This</span> power, when referred to the planets, our author
-calls centripetal, when to the sun attractive; he gives it likewise
-the name of gravity, because he finds it to be of the same
-nature with that power of gravity, which is observed in our
-earth, as will appear hereafter<a name="FNanchor_161_161" id="FNanchor_161_161"></a><a href="#Footnote_161_161" class="fnanchor">[161]</a>. By all these names he designs
-only to signify a power endued with the properties before
-mentioned; but by no means would he have it understood, as
-if these names referred any way to the cause of it. In particular
-in one place where he uses the name of attraction, he cautions
-us expressly against implying any thing but a power directing
-a body to a center without any reference to the cause
-of it, whether residing in that center, or arising from any
-external impulse<a name="FNanchor_162_162" id="FNanchor_162_162"></a><a href="#Footnote_162_162" class="fnanchor">[162]</a>.</p>
-
-<p><span class="pagenum"><a name="Page_175" id="Page_175">[175]</a></span></p>
-
-<p><a name="c175" id="c175">6.</a> <span class="smcap gesperrt">But</span> now, in these demonstrations some very minute inequalities
-in the motion of the planets are neglected; which is
-done with a great deal of judgment; for whatever be their
-cause, the effects are very inconsiderable, they being so exceeding
-small, that some astronomers have thought fit wholly to pass
-them by<a name="FNanchor_163_163" id="FNanchor_163_163"></a><a href="#Footnote_163_163" class="fnanchor">[163]</a>. However the excellency of this philosophy, when
-in the hands of so great a geometer as our author, is such, that
-it is able to trace the least variations of things up to their causes.
-The only inequalities, which have been observed common to
-all the planets, are the motion of the aphelion and the nodes.
-The transverse axis of each orbit does not always remain fixed,
-but moves about the sun with a very slow progressive
-motion: nor do the planets keep constantly the same plane,
-but change them, and the lines in which those planes intersect
-each other by insensible degrees. The first of these
-inequalities, which is the motion of the aphelion, may be accounted
-for, by supposing the gravitation of the planets towards
-the sun to differ a little from the forementioned reciprocal
-duplicate proportion of the distances; but the second,
-which is the motion of the nodes, cannot be accounted
-for by any power directed towards the sun; for no such
-can give the planet any lateral impulse to divert it from the
-plane of its motion into any new plane, but of necessity must
-be derived from some other center. Where that power is
-lodged, remains to be discovered. Now it is proved, as
-shall be explained in the following chapter, that the three
-primary planets Saturn, Jupiter, and the earth, which have
-satellites revolving about them, are endued with a power of<span class="pagenum"><a name="Page_176" id="Page_176">[176]</a></span>
-causing bodies, in particular those satellites, to gravitate towards
-them with a force, which is reciprocally in the duplicate
-proportion of their distances; and the planets are in all respects,
-in which they come under our examination, so similar
-and alike, that there is no reason to question, but they have
-all the same property. Though it be sufficient for the present
-purpose to have it proved of Jupiter and Saturn only; for
-these planets contain much greater quantities of matter than
-the rest, and proportionally exceed the others in power<a name="FNanchor_164_164" id="FNanchor_164_164"></a><a href="#Footnote_164_164" class="fnanchor">[164]</a>. But
-the influence of these two planets being allowed, it is evident
-how the planets come to shift continually their planes:
-for each of the planets moving in a different plane, the
-action of Jupiter and Saturn upon the rest will be oblique to
-the planes of their motion; and therefore will gradually draw
-them into new ones. The same action of these two planets upon
-the rest will cause likewise a progressive motion of the
-aphelion; so that there will be no necessity of having recourse
-to the other cause for this motion, which was before hinted
-at<a name="FNanchor_165_165" id="FNanchor_165_165"></a><a href="#Footnote_165_165" class="fnanchor">[165]</a>; viz, the gravitation of the planets towards the sun differing
-from the exact reciprocal duplicate proportion of the distances.
-And in the last place, the action of Jupiter and Saturn
-upon each other will produce in their motions the same inequalities,
-as their joint action produces in the rest. All this
-is effected in the same manner, as the sun produces the same
-kind of inequalities and many others in the motion of the
-moon and the other secondary planets; and therefore will be
-best apprehended by what shall be said in the next chapter.<span class="pagenum"><a name="Page_177" id="Page_177">[177]</a></span>
-Those other irregularities in the motion of the secondary
-planets have place likewise here; but are too minute to be
-observable: because they are produced and rectified alternately,
-for the most part in the time of a single revolution;
-whereas the motion of the aphelion and nodes, which continually
-increase, become sensible in a long series of years. Yet
-some of these other inequalities are discernible in Jupiter and
-Saturn, in Saturn chiefly; for when Jupiter, who moves faster
-than Saturn, approaches near to a conjunction with him, his
-action upon Saturn will a little retard the motion of that planet,
-and by the reciprocal action of Saturn he will himself be
-accelerated. After conjunction, Jupiter will again accelerate
-Saturn, and be likewise retarded in the same degree, as before
-the first was retarded and the latter accelerated.  Whatever
-inequalities besides are produced in the motion of Saturn by
-the action of Jupiter upon that planet, will be sufficiently rectified,
-by placing the focus of Saturn’s ellipsis, which should
-otherwise be in the sun, in the common center of gravity of
-the sun and Jupiter.  And all the inequalities in the motion
-of Jupiter, caused by Saturn’s action upon him, are much
-less considerable than the irregularities of Saturn’s motion<a name="FNanchor_166_166" id="FNanchor_166_166"></a><a href="#Footnote_166_166" class="fnanchor">[166]</a>.</p>
-
-<p>7. <span class="smcap gesperrt">This</span> one principle therefore of the planets having a
-power, as well as the sun, to cause bodies to gravitate towards
-them, which is proved by the motion of the secondary planets
-to obtain in fact, explains all the irregularities relating to
-the planets ever observed by astronomers.</p>
-
-<p><span class="pagenum"><a name="Page_178" id="Page_178">[178]</a></span></p>
-
-<p><a name="c178" id="c178">8.</a> Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> after this proceeds to make an
-improvement in astronomy by applying this theory to the farther
-correction of their motions. For as we have here observed
-the planets to possess a principle of gravitation, as well as
-the sun; so it will be explained at large hereafter, that the
-third law of motion, which makes action and reaction equal,
-is to be applied in this case<a name="FNanchor_167_167" id="FNanchor_167_167"></a><a href="#Footnote_167_167" class="fnanchor">[167]</a>; and that the sun does not only
-attract each planet, but is it self also attracted by them; the
-force, wherewith the planet is acted on, bearing to the force,
-wherewith the sun it self is acted on at the same time, the
-proportion, which the quantity of matter in the sun bears to
-the quantity of matter in the planet. From the action between
-the sun and planet being thus mutual Sir <span class="smcap">Isaac
-Newton</span> proves that the sun and planet will describe about
-their common center of gravity similar ellipsis’s; and then that
-the transverse axis of the ellipsis described thus about the moveable
-sun, will bear to the transverse axis of the ellipsis, which
-would be described about the sun at rest in the same time, the
-same proportion as the quantity of solid matter in the sun and
-planet together bears to the first of two mean proportionals between
-this quantity and the quantity of matter in the sun only<a name="FNanchor_168_168" id="FNanchor_168_168"></a><a href="#Footnote_168_168" class="fnanchor">[168]</a>.</p>
-
-<p>9. <span class="smcap gesperrt">Above</span>, where I shewed how to find a cube, that
-should bear any proportion to another cube<a name="FNanchor_169_169" id="FNanchor_169_169"></a><a href="#Footnote_169_169" class="fnanchor">[169]</a>, the lines F&nbsp;T
-and T&nbsp;S are two mean proportionals between E&nbsp;F and F&nbsp;G;
-and counting from E&nbsp;F, F&nbsp;T is called the first, and F&nbsp;S the second
-of those means. In numbers these mean proportionals<span class="pagenum"><a name="Page_179" id="Page_179">[179]</a></span>
-are thus found.</p>
-
-<div class="floatright">
-     <img src="images/ill-239.jpg" width="100" height="114"
-         alt=""
-         title="" />
-</div>
-
-<p>Suppose A and B two numbers, and it be
-required to find C the first, and D the second of
-the two mean proportionals between them. First
-multiply A by it self, and the product multiply
-by B; then C will be the number which in arithmetic
-is called the cubic root of this last product; that is,
-the number C being multiplied by it self, and the product
-again multiplied by the same number C, will produce the
-product above mentioned. In like manner D is the cubic
-root of the product of B multiplied by it self, and the produce
-of that multiplication multiplied again by A.</p>
-
-<p>10. <span class="smcap gesperrt">It</span> will be asked, perhaps, how this correction can be
-admitted, when the cause of the motions of the planets was
-before found by supposing the sun the center of the power,
-which acted upon them: for according to the present correction
-this power appears rather to be directed to their common
-center of gravity. But whereas the sun was at first concluded
-to be the center, to which the power acting on the planets
-was directed, because the spaces described round the sun in
-equal times were found to be equal; so Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span>
-proves, that if the sun and planet move round their common
-center of gravity, yet to an eye placed in the planet, the spaces,
-which will appear to be described about the sun, will have
-the same relation to the times of their description, as the real
-spaces would have, if the sun were at rest<a name="FNanchor_170_170" id="FNanchor_170_170"></a><a href="#Footnote_170_170" class="fnanchor">[170]</a>. I farther asserted,
-that, supposing the planets to move round the sun at rest,<span class="pagenum"><a name="Page_180" id="Page_180">[180]</a></span>
-and to be attracted by a power, which every where should
-act with degrees of strength reciprocally in the duplicate
-proportion of the distances; then the periods of the planets
-must observe the same relation to their distances, as astronomers
-find them to do. But here it must not be supposed, that
-the observations of astronomers absolutely agree without any
-the least difference; and the present correction will not cause
-a deviation from any one astronomer’s observations, so much
-as they differ from one another. For in Jupiter, where this
-correction is greatest, it hardly amounts to the 3000<sup>th</sup> part
-of the whole axis.</p>
-
-<p><a name="c180" id="c180">11.</a> <span class="smcap gesperrt">Upon</span> this head I think it not improper to mention
-a reflection made by our excellent author upon these small inequalities
-in the planets motions; which contains under it a
-very strong philosophical argument against the eternity of the
-world. It is this, that these inequalities must continually increase
-by slow degrees, till they render at length the present
-frame of nature unfit for the purposes, it now serves<a name="FNanchor_171_171" id="FNanchor_171_171"></a><a href="#Footnote_171_171" class="fnanchor">[171]</a>. And
-a more convincing proof cannot be desired against the present
-constitution’s having existed from eternity than this,
-that a certain period of years will bring it to an end. I am
-aware this thought of our author has been represented even
-as impious, and as no less than casting a reflection upon
-the wisdom of the author of nature, for framing a perishable
-work. But I think so bold an assertion ought to have
-been made with singular caution. For if this remark
-upon the increasing irregularities of the heavenly motions<span class="pagenum"><a name="Page_181" id="Page_181">[181]</a></span>
-be true in fact, as it really is, the imputation must return
-upon the asserter, that this does detract from the divine
-wisdom. Certainly we cannot pretend to know all the
-omniscient Creator’s purposes in making this world, and
-therefore cannot undertake to determine how long he designed
-it should last. And it is sufficient, if it endure
-the time intended by the author. The body of every animal
-shews the unlimited wisdom of its author no less, nay
-in many respects more, than the larger frame of nature;
-and yet we see, they are all designed to last but a small
-space of time.</p>
-
-<p>12. <span class="smcap gesperrt">There</span> need nothing more be said of the primary planets;
-the motions of the secondary shall be next considered.</p>
-
-</div>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c181" id="c181"><span class="smcap">Chap. III.</span></a><br />
-Of the motion of the MOON and the other
-SECONDARY PLANETS.</h2>
-
-<p class="drop-cap04">THE excellency of this philosophy sufficiently appears
-from its extending in the manner, which has been related,
-to the minutest circumstances of the primary planets
-motions; which nevertheless bears no proportion to the vast
-success of it in the motions of the secondary; for it not only
-accounts for all the irregularities, by which their motions were
-known to be disturbed, but has discovered others so complicated,
-that astronomers were never able to distinguish them, and
-reduce them under proper heads; but these were only to be<span class="pagenum"><a name="Page_182" id="Page_182">[182]</a></span>
-found out from their causes, which this philosophy has brought
-to light, and has shewn the dependence of these inequalities
-upon such causes in so perfect a manner, that we not only learn
-from thence in general, what those inequalities are, but are
-able to compute the degree of them. Of this Sir <span class="smcap"><em class="gesperrt">Is. Newton</em></span>
-has given several specimens, and has moreover found means
-to reduce the moon’s motion so completely to rule, that he
-has framed a theory, from which the place of that planet
-may at all times be computed, very nearly or altogether as exactly,
-as the places of the primary planets themselves, which is
-much beyond what the greatest astronomers could ever effect.</p>
-
-<p><a name="c182" id="c182">2.</a> <span class="smcap gesperrt">The</span> first thing demonstrated of these secondary planets
-is, that they are drawn towards their respective primary in the
-same manner as the primary planets are attracted by the sun.
-That each secondary planet is kept in its orbit by a power
-pointed towards the center of the primary planet, about
-which the secondary revolves; and that the power, by which
-the secondaries of the same primary are influenced, bears the
-same relation to the distance from the primary, as the power,
-by which the primary planets are guided, does in regard to
-the distance from the sun<a name="FNanchor_172_172" id="FNanchor_172_172"></a><a href="#Footnote_172_172" class="fnanchor">[172]</a>. This is proved in the satellites of
-Jupiter and Saturn, because they move in circles, as far as we
-can observe, about their respective primary with an equable
-course, the respective primary being the center of each orbit:
-and by comparing the times, in which the different satellites
-of the same primary perform their periods, they are<span class="pagenum"><a name="Page_183" id="Page_183">[183]</a></span>
-found to observe the same relation to the distances from their
-primary, as the primary planets observe in respect of their
-mean distances from the sun<a name="FNanchor_173_173" id="FNanchor_173_173"></a><a href="#Footnote_173_173" class="fnanchor">[173]</a>.  Here these bodies moving in
-circles with an equable motion, each satellite passes over equal
-parts of its orbit in equal portions of time; consequently
-the line drawn from the center of the orbit, that is, from
-the primary planet, to the satellite, will pass over equal spaces
-along with the satellite in equal portions of time; which
-proves the power, by which each satellite is held in its orbit,
-to be pointed towards the primary as a center<a name="FNanchor_174_174" id="FNanchor_174_174"></a><a href="#Footnote_174_174" class="fnanchor">[174]</a>. It is also manifest
-that the centripetal power, which carries a body in a
-circle concentrical with the power, acts upon the body at all
-times with the same strength. But Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> demonstrates
-that, when bodies are carried in different circles by
-centripetal powers directed to the centers of those circles, then,
-the degrees of strength of those powers are to be compared by
-considering the relation between the times, in which the bodies
-perform their periods through those circles<a name="FNanchor_175_175" id="FNanchor_175_175"></a><a href="#Footnote_175_175" class="fnanchor">[175]</a>; and in particular
-he shews, that if the periodical times bear that relation,
-which I have just now asserted the satellites of the same primary
-to observe; then the centripetal powers are reciprocally
-in the duplicate proportion of the semidiameters of the circles,
-or in that proportion to the distances of the bodies from the
-centers<a name="FNanchor_176_176" id="FNanchor_176_176"></a><a href="#Footnote_176_176" class="fnanchor">[176]</a>. Hence it follows that in the planets Jupiter and
-Saturn, the centripetal power in each decreases with the increase
-of distance, in the same proportion as the centripetal<span class="pagenum"><a name="Page_184" id="Page_184">[184]</a></span>
-power appertaining to the sun decreases with the increase of
-distance. I do not here mean that this proportion of the centripetal
-powers holds between the power of Jupiter at any distance
-compared with the power of Saturn at any other distance;
-but only in the change of strength of the power belonging
-to the same planet at different distances from him.
-Moreover what is here discovered of the planets Jupiter and
-Saturn by means of the different satellites, which revolve
-round each of them, appears in the earth by the moon alone;
-because she is found to move round the earth in an ellipsis after
-the same manner as the primary planets do about the sun;
-excepting only some small irregularities in her motion, the
-cause of which will be particularly explained in what follows,
-whereby it will appear, that they are no objection against
-the earth’s acting on the moon in the same manner as the sun
-acts on the primary planets; that is, as the other primary
-planets Jupiter and Saturn act upon their satellites. Certainly
-since these irregularities can be otherwise accounted for, we
-ought not to depart from that rule of induction so necessary
-in philosophy, that to like bodies like properties are to be attributed,
-where no reason to the contrary appears. We cannot
-therefore but ascribe to the earth the same kind of action
-upon the moon, as the other primary planets Jupiter and Saturn
-have upon their satellites; which is known to be very
-exactly in the proportion assigned by the method of comparing
-the periodical times and distances of all the satellites which
-move about the same planet; this abundantly compensating
-our not being near enough to observe the exact figure of
-their orbits. For if the little deviation of the moon’s orbit<span class="pagenum"><a name="Page_185" id="Page_185">[185]</a></span>
-orbit from a true permanent ellipsis arose from the action of the
-earth upon the moon not being in the exact reciprocal duplicate
-proportion of the distance, were another moon to revolve
-about the earth, the proportion between the periodical times of
-this new moon, and the present, would discover the deviation
-from the mentioned proportion much more manifestly.</p>
-
-<p>3. <span class="smcap gesperrt">By</span> the number of satellites, which move round Jupiter
-and Saturn, the power of each of these planets is measured in
-a great diversity of distance; for the distance of the outermost
-satellite in each of these planets exceeds several times the distance
-of the innermost. In Jupiter the astronomers have usually
-placed the innermost satellite at a distance from the center of
-that planet equal to about 5⅔ of the semidiameters of Jupiter’s
-body, and this satellite performs its revolution in about 1 day
-18½ hours. The next satellite, which revolves round Jupiter in
-about 3 days 13⅕ hours, they place at the distance from Jupiter
-of about 9 of that planet’s semidiameters. To the third satellite,
-which performs its period nearly in 7 days 3¾ hours,
-they assign the distance of about 14⅖ semidiameters. But
-the outermost satellite they remove to 25⅓ semidiameters, and
-this satellite makes its period in about 16 days 16½ hours<a name="FNanchor_177_177" id="FNanchor_177_177"></a><a href="#Footnote_177_177" class="fnanchor">[177]</a>.
-In Saturn there is still a greater diversity in the distance of the
-several satellites. By the observations of the late <span class="smcap"><em class="gesperrt">Cassini</em></span>, a
-celebrated astronomer in France, who first discovered all these
-satellites, except one known before, the innermost is distant
-about 4½ of Saturn’s semidiameters from his center, and revolves<span class="pagenum"><a name="Page_186" id="Page_186">[186]</a></span>
-round in about 1 day 21⅓ hours. The next satellite
-is distant about 5¾ semidiameters, and makes its period in about
-2 days 17⅔ hours.  The third is removed to the distance
-of about 8 semidiameters, and performs its revolution in
-near 4 days 12½ hours. The fourth satellite discovered first
-by the great <span class="smcap">Huygens</span>, is near 18⅔ semidiameters, and
-moves round Saturn in about 15 days 22⅔ hours. The outermost
-is distant 56 semidiameters, and makes its revolution
-in about 79 days 7⅘ hours<a name="FNanchor_178_178" id="FNanchor_178_178"></a><a href="#Footnote_178_178" class="fnanchor">[178]</a>.  Besides these satellites, there
-belongs to the planet Saturn another body of a very singular
-kind. This is a shining, broad, and flat ring, which encompasses
-the planet round. The diameter of the outermost
-verge of this ring is more than double the diameter of Saturn.
-<span class="smcap"><em class="gesperrt">Huygens</em></span>, who first described this ring, makes the whole
-diameter thereof to bear to the diameter of Saturn the proportion
-of 9 to 4. The late reverend Mr. <span class="smcap">Pound</span> makes the
-proportion something greater, viz. that of 7 to 3. The distances
-of the satellites of this planet Saturn are compared by
-<span class="smcap"><em class="gesperrt">Cassini</em></span> to the diameter of the ring.  His numbers I have
-reduced to those above, according to Mr. <span class="smcap">Pound</span>’s proportion
-between the diameters of Saturn and of his ring. As
-this ring appears to adhere no where to Saturn, so the distance
-of Saturn from the inner edge of the ring seems rather
-greater than the breadth of the ring. The distances, which
-have here been given, of the several satellites, both for Jupiter
-and Saturn, may be more depended on in relation to the
-proportion, which those belonging to the same primary planet<span class="pagenum"><a name="Page_187" id="Page_187">[187]</a></span>
-bear one to another, than in respect to the very numbers, that
-have been here set down, by reason of the difficulty there is
-in measuring to the greatest  exactness the diameters of the primary
-planets; as will be explained hereafter, when we come
-to treat of telescopes<a name="FNanchor_179_179" id="FNanchor_179_179"></a><a href="#Footnote_179_179" class="fnanchor">[179]</a>. By the observations of the forementioned
-Mr. <span class="smcap">Pound</span>, in Jupiter the distance of the innermost
-satellite should rather be about 6 semidiameters, of the second
-9-½, of the third 15, and of the outermost 26⅔<a name="FNanchor_180_180" id="FNanchor_180_180"></a><a href="#Footnote_180_180" class="fnanchor">[180]</a>; and in Saturn
-the distance of the innermost satellite 4 semidiameters,
-of the next 6¼, of the third 8¾, of the fourth 20⅓, and of the
-fifth 59<a name="FNanchor_181_181" id="FNanchor_181_181"></a><a href="#Footnote_181_181" class="fnanchor">[181]</a>. However the proportion between the distances
-of the satellites in the same primary is the only thing necessary
-to the point we are here upon.</p>
-
-<p>4. <span class="smcap gesperrt">But</span> moreover the force, wherewith the earth acts in
-different distances, is confirmed from the following consideration,
-yet more expresly than by the preceding analogical
-reasoning. It will appear, that if the power of the earth, by
-which it retains the moon in her orbit, be supposed to act at all
-distances between the earth and moon, according to the forementioned
-rule; this power will be sufficient to produce upon
-bodies, near the surface of the earth, all the effects ascribed
-to the principle of gravity. This is discovered by the following
-method. Let A (in fig. 94.) represent the earth,
-B the moon, B&nbsp;C&nbsp;D the moon’s orbit, which differs little from
-a circle, of which A is the center. If the moon in B were
-left to it self to move with the velocity, it has in the point B, it<span class="pagenum"><a name="Page_188" id="Page_188">[188]</a></span>
-would leave the orbit, and proceed right forward in the line
-B&nbsp;E, which touches the orbit in B. Suppose the moon would
-upon this condition move from B to E in the space of one minute
-of time. By the action of the earth upon the moon, whereby
-it is retained in its orbit, the moon will really be found at the
-end of this minute in the point F, from whence a straight line
-drawn to A shall make the space B&nbsp;F&nbsp;A in the circle equal to the
-triangular space B&nbsp;E&nbsp;A; so that the moon in the time wherein
-it would have moved from B to E, if left to it self, has been
-impelled towards the earth from E to F. And when the time
-of the moon’s passing from B to F is small, as here it is only
-one minute, the distance between E and F scarce differs from
-the space, through which the moon would descend in the
-same time, if it were to fall directly down from B toward A
-without any other motion. A&nbsp;B the distance of the earth and
-moon is about 60 of the earth’s semidiameters, and the moon
-completes her revolution round the earth in about 27 days
-7 hours and 43 minutes: therefore the space E&nbsp;F will here be
-found by computation to be about 16⅛ feet. Consequently,
-if the power, by which the moon is retained in its orbit, be
-near the surface of the earth greater, than at the distance of
-the moon in the duplicate proportion of that distance; the
-number of feet, a body would descend near the surface of the
-earth by the action of this power upon it in one minute of
-time, would be equal to 16⅛ multiplied twice into the number
-60, that is, equal to 58050. But how fast bodies fall near
-the surface of the earth may be known by the pendulum<a name="FNanchor_182_182" id="FNanchor_182_182"></a><a href="#Footnote_182_182" class="fnanchor">[182]</a>; and<span class="pagenum"><a name="Page_189" id="Page_189">[189]</a></span>
-by the exactest experiments they are found to descend the space
-of 16⅛ feet in a second of time; and the spaces described by
-falling bodies being in the duplicate proportion of the times
-of their fall<a name="FNanchor_183_183" id="FNanchor_183_183"></a><a href="#Footnote_183_183" class="fnanchor">[183]</a>, the number of feet, a body would describe in its
-fall near the surface of the earth in one minute of time, will
-be equal to 16⅛ twice multiplied by 60, the same as would
-be caused by the power which acts upon the moon.</p>
-
-<p>5. <span class="smcap gesperrt">In</span> this computation the earth is supposed to be at
-rest, whereas it would have been more exact to have supposed
-it to move, as well as the moon, about their common
-center of gravity; as will easily be understood, by what
-has been said in the preceding chapter, where it was shewn,
-that the sun is subjected to the like motion about the common
-center of gravity of it self and the planets. The action
-of the sun upon the moon, which is to be explain’d
-in what follows, is likewise here neglected: and Sir <span class="smcap">Isaac
-Newton</span> shews, if you take in both these considerations,
-the present computation will best agree to a somewhat greater
-distance of the moon and earth, viz. to 60½ semidiameters
-of the earth, which distance is more conformable to
-astronomical observations.</p>
-
-<p><a name="c189" id="c189">6.</a> <span class="smcap gesperrt">These</span> computations afford an additional proof, that
-the action of the earth observes the same proportion to the
-distance, which is here contended for. Before I said, it
-was reasonable to conclude so by induction from the planets<span class="pagenum"><a name="Page_190" id="Page_190">[190]</a></span>
-Jupiter and Saturn; because they act in that manner.
-But now the same thing will be evident by drawing no other
-consequence from what is seen in those planets, than that the
-power, by which the primary planets act on their secondary,
-is extended from the primary through the whole interval between,
-so that it would act in every part of the intermediate
-space. In Jupiter and Saturn this power is so far from being
-confined to a small extent of distance, that it not only reaches
-to several satellites at very different distances, but also from
-one planet to the other, nay even through the whole planetary
-system<a name="FNanchor_184_184" id="FNanchor_184_184"></a><a href="#Footnote_184_184" class="fnanchor">[184]</a>. Consequently there is no appearance of reason,
-why this power should not act at all distances, even at the
-very surfaces of these planets as well as farther off. But from
-hence it follows, that the power, which retains the moon
-in her orbit, is the same, as causes bodies near the surface of
-the earth to gravitate. For since the power, by which the
-earth acts on the moon, will cause bodies near the surface
-of the earth to descend with all the velocity they are found
-to do, it is certain no other power can act upon them
-besides; because if it did, they must of necessity descend
-swifter. Now from all this it is at length very evident,
-that the power in the earth, which we call gravity, extends
-up to the moon, and decreases in the duplicate proportion
-of the increase of the distance from the earth.</p>
-
-<p><a name="c190" id="c190">7.</a> <span class="smcap gesperrt">This</span> finishes the discoveries made in the action of
-the primary planets upon their secondary. The next thing<span class="pagenum"><a name="Page_191" id="Page_191">[191]</a></span>
-to be shewn is, that the sun acts upon them likewise: for
-this purpose it is to be observed, that if to the motion of the
-satellite, whereby it would be carried round its primary at
-rest, be superadded the same motion both in regard to
-velocity and direction, as the primary it self has, it will
-describe about the primary the same orbit, with as great
-regularity, as if the primary was indeed at rest. The
-cause of this is that law of motion, which makes a
-body near the surface of the earth, when let fall, to
-descend perpendicularly, though the earth be in so swift
-a motion, that if the falling body did not partake of it,
-its descent would be remarkably oblique; and that a body
-projected describes in the most regular manner the same
-parabola, whether projected in the direction, in which the
-earth moves, or in the opposite direction, if the projecting
-force be the same<a name="FNanchor_185_185" id="FNanchor_185_185"></a><a href="#Footnote_185_185" class="fnanchor">[185]</a>. From this we learn, that
-if the satellite moved about its primary with perfect regularity,
-besides its motion about the primary, it would
-participate of all the motion of its primary; have the
-same progressive velocity, with which the primary is carried
-about the sun; and be impelled with the same velocity
-as the primary towards the sun, in a direction parallel
-to that impulse of its primary. And on the contrary, the
-want of either of these, in particular of the impulse towards
-the sun, will occasion great inequalities in the motion
-of the secondary planet. The inequalities, which would
-arise from the absence of this impulse towards the sun are<span class="pagenum"><a name="Page_192" id="Page_192">[192]</a></span>
-so great, that by the regularity, which appears in the motion
-of the secondary planets, it is proved, that the sun communicates,
-the same velocity to them by its action, as it gives
-to their primary at the same distance. For Sir <span class="smcap"><em class="gesperrt">Isaac Newton</em></span>
-informs us, that upon examination he found, that if
-any of the satellites of Jupiter were attracted by the sun
-more or less, than Jupiter himself at the same distance, the
-orbit of that satellite, instead of being concentrical to Jupiter,
-must have its center at a greater or less distance, than
-the center of Jupiter from the sun, nearly in the subduplicate
-proportion of the difference between the sun’s action upon
-the satellite, and upon Jupiter; and therefore if any satellite
-were attracted by the sun but 1/1000 part more or less,
-than Jupiter is at the same distance, the center of the
-orbit of that satellite would be distant from the center of
-Jupiter no less than a fifth part of the distance of the outermost
-satellite from Jupiter<a name="FNanchor_186_186" id="FNanchor_186_186"></a><a href="#Footnote_186_186" class="fnanchor">[186]</a>; which is almost the whole
-distance of the innermost satellite. By the like argument
-the satellites of Saturn gravitate towards the sun, as much
-as Saturn it self at the same distance; and the moon as
-much as the earth.</p>
-
-<p>8. <span class="smcap gesperrt">Thus</span> is proved, that the sun acts upon the secondary
-planets, as much as upon the primary at the same
-distance: but it was found in the last chapter, that the
-action of the sun upon bodies is reciprocally in the duplicate
-proportion of the distance; therefore the secondary<span class="pagenum"><a name="Page_193" id="Page_193">[193]</a></span>
-planets being sometimes nearer to the sun than the primary,
-and sometimes more remote, they are not alway
-acted upon in the same degree with their primary, but
-when nearer to the sun, are attracted more, and when farther
-distant, are attracted less. Hence arise various inequalities
-in the motion of the secondary planets<a name="FNanchor_187_187" id="FNanchor_187_187"></a><a href="#Footnote_187_187" class="fnanchor">[187]</a>.</p>
-
-<p><a name="c193" id="c193">9.</a> <span class="smcap gesperrt">Some</span> of these inequalities would take place, though
-the moon, if undisturbed by the sun, would have moved in
-a circle concentrical to the earth, and in the plane of the earth’s
-motion; others depend on the elliptical figure, and the oblique
-situation of the moon’s orbit. One of the first kind is,
-that the moon is caused so to move, as not to describe equal
-spaces in equal times, but is continually accelerated, as she
-passes from the quarter to the new or full, and is retarded
-again by the like degrees in returning from the new and full
-to the next quarter. Here we consider not so much the absolute,
-as the apparent motion of the moon in respect to us.</p>
-
-<p>10. <span class="smcap gesperrt">The</span> principles of astronomy teach how to distinguish
-these two motions. Let S (in fig. 95.) represent the
-sun, A the earth moving in its orbit B&nbsp;C, D&nbsp;E&nbsp;F&nbsp;G the moon’s
-orbit, the place of the moon H. Suppose the earth to have
-moved from A to I. Because it has been shewn, that the
-moon partakes of all the progressive motion of the earth; and
-likewise that the sun attracts both the earth and moon equally,
-when they are at the same distance from it, or that the
-mean action of the sun upon the moon is equal to its action<span class="pagenum"><a name="Page_194" id="Page_194">[194]</a></span>
-upon the earth: we must therefore consider the earth as carrying
-about with it the moon’s orbit; so that when the
-earth is removed from A to I, the moon’s orbit shall likewise
-be removed from its former situation into that denoted
-by K&nbsp;L&nbsp;M&nbsp;N. But now the earth being in I, if the moon
-were found in O, so that O&nbsp;I should be parallel to H&nbsp;A,
-though the moon would really have moved from H to O, yet
-it would not have appeared to a spectator upon the earth to
-have moved at all, because the earth has moved as much it
-self; so that the moon would still appear in the same place
-with respect to the fixed stars. But if the moon be observed
-in P, it will then appear to have moved, its apparent motion
-being measured by the angle under O&nbsp;I&nbsp;P. And if the angle
-under P&nbsp;I&nbsp;S be less than the angle under H&nbsp;A&nbsp;S, the moon
-will have approached nearer to its conjunction with the sun.</p>
-
-<p>11. <span class="smcap gesperrt">To</span> come now to the explication of the mentioned
-inequality in the moon’s motion: let S (in fig. 96.) represent
-the sun, A the earth, B&nbsp;C&nbsp;D&nbsp;E the moon’s orbit, C the place of the
-moon, when in the latter quarter. Here it will be nearly at the
-same distance from the sun, as the earth is. In this case therefore
-they will both be equally attracted, the earth in the direction
-A&nbsp;S, and the moon in the direction C&nbsp;S. Whence as the
-earth in moving round the sun is continually descending toward
-it, so the moon in this situation must in any equal portion
-of time descend as much; and therefore the position of
-the line A&nbsp;C in respect of A&nbsp;S, and the change, which the
-moon’s motion produces in the angle under C&nbsp;A&nbsp;S, will not be
-altered by the sun.</p>
-
-<p><span class="pagenum"><a name="Page_195" id="Page_195">[195]</a></span></p>
-
-<p>12. <span class="smcap gesperrt">But</span> now as soon as ever the moon is advanced from
-the quarter toward the new or conjunction, suppose to G,
-the action of the sun upon it will have a different effect. Here,
-were the sun’s action upon the moon to be applied in the direction
-G&nbsp;H parallel to A&nbsp;S, if its action on the moon were
-equal to its action on the earth, no change would be wrought
-by the sun on the apparent motion of the moon round the
-earth. But the moon receiving a greater impulse in G than
-the earth receives in A, were the sun to act in the direction
-G&nbsp;H, yet it would accelerate the description of the space
-D&nbsp;A&nbsp;G, and cause the angle under G&nbsp;A&nbsp;D to decrease faster,
-than otherwise it would. The sun’s action will have this effect
-upon account of the obliquity of its direction to that, in
-which the earth attracts the moon. For the moon by this
-means is drawn by two forces oblique to each other, one
-drawing from G toward A, the other from G toward H,
-therefore the moon must necessarily be impelled toward D.
-Again, because the sun does not act in the direction G&nbsp;H parallel
-to S&nbsp;A, but in the direction G&nbsp;S oblique to it, the sun’s
-action on the moon will by reason of this obliquity farther contribute
-to the moon’s acceleration. Suppose the earth in any
-short space of time would have moved from A to I, if not
-attracted by the sun; the point I being in the straight line C&nbsp;E,
-which touches the earth’s orbit in A. Suppose the moon in
-the same time would have moved in her orbit from G to K,
-and besides have partook of all the progressive motion of the
-earth. Then if K&nbsp;L be drawn parallel to A&nbsp;I, and taken equal
-to it, the moon, if not attracted by the sun, would be found<span class="pagenum"><a name="Page_196" id="Page_196">[196]</a></span>
-in L. But the earth by the sun’s action is removed from I. Suppose
-it were moved down to M in the line I&nbsp;M&nbsp;N parallel
-to S&nbsp;A, and if the moon were attracted but as much, and in
-the same direction, as the earth is here supposed to be attracted,
-so as to have descended during the same time in the line L&nbsp;O,
-parallel also to A&nbsp;S, down as far as P, till L&nbsp;P were equal
-to I&nbsp;M; the angle under P&nbsp;M&nbsp;N would be equal to that
-under L&nbsp;I&nbsp;N, that is, the moon will appear advanced no farther
-forward, than if neither it nor the earth had been subject
-to the sun’s action. But this is upon the supposition, that the
-action of the sun upon the moon and earth were equal;
-whereas the moon being acted upon more than the earth, did
-the sun’s action draw the moon in the line L&nbsp;O parallel to A&nbsp;S,
-it would draw it down so far as to make L&nbsp;P greater than
-I&nbsp;M; whereby the angle under P&nbsp;M&nbsp;N will be rendred less,
-than that under L&nbsp;I&nbsp;N. But moreover, as the sun draws the
-earth in a direction oblique to I&nbsp;N, the earth will be found
-in its orbit somewhat short of the point M; however the
-moon is attracted by the sun still more out of the line L&nbsp;O,
-than the earth is out of the line I&nbsp;N; therefore this obliquity
-of the sun’s action will yet farther diminish the angle
-under P&nbsp;M&nbsp;N.</p>
-
-<p>13. <span class="smcap gesperrt">Thus</span> the moon at the point G receives an impulse
-from the sun, whereby her motion is accelerated. And the
-sun producing this effect in every place between the quarter
-and the conjunction, the moon will move from the quarter
-with a motion continually more and more accelerated; and
-therefore by acquiring from time to time additional degrees<span class="pagenum"><a name="Page_197" id="Page_197">[197]</a></span>
-of velocity in its orbit, the spaces, which are described in
-equal times by the line drawn from the earth to the moon, will
-not be every where equal, but those toward the conjunction
-will be greater, than those toward the quarter. But now in
-the moon’s passage from the conjunction D to the next quarter
-the sun’s action will again retard the moon, till at the next
-quarter in E it be restored to the first velocity, which it had
-in C.</p>
-
-<p>14. <span class="smcap gesperrt">Again</span> as the moon moves from E to the full or opposition
-to the sun in B, it is again accelerated, the deficiency
-of the sun’s action upon the moon, from what it has upon the
-earth, producing here the same effect as before the excess of its
-action. Consider the moon in Q, moving from E towards B.
-Here if the moon were attracted by the sun in a direction
-parallel to A&nbsp;S, yet being acted on less than the earth, as
-the earth descends toward the sun, the moon will in some
-measure be left behind. Therefore Q&nbsp;F being drawn parallel
-to S&nbsp;B, a spectator on the earth would see the moon
-move, as if attracted from the point Q in the direction
-Q&nbsp;F with a degree of force equal to that, whereby the sun’s
-action on the moon falls short of its action on the earth. But
-the obliquity of the sun’s action has also here an effect. In
-the time the earth would have moved from A to I without the
-influence of the sun, let the moon have moved in its orbit from
-Q to R. Drawing therefore R&nbsp;T parallel to A&nbsp;I, and equal to the
-same, for the like reason as before, the moon by the motion of
-its orbit, if not at all attracted by the sun, must be found in T;
-and therefore, if attracted in a direction parallel to S&nbsp;A, would<span class="pagenum"><a name="Page_198" id="Page_198">[198]</a></span>
-be in the line T&nbsp;V parallel to A&nbsp;S; suppose in W. But the
-moon in Q being farther off the sun than the earth, it will be
-less attracted, that is, T&nbsp;W will be less than I&nbsp;M, and if the
-line S&nbsp;M be prolonged toward X, the angle under X&nbsp;M&nbsp;W
-will be less than that under X&nbsp;I&nbsp;T. Thus by the sun’s action
-the moon’s passage from the quarter to the full would be accelerated,
-if the sun were to act on the earth and moon in a
-direction parallel to A&nbsp;S: and the obliquity of the sun’s action
-will still more increase this acceleration. For the action
-of the sun on the moon is oblique to the line S&nbsp;A the whole
-time of the moon’s passage from Q to T, and will carry
-the moon out of the line T&nbsp;V toward the earth. Here I suppose
-the time of the moon’s passage from Q to T so short, that
-it shall not pass beyond the line S&nbsp;A. The earth also will come
-a little short of the line I&nbsp;N, as was said before. From these
-causes the angle under X&nbsp;M&nbsp;W will be still farther lessened.</p>
-
-<p><a name="c198" id="c198">15.</a> <span class="smcap gesperrt">The</span> moon in passing from the opposition B to the
-next quarter will be retarded again by the same degrees, as
-it is accelerated before its appulse to the opposition. Because
-this action of the sun, which in the moon’s passage from the
-quarter to the opposition causes it to be extraordinarily accelerated,
-and diminishes the angle, which measures its distance
-from the opposition; will make the moon slacken its pace afterwards,
-and retard the augmentation of the same angle in
-its passage from the opposition to the following quarter; that
-is, will prevent that angle from increasing so fast, as otherwise
-it would. And thus the moon, by the sun’s action upon it, is
-twice accelerated and twice restored to its first velocity, every<span class="pagenum"><a name="Page_199" id="Page_199">[199]</a></span>
-circuit it makes round the earth. This inequality of the moon’s
-motion about the earth is called by astronomers its variation.</p>
-
-<p>16. <span class="smcap gesperrt">The</span> next effect of the sun upon the moon is, that it
-gives the orbit of the moon in the quarters a greater degree
-of curvature, than it would receive from the action of
-the earth alone; and on the contrary in the conjunction and
-opposition the orbit is less inflected.</p>
-
-<p>17. <span class="smcap gesperrt">When</span> the moon is in conjunction with the sun in
-the point D, the sun attracting the moon more forcibly than
-it does the earth, the moon by that means is impelled less toward
-the earth, than otherwise it would be, and so the orbit
-is less incurvated; for the power, by which the moon is impelled
-toward the earth, being that, by which it is inflected
-from a rectilinear course, the less that power is, the less it
-will be inflected. Again, when the moon is in the opposition
-in B, farther removed from the sun than the earth is;
-it follows then, though the earth and moon are both continually
-descending to the sun, that is, are drawn by the sun
-toward it self out of the place they would otherwise move
-into, yet the moon descends with less velocity than the
-earth; insomuch that the moon in any given space of
-time from its passing the point of opposition will have
-less approached the earth, than otherwise it would have
-done, that is, its orbit in respect of the earth will approach
-nearer to a straight line. In the last place, when
-the moon is in the quarter in F, and equally distant
-from the sun as the earth, we observed before, that<span class="pagenum"><a name="Page_200" id="Page_200">[200]</a></span>
-the earth and moon would descend with equal pace toward
-the sun, so as to make no change by that descent
-in the angle under F&nbsp;A&nbsp;S; but the length of the line F&nbsp;A must
-of necessity be shortned. Therefore the moon in moving from
-F toward the conjunction with the sun will be impelled more
-toward the earth by the sun’s action, than it would have been
-by the earth alone, if neither the earth nor moon had been
-acted on by the sun; so that by this additional impulse the
-orbit is rendred more curve, than it would otherwise be.
-The same effect will also be produced in the other quarter.</p>
-
-<p><a name="c200" id="c200">18.</a> <span class="smcap gesperrt">Another</span> effect of the sun’s action, consequent upon
-this we have now explained, is, that though the moon undisturbed
-by the sun might move in a circle having the earth
-for its center; by the sun’s action, if the earth were to be
-in the very middle or center of the moon’s orbit, yet the
-moon would be nearer the earth at the new and full, than
-in the quarters. In this probably will at first appear some
-difficulty, that the moon should come nearest to the earth,
-where it is least attracted to it, and be farthest off when most
-attracted. Which yet will appear evidently to follow from
-that very cause, by considering what was last shewn, that the
-orbit of the moon in the conjunction and opposition is rendred
-less curve; for the less curve the orbit of the moon is,
-the less will the moon have descended from the place
-it would move into, without the action of the earth. Now
-if the moon were to move from any place without farther
-disturbance from that action, since it would proceed in
-the line, which would touch its orbit in that place, it would<span class="pagenum"><a name="Page_201" id="Page_201">[201]</a></span>
-recede continually from the earth; and therefore if the power
-of the earth upon the moon, be sufficient to retain it at
-the same distance, this diminution of that power will cause
-the distance to increase, though in a less degree. But on the
-other hand in the quarters, the moon, being pressed more towards
-the earth than by the earth’s single action, will be
-made to approach it; so that in passing from the conjunction
-or opposition to the quarters the moon ascends from the
-earth, and in passing from the quarters to the conjunction
-and opposition it descends again, becoming nearer in these
-last mentioned places than in the other.</p>
-
-<p><a name="c201a" id="c201a">19.</a> <span class="smcap gesperrt">All</span> these forementioned inequalities are of different
-degrees, according as the sun is more or less distant from the
-earth; greater when the earth is nearest the sun, and less
-when it is farthest off. For in the quarters, the nearer the
-moon is to the sun, the greater is the addition to the earth’s
-action upon it by the power of the sun; and in the conjunction
-and opposition, the difference between the sun’s action
-upon the earth and upon the moon is likewise so much the
-greater.</p>
-
-<p><a name="c201b" id="c201b">20.</a> This difference in the distance between the earth
-and the sun produces a farther effect upon the moon’s motion;
-causing the orbit to dilate when less remote from the
-sun, and become greater, than when at a farther distance.
-For it is proved by Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em>, that the action of
-the sun, by which it diminishes the earth’s power over the
-moon, in the conjunction or opposition, is about twice as<span class="pagenum"><a name="Page_202" id="Page_202">[202]</a></span>
-great, as the addition to the earth’s action by the sun in the
-quarters<a name="FNanchor_188_188" id="FNanchor_188_188"></a><a href="#Footnote_188_188" class="fnanchor">[188]</a>; so that upon the whole, the power of the earth
-upon the moon is diminished by the sun, and therefore is
-most diminished, when the action of the sun is strongest: but
-as the earth by its approach to the sun has its influence lessened,
-the moon being less attracted will gradually recede from
-the earth; and as the earth in its recess from the sun recovers
-by degrees its former power, the orbit of the moon must again
-contract. Two consequences follow from hence: the
-moon will be most remote from the earth, when the earth is
-nearest the sun; and also will take up a longer time in performing
-its revolution through the dilated orbit, than through
-the more contracted.</p>
-
-<p><a name="c202" id="c202">21.</a> <span class="smcap gesperrt">These</span> irregularities the sun would produce in the
-moon, if the moon, without being acted on unequally by the
-sun, would describe a perfect circle about the earth, and in
-the plane of the earth’s motion; but though neither of these
-suppositions obtain in the motion of the moon, yet the forementioned
-inequalities will take place, only with some difference
-in respect to the degree of them; but the moon by not
-moving in this manner is subject to some other inequalities also.
-For as the moon describes, instead of a circle concentrical
-to the earth, an ellipsis, with the earth in one focus, that
-ellipsis will be subjected to various changes. It can neither
-preserve constantly the same position, nor yet the same figure;
-and because the plane of this ellipsis is not the same<span class="pagenum"><a name="Page_203" id="Page_203">[203]</a></span>
-with that of the earth’s orbit, the situation of the plane, wherein
-the moon moves, will continually change; neither the line
-in which it intersects the plane of the earth’s orbit, nor the
-inclination of the planes to each other, will remain for any
-time the same. All these alterations offer themselves now to
-be explained.</p>
-
-<p>22. <span class="smcap gesperrt">I shall</span> first consider the changes which are made
-in the plane of the moon’s orbit. The moon not moving
-in the same plane with the earth, the sun is seldom in the
-plane of the moon’s orbit, viz. only when the line made by
-the common intersection of the two planes, if produced,
-will pass through the sun, as is represented in fig. 97. where
-S denotes the sun; T the earth; A&nbsp;T&nbsp;B the earth’s orbit described
-upon the plane of this scheme; C&nbsp;D&nbsp;E&nbsp;F the moon’s
-orbit, the part C&nbsp;D&nbsp;E being raised above, and the part C&nbsp;F&nbsp;E
-depressed under the plane of this scheme. Here the line C&nbsp;E,
-in which the plane of this scheme, that is, the plane of the
-earth’s orbit and the plane of the moon’s orbit intersect each
-other, being continued passes through the sun in S. When
-this happens, the action of the sun is directed in the plane
-of the moon’s orbit, and cannot draw the moon out of this
-plane, as will evidently appear to any one that shall consider
-the present scheme: for suppose the moon in G, and let a
-straight line be drawn from G to S, the sun draws the moon
-in the direction of this line from G toward S: but this line lies
-in the plane of the orbit; and if it be prolonged from S beyond
-G, the continuation of it will lie on the plane C&nbsp;D&nbsp;E; for the
-plane itself, if sufficiently extended, will pass through the sun.<span class="pagenum"><a name="Page_204" id="Page_204">[204]</a></span>
-But in other cases the obliquity of the sun’s action to the plane
-of the orbit will cause this plane continually to change.</p>
-
-<p>23. <span class="smcap gesperrt">Suppose</span> in the first place, the line, in which the two
-planes intersect each other, to be perpendicular to the line
-which joins the earth and sun. Let T (in fig. 98, 99, 100, 101.)
-represent the earth; S the sun; the plane of this scheme the
-plane of the earth’s motion, in which both the sun and earth
-are placed. Let A&nbsp;C be perpendicular to S&nbsp;T, which joins the
-earth and sun; and let the line A&nbsp;C be that, in which the plane
-of the moon’s orbit intersects the plane of the earth’s motion.
-To the center T describe in the plane of the earth’s motion
-the circle A&nbsp;B&nbsp;C&nbsp;D. And in the plane of the moon’s orbit
-describe the circle A&nbsp;E&nbsp;C&nbsp;F, one half of which A&nbsp;E&nbsp;C will
-be elevated above the plane of this scheme, the other half
-A&nbsp;F&nbsp;C as much depressed below it.</p>
-
-<p>24. <span class="smcap gesperrt">Now</span> suppose the moon to set forth from the point A
-(in fig. 98.) in the direction of the plane A&nbsp;E&nbsp;C. Here she
-will be continually drawn out of this plane by the action of
-the sun: for this plane A&nbsp;E&nbsp;C, if extended, will not pass through
-the sun, but above it; so that the sun, by drawing the moon
-directly toward it self, will force it continually more and more
-from that plane towards the plane of the earth’s motion, in
-which it self is; causing it to describe the line A&nbsp;K&nbsp;G&nbsp;H&nbsp;I, which
-will be convex to the plane A&nbsp;E&nbsp;C, and concave to the plane
-of the earth’s motion. But here this power of the sun, which
-is said to draw the moon toward the plane of the earth’s
-motion, must be understood principally of so much only of
-the sun’s action upon the moon, as it exceeds the action of the
-same upon the earth. For suppose the preceding figure to be
-viewed by the eye, placed in the plane of that scheme, and in
-the line C&nbsp;T&nbsp;A on the side of A, the plane A&nbsp;B&nbsp;C&nbsp;D will appear as
-the straight line D&nbsp;T&nbsp;B, (in fig. 102.) and the plane A&nbsp;E&nbsp;C&nbsp;F as another
-straight line F&nbsp;E; and the curve line A&nbsp;K&nbsp;G&nbsp;H&nbsp;I under the
-form of the line T&nbsp;K&nbsp;G&nbsp;H&nbsp;I.</p>
-
-<div class="figcenter">
-     <img src="images/ill-265.jpg" width="400" height="494"
-         alt=""
-         title="" />
-</div>
-
-<p><span class="pagenum"><a name="Page_205" id="Page_205">[205]</a></span></p>
-
-<p>Now it is plain, that the earth and
-moon being both attracted by the sun, if the sun’s action upon
-both was equally strong, the earth T, and with it the plane
-A&nbsp;E&nbsp;C&nbsp;F or line F&nbsp;T&nbsp;E in this scheme, would be carried toward
-the sun with as great a pace as the moon, and therefore the
-moon not drawn out of it by the sun’s action, excepting
-only from the small obliquity of the direction of this action
-upon the moon to that of the sun’s action upon the earth,
-which arises from the moon’s being out of the plane of the
-earth’s motion, and is not very considerable; but the action
-of the sun upon the moon being greater than upon the earth,
-all the time the moon is nearer to the sun than the earth is,
-it will be drawn from the plane A&nbsp;E&nbsp;C or the line T&nbsp;E by
-that excess, and made to describe the curve line A&nbsp;G&nbsp;I or
-T&nbsp;G&nbsp;I. But it is the custom of astronomers, instead of considering
-the moon as moving in such a curve line, to refer
-its motion continually to the plane, which touches the true
-line wherein it moves, at the point where at any time the
-moon is. Thus when the moon is in the point A, its motion
-is considered as being in the plane A&nbsp;E&nbsp;C, in whose direction it
-then essaies to move; and when in the point K (in fig. 99.)
-its motion is referred to the plane, which passes through the
-earth, and touches the line A&nbsp;K&nbsp;G&nbsp;H&nbsp;I in the point K. Thus<span class="pagenum"><a name="Page_206" id="Page_206">[206]</a></span>
-the moon in passing from A to I will continually change the
-plane of her motion. In what manner this change proceeds,
-I shall now particularly explain.</p>
-
-<p>25. <span class="smcap gesperrt">Let</span> the plane, which touches the line A&nbsp;K&nbsp;I in the point
-K (in fig. 99.) intersect the plane of the earth’s orbit in the line
-L&nbsp;T&nbsp;M. Then, because the line A&nbsp;K&nbsp;I is concave to the plane
-A&nbsp;B&nbsp;C, it falls wholly between that plane, and the plane which
-touches it in K; so that the plane M&nbsp;K&nbsp;L will cut the plane A&nbsp;E&nbsp;C,
-before it meets with the plane of the earth’s motion; suppose
-in the line Y&nbsp;T, and the point A will fall between K and L.
-With a semidiameter equal to T&nbsp;Y or T&nbsp;L describe the semicircle
-L&nbsp;Y&nbsp;M. Now to a spectator on the earth the moon, when
-in A, will appear to move in the circle A&nbsp;E&nbsp;C&nbsp;F, and, when in
-K, will appear to be moving in the semicircle L&nbsp;Y&nbsp;M. The
-earth’s motion is performed in the plane of this scheme, and
-to a spectator on the earth the sun will appear always moving
-in that plane. We may therefore refer the apparent motion
-of the sun to the circle A&nbsp;B&nbsp;C&nbsp;D, described in this plane about
-the earth. But the points where this circle, in which the
-sun seems to move, intersects the circle in which the moon
-is seen at any time to move, are called the nodes of the moon’s
-orbit at that time. When the moon is seen moving in the circle
-A&nbsp;E&nbsp;C&nbsp;D, the points A and C are the nodes of the orbit;
-when she appears in the semicircle L&nbsp;Y&nbsp;M, then L and M are
-the nodes. Now here it appears, from what has been said,
-that while the moon has moved from A to K, one of the
-nodes has been carried from A to L, and the other as much
-from C to M. But the motion from A to L, and from C to<span class="pagenum"><a name="Page_207" id="Page_207">[207]</a></span>
-M, is backward in regard to the motion of the moon, which
-is the other way from A to K, and from thence toward C.</p>
-
-<p>26. <span class="smcap gesperrt">Farther</span> the angle, which the plane, wherein the
-moon at any time appears, makes with the plane of the earth’s
-motion, is called the inclination of the moon’s orbit at that
-time. And I shall now proceed to shew, that this inclination
-of the orbit, when the moon is in K, is less than when
-she was in A; or, that the plane L&nbsp;Y&nbsp;M, which touches the
-line of the moon’s motion in K, makes a less angle with the
-plane of the earth’s motion or with the circle A&nbsp;B&nbsp;C&nbsp;D, than
-the plane A&nbsp;E&nbsp;C makes with the same. The semicircle L&nbsp;Y&nbsp;M
-intersects the semicircle A&nbsp;E&nbsp;C in Y; and the arch A&nbsp;Y is less
-than L&nbsp;Y, and both together less than half a circle. But it is demonstrated
-by the writers on that part of astronomy, which is
-called the doctrine of the sphere, that when a triangle is made,
-as here, by three arches of circles A&nbsp;L, A&nbsp;Y, and Y&nbsp;L, the angle
-under Y&nbsp;A&nbsp;B without the triangle is greater than the angle under
-Y&nbsp;L&nbsp;A within, if the two arches A&nbsp;Y, Y&nbsp;L taken together do
-not amount to a semicircle; if the two arches make a complete
-semicircle, the two angles will be equal; but if the two
-arches taken together exceed a semicircle, the inner angle under
-Y&nbsp;L&nbsp;A is greater than the other<a name="FNanchor_189_189" id="FNanchor_189_189"></a><a href="#Footnote_189_189" class="fnanchor">[189]</a>. Here therefore the two
-arches A&nbsp;Y and L&nbsp;Y together being less than a semicircle, the
-angle under A&nbsp;L&nbsp;Y is less, than the angle under B&nbsp;A&nbsp;E. But
-from the doctrine of the sphere it is also evident, that the angle
-under A&nbsp;L&nbsp;Y is equal to that, in which the plane of the<span class="pagenum"><a name="Page_208" id="Page_208">[208]</a></span>
-circle L&nbsp;Y&nbsp;K&nbsp;M, that is, the plane which touches the line A&nbsp;K&nbsp;G&nbsp;H&nbsp;I
-in K, is inclined to the plane of the earth’s motion A&nbsp;B&nbsp;C;
-and the angle under B&nbsp;A&nbsp;E is equal to that, in which the plane
-A&nbsp;E&nbsp;C is inclined to the same plane. Therefore the inclination
-of the former plane is less than the inclination of the latter.</p>
-
-<p>27. <span class="smcap gesperrt">Suppose</span> now the moon to be advanced to the point
-G (in fig. 100.) and in this point to be distant from its node
-a quarter part of the whole circle; or in other words, to be
-in the midway between its two nodes. And in this case the
-nodes will have receded yet more, and the inclination of the
-orbit be still more diminished: for suppose the line A&nbsp;K&nbsp;G&nbsp;H&nbsp;I
-to be touched in the point G by a plane passing through the
-earth T: let the intersection of this plane with the plane of
-the earth’s motion be the line W&nbsp;T&nbsp;O, and the line T&nbsp;P its intersection
-with the plane L&nbsp;K&nbsp;M. In this plane let the circle
-N&nbsp;G&nbsp;O be described with the semidiameter T&nbsp;P or N&nbsp;T cutting
-the other circle L&nbsp;K&nbsp;M in P. Now the line A&nbsp;K&nbsp;G&nbsp;I is convex
-to the plane L&nbsp;K&nbsp;M, which touches it in K; and therefore the
-plane N&nbsp;G&nbsp;O, which touches it in G, will intersect the other
-touching plane between G and K; that is, the point P will fall
-between those two points, and the plane continued to the
-plane of the earth’s motion will pass beyond L; so that the
-points N and O, or the places of the nodes, when the moon
-is in G, will be farther from A and C than L and M, that is,
-will have moved farther backward. Besides, the inclination
-of the plane N&nbsp;G&nbsp;O to the plane of the earth’s motion A&nbsp;B&nbsp;C
-is less, than the inclination of the plane L&nbsp;K&nbsp;M to the same; for
-here also the two arches L&nbsp;P and N&nbsp;P taken together are less<span class="pagenum"><a name="Page_209" id="Page_209">[209]</a></span>
-than a semicircle, each of these arches being less than a quarter
-of a circle; as appears, because G&nbsp;N, the distance of the
-moon in G from its node N, is here supposed to be a quarter
-part of a circle.</p>
-
-<p>28. <span class="smcap gesperrt">After</span> the moon is passed beyond G, the case is altered;
-for then these arches will be greater than quarters of the circle,
-by which means the inclination will be again increased, tho’
-the nodes still go on to move the same way. Suppose the
-moon in H, (in fig. 101.) and that the plane, which touches
-the line A&nbsp;K&nbsp;G&nbsp;I in H, intersects the plane of the earth’s motion
-in the line Q&nbsp;T&nbsp;R, and the plane N&nbsp;G&nbsp;O in the line T&nbsp;V,
-and besides that the circle Q&nbsp;H&nbsp;R be described in that plane;
-then, for the same reason as before, the point V will fall between
-H and G, and the plane R&nbsp;V&nbsp;Q will pass beyond the
-last plane O&nbsp;V&nbsp;N, causing the points Q and R to fall farther
-from A and C than N and O. But the arches N&nbsp;V, V&nbsp;Q are
-each greater than a quarter of a circle, N&nbsp;V the least of them
-being greater than G&nbsp;N, which is a quarter of a circle; and
-therefore the two arches N&nbsp;V and V&nbsp;Q together exceed a semicircle;
-consequently the angle under B&nbsp;Q&nbsp;V will be greater,
-than that under B&nbsp;N&nbsp;V.</p>
-
-<p>29. <span class="smcap gesperrt">In</span> the last place, when the moon is by this attraction
-of the sun, drawn at length into the plane of the earth’s
-motion, the node will have receded yet more, and the inclination
-be so much increased, as to become somewhat more
-than at first: for the line A&nbsp;K&nbsp;G&nbsp;H&nbsp;I being convex to all the
-planes, which touch it, the part H&nbsp;I will wholly fall between<span class="pagenum"><a name="Page_210" id="Page_210">[210]</a></span>
-the plane Q&nbsp;V&nbsp;R and the plane A&nbsp;B&nbsp;C; so that the point I will fall
-between B and R; and drawing I&nbsp;T&nbsp;W, the point W will be farther
-remov’d from A than Q. But it is evident, that the plane,
-which passes through the earth T, and touches the line A&nbsp;G&nbsp;I
-in the point I, will cut the plane of the earth’s motion A&nbsp;B&nbsp;C&nbsp;D
-in the line I&nbsp;T&nbsp;W, and be inclined to the same in the angle under
-H&nbsp;I&nbsp;B; so that the node, which was first in A, after having
-passed into L, N and Q, comes at last into the point W; as the
-node which was at first in C has passed successively from thence
-through the points M, O and R to I: but the angle under H&nbsp;I&nbsp;B,
-which is now the inclination of the orbit to the plane of the
-ecliptic, is manifestly not less than the angle under E&nbsp;C&nbsp;B or
-E&nbsp;A&nbsp;B, but rather something greater.</p>
-
-<p>30. <span class="smcap gesperrt">Thus</span> the moon in the case before us, while it passes
-from the plane of the earth’s motion in the quarter, till it
-comes again into the same plane, has the nodes of its orbit
-continually moved backward, and the inclination of its orbit
-is at first diminished, viz. till it comes to G in fig. 100, which is
-near to its conjunction with the sun, but afterwards is increased
-again almost by the same degrees, till upon the moon’s
-arrival again to the plane of the earth’s motion, the inclination
-of the orbit is restored to something more than its first
-magnitude, though the difference is not very great, because
-the points I and C are not far distant from each other<a name="FNanchor_190_190" id="FNanchor_190_190"></a><a href="#Footnote_190_190" class="fnanchor">[190]</a>.</p>
-
-<p><span class="pagenum"><a name="Page_211" id="Page_211">[211]</a></span></p>
-
-<p>31. <span class="smcap gesperrt">After</span> the same manner, if the moon had departed
-from the quarter in C, it should have described the curve
-line C&nbsp;X&nbsp;W (in fig. 98.) between the planes A&nbsp;F&nbsp;C and A&nbsp;D&nbsp;C,
-which would be convex to the former of those planes, and
-concave to the latter; so that, here also, the nodes should
-continually recede, and the inclination of the orbit gradually
-diminish more and more, till the moon arrived near its opposition
-to the sun in X; but from that time the inclination
-should again increase, till it became a little greater than at first.
-This will easily appear, by considering, that as the action of
-the sun upon the moon, by exceeding its action upon the earth,
-drew it out of the plane A&nbsp;E&nbsp;C towards the sun, while the moon
-passed from A to I; so, during its passage from C to W, the
-moon being all that time farther from the sun than the earth,
-it will be attracted less; and the earth, together with the
-plane A&nbsp;E&nbsp;C&nbsp;F, will as it were be drawn from the moon, in
-such sort, that the path the moon describes shall appear from
-the earth, as it did in the former case by the moon’s being
-drawn away.</p>
-
-<p>32. <span class="smcap gesperrt">These</span> are the changes, which the nodes and the inclination
-of the moon’s orbit undergo, when the nodes are in
-the quarters; but when the nodes by their motion, and the
-motion of the sun together, come to be situated between the
-quarter and conjunction or opposition, their motion and the
-change made in the inclination of the orbit are somewhat different.</p>
-
-<p><span class="pagenum"><a name="Page_212" id="Page_212">[212]</a></span></p>
-
-<p>33. <span class="smcap gesperrt">Let</span> A&nbsp;G&nbsp;C&nbsp;H (in fig. 103.) be a circle described in the
-plane of the earth’s motion, having the earth in T for its center.
-Let the point opposite to the sun be A, and the point G a fourth
-part of the circle distant from A. Let the nodes of the moon’s
-orbit be situated in the line B&nbsp;T&nbsp;D, and B the node, falling between
-A, the place where the moon would be in the full,
-and G the place where the moon would be in the quarter.
-Suppose B&nbsp;E&nbsp;D&nbsp;F to be the plane, in which the moon essays to
-move, when it proceeds from the point B. Because the moon
-in B is more distant from the sun than the earth, it shall be
-less attracted by the sun, and shall not descend towards the
-sun so fast as the earth: consequently it shall quit the plane
-B&nbsp;E&nbsp;D&nbsp;F, which we suppose to accompany the earth, and describe
-the line B&nbsp;I&nbsp;K convex thereto, till such time as it comes
-to the point K, where it will be in the quarter: but from
-thenceforth being more attracted than the earth, the moon
-shall change its course, and the following part of the path
-it describes shall be concave to the plane B&nbsp;E&nbsp;D or B&nbsp;G&nbsp;D,
-and shall continue concave to the plane B&nbsp;G&nbsp;D, till it crosses
-that plane in L, just as in the preceding case.  Now I say,
-while the moon is passing from B to K, the nodes, contrary
-to what was found in the foregoing case, will proceed forward,
-or move the same way with the moon<a name="FNanchor_191_191" id="FNanchor_191_191"></a><a href="#Footnote_191_191" class="fnanchor">[191]</a>; and at the
-same time the inclination of the orbit will increase<a name="FNanchor_192_192" id="FNanchor_192_192"></a><a href="#Footnote_192_192" class="fnanchor">[192]</a>.</p>
-
-<div class="figcenter">
-     <img src="images/ill-275.jpg" width="400" height="506"
-         alt=""
-         title="" />
-</div>
-
-<p><span class="pagenum"><a name="Page_213" id="Page_213">[213]</a></span></p>
-
-<p>34. <span class="smcap gesperrt">When</span> the moon is in the point I, let the plane
-M&nbsp;I&nbsp;N pass through the earth T, and touch the path of the
-moon in I, cutting the plane of the earth’s motion, in the line
-M&nbsp;T&nbsp;N, and the plane B&nbsp;E&nbsp;D in the line T&nbsp;O. Because the line
-B&nbsp;I&nbsp;K is convex to the plane B&nbsp;E&nbsp;D, which touches it in B, the
-plane N&nbsp;I&nbsp;M must cross the plane D&nbsp;E&nbsp;B, before it meets the
-plane C&nbsp;G&nbsp;B; and therefore the point M will fall from B towards
-G, and the node of the moon’s orbit being translated
-from B to M is moved forward.</p>
-
-<p>35. <span class="smcap gesperrt">I say</span> farther, the angle under O&nbsp;M&nbsp;G, which the
-plane M&nbsp;O&nbsp;N makes with the plane B&nbsp;G&nbsp;C, is greater than the
-angle under O&nbsp;B&nbsp;G, which the plane B&nbsp;O&nbsp;D makes with the
-same. This appears from what has been already explained;
-because the arches B&nbsp;O, O&nbsp;M are each less than the quarter of
-a circle, and therefore taken both together are less than a semicircle.</p>
-
-<p>36. <span class="smcap gesperrt">Again</span>, when the moon is come to the point K in
-its quarter, the nodes will be advanced yet farther forward,
-and the inclination of the orbit also more augmented. Hitherto
-the moon’s motion has been referred to the plane,
-which passing through the earth touches the path of the
-moon in the point, where the moon is, according to what
-was asserted at the beginning of this discourse upon the
-nodes, that it is the custom of astronomers so to do. But
-here in the point K no such plane can be found; on the contrary,
-seeing the line of the moon’s motion on one side the point
-K is convex to the plane B&nbsp;E&nbsp;D, and on the other side concave
-to the same, no plane can pass through the points T and
-K but will cut the line B&nbsp;K&nbsp;L in that point. Therefore instead<span class="pagenum"><a name="Page_214" id="Page_214">[214]</a></span>
-of such a touching plane, we must here make use of what is
-equivalent, the plane P&nbsp;K&nbsp;Q, with which the line B&nbsp;K&nbsp;L shall
-make a less angle than with any other plane; for this plane
-does as it were touch the line B&nbsp;K in the point K, since it so
-cuts it, that no other plane can be drawn so, as to pass between
-the line B&nbsp;K and the plane P&nbsp;K&nbsp;Q. But now it is evident,
-that the point P, or the node, is removed from M towards
-G, that is, has moved yet farther forward; and it is
-likewise as manifest, that the angle under K&nbsp;P&nbsp;G, or the inclination
-of the moon’s orbit in the point K, is greater than
-the angle under I&nbsp;M&nbsp;G, for the reason so often assigned.</p>
-
-<p>37. <span class="smcap gesperrt">After</span> the moon has passed the quarter, the path of
-the moon being concave to the plane A&nbsp;G&nbsp;C&nbsp;H, the nodes, as
-in the preceding case, shall recede, till the moon arrives at
-the point L; which shews, that considering the whole time
-of the moon’s passing from B to L, at the end of that time the
-nodes shall be found to have receded, or to be placed backwarder,
-when the moon is in L, than when it was in B. For
-the moon takes a longer time in passing from K to L, than
-in passing from B to K; and therefore the nodes continue to
-recede a longer time, than they moved forwards; so that their
-recess must surmount their advance.</p>
-
-<p>38. <span class="smcap gesperrt">In</span> the same manner, while the moon is in its passage
-from K to L, the inclination of the orbit shall diminish, till
-the moon comes to the point, in which it is one quarter
-part of a circle distant from its node; suppose in the point
-R; and from that time the inclination shall again increase.<span class="pagenum"><a name="Page_215" id="Page_215">[215]</a></span>
-Since therefore the inclination of the orbit increases, while
-the moon is passing from B to K, and diminishes itself again
-only, while the moon is passing from K to R, and then
-augments again, till the moon arrive in L; while the moon is
-passing from B to L, the inclination of the orbit is much more
-increased than diminished, and will be distinguishably greater,
-when the moon is come to L, than when it set out from B.</p>
-
-<p>39. <span class="smcap gesperrt">In</span> like manner, while the moon is passing from L on
-the other side the plane A&nbsp;G&nbsp;C&nbsp;H, the node shall advance forward,
-as long as the moon is between the point L and the next
-quarter; but afterwards it shall recede, till the moon come
-to pass the plane A&nbsp;G&nbsp;C&nbsp;H again in the point V, between B and
-A: and because the time between the moon’s passing from
-L to the next quarter is less, than the time between that quarter
-and the moon’s coming to the point V, the node shall
-have more receded than advanced; so that the point V will
-be nearer to A, than L is to C. So also the inclination of the
-orbit, when the moon is in V, will be greater, than when the
-moon was at L; for this inclination increases all the time the
-moon is between L and the next quarter; it decreases only
-while the moon is passing from this quarter to the mid way
-between the two nodes, and from thence increases again during
-the whole passage through the other half of the way to
-the next node.</p>
-
-<p>40. <span class="smcap gesperrt">Thus</span> we have traced the moon from her node in
-the quarter, and shewn, that at every period of the moon the
-nodes will have receded, and thereby will have approached<span class="pagenum"><a name="Page_216" id="Page_216">[216]</a></span>
-toward a conjunction with the sun. But this conjunction will
-be much forwarded by the visible motion of the sun itself.
-In the last scheme the sun will appear to move from S toward
-W. Suppose it appeared to have moved from S to W,
-while the moon’s node has receded from B to V, then drawing
-the line W&nbsp;T&nbsp;X, the arch V&nbsp;X will represent the distance of the
-line drawn between the nodes from the sun, when the moon
-is in V; whereas the arch B&nbsp;A represented that distance, when
-the moon was in B. This visible motion of the sun is much
-greater, than that of the node; for the sun appears to revolve
-quite round each year, and the node is near 19 years in making
-one revolution. We have also seen, that when the node
-was in the quadrature, the inclination of the moon’s orbit decreased,
-till the moon came to the conjunction, or opposition,
-according to which node it set out from; but that afterwards
-it again increased, till it became at the next node rather
-greater than at the former. When the node is once removed
-from the quarter nearer to a conjunction with the sun,
-the inclination of the moon’s orbit, when the moon comes
-into the node, is more sensibly greater, than it was in the node
-preceding; the inclination of the orbit by this means more
-and more increasing till the node comes into conjunction with
-the sun; at which time it has been shewn above, that the sun
-has no power to change the plane of the moon’s motion; and
-consequently has no effect either on the nodes, or on the inclination
-of the orbit.</p>
-
-<p>41. <span class="smcap gesperrt">As</span> soon as the nodes, by the action of the sun, are
-got out of conjunction toward the other quarters, they begin<span class="pagenum"><a name="Page_217" id="Page_217">[217]</a></span>
-again to recede as before; but the inclination of the orbit in
-the appulse of the moon to each succeeding node is less than
-at the preceding, till the nodes come again into the quarters.
-This will appear as follows. Let A (in fig. 104.) represent
-one of the moon’s nodes placed between the point
-of opposition B and the quarter C. Let the plane A&nbsp;D&nbsp;E pass
-through the earth T, and touch the path of the moon in A.
-Let the line A&nbsp;F&nbsp;G&nbsp;H be the path of the moon in her passage
-from A to H, where she crosses again the plane of the earth’s
-motion. This line will be convex toward the plane A&nbsp;D&nbsp;E, till
-the moon comes to G, where she is in the quarter; and after
-this, between G and H, the same line will be concave toward
-this plane. All the time this line is convex toward the plane
-A&nbsp;D&nbsp;E, the nodes will recede; and on the contrary proceed,
-while it is concave to that plane. All this will easily be conceived
-from what has been before so largely explained. But
-the moon is longer in passing from A to G, than from G to H;
-therefore the nodes recede a longer time, than they proceed;
-consequently upon the whole, when the moon is arrived at
-H, the nodes will have receded, that is, the point H will fall
-between B and E. The inclination of the orbit will decrease,
-till the moon is arrived to the point F, in the middle between
-A and H. Through the passage between F and G the inclination
-will increase, but decrease again in the remaining part
-of the passage from G to H, and consequently at H must be
-less than at A. The like effects, both in respect to the nodes
-and inclination of the orbit, will take place in the following
-passage of the moon on the other side of the plane A&nbsp;B&nbsp;E&nbsp;C,
-from H, till it comes over that plane again in I.</p>
-
-<p><span class="pagenum"><a name="Page_218" id="Page_218">[218]</a></span></p>
-
-<p>42. <span class="smcap gesperrt">Thus</span> the inclination of the orbit is greatest, when
-the line drawn between the moon’s nodes will pass through
-the sun; and least, when this line lies in the quarters, especially
-if the moon at the same time be in conjunction with the
-sun, or in the opposition. In the first of these cases the nodes
-have no motion, in all others, the nodes will each month
-have receded: and this regressive motion will be greatest,
-when the nodes are in the quarters; for in that case the nodes
-have no progressive motion during the whole month, but in
-all other cases the nodes do at some times proceed forward,
-viz. whenever the moon is between either quarter, and the
-node which is less distant from that quarter than a fourth
-part of a circle.</p>
-
-<p><a name="c218" id="c218">43.</a> <span class="smcap gesperrt">It</span> now remains only to explain the irregularities in
-the moon’s motion, which follow from the elliptical figure
-of the orbit. By what has been said at the beginning of this
-chapter it appears, that the power of the earth on the moon
-acts in the reciprocal duplicate proportion of the distance:
-therefore the moon, if undisturbed by the sun, would move
-round the earth in a true ellipsis, and the line drawn from
-the earth to the moon would pass over equal spaces in equal
-portions of time. That this description of the spaces is
-altered by the sun, has been already declared. It has also
-been shown, that the figure of the orbit is changed each
-month; that the moon is nearer the earth at the new and
-full, and more remote in the quarters, than it would be without
-the sun. Now we must pass by these monthly changes,
-and consider the effect, which the sun will have in the different<span class="pagenum"><a name="Page_219" id="Page_219">[219]</a></span>
-situations of the axis of the orbit in respect of that luminary.</p>
-
-<p>44. <span class="smcap gesperrt">The</span> action of the sun varies the force, wherewith
-the moon is drawn toward the earth; in the quarters the
-force of the earth is directly increased by the sun; at the
-new and full the same is diminished; and in the intermediate
-places the influence of the earth is sometimes aided, and
-sometimes lessened by the sun. In these intermediate places
-between the quarters and the conjunction or opposition,
-the sun’s action is so oblique to the action of the earth on
-the moon, as to produce that alternate acceleration and retardment
-of the moon’s motion, which I observed above
-to be stiled the variation. But besides this effect, the power,
-by which the earth attracts the moon toward itself, will not
-be at full liberty to act with the same force, as if the sun
-acted not at all on the moon. And this effect of the sun’s
-action, whereby it corroborates or weakens the action of the
-earth, is here only to be considered. And by this influence
-of the sun it comes to pass, that the power, by which the
-moon is impelled toward the earth, is not perfectly in the reciprocal
-duplicate proportion of the distance. Consequently
-the moon will not describe a perfect ellipsis. One particular,
-wherein the moon’s orbit will differ from an ellipsis, consists
-in the places, where the motion of the moon is perpendicular
-to the line drawn from itself to the earth. In an
-ellipsis, after the moon should have set out in the direction
-perpendicular to this line drawn from itself to the earth,
-and at its greatest distance from the earth, its motion would<span class="pagenum"><a name="Page_220" id="Page_220">[220]</a></span>
-again become perpendicular to this line drawn between itself
-and the earth, and the moon be at its nearest distance
-from the earth, when it should have performed half its period;
-after performing the other half of its period its motion
-would again become perpendicular to the forementioned
-line, and the moon return into the place whence it set out,
-and have recovered again its greatest distance. But the moon
-in its real motion, after setting out as before, sometimes makes
-more than half a revolution, before its motion comes again
-to be perpendicular to the line drawn from itself to the earth,
-and the moon is at its nearest distance; and then performs
-more than another half of an intire revolution before its motion
-can a second time recover its perpendicular direction to
-the line drawn from the moon to the earth, and the moon
-arrive again to its greatest distance from the earth. At other
-times the moon will descend to its nearest distance, before it
-has made half a revolution, and recover again its greatest distance,
-before it has made an intire revolution. The place,
-where the moon is at its greatest distance from the earth, is called
-the moon’s apogeon, and the place of the least distance
-the perigeon. This change of the place, where the moon
-successively comes to its greatest distance from the earth, is
-called the motion of the apogeon. In what manner the sun
-causes the apogeon to move, I shall now endeavour to explain.</p>
-
-<p>45. <span class="smcap gesperrt">Our</span> author shews, that if the moon were attracted
-toward the earth by a composition of two powers, one
-of which were reciprocally in the duplicate proportion of
-the distance from the earth, and the other reciprocally<span class="pagenum"><a name="Page_221" id="Page_221">[221]</a></span>
-in the triplicate proportion of the same distance; then,
-though the line described by the moon would not be in
-reality an ellipsis, yet the moon’s motion might be perfectly
-explained by an ellipsis, whose axis should be made to move
-round the earth; this motion being in consequence, as astronomers
-express themselves, that is, the same way as the moon
-itself moves, if the moon be attracted by the sum of the two
-powers; but the axis must move in antecedence, or the contrary
-way, if the moon be acted on by the difference of these
-powers. What is meant by duplicate proportion has been
-often explained; namely, that if three magnitudes, as A, B,
-and C, are so related, that the second B bears the same proportion
-to the third C, as the first A bears to the second
-B, then the proportion of the first A to the third C, is the
-duplicate of the proportion of the first A to the second B.
-Now if a fourth magnitude, as D, be assumed, to which C
-shall bear the same proportion as A bears to B, and B to C,
-then the proportion of A to D is the triplicate of the proportion
-of A to B.</p>
-
-<p>46. <span class="smcap gesperrt">The</span> way of representing the moon’s motion in
-this case is thus. T denoting the earth (in fig. 105, 106.)
-suppose the moon in the point A, its apogeon, or greatest
-distance from the earth, moving in the direction A&nbsp;F perpendicular
-to A&nbsp;B, and acted upon from the earth by two
-such forces as have been named. By that power alone,
-which is reciprocally in the duplicate proportion of the
-distance, if the moon let out from the point A with a
-proper degree of velocity, the ellipsis A&nbsp;M&nbsp;B may be described.<span class="pagenum"><a name="Page_222" id="Page_222">[222]</a></span>
-But if the moon be acted upon by the sum of the
-forementioned powers, and the velocity of the moon in the
-point A be augmented in a certain proportion<a name="FNanchor_193_193" id="FNanchor_193_193"></a><a href="#Footnote_193_193" class="fnanchor">[193]</a>; or if that
-velocity be diminished in a certain proportion, and the moon
-be acted upon by the difference of those powers; in both
-these cases the line A&nbsp;E, which shall be described by the
-moon, is thus to be determined. Let the point M be that,
-into which the moon would have arrived in any given space
-of time, had it moved in the ellipsis A&nbsp;M&nbsp;B. Draw M&nbsp;T,
-and likewise C&nbsp;T&nbsp;D in such sort, that the angle under A&nbsp;T&nbsp;M
-shall bear the same proportion to the angle under A&nbsp;T&nbsp;C, as
-the velocity, with which the ellipsis A&nbsp;M&nbsp;B must have been described,
-bears to the difference between this velocity, and the
-velocity, with which the moon must set out from the point A
-in order to describe the path A&nbsp;E. Let the angle A&nbsp;T&nbsp;C be taken
-toward the moon (as in fig. 105.) if the moon be attracted
-by the sum of the powers; but the contrary way (as in
-fig. 106.) if by their difference. Then let the line A&nbsp;B be
-moved into the position C&nbsp;D, and the ellipsis A&nbsp;M&nbsp;B into the
-situation C&nbsp;N&nbsp;D, so that the point M be translated to L: then
-the point L shall fall upon the path of the moon A&nbsp;E.</p>
-
-<p>47. <span class="smcap gesperrt">The</span> angular motion of the line A&nbsp;T, wereby it is
-removed into the situation C&nbsp;T, represents the motion of the
-apogeon; by the means of which the motion of the moon
-might be fully explicated by the ellipsis A&nbsp;M&nbsp;B, if the action of
-the sun upon it was directed to the center of the earth, and<span class="pagenum"><a name="Page_223" id="Page_223">[223]</a></span>
-reciprocally in the triplicate proportion of the moon’s distance
-from it. But that not being so, the apogeon will not move in
-the regular manner now described. However, it is to be observed
-here, that in the first of the two preceding cases, where
-the apogeon moves forward, the whole centripetal power
-increases faster, with the decrease of distance, than if the
-intire power were reciprocally in the duplicate proportion of
-the distance; because one part only is in that proportion,
-and the other part, which is added to this to make up the
-whole power, increases faster with the decrease of distance.
-On the other hand, when the centripetal power is the difference
-between these two, it increases less with the decrease of
-the distance, than if it were simply in the reciprocal duplicate
-proportion of the distance. Therefore if we chuse to explain
-the moon’s motion by an ellipsis (as is most convenient
-for astronomical uses to be done, and by reason of the small
-effect of the sun’s power, the doing so will not be attended
-with any sensible error;) we may collect in general, that
-when the power, by which the moon is attracted to the earth,
-by varying the distance, increases in a greater than in the duplicate
-proportion of the distance diminished, a motion in consequence
-must be ascribed to the apogeon; but that when the
-attraction increases in a less proportion than that named, the
-apogeon must have given to it a motion in antecedence<a name="FNanchor_194_194" id="FNanchor_194_194"></a><a href="#Footnote_194_194" class="fnanchor">[194]</a>. It is
-then observed by Sir <span class="smcap">Is. Newton</span>, that the first of these cases
-obtains, when the moon is in the conjunction and opposition;
-and the latter, when the moon is in the quarters: so that
-in the first the apogeon moves according to the order of the<span class="pagenum"><a name="Page_224" id="Page_224">[224]</a></span>
-signs; in the other, the contrary way<a name="FNanchor_195_195" id="FNanchor_195_195"></a><a href="#Footnote_195_195" class="fnanchor">[195]</a>. But, as was said before,
-the disturbance given to the action of the earth by the sun in
-the conjunction and opposition being near twice as great as
-in the quarters<a name="FNanchor_196_196" id="FNanchor_196_196"></a><a href="#Footnote_196_196" class="fnanchor">[196]</a>, the apogeon will advance with a greater
-velocity than recede, and in the compass of a whole revolution
-of the moon will be carried in consequence<a name="FNanchor_197_197" id="FNanchor_197_197"></a><a href="#Footnote_197_197" class="fnanchor">[197]</a>.</p>
-
-<p>48. <span class="smcap gesperrt">It</span> is shewn in the next place by our author, that
-when the line A&nbsp;B coincides with that, which joins the earth
-and the sun, the progressive motion of the apogeon, when
-the moon is in the conjunction or opposition, exceeds the
-regressive in the quadratures more than in any other situation
-of the line A&nbsp;B<a name="FNanchor_198_198" id="FNanchor_198_198"></a><a href="#Footnote_198_198" class="fnanchor">[198]</a>. On the contrary, when the line A&nbsp;B
-makes right angles with that, which joins the earth and sun,
-the retrograde motion will be more considerable<a name="FNanchor_199_199" id="FNanchor_199_199"></a><a href="#Footnote_199_199" class="fnanchor">[199]</a>, nay is
-found so great as to exceed the progressive; so that in this
-case the apogeon in the compass of an intire revolution of
-the moon is carried in antecedence. Yet from the considerations
-in the last paragraph the progressive motion exceeds
-the other; so that in the whole the mean motion of
-the apogeon is in consequence, according as astronomers
-find. Moreover, the line A&nbsp;B changes its situation with that,
-which joins the earth and sun, by such slow degrees, that the
-inequalities in the motion of the apogeon arising from this
-last consideration, are much greater than what arises from
-the other<a name="FNanchor_200_200" id="FNanchor_200_200"></a><a href="#Footnote_200_200" class="fnanchor">[200]</a>.</p>
-
-<p><span class="pagenum"><a name="Page_225" id="Page_225">[225]</a></span></p>
-
-<p>49. <span class="smcap gesperrt">Farther</span>, this unsteady motion in the apogeon is attended
-with another inequality in the motion of the moon, that
-it cannot be explained at all times by the same ellipsis. The
-ellipsis in general is called by astronomers an eccentric orbit.
-The point, in which the two axis’s cross, is called the center of
-the figure; because all lines drawn through this point within
-the ellipsis, from side to side, are divided in the middle by
-this point. But the center, about which the heavenly bodies
-revolve, lying out of this center of the figure in one focus,
-these orbits are said to be eccentric; and where the distance of
-the focus from this center bears the greatest proportion to the
-whole axis, that orbit is called the most eccentric: and in
-such an orbit the distance from the focus to the remoter extremity
-of the axis bears the greatest proportion to the distance
-of the nearer extremity. Now whenever the apogeon
-of the moon moves in consequence, the moon’s motion
-must be referred to an orbit more eccentric, than what the
-moon would describe, if the whole power, by which the
-moon was acted on in its passing from the apogeon, changed
-according to the reciprocal duplicate proportion of the distance
-from the earth, and by that means the moon did describe
-an immoveable ellipsis; and when the apogeon moves
-in antecedence, the moon’s motion must be referred to an
-orbit less eccentric. In the first of the two figures last referred
-to, the true place of the moon L falls without the orbit
-A&nbsp;M&nbsp;B, to which its motion is referred: whence the orbit A&nbsp;L&nbsp;E,
-truly described by the moon, is less incurvated in the point A,
-than is the orbit A&nbsp;M&nbsp;B; therefore the orbit A&nbsp;M&nbsp;B is more oblong,
-and differs farther from a circle, than the ellipsis would,<span class="pagenum"><a name="Page_226" id="Page_226">[226]</a></span>
-whose curvature in A were equal to that of the line A&nbsp;L&nbsp;B,
-that is, the proportion of the distance of the earth T from
-the center of the ellipsis to its axis will be greater in the ellipsis
-A&nbsp;M&nbsp;B, than in the other; but that other is the ellipsis,
-which the moon would describe, if the power acting upon it
-in the point A were altered in the reciprocal duplicate proportion
-of the distance. In the second figure, when the
-apogeon recedes, the place of the moon L falls within the
-orbit A&nbsp;M&nbsp;B, and therefore that orbit is less eccentric, than
-the immoveable orbit which the moon should describe. The
-truth of this is evident; for, when the apogeon moves forward,
-the power, by which the moon is influenced in its descent
-from the apogeon, increases faster with the decrease of
-distance, than in the duplicate proportion of the distance;
-and consequently the moon being drawn more forcibly toward
-the earth, it will descend nearer to it. On the other
-hand, when the apogeon recedes, the power acting on the
-moon increases with the decrease of distance in less than the
-duplicate proportion of the distance; and therefore the moon
-is less impelled toward the earth, and will not descend so low.</p>
-
-<p>50. <span class="smcap gesperrt">Now</span> suppose in the first of these figures, that the
-apogeon A is in the situation, where it is approaching toward
-the conjunction or opposition of the sun. In this case the progressive
-motion of the apogeon is more and more accelerated.
-Here suppose that the moon, after having descended from A
-through the orbit A&nbsp;E as far as F, where it is come to its nearest
-distance from the earth, ascends again up the line F&nbsp;G. Because
-the motion of the apogeon is here continually more and<span class="pagenum"><a name="Page_227" id="Page_227">[227]</a></span>
-more accelerating, the cause of its motion is constantly upon
-the increase; that is, the power, whereby the moon is
-drawn to the earth, will decrease with the increase of distance,
-in the moon’s ascent from F, in a greater proportion than that
-wherewith it increased with the decrease of distance in the
-moon’s descent to F. Consequently the moon will ascend higher
-than to the distance A&nbsp;T, from whence it descended; therefore
-the proportion of the greatest distance of the moon to
-the least is increased. And when the moon descends again, the
-power will yet more increase with the decrease of distance,
-than in the last ascent it decreased with the augmentation
-of distance; the moon therefore must descend nearer to the
-earth than it did before, and the proportion of the greatest
-distance to the least yet be more increased. Thus as long
-as the apogeon is advancing toward the conjunction or opposition,
-the proportion of the greatest distance of the moon
-from the earth to the least will continually increase; and
-the elliptical orbit, to which the moon’s motion is referred,
-will be rendered more and more eccentric.</p>
-
-<p>51. <span class="smcap gesperrt">As</span> soon as the apogeon is passed the conjunction
-with the sun or the opposition, the progressive motion thereof
-abates, and with it the proportion of the greatest distance of
-the moon from the earth to the least distance will also diminish;
-and when the apogeon becomes regressive, the diminution
-of this proportion will be still farther continued on, till
-the apogeon comes into the quarter; from thence this proportion,
-and the eccentricity of the orbit will increase again.
-Thus the orbit of the moon is most eccentric, when the apogeon<span class="pagenum"><a name="Page_228" id="Page_228">[228]</a></span>
-is in conjunction with the sun, or in opposition to it,
-and least of all when the apogeon is in the quarters.</p>
-
-<p>52. <span class="smcap gesperrt">These</span> changes in the nodes, in the inclination of
-the orbit to the plane of the earth’s motion, in the apogeon,
-and in the eccentricity, are varied like the other inequalities
-in the motion of the moon, by the different distance of the
-earth from the sun; being greatest, when their cause is greatest,
-that is, when the earth is nearest to the sun.</p>
-
-<p>53. <span class="smcap gesperrt">I said</span> at the beginning of this chapter, that Sir <span class="smcap">Isaac
-Newton</span> has computed the very quantity of many of the
-moon’s inequalities. That acceleration of the moon’s motion,
-which is called the variation, when greatest, removes
-the moon out of the place, in which it would otherwise be
-found, something more than half a degree<a name="FNanchor_201_201" id="FNanchor_201_201"></a><a href="#Footnote_201_201" class="fnanchor">[201]</a>. In the phrase
-of astronomers, a degree is 1/360 part of the whole circuit of
-the moon or any planet. If the moon, without disturbance
-from the sun, would have described a circle concentrical to
-the earth, the sun will cause the moon to approach nearer
-to the earth in the conjunction and opposition, than in the
-quarters, nearly in the proportion of 69 to 70<a name="FNanchor_202_202" id="FNanchor_202_202"></a><a href="#Footnote_202_202" class="fnanchor">[202]</a>. We had
-occasion to mention above, that the nodes perform their period
-in almost 19 years. This the astronomers found by
-observation; and our author’s computations assign to them
-the same period<a name="FNanchor_203_203" id="FNanchor_203_203"></a><a href="#Footnote_203_203" class="fnanchor">[203]</a>. The inclination of the moon’s orbit when
-least, is an angle about 1/18 part of that angle, which constitutes<span class="pagenum"><a name="Page_229" id="Page_229">[229]</a></span>
-a perpendicular; and the difference between the greatest and
-least inclination of the orbit is determined by our author’s
-computation to be about 1/18 of the least inclination<a name="FNanchor_204_204" id="FNanchor_204_204"></a><a href="#Footnote_204_204" class="fnanchor">[204]</a>. And
-this also is agreeable to the observations of astronomers. The
-motion of the apogeon, and the changes in the eccentricity,
-Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> has not computed. The apogeon
-performs its revolution in about eight years and ten months.
-When the moon’s orbit is most eccentric, the greatest distance
-of the moon from the earth bears to the least distance
-nearly the proportion of 8 to 7; when the orbit is
-least eccentric, this proportion is hardly so great as that of
-12 to 11.</p>
-
-<p><a name="c229" id="c229">54.</a> <span class="smcap gesperrt">Sir</span> <span class="smcap"><em class="gesperrt">Isaac Newton</em></span> shews farther, how, by comparing
-the periods of the motion of the satellites, which revolve
-round Jupiter and Saturn, with the period of our
-moon round the earth, and the periods of those planets
-round the sun with the period of our earth’s motion, the
-inequalities in the motion of those satellites may be derived
-from the inequalities in the moon’s motion; excepting only
-in regard to that motion of the axis of the orbit, which
-in the moon makes the motion of the apogeon; for the
-orbits of those satellites, as far as can be discerned by us at
-this distance, appearing little or nothing eccentric, this
-motion, as deduced from the moon, must be diminished.</p>
-
-</div>
-
-<p><span class="pagenum"><a name="Page_230" id="Page_230">[230]</a></span></p>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c230a" id="c230a"><span class="smcap"><em class="gesperrt">Chap. IV</em>.</span></a><br />
-Of <em class="gesperrt">Comets</em>.</h2>
-
-<p class="drop-cap04">IN the former of the two preceding chapters the powers
-have been explained, which keep in motion those celestial
-bodies, whose courses had been well determined by the
-astronomers. In the last chapter we have shewn, how those
-powers have been applied by our author to the making a
-more perfect discovery of the motion of those bodies, the
-courses of which were but imperfectly understood; for
-some of the inequalities, which we have been describing
-in the moon’s motion, were unknown to the astronomers.
-In this chapter we are to treat of a third species of the heavenly
-bodies, the true motion of which was not at all apprehended
-before our author writ; in so much, that here
-Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> has not only explained the causes of
-the motion of these bodies, but has performed also the part
-of an astronomer, by discovering what their motions are.</p>
-
-<p><a name="c230b" id="c230b">2.</a> <span class="smcap gesperrt">That</span> these bodies are not meteors in our air, is
-manifest; because they rise and set in the same manner,
-as the sun and stars. The astronomers had gone so far in
-their inquiries concerning them, as to prove by their observations,
-that they moved in the etherial spaces far beyond
-the moon; but they had no true notion at all of the path,
-which they described. The most prevailing opinion before<span class="pagenum"><a name="Page_231" id="Page_231">[231]</a></span>
-our author was, that they moved in straight lines; but in
-what part of the heavens was not determined. <span class="smcap">DesCartes</span><a name="FNanchor_205_205" id="FNanchor_205_205"></a><a href="#Footnote_205_205" class="fnanchor">[205]</a>
-removed them far beyond the sphere of Saturn, as
-finding the straight motion attributed to them, inconsistent
-with the vortical fluid, by which he explains the motions
-of the planets, as we have above related<a name="FNanchor_206_206" id="FNanchor_206_206"></a><a href="#Footnote_206_206" class="fnanchor">[206]</a>. But Sir <span class="smcap">Isaac
-Newton</span> distinctly proves from astronomical observation,
-that the comets pass through the region of the planets, and
-are mostly invisible at a less distance, than that of Jupiter<a name="FNanchor_207_207" id="FNanchor_207_207"></a><a href="#Footnote_207_207" class="fnanchor">[207]</a>.</p>
-
-<p><a name="c231" id="c231">3.</a> <span class="smcap gesperrt">And</span> from hence finding the comets to be evidently
-within the sphere of the sun’s action, he concludes they
-must, necessarily move about the sun, as the planets do<a name="FNanchor_208_208" id="FNanchor_208_208"></a><a href="#Footnote_208_208" class="fnanchor">[208]</a>.
-The planets move in ellipsis’s; but it is not necessary that
-every body, which is influenced by the sun, should move
-in that particular kind of line. However our author proves,
-that the power of the sun being reciprocally in the duplicate
-proportion of the distance, every body acted on by the sun
-must either fall directly down, or move in some conic section;
-of which lines I have above observed, that there are
-three species, the ellipsis, parabola, and hyperbola<a name="FNanchor_209_209" id="FNanchor_209_209"></a><a href="#Footnote_209_209" class="fnanchor">[209]</a>. If a
-body, which descends toward the sun as low as the orbit
-of any planet, move with a swifter motion than the planet
-does, that body will describe an orbit of a more oblong
-figure, than that of the planet, and have a longer axis at
-least.  The velocity of the body may be so great, that it<span class="pagenum"><a name="Page_232" id="Page_232">[232]</a></span>
-shall move in a parabola, and having once passed about
-the sun, shall ascend for ever without returning any more:
-but the sun will be placed in the focus of this parabola.
-With a velocity still greater the body will move in an
-hyperbola. But it is most probable, that the comets move
-in elliptical orbits, though of a very oblong, or in the
-phrase of astronomers, of a very eccentric form, such as
-is represented in fig. 107, where S is the sun, C the comet,
-and A&nbsp;B&nbsp;D&nbsp;E its orbit, wherein the distance of S
-and D far exceeds that of S and A. Whence it is, that
-they sometimes are found at a moderate distance from the
-sun, and appear within the planetary regions; at other
-times they ascend to vast distances, far beyond the very orbit
-of Saturn, and so become invisible.  That the comets
-do move in this manner is proved by our author, from computations
-built upon the observations, which astronomers had
-made on many comets. These computations were performed
-by Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> himself upon the comet, which
-appeared toward the latter end of the year 1680, and at
-the beginning of the year following<a name="FNanchor_210_210" id="FNanchor_210_210"></a><a href="#Footnote_210_210" class="fnanchor">[210]</a>; but the learned
-Dr. <span class="smcap">Halley</span> prosecuted the like computations more at large
-in this, and also in many other comets<a name="FNanchor_211_211" id="FNanchor_211_211"></a><a href="#Footnote_211_211" class="fnanchor">[211]</a>. Which computations
-are made upon propositions highly worthy of our author’s unparallel’d
-genius, such as could scarce have been discovered
-by any one not possessed of the utmost force of invention;</p>
-
-<p><span class="pagenum"><a name="Page_233" id="Page_233">[233]</a></span></p>
-
-<p><a name="c233" id="c233">4.</a> <span class="smcap gesperrt">Those</span> computations depend upon this principle,
-that the eccentricity of the orbits of the comets is so
-great, that if they are really elliptical, yet they approach
-so near to parabolas in that part of them, where they
-come under our view, that they may be taken for such
-without sensible error<a name="FNanchor_212_212" id="FNanchor_212_212"></a><a href="#Footnote_212_212" class="fnanchor">[212]</a>: as in the preceding figure the
-parabola F&nbsp;A&nbsp;G differs in the lower part of it about A very
-little from the ellipsis D&nbsp;E&nbsp;A&nbsp;B. Upon which ground
-our great author teaches a method of finding by three observations
-made upon any comet the parabola, which
-nearest agrees with its orbit<a name="FNanchor_213_213" id="FNanchor_213_213"></a><a href="#Footnote_213_213" class="fnanchor">[213]</a>.</p>
-
-<p>5. <span class="smcap gesperrt">Now</span> what confirms this whole theory beyond the
-least room for doubt is, that the places of the comets computed
-in the orbits, which the method here mentioned
-assigns them, agree to the observations of astronomers with
-the same degree of exactness, as the computations of the
-primary planets places usually do; and this in comets,
-whose motions are very extraordinary<a name="FNanchor_214_214" id="FNanchor_214_214"></a><a href="#Footnote_214_214" class="fnanchor">[214]</a>.</p>
-
-<p>6. <span class="smcap gesperrt">Our</span> author afterwards shews how to make use of
-any small deviation from the parabola, that shall be observed,
-to determine whether the orbits of the comets are
-elliptical or not, and so to discover if the same comet returns
-at certain periods<a name="FNanchor_215_215" id="FNanchor_215_215"></a><a href="#Footnote_215_215" class="fnanchor">[215]</a>. And upon examining the comet
-in 1680, by the rule laid down for this purpose, he
-finds its orbit to agree more exactly to an ellipsis than<span class="pagenum"><a name="Page_234" id="Page_234">[234]</a></span>
-to a parabola, though the ellipsis be so very eccentric,
-that the comet cannot perform its period through it in the
-space of 500 years<a name="FNanchor_216_216" id="FNanchor_216_216"></a><a href="#Footnote_216_216" class="fnanchor">[216]</a>. Upon this Dr. <span class="smcap">Halley</span> observed,
-that mention is made in history of a comet, with the
-like eminent tail as this, having appeared three several
-times before; the first of which appearances was at the
-death of <span class="smcap">Julius Cesar</span>, and each appearance was at the
-distance of 575 years from the next preceding. He therefore
-computed the motion of this comet in such an elliptic
-orbit, as would require this number of years for the
-body to revolve through it; and these computations agree
-yet more perfectly with the observations made on this comet,
-than any parabolical orbit will do<a name="FNanchor_217_217" id="FNanchor_217_217"></a><a href="#Footnote_217_217" class="fnanchor">[217]</a>.</p>
-
-<p><a name="c234" id="c234">7.</a> <span class="smcap gesperrt">The</span> comparing together different appearances of the
-same comet, is the only way to discover certainly the true
-form of the orbit: for it is impossible to determine with exactness
-the figure of an orbit so exceedingly eccentric, from
-single observations taken in one part of it; and therefore
-Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em><a name="FNanchor_218_218" id="FNanchor_218_218"></a><a href="#Footnote_218_218" class="fnanchor">[218]</a> proposes to compare the orbits,
-upon the supposition that they are parabolical, of such
-comets as appear at different times; for if the same orbit
-be found to be described by a comet at different times,
-in all probability it will be the same comet which describes
-it. And here he remarks from Dr. <span class="smcap">Halley</span>, that
-the same orbit very nearly agrees to two appearances of
-a comet about the space of 75 years distance<a name="FNanchor_219_219" id="FNanchor_219_219"></a><a href="#Footnote_219_219" class="fnanchor">[219]</a>; so that<span class="pagenum"><a name="Page_235" id="Page_235">[235]</a></span>
-if those two appearances were really of the same comet,
-the transverse axis of the orbit of the comet would be near
-18 times the axis of the earth’s orbit; and the comet,
-when at its greatest distance from the sun, will be removed
-not less than 35 times as far as the middle distance
-of the earth.</p>
-
-<p><a name="c235" id="c235">8.</a> <span class="smcap gesperrt">And</span> this seems to be the shortest period of any of
-the comets. But it will be farther confirmed, if the same
-comet should return a third time after another period of
-75 years. However it is not to be expected, that comets
-should preserve the same regularity in their periods, as
-the planets; because the great eccentricity of their orbits
-makes them liable to suffer very considerable alterations
-from the action of the planets, and other comets, upon them.</p>
-
-<p>9. <span class="smcap gesperrt">It</span> is therefore to prevent too great disturbances
-in their motions from these causes, as our author observes,
-that while the planets revolve all of them nearly in the
-same plane, the comets are disposed in very different ones;
-and distributed over all parts of the heavens; that,
-when in their greatest distance from the sun, and moving
-slowest, they might be removed as far as possible out of the
-reach of each other’s action<a name="FNanchor_220_220" id="FNanchor_220_220"></a><a href="#Footnote_220_220" class="fnanchor">[220]</a>. The same end is likewise
-farther answered in those comets, which by moving slowest
-in the aphelion, or remotest distance from the sun, descend
-nearest to it, by placing the aphelion of these at the
-greatest height from the sun<a name="FNanchor_221_221" id="FNanchor_221_221"></a><a href="#Footnote_221_221" class="fnanchor">[221]</a>.</p>
-
-<p><span class="pagenum"><a name="Page_236" id="Page_236">[236]</a></span></p>
-
-<p>10. <span class="smcap gesperrt">Our</span> philosopher being led by his principles to explain
-the motions of the comets, in the manner now related,
-takes occasion from thence to give us his thoughts
-upon their nature and use.  For which end he proves in
-the first place, that they must necessarily be solid and compact
-bodies, and by no means any sort of vapour or light
-substance exhaled from the planets or stars: because at
-the near distance, to which some comets approach the sun,
-it could not be, but the immense heat, to which they are
-exposed, should instantaneously disperse and scatter any
-such light volatile substance<a name="FNanchor_222_222" id="FNanchor_222_222"></a><a href="#Footnote_222_222" class="fnanchor">[222]</a>. In particular the forementioned
-comet of 1680 descended so near the sun, as to
-come within a sixth part of the sun’s diameter from the
-surface of it. In which situation it must have been exposed,
-as appears by computation, to a degree of heat
-exceeding the heat of the sun upon our earth no less than
-28000 times; and therefore might have contracted a degree
-of heat 2000 times greater, than that of red hot
-iron<a name="FNanchor_223_223" id="FNanchor_223_223"></a><a href="#Footnote_223_223" class="fnanchor">[223]</a>. Now a substance, which could endure so intense
-a heat, without being dispersed in vapor, must needs be
-firm and solid.</p>
-
-<p>11. <span class="smcap gesperrt">It</span> is shewn likewise, that the comets are opake
-substances, shining by a reflected light, borrowed from
-the sun<a name="FNanchor_224_224" id="FNanchor_224_224"></a><a href="#Footnote_224_224" class="fnanchor">[224]</a>. This is proved from the observation, that comets,
-though they are approaching the earth, yet diminish
-in lustre, if at the same time they recede from<span class="pagenum"><a name="Page_237" id="Page_237">[237]</a></span>
-the sun; and on the contrary, are found to encrease
-daily in brightness, when they advance towards the sun,
-though at the same time they move from the earth<a name="FNanchor_225_225" id="FNanchor_225_225"></a><a href="#Footnote_225_225" class="fnanchor">[225]</a>.</p>
-
-<p>12. <span class="smcap gesperrt">The</span> comets therefore in these respects resemble the
-planets; that both are durable opake bodies, and both revolve
-about the sun in conic sections. But farther the
-comets, like our earth, are surrounded by an atmosphere.
-The air we breath is called the earth’s atmosphere;
-and it is most probable, that all the other planets
-are invested with the like fluid. Indeed here a difference
-is found between the planets and comets. The atmospheres
-of the planets are of so fine and subtile a substance, as
-hardly to be discerned at any distance, by reason of the
-small quantity of light which they reflect, except only in
-the planet Mars. In him there is some little appearance
-of such a substance surrounding him, as stars which have
-been covered by him are said to look somewhat dim a
-small space before his body comes under them, as if their
-light, when he is near, were obstructed by his atmosphere.
-But the atmospheres which surround the comets are so
-gross and thick, as to reflect light very copiously. They
-are also much greater in proportion to the body they surround,
-than those of the planets, if we may judge of
-the rest from our air; for it has been observed of comets,
-that the bright light appearing in the middle of them, which<span class="pagenum"><a name="Page_238" id="Page_238">[238]</a></span>
-is reflected from the solid body, is scarce a ninth or tenth
-part of the whole comet,</p>
-
-<p><a name="c238" id="c238">13.</a> <span class="smcap gesperrt">I speak</span> only of the heads of the comets, the most
-lucid part of which is surrounded by a fainter light, the
-most lucid part being usually not above a ninth or tenth
-part of the whole in breadth<a name="FNanchor_226_226" id="FNanchor_226_226"></a><a href="#Footnote_226_226" class="fnanchor">[226]</a>. Their tails are an appearance
-very peculiar, nothing of the same nature appertaining
-in the least degree to any other of the celestial bodies.
-Of that appearance there are several opinions; our
-author reduces them to three<a name="FNanchor_227_227" id="FNanchor_227_227"></a><a href="#Footnote_227_227" class="fnanchor">[227]</a>. The two first, which he
-proposes, are rejected by him; but the third he approves.
-The first is, that they arise from a beam of light transmitted
-through the head of the comet, in like manner as
-a stream of light is discerned, when the sun shines into a
-darkened room through a small hole. This opinion, as
-Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> observes, implies the authors of it
-wholly unskilled in the principles of optics; for that stream
-of light, seen in a darkened room, arises from the reflection
-of the sun beams by the dust and motes floating in
-the air: for the rays of light themselves are not seen, but
-by their being reflected to the eye from some substance,
-upon which they fall<a name="FNanchor_228_228" id="FNanchor_228_228"></a><a href="#Footnote_228_228" class="fnanchor">[228]</a>. The next opinion examined by
-our author is that of the celebrated <span class="smcap">DesCartes</span>, who
-imagins these tails to be the light of the comet refracted
-in its passage to us, and thence affording an oblong representation;
-as the light of the sun does, when refracted<span class="pagenum"><a name="Page_239" id="Page_239">[239]</a></span>
-by the prism in that noted experiment, which will have a
-great share in the third book of this discourse<a name="FNanchor_229_229" id="FNanchor_229_229"></a><a href="#Footnote_229_229" class="fnanchor">[229]</a>. But this
-opinion is at once overturned from this consideration only,
-that the planets could be no more free from this refraction
-than the comets; nay ought to have larger or
-brighter tails, than they, because the light of the planets is
-strongest. However our author has thought proper to add
-some farther objections against this opinion: for instance,
-that these tails are not variegated with colours, as is the
-image produced by the prism, and which is inseparable
-from that unequal refraction, which produces that disproportioned
-length of the image. And besides, when the
-light in its passage from different comets to the earth describes
-the same path through the heavens, the refraction
-of it should of necessity be in all respects the same. But
-this is contrary to observation; for the comet in 1680,
-the 28th day of December, and a former comet in the
-year 1577, the 29th day of December, appear’d in the
-same place of the heavens, that is, were seen adjacent to
-the same fixed stars, the earth likewise being in the same
-place at both times; yet the tail of the latter comet deviated
-from the opposition to the sun a little to the northward,
-and the tail of the former comet declined from the
-opposition of the sun five times as much southward<a name="FNanchor_230_230" id="FNanchor_230_230"></a><a href="#Footnote_230_230" class="fnanchor">[230]</a>.</p>
-
-<p>14. <span class="smcap gesperrt">There</span> are some other false opinions, though less
-regarded than these, which have been advanced upon this<span class="pagenum"><a name="Page_240" id="Page_240">[240]</a></span>
-argument. These our excellent author passes over, hastening
-to explain, what he takes to be the true cause of this
-appearance. He thinks it is certainly owing to steams and
-vapours exhaled from the body, and gross atmosphere of
-the comets, by the heat of the sun; because all the appearances
-agree perfectly to this sentiment. The tails are
-but small, while the comet is descending to the sun, but
-enlarge themselves to an immense degree, as soon as ever
-the comet has passed its perihelion; which shews the tail
-to depend upon the degree of heat, which the comet receives
-from the sun. And that the intense heat to which
-comets, when nearest the sun, are exposed, should exhale
-from them a very copious vapour, is a most reasonable supposition;
-especially if we consider, that in those free and
-empty regions steams will more easily ascend, than here
-upon the surface of the earth, where they are suppressed
-and hindered from rising by the weight of the incumbent
-air: as we find by experiments made in vessels exhausted
-of the air, where upon removal of the air several substances
-will fume and discharge steams plentifully, which
-emit none in the open air. The tails of comets, like such
-a vapour, are always in the plane of the comet’s orbit, and
-opposite to the sun, except that the upper part thereof
-inclines towards the parts, which the comet has left by its
-motion; resembling perfectly the smoak of a burning coal,
-which, if the coal remain fixed, ascends from it perpendicularly;
-but, if the coal be in motion, ascends obliquely,
-inclining from the motion of the coal. And besides, the
-tails of comets may be compared to this smoak in another<span class="pagenum"><a name="Page_241" id="Page_241">[241]</a></span>
-respect, that both of them are denser and more compact
-on the convex side, than on the concave. The different
-appearance of the head of the comet, after it has past its
-perihelion, from what it had before, confirms greatly this
-opinion of their tails: for smoke raised by a strong heat is
-blacker and grosser, than when raised by a less; and accordingly
-the heads of comets, at the same distance from
-the sun, are observed less bright and shining after the perihelion,
-than before, as if obscured by such a gross smoke.</p>
-
-<p>15. <span class="smcap gesperrt">The</span> observations of <span class="smcap">Hevelius</span> upon the atmospheres
-of comets still farther illustrate the same; who relates,
-that the atmospheres, especially that part of them next
-the sun, are remarkably contracted when near the sun, and
-dilated again afterwards.</p>
-
-<p>16. <span class="smcap gesperrt">To</span> give a more full idea of these tails, a rule is
-laid down by our author, whereby to determine at any
-time, when the vapour in the extremity of the tail first
-rose from the head of the comet. By this rule it is found,
-that the tail does not consist of a fleeting vapour, dissipated
-soon after it is raised, but is of long continuance;
-that almost all the vapour, which rose about the time of
-the perihelion from the comet of 1680, continued to accompany
-it, ascending by degrees, being succeeded constantly
-by fresh matter, which rendered the tail contiguous
-to the comet. From this computation the tails are
-found to participate of another property of ascending vapours,
-that, when they ascend with the greatest velocity,
-they are least incurvated.</p>
-
-<p><span class="pagenum"><a name="Page_242" id="Page_242">[242]</a></span></p>
-
-<p>17. <span class="smcap gesperrt">The</span> only objection that can be made against this
-opinion is the difficulty of explaining, how a sufficient
-quantity of vapour can be raised from the atmosphere of a
-comet to fill those vast spaces, through which their tails
-are sometimes extended. This our author removes by the
-following computation: our air being an elastic fluid, as
-has been said before<a name="FNanchor_231_231" id="FNanchor_231_231"></a><a href="#Footnote_231_231" class="fnanchor">[231]</a>, is more dense here near the surface
-of the earth, where it is pressed upon by the whole air
-above; than it is at a distance from the earth, where it has
-a less weight incumbent. I have observed, that the density
-of the air is reciprocally proportional to the compressing
-weight. From hence our author computes to what degree
-of rarity the air must be expanded, according to this rule, at
-an height equal to a semidiameter of the earth: and he finds,
-that a globe of such air, as we breath here on the surface of
-the earth, which shall be one inch only in diameter, if it were
-expanded to the degree of rarity, which the air must have
-at the height now mentioned, would fill all the planetary
-regions even to the very sphere of Saturn, and far beyond.
-Now since the air at a greater height will be still immensly
-more rarified, and the surface of the atmospheres
-of comets is usually about ten times the distance from the
-center of the comet, as the surface of the comet it self, and
-the tails are yet vastly farther removed from the center of
-the comet; the vapour, which composes those tails, may very
-well be allowed to be so expanded, as that a moderate
-quantity of matter may fill all that space, they are seen to
-take up. Though indeed the atmospheres of comets being<span class="pagenum"><a name="Page_243" id="Page_243">[243]</a></span>
-very gross, they will hardly be rarified in their tails to so great
-a degree, as our air under the same circumstances; especially
-since they may be something condensed, as well by their gravitation
-to the sun, as that the parts will gravitate to one another;
-which will hereafter be shewn to be the universal property
-of all matter<a name="FNanchor_232_232" id="FNanchor_232_232"></a><a href="#Footnote_232_232" class="fnanchor">[232]</a>. The only scruple left is, how so much
-light can be reflected from a vapour so rare, as this computation
-implies. For the removal of which our author observes,
-that the most refulgent of these tails hardly appear brighter,
-than a beam of the sun’s light transmitted into a darkened
-room through a hole of a single inch diameter; and that
-the smallest fixed stars are visible through them without any
-sensible diminution of their lustre.</p>
-
-<p><a name="c243" id="c243">18.</a> <span class="smcap gesperrt">All</span> these considerations put it beyond doubt, what
-is the true nature of the tails of comets. There has indeed
-nothing been said, which will account for the irregular
-figures, in which those tails are sometimes reported to have
-appeared; but since none of those appearances have ever been
-recorded by astronomers, who on the contrary ascribe the
-same likeness to the tails of all comets, our author with great
-judgment refers all those to accidental refractions by intervening
-clouds, or to parts of the milky way contiguous to the
-comets<a name="FNanchor_233_233" id="FNanchor_233_233"></a><a href="#Footnote_233_233" class="fnanchor">[233]</a>.</p>
-
-<p>19. <span class="smcap gesperrt">The</span> discussion of this appearance in comets has
-led Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> into some speculations relating
-to their use, which I cannot but extreamly admire, as<span class="pagenum"><a name="Page_244" id="Page_244">[244]</a></span>
-representing in the strongest light imaginable the extensive
-providence of the great author of nature, who,
-besides the furnishing this globe of earth, and without
-doubt the rest of the planets, so abundantly with every
-thing necessary for the support and continuance of the
-numerous races of plants and animals, they are stocked
-with, has over and above provided a numerous train of
-comets, far exceeding the number of the planets, to rectify
-continually, and restore their gradual decay, which
-is our author’s opinion concerning them<a name="FNanchor_234_234" id="FNanchor_234_234"></a><a href="#Footnote_234_234" class="fnanchor">[234]</a>. For since the
-comets are subject to such unequal degrees of heat, being
-sometimes burnt with the most intense degree of it, at
-other times scarce receiving any sensible influence from the
-sun; it can hardly be supposed, they are designed for any
-such constant use, as the planets. Now the tails, which they
-emit, like all other kinds of vapour, dilate themselves as
-they ascend, and by consequence are gradually dispersed and
-scattered through all the planetary regions, and thence cannot
-but be gathered up by the planets, as they pass through
-their orbs: for the planets having a power to cause all bodies
-to gravitate towards them, as will in the sequel of this
-discourse be shewn<a name="FNanchor_235_235" id="FNanchor_235_235"></a><a href="#Footnote_235_235" class="fnanchor">[235]</a>; these vapours will be drawn in process
-of time into this or the other planet, which happens to
-act strongest upon them. And by entering the atmospheres
-of the earth and other planets, they may well be supposed to
-contribute to the renovation of the face of things, in particular
-to supply the diminution caused in the humid parts<span class="pagenum"><a name="Page_245" id="Page_245">[245]</a></span>
-by vegetation and putrefaction. For vegetables are nourished
-by moisture, and by putrefaction are turned in great
-part into dry earth; and an earthy substance always subsides
-in fermenting liquors; by which means the dry parts
-of the planets must continually increase, and the fluids diminish,
-nay in a sufficient length of time be exhausted,
-if not supplied by some such means. It is farther our great
-author’s opinion, that the most subtile and active parts of
-our air, upon which the life of things chiefly depends, is
-derived to us, and supplied by the comets. So far are
-they from portending any hurt or mischief to us, which
-the natural fears of men are so apt to suggest from the appearance
-of any thing uncommon and astonishing.</p>
-
-<p><a name="c245" id="c245">20.</a> <span class="smcap gesperrt">That</span> the tails of comets have some such important
-use seems reasonable, if we consider, that those bodies
-do not send out those fumes merely by their near approach
-to the sun; but are framed of a texture, which disposes
-them in a particular manner to fume in that sort: for the
-earth, without emitting any such steam, is more than half
-the year at a less distance from the sun, than the comet
-of 1664 and 1665 approached it, when nearest; likewise
-the comets of 1682 and 1683 never approached the sun
-much above a seventh part nearer than Venus, and were
-more than half as far again from the sun as Mercury; yet
-all these emitted tails.</p>
-
-<p>21. <span class="smcap gesperrt">From</span> the very near approach of the comet of
-1680 our author draws another speculation; for if the<span class="pagenum"><a name="Page_246" id="Page_246">[246]</a></span>
-sun have an atmosphere about it, the comet mentioned
-seems to have descended near enough to the sun to enter
-within it. If so, it must have been something retarded by
-the resistance it would meet with, and consequently in its
-next descent to the sun will fall nearer than now; by
-which means it will meet with a greater resistance, and
-be again more retarded. The event of which must be, that
-at length it will impinge upon the sun’s surface, and thereby
-supply any decrease, which may have happened by so long
-an emission of light, or otherwise. And something like this
-our author conjectures may be the case of those fixed stars
-which by an additional increase of their lustre have for a
-certain time become visible to us, though usually they are
-out of sight. There is indeed a kind of fixed stars, which
-appear and disappear at regular and equal intervals: here
-some more steady cause must be sought for; perhaps these
-stars turn round their own axis’s, as our sun does<a name="FNanchor_236_236" id="FNanchor_236_236"></a><a href="#Footnote_236_236" class="fnanchor">[236]</a>, and have
-some part of their body more luminous than the other,
-whereby they are seen, when the most lucid part is next to
-us, and when the darker part is turned toward us, they
-vanish out of sight.</p>
-
-
-<p>22. <span class="smcap gesperrt">Whether</span> the sun does really diminish, as has been
-here suggested, is difficult to prove; yet that it either does
-so, or that the earth increases, if not both, is rendered probable
-from Dr. <span class="smcap">Halley</span>’s observation<a name="FNanchor_237_237" id="FNanchor_237_237"></a><a href="#Footnote_237_237" class="fnanchor">[237]</a>, that by comparing<span class="pagenum"><a name="Page_247" id="Page_247">[247]</a></span>
-the proportion, which the periodical time of the moon bore
-to that of the sun in former times, with the proportion between
-them at present, the moon is found to be something
-accelerated in respect of the sun. But if the sun diminish,
-the periods of the primary planets will be lengthened; and
-if the earth be encreased, the period of the moon will be
-shortened: as will appear by the next chapter, wherein
-it shall be shewn, that the power of the sun and earth is
-the result of the same power being lodg’d in all their parts,
-and that this principle of producing gravitation in other bodies
-is proportional to the solid matter in each body.</p>
-
-</div>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c247" id="c247"><span class="smcap"><em class="gesperrt">Chap.</em> V.</span></a><br />
-Of the BODIES of the SUN and PLANETS.</h2>
-
-<p class="drop-cap08">OUR author, after having discovered that the celestial
-motions are performed by a force extended from the
-sun and primary planets, follows this power into the deepest
-recesses of those bodies themselves, and proves the same
-to accompany the smallest particle, of which they are composed.</p>
-
-<p>2. <span class="smcap gesperrt">Preparative</span> hereto he shews first, that each of the
-heavenly bodies attracts the rest, and all bodies, with such
-different degrees of force, as that the force of the same attracting<span class="pagenum"><a name="Page_248" id="Page_248">[248]</a></span>
-body is exerted on others exactly in proportion to
-the quantity of matter in the body attracted<a name="FNanchor_238_238" id="FNanchor_238_238"></a><a href="#Footnote_238_238" class="fnanchor">[238]</a>.</p>
-
-<p><a name="c248" id="c248">3.</a> <span class="smcap gesperrt">Of</span> this the first proof he brings is from experiments
-made here upon the earth. The power by which the moon
-is influenced was above shewn to be the same, with that
-power here on the surface of the earth, which we call gravity<a name="FNanchor_239_239" id="FNanchor_239_239"></a><a href="#Footnote_239_239" class="fnanchor">[239]</a>.
-Now one of the effects of the principle of gravity
-is, that all bodies descend by this force from the same height
-in equal times. Which has been long taken notice of;
-particular methods having been invented to shew that the
-only cause, why some bodies were observed to fall from the
-same height sooner than others, was the resistance of the
-air. This we have above related<a name="FNanchor_240_240" id="FNanchor_240_240"></a><a href="#Footnote_240_240" class="fnanchor">[240]</a>; and proved from hence,
-that since bodies resist to any change of their state from rest
-to motion, or from motion to rest, in proportion to the
-quantity of matter contained in them; the power that can
-move different quantities of matter equally, must be proportional
-to the quantity. The only objection here is, that
-it can hardly be made certain, whether this proportion in
-the effect of gravity on different bodies holds perfectly exact
-or not from these experiments; by reason that the
-great swiftness, with which bodies fall, prevents our being
-able to determine the times of their descent with all the
-exactness requisite. Therefore to remedy this inconvenience,
-our author substitutes another more certain experiment
-in the room of these made upon falling bodies. Pendulums<span class="pagenum"><a name="Page_249" id="Page_249">[249]</a></span>
-are caused to vibrate by the same principle, as makes
-bodies descend; the power of gravity putting them in motion,
-as well as the other.  But if the ball of any pendulum,
-of the same length with another, were more or less
-attracted in proportion to the quantity of solid matter in
-the ball, that pendulum must accordingly move faster or
-slower than the other. Now the vibrations of pendulums
-continue for a great length of time, and the number of
-vibrations they make may easily be determined without
-suspicion of error; so that this experiment may be
-extended to what exactness one pleases:  and our author
-assures us, that he examined in this way several
-substances, as gold, silver, lead, glass, sand, common salt,
-wood, water, and wheat; in all which he found not the
-least deviation from the proportion mentioned, though he
-made the experiment in such a manner, that in bodies of
-the same weight a difference in the quantity of their matter
-less than a thousandth part of the whole would have
-discovered it self<a name="FNanchor_241_241" id="FNanchor_241_241"></a><a href="#Footnote_241_241" class="fnanchor">[241]</a>. It appears therefore, that all bodies are
-made to descend by the power of gravity here, near the surface
-of the earth, with the same degree of swiftness. We
-have above observed this descent to be after the rate of 16⅛
-feet in the first second of time from the beginning of their
-fall. Moreover it was also observed, that if any body, which
-fell here at the surface of the earth after this rate, were
-to be conveyed up to the height of the moon, it would<span class="pagenum"><a name="Page_250" id="Page_250">[250]</a></span>
-descend from thence just with the same degree of velocity,
-as that with which the moon is attracted toward the
-earth; and therefore the power of the earth upon the moon
-bears the same proportion to the power it would have upon
-those bodies at the same distance, as the quantity of matter
-in the moon bears to the quantity in those bodies.</p>
-
-<p><a name="c250" id="c250">4.</a> <span class="smcap gesperrt">Thus</span> the assertion laid down is proved in the earth,
-that the power of the earth on every body it attracts is, at
-the same distance from the earth, proportional to the quantity
-of solid matter in the body acted on. As to the sun, it
-has been shewn, that the power of the sun’s action upon
-the same primary planet is reciprocally in the duplicate proportion
-of the distance; and that the power of the sun
-decreases throughout in the same proportion, the motion of
-comets traversing the whole planetary region testifies. This
-proves, that if any planet were removed from the sun to
-any other distance whatever, the degree of its acceleration
-toward the sun would yet remain reciprocally in the duplicate
-proportion of its distance. But it has likewise been
-shewn, that the degree of acceleration, which the sun gives
-to every one of the planets, is reciprocally in the duplicate
-proportion of their respective distances. All which compared
-together puts it out of doubt, that the power of
-the sun upon any planet, removed into the place of any
-ether, would give it the same velocity of descent, as it
-gives that other; and consequently, that the sun’s action
-upon different planets at the same distance would be proportional
-to the quantity of matter in each.  It has farther<span class="pagenum"><a name="Page_251" id="Page_251">[251]</a></span>
-been shewn, that the sun attracts the primary planets, and
-their respective secondary, when at the same distance, so
-as to communicate to both the same degree of velocity;
-and therefore the force, wherewith the sun acts on the secondary
-planet, bears the same proportion to the force,
-wherewith at the same distance it attracts the primary, as
-the quantity of solid matter in the secondary planet bears to
-the quantity of matter in the primary.</p>
-
-<p><a name="c251" id="c251">5.</a> <span class="smcap gesperrt">This</span> property therefore is proved of both kinds of
-planets, in respect of the sun. Therefore the sun possesses the
-quality found in the earth, of acting on bodies with a degree
-of force proportional to the quantity of matter in the
-body, which receives the influence.</p>
-
-<p>6. <span class="smcap gesperrt">That</span> the power of attraction, with which the other
-planets are endued, should differ from that of the earth, can
-hardly be supposed, if we consider the similitude between
-those bodies; and that it does not in this respect, is farther
-proved from the satellites of Saturn and Jupiter, which are attracted
-by their respective primary according to the same law,
-that is, in the same proportion to their distances, as the primary
-are attracted by the sun: so that what has been concluded
-of the sun in relation to the primary planets, may be justly
-concluded of these primary in respect of their secondary, and
-in consequence of that, in regard likewise to all other bodies,
-viz. that they will attract every body in proportion to the
-quantity of solid matter it contains.</p>
-
-<p><span class="pagenum"><a name="Page_252" id="Page_252">[252]</a></span></p>
-
-<p>7. <span class="smcap gesperrt">Hence</span> it follows, that this attraction extends itself
-to every particle of matter in the attracted body: and that
-no portion of matter whatever is exempted from the influence
-of those bodies, to which we have proved this attractive
-power to belong.</p>
-
-<p><a name="c252a" id="c252a">8.</a> <span class="smcap gesperrt">Before</span> we proceed farther, we may here remark,
-that this attractive power both of the sun and planets now
-appears to be quite of the same nature in all; for it acts in
-each in the same proportion to the distance, and in the same
-manner acts alike upon every particle of matter. This
-power therefore in the sun and other planets is not of a different
-nature from this power in the earth; which has been already
-shewn to be the same with that, which we call gravity<a name="FNanchor_242_242" id="FNanchor_242_242"></a><a href="#Footnote_242_242" class="fnanchor">[242]</a>.</p>
-
-<p><a name="c252b" id="c252b">9.</a> <span class="smcap gesperrt">And</span> this lays open the way to prove, that the attracting
-power lodged in the sun and planets, belongs likewise
-to every part of them: and that their respective powers
-upon the same body are proportional to the quantity of matter,
-of which they are composed; for instance, that the force
-with which the earth attracts the moon, is to the force, with
-which the sun would attract it at the same distance, as the
-quantity of solid matter contained in the earth, to the quantity
-contained in the sun<a name="FNanchor_243_243" id="FNanchor_243_243"></a><a href="#Footnote_243_243" class="fnanchor">[243]</a>.</p>
-
-<p>10. <span class="smcap gesperrt">The</span> first of these assertions is a very evident consequence
-from the latter. And before we proceed to the proof,<span class="pagenum"><a name="Page_253" id="Page_253">[253]</a></span>
-it must first be shewn, that the third law of motion, which
-makes action and reaction equal, holds in these attractive
-powers. The most remarkable attractive force, next to the
-power of gravity, is that, by which the loadstone attracts iron.
-Now if a loadstone were laid upon water, and supported by
-some proper substance, as wood or cork, so that it might
-swim; and if a piece of iron were caused to swim upon the
-water in like manner: as soon as the loadstone begins to
-attract the iron, the iron shall move toward the stone, and
-the stone shall also move toward the iron; when they meet,
-they shall stop each other, and remain fixed together without
-any motion. This shews, that the velocities, wherewith
-they meet, are reciprocally proportional to the quantities
-of solid matter in each; and that by the stone’s attracting
-the iron, the stone itself receives as much motion,
-in the strict philosophic sense of that word<a name="FNanchor_244_244" id="FNanchor_244_244"></a><a href="#Footnote_244_244" class="fnanchor">[244]</a>, as it communicates
-to the iron: for it has been declared above to be an
-effect of the percussion of two bodies, that if they meet
-with velocities reciprocally proportional to the respective
-bodies, they shall be stopped by the concourse, unless their
-elasticity put them into fresh motion; but if they meet
-with any other velocities, they shall retain some motion
-after meeting<a name="FNanchor_245_245" id="FNanchor_245_245"></a><a href="#Footnote_245_245" class="fnanchor">[245]</a>. Amber, glass, sealing-wax, and many other
-substances acquire by rubbing a power, which from its
-having been remarkable, particularly in amber, is called
-electrical.  By this power they will for some time after<span class="pagenum"><a name="Page_254" id="Page_254">[254]</a></span>
-rubbing attract light bodies, that shall be brought within
-the sphere of their activity. On the other hand Mr. <span class="smcap">Boyle</span>
-found, that if a piece of amber be hung in a perpendicular
-position by a string, it shall be drawn itself toward the body
-whereon it was rubbed, if that body be brought near
-it. Both in the loadstone and in electrical bodies we usually
-ascribe the power to the particular body, whose presence
-we find necessary for producing the effect. The loadstone
-and any piece of iron will draw each other, but in
-two pieces of iron no such effect is ordinarily observed; therefore
-we call this attractive power the power of the loadstone:
-though near a loadstone two pieces of iron will also
-draw each other. In like manner the rubbing of amber,
-glass, or any such body, till it is grown warm, being
-necessary to cause any action between those bodies and other
-substances, we ascribe the electrical power to those bodies.
-But in all these cases if we would speak more correctly,
-and not extend the sense of our expressions beyond what
-we see; we can only say that the neighbourhood of a loadstone
-and a piece of iron is attended with a power, whereby
-the loadstone and the iron are drawn toward each other;
-and the rubbing of electrical bodies gives rise to a power,
-whereby those bodies and other substances are mutually attracted.
-Thus we must also understand in the power of
-gravity, that the two bodies are mutually made to approach
-by the action of that power. When the sun draws any
-planet, that planet also draws the sun; and the motion,
-which the planet receives from the sun, bears the same proportion
-to the motion, which the sun it self receives, as<span class="pagenum"><a name="Page_255" id="Page_255">[255]</a></span>
-the quantity of solid matter in the sun bears to the quantity
-of solid matter in the planet. Hitherto, for brevity
-sake in speaking of these forces, we have generally ascribed
-them to the body, which is least moved; as when we
-called the power, which exerts itself between the sun and
-any planet, the attractive power of the sun; but to speak
-more correctly, we should rather call this power in any
-case the force, which acts between the sun and earth, between
-the sun and Jupiter, between the earth and moon,
-&amp;c. for both the bodies are moved by the power acting between
-them, in the same manner, as when two bodies are
-tied together by a rope, if that rope shrink by being wet,
-or otherwise, and thereby cause the bodies to approach, by
-drawing both, it will communicate to both the same degree
-of motion, and cause them to approach with velocities
-reciprocally proportional to the respective bodies. From
-this mutual action between the sun and planet it follows,
-as has been observed above<a name="FNanchor_246_246" id="FNanchor_246_246"></a><a href="#Footnote_246_246" class="fnanchor">[246]</a>, that the sun and planet
-do each move about their common center of gravity.
-Let A (in fig. 108.) represent the sun, B a planet, C their
-common center of gravity. If these bodies were once at
-rest, by their mutual attraction they would directly approach
-each other with such velocities, that their common
-center of gravity would remain at rest, and the two bodies
-would at length meet in that point. If the planet B were
-to receive an impulse, as in the direction of the line D&nbsp;E,
-this would prevent the two bodies from falling together;<span class="pagenum"><a name="Page_256" id="Page_256">[256]</a></span>
-but their common center of gravity would be put into motion
-in the direction of the line C&nbsp;F equidistant from B&nbsp;E.
-In this case Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> proves<a name="FNanchor_247_247" id="FNanchor_247_247"></a><a href="#Footnote_247_247" class="fnanchor">[247]</a>, that the sun and
-planet would describe round their common center of gravity
-similar orbits, while that center would proceed with an
-uniform motion in the line C&nbsp;F; and so the system of the
-two bodies would move on with the center of gravity without
-end. In order to keep the system in the same place,
-it is necessary, that when the planet received its impulse in
-the direction B&nbsp;E, the sun should also receive such an impulse
-the contrary way, as might keep the center of gravity
-C without motion; for if these began once to move
-without giving any motion to their common center of gravity,
-that center would always remain fixed.</p>
-
-<p>11. <span class="smcap gesperrt">By</span> this may be understood in what manner the action
-between the sun and planets is mutual. But farther,
-we have shewn above<a name="FNanchor_248_248" id="FNanchor_248_248"></a><a href="#Footnote_248_248" class="fnanchor">[248]</a>, that the power, which acts between
-the sun and primary planets, is altogether of the same nature
-with that, which acts between the earth and the bodies
-at its surface, or between the earth and its parts, and
-with that which acts between the primary planets and their
-secondary; therefore all these actions must be ascribed to
-the same cause<a name="FNanchor_249_249" id="FNanchor_249_249"></a><a href="#Footnote_249_249" class="fnanchor">[249]</a>. Again, it has been already proved, that
-in different planets the force of the sun’s action upon each at
-the same distance would be proportional to the quantity of solid
-matter in the planet<a name="FNanchor_250_250" id="FNanchor_250_250"></a><a href="#Footnote_250_250" class="fnanchor">[250]</a>; therefore the reaction of each planet
-on the sun at the same distance, or the motion, which the sun
-would receive from each planet, would also be proportional
-to the quantity of matter in the planet; that is, these planets
-at the same distance would act on the same body with
-degrees of strength proportional to the quantity of solid matter
-in each.</p>
-
-<div class="figcenter">
-     <img src="images/ill-321.jpg" width="400" height="517"
-         alt=""
-         title="" />
-</div>
-
-<p><span class="pagenum"><a name="Page_257" id="Page_257">[257]</a></span></p>
-
-<p><a name="c257" id="c257">12.</a> <span class="smcap gesperrt">In</span> the next place, from what has been now proved,
-our great author has deduced this farther consequence,
-no less surprizing than elegant; that each of the particles,
-out of which the bodies of the sun and planets are framed,
-exert their power of gravitation by the same law, and in
-the same proportion to the distance, as the great bodies
-which they compose. For this purpose he first demonstrates,
-that if a globe were compounded of particles, which
-will attract the particles of any other body reciprocally
-in the duplicate proportion of their distances, the whole
-globe will attract the same in the reciprocal duplicate proportion
-of their distances from the center of the globe;
-provided the globe be of uniform density throughout<a name="FNanchor_251_251" id="FNanchor_251_251"></a><a href="#Footnote_251_251" class="fnanchor">[251]</a>. And
-from this our author deduces the reverse, that if a globe acts
-upon distant bodies by the law just now specified, and the
-power of the globe is derived from its being composed of attractive
-particles; each of those particles will attract after the
-same proportion<a name="FNanchor_252_252" id="FNanchor_252_252"></a><a href="#Footnote_252_252" class="fnanchor">[252]</a>. The manner of deducing this is not set
-down at large by our author, but is as follows. The globe is<span class="pagenum"><a name="Page_258" id="Page_258">[258]</a></span>
-supposed to act upon the particles of a body without it constantly
-in the reciprocal duplicate proportion of their distances
-from its center; and therefore at the same distance from
-the globe, on which side soever the body be placed, the
-globe will act equally upon it. Now because, if the particles,
-of which the globe is composed, acted upon those without
-in the reciprocal duplicate proportion of their distances,
-the whole globe would act upon them in the same manner as
-it does; therefore, if the particles of the globe have not all
-of them that property, some must act stronger than in that
-proportion, while others act weaker: and if this be the condition
-of the globe, it is plain, that when the body attracted
-is in such a situation in respect of the globe, that the greater
-number of the strongest particles are nearest to it, the body
-will be more forcibly attracted; than when by turning the
-globe about, the greater quantity of weak particles should
-be nearest, though the distance of the body should remain
-the same from the center of the globe. Which is contrary
-to what was at first remarked, that the globe on all sides of
-it acts with the same strength at the same distance. Whence it
-appears, that no other constitution of the globe can agree to it.</p>
-
-<p>13. <span class="smcap gesperrt">From</span> these propositions it is farther collected, that
-if all the particles of one globe attract all the particles of another
-in the proportion so often mentioned, the attracting
-globe will act upon the other in the same proportion to the
-distance between the center of the globe which attracts, and
-the center of that which is attracted<a name="FNanchor_253_253" id="FNanchor_253_253"></a><a href="#Footnote_253_253" class="fnanchor">[253]</a>: and farther, that this<span class="pagenum"><a name="Page_259" id="Page_259">[259]</a></span>
-proportion holds true, though either or both the globes be
-composed of dissimilar parts, some rarer and some more
-dense; provided only, that all the parts in the same globe
-equally distant from the center be homogeneous<a name="FNanchor_254_254" id="FNanchor_254_254"></a><a href="#Footnote_254_254" class="fnanchor">[254]</a>. And
-also, if both the globes attract each other<a name="FNanchor_255_255" id="FNanchor_255_255"></a><a href="#Footnote_255_255" class="fnanchor">[255]</a>. All which place
-it beyond contradiction, that this proportion obtains with as
-much exactness near and contiguous to the surface of attracting
-globes, as at greater distances from them.</p>
-
-<p><a name="c259" id="c259">14.</a> <span class="smcap gesperrt">Thus</span> our author, without the pompous pretence of
-explaining the cause of gravity, has made one very important
-step toward it, by shewing that this power in the great bodies
-of the universe, is derived from the same power being lodged
-in every particle of the matter which composes them: and
-consequently, that this property is no less than universal to
-all matter whatever, though the power be too minute to produce
-any visible effects on the small bodies, wherewith we
-converse, by their action on each other<a name="FNanchor_256_256" id="FNanchor_256_256"></a><a href="#Footnote_256_256" class="fnanchor">[256]</a>. In the fixed stars
-indeed we have no particular proof that they have this power;
-for we find no apperance to demonstrate that they either
-act, or are acted upon by it. But since this power
-is found to belong to all bodies, whereon we can make
-observation; and we see that it is not to be altered by any
-change in the form of bodies, but always accompanies them
-in every shape without diminution, remaining ever proportional
-to the quantity of solid matter in each; such a
-power must without doubt belong universally to all matter.</p>
-
-<p><span class="pagenum"><a name="Page_260" id="Page_260">[260]</a></span></p>
-
-<p>15. <span class="smcap gesperrt">This</span> therefore is the universal law of matter; which
-recommends it self no less for its great plainness and simplicity,
-than for the surprizing discoveries it leads us to. By
-this principle we learn the different weight, which the same
-body will have upon the surfaces of the sun and of diverse
-planets; and by the same we can judge of the composition
-of those celestial bodies, and know the density of
-each; which is formed of the most compact, and which of
-the most rare substance. Let the adversaries of this philosophy
-reflect here, whether loading this principle with the
-appellation of an occult quality, or perpetual miracle, or
-any other reproachful name, be sufficient to dissuade us from
-cultivating it; since this quality, which they call occult, leads
-to the knowledge of such things, that it would have been reputed
-no less than madness for any one, before they had been
-discovered, even to have conjectured that our faculties should
-ever have reached so far.</p>
-
-<p>16. <span class="smcap gesperrt">See</span> how all this naturally follows from the foregoing
-principles in those planets, which have satellites moving
-about them. By the times, in which these satellites
-perform their revolutions, compared with their distances
-from their respective primary, the proportion between the
-power, with which one primary attracts his satellites, and
-the force with which any other attracts his will be known;
-and the proportion of the power with which any planet
-attracts its secondary, to the power with which it attracts a
-body at its surface is found, by comparing the distance of
-the secondary planet from the center of the primary, to<span class="pagenum"><a name="Page_261" id="Page_261">[261]</a></span>
-the distance of the primary planet’s surface from the same:
-and from hence is deduced the proportion between the power
-of gravity upon the surface of one planet, to the gravity upon
-the surface of another. By the like method of comparing
-the periodical time of a primary planet about the sun, with
-the revolution of a satellite about its primary, may be found
-the proportion of gravity, or of the weight of any body upon
-the surface of the sun, to the gravity, or to the weight of
-the same body upon the surface of the planet, which carries
-about the satellite.</p>
-
-<p><a name="c261" id="c261">17.</a> <span class="smcap gesperrt">By</span> these kinds of computation it is found, that the
-weight of the same body upon the surface of the sun will
-be about 23 times as great, as here upon the surface of the
-earth; about 10⅗ times as great, as upon the surface of Jupiter;
-and near 19 times as great, as upon the surface of Saturn<a name="FNanchor_257_257" id="FNanchor_257_257"></a><a href="#Footnote_257_257" class="fnanchor">[257]</a>.</p>
-
-<p>18. <span class="smcap gesperrt">The</span> quantity of matter, which composes each of
-these bodies, is proportional to the power it has upon a
-body at a given distance. By this means it is found, that the
-sun contains 1067 times as much matter as Jupiter; Jupiter
-158⅔ times as much as the earth, and 2-5/6 times as much
-as Saturn<a name="FNanchor_258_258" id="FNanchor_258_258"></a><a href="#Footnote_258_258" class="fnanchor">[258]</a>. The diameter of the sun is about 92 times,
-that of Jupiter about 9 times, and that of Saturn about
-7 times the diameter of the earth.</p>
-
-<p><span class="pagenum"><a name="Page_262" id="Page_262">[262]</a></span></p>
-
-<p>19. <span class="smcap gesperrt">By</span> making a comparison between the quantity of
-matter in these bodies and their magnitudes, to be found
-from their diameters, their respective densities are readily
-deduced; the density of every body being measured by the
-quantity of matter contained under the same bulk, as has
-been above remarked<a name="FNanchor_259_259" id="FNanchor_259_259"></a><a href="#Footnote_259_259" class="fnanchor">[259]</a>.  Thus the earth is found 4¼ times
-more dense than Jupiter; Saturn has between ⅔ and ¾ of the
-density of Jupiter; but the sun has one fourth part only of
-the density of the earth<a name="FNanchor_260_260" id="FNanchor_260_260"></a><a href="#Footnote_260_260" class="fnanchor">[260]</a>. From which this observation is drawn
-by our author; that the sun is rarified by its great heat, and that
-of the three planets named, the more dense is nearer the sun
-than the more rare; as was highly reasonable to expect, the
-densest bodies requiring the greatest heat to agitate and put
-their parts in motion; as on the contrary, the planets which
-are more rare, would be rendered unfit for their office, by
-the intense heat to which the denser are exposed.  Thus the
-waters of our seas, if removed to the distance of Saturn from
-the sun, would remain perpetually frozen; and if as near
-the sun as Mercury, would constantly boil<a name="FNanchor_261_261" id="FNanchor_261_261"></a><a href="#Footnote_261_261" class="fnanchor">[261]</a>.</p>
-
-<p>20. <span class="smcap gesperrt">The</span> densities of the three planets Mercury, Venus,
-and Mars, which have no satellites, cannot be expresly assigned;
-but from what is found in the others, it is very probable,
-that they also are of such different degrees of density,
-that universally the planet which is nearest to the sun, is
-formed of the most compact substance.</p>
-
-</div>
-
-<p><span class="pagenum"><a name="Page_263" id="Page_263">[263]</a></span></p>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c263" id="c263"><span class="smcap"><em class="gesperrt">Chap</em>. VI.</span></a><br />
-Of the FLUID PARTS of the PLANETS.</h2>
-
-<p class="drop-cap04">THIS globe, that we inhabit, is composed of two parts;
-the solid earth, which affords us a foundation to dwell
-upon; and the seas and other waters, that furnish rains and
-vapours necessary to render the earth fruitful, and productive
-of what is requisite for the support of life. And that the
-moon, though but a secondary planet, is composed in like
-manner, is generally thought, from the different degrees of
-light which appear on its surface; the parts of that planet,
-which reflect a dim light, being supposed to be fluid, and to
-imbibe the sun’s rays, while the solid parts reflect them more
-copiously. Some indeed do not allow this to be a conclusive
-argument: but whether we can distinguish the fluid part of
-the moon’s surface from the rest or not; yet it is most probable
-that there are two such different parts, and with still greater
-reason we may ascribe the like to the other primary planets,
-which yet more nearly resemble our earth. The earth is also
-encompassed by another fluid the air, and we have before remarked,
-that probably the rest of the planets are surrounded
-by the like. These fluid parts in particular engage our author’s
-attention, both by reason of some remarkable appearances
-peculiar to them, and likewise of some effects they
-have upon the whole bodies to which they belong.</p>
-
-<p><span class="pagenum"><a name="Page_264" id="Page_264">[264]</a></span></p>
-
-<p><a name="c264" id="c264">2.</a> <span class="smcap gesperrt">Fluids</span> have been already treated of in general, with
-respect to the effect they have upon solid bodies moving in
-them<a name="FNanchor_262_262" id="FNanchor_262_262"></a><a href="#Footnote_262_262" class="fnanchor">[262]</a>; now we must consider them in reference to the operation
-of the power of gravity upon them. By this power
-they are rendered weighty, like all other bodies, in proportion
-to the quantity of matter, which is contained in them. And
-in any quantity of a fluid the upper parts press upon the lower
-as much, as any solid body would press on another, whereon
-it should lie. But there is an effect of the pressure of fluids on
-the bottom of the vessel, wherein they are contained, which I
-shall particularly explain. The force supported by the bottom
-of such a vessel is not simply the weight of the quantity
-of the fluid in the vessel, but is equal to the weight of that
-quantity of the fluid, which would be contained in a vessel of
-the same bottom and of equal width throughout, when this
-vessel is filled up to the same height, as that to which the vessel
-proposed is filled. Suppose water were contained in the
-vessel A&nbsp;B&nbsp;C&nbsp;D (in fig. 109.) filled up to E&nbsp;F. Here it is evident,
-that if a part of the bottom, as G&nbsp;H, which is directly under
-any part of the space E&nbsp;F, be considered separately; it will appear
-at once, that this part sustains the weight of as much of
-the fluid, as stands perpendicularly over it up to the height of
-E&nbsp;F; that is, the two perpendiculars G&nbsp;I and H&nbsp;K being drawn,
-the part G&nbsp;H of the bottom will sustain the whole weight of
-the fluid included between these two perpendiculars. Again,
-I say, every other part of the bottom equally broad with this,
-will sustain as great a pressure. Let the part L&nbsp;M be of the<span class="pagenum"><a name="Page_265" id="Page_265">[265]</a></span>
-same breadth with G&nbsp;H. Here the perpendiculars L&nbsp;O and
-M&nbsp;N being drawn, the quantity of water contained between
-these perpendiculars is not so great, as that contained between
-the perpendiculars G&nbsp;I and H&nbsp;K; yet, I say, the pressure on L&nbsp;M
-will be equal to that on G&nbsp;H. This will appear by the following
-considerations. It is evident, that if the part of the
-vessel between O and N were removed, the water would immediately
-flow out, and the surface E&nbsp;F would subside; for
-all parts of the water being equally heavy, it must soon form
-itself to a level surface, if the form of the vessel, which contains
-it, does not prevent. Therefore since the water is prevented
-from rising by the side N&nbsp;O of the vessel, it is manifest,
-that it must press against N&nbsp;O with some degree of force.
-In other words, the water between the perpendiculars L&nbsp;O and
-M&nbsp;N endeavours to extend itself with a certain degree of force;
-or more correctly, the ambient water presses upon this, and
-endeavours to force this pillar or column of water into a greater
-length. But since this column of water is sustained between
-N&nbsp;O and L&nbsp;M, each of these parts of the vessel will be
-equally pressed against by the power, wherewith this column
-endeavours to extend. Consequently L&nbsp;M bears this force
-over and above the weight of the column of water between
-L&nbsp;O and M&nbsp;N. To know what this expansive force is, let the
-part O&nbsp;N of the vessel be removed, and the perpendiculars L&nbsp;O
-and M&nbsp;N be prolonged; then by means of some pipe fixed
-over N&nbsp;O let water be filled between these perpendiculars up to
-P&nbsp;Q an equal height with E&nbsp;F. Here the water between the perpendiculars
-L&nbsp;P and M&nbsp;Q is of an equal height with the highest
-part of the water in the vessel; therefore the water in the<span class="pagenum"><a name="Page_266" id="Page_266">[266]</a></span>
-vessel cannot by its pressure force it up higher, nor can the
-water in this column subside; because, if it should, it would
-raise the water in the vessel to a greater height than itself.
-But it follows from hence, that the weight of water contained
-between P&nbsp;O and Q&nbsp;N is a just balance to the force, wherewith
-the column between L&nbsp;O and M&nbsp;N endeavours to extend. So
-the part L&nbsp;M of the bottom, which sustains both this force
-and the weight of the water between L&nbsp;O and M&nbsp;N, is pressed
-upon by a force equal to the united weight of the water
-between L&nbsp;O and M&nbsp;N, and the weight of the water between
-P&nbsp;O and Q&nbsp;N; that is, it is pressed on by a force equal to the
-weight of all the water contained between L&nbsp;P and M&nbsp;Q. And
-this weight is equal to that of the water contained between
-G&nbsp;I and H&nbsp;K, which is the weight sustained by the part G&nbsp;H
-of the bottom. Now this being true of every part of the
-bottom B&nbsp;C, it is evident, that if another vessel R&nbsp;S&nbsp;T&nbsp;V be
-formed with a bottom R&nbsp;V equal to the bottom B&nbsp;C, and be
-throughout its whole height of one and the same breadth;
-when this vessel is filled with water to the same height, as the
-vessel A&nbsp;B&nbsp;C&nbsp;D is filled, the bottoms of these two vessels shall
-be pressed upon with equal force. If the vessel be broader
-at the top than at the bottom, it is evident, that the bottom
-will bear the pressure of so much of the fluid, as is perpendicularly
-over it, and the sides of the vessel will support the
-rest. This property of fluids is a corollary from a proposition
-of our author<a name="FNanchor_263_263" id="FNanchor_263_263"></a><a href="#Footnote_263_263" class="fnanchor">[263]</a>; from whence also he deduces the effects
-of the pressure of fluids on bodies resting in them.<span class="pagenum"><a name="Page_267" id="Page_267">[267]</a></span>
-These are, that any body heavier than a fluid will sink to
-the bottom of the vessel, wherein the fluid is contained,
-and in the fluid will weigh as much as its own weight exceeds
-the weight of an equal quantity of the fluid; any body
-uncompressible of the same density with the fluid, will rest
-any where in the fluid without suffering the least change either
-in its place or figure from the pressure of such a fluid,
-but will remain as undisturbed as the parts of the fluid themselves;
-but every body of less density than the fluid will
-swim on its surface, a part only being received within the
-fluid. Which part will be equal in bulk to a quantity of the
-fluid, whose weight is equal to the weight of the whole body;
-for by this means the parts of the fluid under the body
-will suffer as great a pressure as any other parts of the
-fluid as much below the surface as these.</p>
-
-<p>3. <span class="smcap gesperrt">In</span> the next place, in relation to the air, we have above
-made mention, that the air surrounding the earth being
-an elastic fluid, the power of gravity will have this effect
-on it, to make the lower parts near the surface of the earth
-more compact and compressed together by the weight of
-the air incumbent, than the higher parts, which are pressed
-upon by a less quantity of the air, and therefore sustain
-a less weight<a name="FNanchor_264_264" id="FNanchor_264_264"></a><a href="#Footnote_264_264" class="fnanchor">[264]</a>. It has been also observed, that our author
-has laid down a rule for computing the exact degree
-of density in the air at all heights from the earth<a name="FNanchor_265_265" id="FNanchor_265_265"></a><a href="#Footnote_265_265" class="fnanchor">[265]</a>. But
-there is a farther effect from the air’s being compressed by<span class="pagenum"><a name="Page_268" id="Page_268">[268]</a></span>
-the power of gravity, which he has distinctly considered.
-The air being elastic and in a state of compression, any tremulous
-body will propagate its motion to the air, and excite
-therein vibrations, which will spread from the body that
-occasions them to a great distance. This is the efficient cause
-of sound: for that sensation is produced by the air, which,
-as it vibrates, strikes against the organ of hearing. As this
-subject was extremely difficult, so our great author’s success
-is surprizing.</p>
-
-<p>4. <span class="smcap gesperrt">Our</span> author’s doctrine upon this head I shall endeavour
-to explain somewhat at large. But preliminary thereto
-must be shewn, what he has delivered in general of pressure
-propagated through fluids; and also what he has set
-down relating to that wave-like motion, which appears upon
-the surface of water, when agitated by throwing any thing
-into it, or by the reciprocal motion of the finger, &amp;c.</p>
-
-<p>5. <span class="smcap gesperrt">Concerning</span> the first, it is proved, that pressure is
-spread through fluids, not only right forward in a streight
-line, but also laterally, with almost the same ease and force.
-Of which a very obvious exemplification by experiment is
-proposed: that is, to agitate the surface of water by the reciprocal
-motion of the finger forwards and backwards only;
-for though the finger have no circular motion given it, yet the
-waves excited in the water will diffuse themselves on each
-hand of the direction of the motion, and soon surround the
-finger. Nor is what we observe in sounds unlike to this, which
-do not proceed in straight lines only, but are heard though a<span class="pagenum"><a name="Page_269" id="Page_269">[269]</a></span>
-mountain intervene, and when they enter a room in any
-part of it, they spread themselves into every corner; not by
-reflection from the walls, as some have imagined, but as
-far as the sense can judge, directly from the place where they
-enter.</p>
-
-<p><a name="c269" id="c269">6.</a> <span class="smcap gesperrt">How</span> the waves are excited in the surface of stagnant
-water, may be thus conceived. Suppose in any place, the
-water raised above the rest in form of a small hillock; that
-water will immediately subside, and raise the circumambient
-water above the level of the parts more remote, to which the
-motion cannot be communicated under longer time. And
-again, the water in subsiding will acquire, like all falling bodies,
-a force, which will carry it below the level surface, till
-at length the pressure of the ambient water prevailing, it will
-rise again, and even with a force like to that wherewith it descended,
-which will carry it again above the level.  But in
-the mean time the ambient water before raised will subside,
-as this did, sinking below the level; and in so doing, will
-not only raise the water, which first subsided, but also the water
-next without itself.  So that now beside the first hillock,
-we shall have a ring investing it, at some distance raised above
-the plain surface likewise; and between them the water will
-be sunk below the rest of the surface. After this, the first hillock,
-and the new made annular rising, will descend; raising
-the water between them, which was before depressed, and likewise
-the adjacent part of the surface without. Thus will these
-annular waves be successively spread more and more. For,
-as the hillock subsiding produces one ring, and that ring subsiding<span class="pagenum"><a name="Page_270" id="Page_270">[270]</a></span>
-raises again the hillock, and a second ring; so the hillock
-and second ring subsiding together raise the first ring,
-and a third; then this first and third ring subsiding together
-raise the first hillock, the second ring, and a fourth; and so
-on continually, till the motion by degrees ceases. Now it is demonstrated,
-that these rings ascend and descend in the manner
-of a pendulum; descending with a motion continually accelerated,
-till they become even with the plain surface of the fluid,
-which is half the space they descend; and then being retarded
-again by the same degrees as those, whereby they were
-accelerated, till they are depressed below the plain surface, as
-much as they were before raised above it: and that this augmentation
-and diminution of their velocity proceeds by the same
-degrees, as that of a pendulum vibrating in a cycloid, and
-whose length should be a fourth part of the distance between
-any two adjacent waves: and farther, that a new ring is
-produced every time a pendulum, whose length is four times
-the former, that is, equal to the interval between the summits
-of two waves, makes one oscillation or swing<a name="FNanchor_266_266" id="FNanchor_266_266"></a><a href="#Footnote_266_266" class="fnanchor">[266]</a>.</p>
-
-<p><a name="c270" id="c270">7.</a> <span class="smcap gesperrt">This</span> now opens the way for understanding the motion
-consequent upon the tremors of the air, excited by
-the vibrations of sonorous bodies: which we must conceive
-to be performed in the following manner.</p>
-
-<p>8. <span class="smcap gesperrt">Let</span> A, B, C, D, E, F, G, H (in fig. 110.) represent a series
-of the particles of the air, at equal distances from each
-other. I&nbsp;K&nbsp;L a musical chord, which I shall use for the tremulous<span class="pagenum"><a name="Page_271" id="Page_271">[271]</a></span>
-and sonorous body, to make the conception as simple
-as may be. Suppose this chord stretched upon the points
-I and L, and forcibly drawn into the situation I&nbsp;K&nbsp;L, so that
-it become contiguous to the particle A in its middle point K:
-and let the chord from this situation begin to recoil, pressing
-against the particle A, which will thereby be put into motion
-towards B: but the particles A, B, C being equidistant, the
-elastic power, by which B avoids A, is equal to, and balanced
-by the power, by which it avoids C; therefore the elastic
-force, by which B is repelled from A, will not put B into any
-degree of motion, till A is by the motion of the chord brought
-nearer to B, than B is to C: but as soon as that is done, the
-particle B will be moved towards C; and being made to approach
-C, will in the next place move that; which will upon
-that advance, put D likewise into motion, and so on:
-therefore the particle A being moved by the chord, the following
-particles of the air B, C, D, &amp;c. will successively be
-moved. Farther, if the point K of the chord moves forward
-with an accelerated velocity, so that the particle A shall
-move against B with an advancing pace, and gain ground of
-it, approaching nearer and nearer continually; A by approaching
-will press more upon B, and give it a greater velocity
-likewise, by reason that as the distance between the particles
-diminishes, the elastic power, by which they fly each other,
-increases. Hence the particle B, as well as A, will have its
-motion gradually accelerated, and by that means will more
-and more approach to C. And from the same cause C will
-more and more approach D; and so of the rest. Suppose
-now, since the agitation of these particles has been shewn to<span class="pagenum"><a name="Page_272" id="Page_272">[272]</a></span>
-be successive, and to follow one another, that E be the remotest
-particle moved, while the chord is moving from its
-curve situation I&nbsp;K&nbsp;L into that of a streight line, as I&nbsp;k&nbsp;L; and
-F the first which remains unaffected, though just upon the
-point of being put into motion. Then shall the particles
-A, B, C, D, E, F, G, when the point K is moved into k, have
-acquired the rangement represented by the adjacent points
-<i>a, b, c, d, e, f, g</i>: in which <i>a</i> is nearer to <i>b</i> than <i>b</i> to <i>c</i>, and
-<i>b</i> nearer to <i>c</i> than <i>c</i> to <i>d</i>, and <i>c</i> nearer to <i>d</i> than <i>d</i> to <i>e</i> and
-<i>d</i> nearer to <i>e</i> than <i>e</i> to <i>f</i>, and lastly <i>e</i> nearer to <i>f</i> than <i>f</i> to <i>g</i>.</p>
-
-<p>9. <span class="smcap gesperrt">But</span> now the chord having recovered its rectilinear situation
-I&nbsp;k&nbsp;L, the following motion will be changed, for the
-point K, which before advanced with a motion more and
-more accelerated, though by the force it has acquired it will
-go on to move the same way as before, till it has advanced
-near as far forwards, as it was at first drawn backwards; yet
-the motion of it will henceforth be gradually lessened. The
-effect of which upon the particles <i>a, b, c, d, e, f, g</i> will be,
-that by the time the chord has made its utmost advance, and
-is upon the return, these particles will be put into a contrary
-rangement; so that <i>f</i> shall be nearer to <i>g</i>, than <i>e</i> to <i>f</i>, and
-<i>e</i> nearer to <i>f</i> than <i>d</i> to <i>e</i>; and the like of the rest, till you
-come to the first particles <i>a</i>, <i>b</i>, whose distance will then be
-nearly or quite what it was at first. All which will appear
-as follows. The present distance between <i>a</i> and <i>b</i> is such,
-that the elastic power, by which <i>a</i> repels <i>b</i>, is strong enough to
-maintain that distance, though a advance with the velocity,
-with which the string resumes its rectilinear figure; and the<span class="pagenum"><a name="Page_273" id="Page_273">[273]</a></span>
-motion of the particle <i>a</i> being afterwards slower, the
-present elasticity between <i>a</i> and <i>b</i> will be more than
-sufficient to preserve the distance between them. Therefore
-while it accelerates <i>b</i> it will retard <i>a</i>. The distance
-<i>b&nbsp;c</i> will still diminish, till <i>b</i> come about as near
-to <i>c</i>, as it is from a at present; for after the distances
-<i>a&nbsp;b</i> and <i>b&nbsp;c</i> are become equal, the particle <i>b</i> will continue
-its velocity superior to that of <i>c</i> by its own power of inactivity,
-till such time as the increase of elasticity between
-<i>b</i> and <i>c</i> more than shall be between <i>a</i> and <i>b</i> shall suppress
-its motion: for as the power of inactivity in <i>b</i> made a
-greater elasticity necessary on the side of a than on the side
-of <i>c</i> to push <i>b</i> forward, so what motion <i>b</i> has acquired it will
-retain by the same power of inactivity, till it be suppressed
-by a greater elasticity on the side of <i>c</i>, than on the side of <i>a</i>.
-But as soon as <i>b</i> begins to slacken its pace the distance of <i>b</i>
-from c will widen as the distance <i>a&nbsp;b</i> has already done. Now
-as <i>a</i> acts on <i>b</i>, so will <i>b</i> on <i>c</i>, <i>c</i> on <i>d</i>, &amp;c. so that the distances
-between all the particles <i>b, c, d, e, f, g</i> will be successively
-contracted into the distance of <i>a</i> from <i>b</i>, and then dilated
-again. Now because the time, in which the chord describes
-this present half of its vibration, is about equal to that it took
-up in describing the former; the particles <i>a</i>, <i>b</i> will be as long
-in dilating their distance, as before in contracting it, and
-will return nearly to their original distance. And farther,
-the particles <i>b</i>, <i>c</i>, which did not begin to approach so soon
-as <i>a</i>, <i>b</i>, are now about as much longer, before they begin to
-recede; and likewise the particles <i>c</i>, <i>d</i>, which began to approach
-after <i>b</i>, <i>c</i>, begin to separate later. Whence it appears
-that the particles, whose distance began to be lessened, when<span class="pagenum"><a name="Page_274" id="Page_274">[274]</a></span>
-that of <i>a</i>, <i>b</i> was first enlarged, viz. the particles <i>f</i>, <i>g,</i> should
-be about their nearest distance, when <i>a</i> and <i>b</i> have recovered
-their prime interval. Thus will the particles <i>a, b, c, d,
-e, f, g</i> have changed their situation in the manner asserted.
-But farther, as the particles <i>f</i>, <i>g</i> or F, G gradually approach
-each other, they will move by degrees the succeeding particles
-to as great a length, as the particles A, B did by a like
-approach. So that, when the chord has made its greatest advance,
-being arrived into the situation I ϰ L, the particles moved
-by it will have the rangement noted by the points α, β, γ,
-δ, ε, ζ, η, θ, λ, μ, ν, χ. Where α, β are at the original distance of
-the particles in the line A&nbsp;H; ζ, η are the nearest of all, and
-the distance ν&nbsp;χ is equal to that between α and β.</p>
-
-<p>10. <span class="smcap gesperrt">By</span> this time the chord I&nbsp;ϰ&nbsp;L begins to return, and the
-distance between the particles α and β being enlarged to its
-original magnitude, α has lost all that force it had acquired
-by its motion, being now at rest; and therefore will
-return with the chord, making the distance between α and
-β greater than the natural; for β will not return so soon,
-because its motion forward is not yet quite suppressed, the
-distance β&nbsp;γ not being already enlarged to its prime dimension:
-but the recess of α, by diminishing the pressure upon
-β by its elasticity, will occasion the motion of β to be
-stopt in a little time by the action of γ, and then shall
-β begin to return: at which time the distance between γ
-and δ shall by the superior action of δ above β be enlarged
-to the dimension of the distance β&nbsp;γ, and therefore
-soon after to that of α&nbsp;β. Thus it appears, that each of
-these particles goes on to move forward, till its distance from<span class="pagenum"><a name="Page_275" id="Page_275">[275]</a></span>
-the preceding one be equal to its original distance; the
-whole chain α, β, γ, δ, ε, ζ, η, having an undulating motion
-forward, which is stopt gradually by the excess of the expansive
-power of the preceding parts above that of the
-hinder. Thus are these parts successively stopt, as before
-they were moved; so that when the chord has regained its
-rectilinear situation, the expansion of the parts of the air
-will have advanced so far, that the interval between ζ&nbsp;η,
-which at present is most contracted, will then be restored
-to its natural size: the distances between η and θ, θ and λ, λ
-and μ, μ and ν, ν and χ, being successively contracted into
-the present distance of ζ from η, and again enlarged; so
-that the same effect shall be produced upon the parts beyond
-ζ&nbsp;η, by the enlargement of the distance between those two
-particles, as was occasioned upon the particles α, β, γ, δ, ε,
-ζ, η, θ, λ, μ, ν, χ, by the enlargement of the distance α&nbsp;β to
-its natural extent. And therefore the motion in the air
-will be extended half as much farther as at present, and
-the distance between ν and χ contracted into that, which
-is at present between ζ and η, all the particles of the air
-in motion taking the rangement expressed in figure
-111. by the points α, β, γ, δ, ε, ζ, η, θ, λ, μ, ν, χ, ϰ, ρ, σ,  τ, φ
-wherein the particles from α to χ have their distances from
-each other gradually diminished, the distances between the
-particles ν, χ being contracted the most from the natural distance
-between those particles, and the distance between α, β as
-much augmented, and the distance between the middle particles
-ζ, η becoming equal to the natural. The particles π, ρ, ω<br />
-<span class="pagenum"><a name="Page_276" id="Page_276">[276]</a></span>τ, φ which follow χ, have their distances gradually greater
-and greater, the particles ν, χ, π, ρ, σ, τ, φ being ranged like
-the particles <i>a, b, c, d, e, f, g</i>, or like the particles ζ, η, θ, λ,
-μ, ν, χ in the former figure. Here it will be understood, by what
-has been before explained, that the particles ζ, η being at
-their natural distance from each other, the particle ζ is at
-rest, the particles ε, δ, λ, β, ϰ between them and the string
-being in motion backward, and the rest of the particles
-η, θ, λ, μ, ν, χ, π, ρ, σ, τ in motion forward: each of the particles
-between η and χ moving faster than that, which immediately
-follows it; but of the particles from χ to φ, on
-the contrary, those behind moving on faster than those,
-which precede.</p>
-
-<p>11. <span class="smcap gesperrt">But</span> now the string having recovered its rectilinear
-figure, though it shall go on recoiling, till it return near to its
-first situation I&nbsp;K&nbsp;L, yet there will be a change in its motion; so
-that whereas it returned from the situation I&nbsp;ϰ&nbsp;L with an accelerated
-motion, its motion shall from hence be retarded
-again by the same degrees, as accelerated before. The effect
-of which change upon the particles of the air will be
-this. As by the accelerated motion of the chord α contiguous
-to it moved faster than β, γ, so as to make the interval
-α&nbsp;β greater than the interval β&nbsp;γ, and from thence β
-was made likewise to move faster than γ, and the distance between
-β and γ rendered greater than the distance between γ
-and δ, and so of the rest; now the motion of α being diminished,
-β shall overtake it, and the distance between α
-and β be reduced into that, which is at present between β and
-γ, the interval between β and γ being inlarged into the present<span class="pagenum"><a name="Page_277" id="Page_277">[277]</a></span>
-distance between α and β; but when the interval β&nbsp;γ
-is increased to that, which is at present between α and β&nbsp;γ
-the distance between γ and δ shall be enlarged to the present
-distance between γ and β, and the distance between δ
-and ι inlarged into the present distance between γ and δ;
-and the same of the rest. But the chord more and more
-slackening its pace, the distance between α and β shall be
-more and more diminished; and in consequence of that the
-distance between β and γ shall be again contracted, first into
-its present dimension, and afterwards into a narrower
-space; while the interval γ&nbsp;δ shall dilate into that at present
-between α and β, and as soon as it is so much enlarged, it shall
-contract again. Thus by the reciprocal expansion and contraction
-of the air between α and ζ, by that time the chord
-is got into the situation I&nbsp;K&nbsp;L, the interval ζ&nbsp;η shall be expanded
-into the present distance between α and β; and by
-that time likewise the present distance of α from β will be
-contracted into their natural interval: for this distance will
-be about the same time in contracting it self, as has been
-taken up in its dilatation; seeing the string will be as long
-in returning from its rectilinear figure, as it has been in recovering
-it from its situation I&nbsp;ϰ&nbsp;L. This is the change
-which will be made in the particles between α and ζ. As
-for those between ζ and χ, because each preceding particle
-advances faster than that, which immediately follows it,
-their distances will successively be dilated into that, which
-is at present between ζ and η. And as soon as any two
-particles are arrived at their natural distance, the hindermost
-of them shall be stopt, and immediately after return,<span class="pagenum"><a name="Page_278" id="Page_278">[278]</a></span>
-the distances between the returning particles being greater
-than the natural. And this dilatation of these distances shall
-extend so far, by that time the chord is returned into its first
-situation I&nbsp;K&nbsp;L, that the particles ι&nbsp;χ shall be removed to their
-natural distance. But the dilatation of ν&nbsp;χ shall contract
-the interval τ&nbsp;φ into that at present between ν and χ, and the
-contraction of the distance between those two particles τ
-and φ will agitate a part of the air beyond; so that when
-the chord is returned into the situation I&nbsp;K&nbsp;L, having made
-an intire vibration, the moved particles of the air will take
-the rangement expressed by the points, <i>l, m, n, o, p, q, r, s,
-t, u, w, x, y, z</i>, 1, 2, 3, 4, 5, 6, 7, 8: in which <i>l&nbsp;m</i>, are at
-the natural distance of the particles, the distance <i>m&nbsp;n</i> greater
-than <i>l&nbsp;m</i> and <i>n&nbsp;o</i> greater than <i>m&nbsp;n</i>, and so on, till you come
-to <i>q&nbsp;r</i>, the widest of all: and then the distances gradually
-diminish not only to the natural distance, as <i>w&nbsp;x</i>, but till
-they are contracted as much as χ&nbsp;τ was before; which falls
-out in the points 2, 3, from whence the distances augment
-again, till you come to the part of the air untouched.</p>
-
-<p>12. <span class="smcap gesperrt">This</span> is the motion, into which the air is put, while
-the chord makes one vibration, and the whole length of air
-thus agitated in the time of one vibration of the chord our
-author calls the length of one pulse. When the chord goes
-on to make another vibration, it will not only continue to
-agitate the air at present in motion, but spread the pulsation
-of the air as much farther, and by the same degrees, as before.
-For when the chord returns into its rectilinear situation
-I&nbsp;<i>k</i>&nbsp;L, <i>l&nbsp;m</i> shall be brought into its most contracted<span class="pagenum"><a name="Page_279" id="Page_279">[279]</a></span>
-state, <i>q&nbsp;r</i> now in the state of greatest dilatation shall be reduced
-to its natural distance, the points <i>w</i>, <i>x</i> now at their
-natural distance shall be at their greatest distance, the points
-2, 3 now most contracted enlarged to their natural distance,
-and the points 7, 8 reduced to their most contracted state:
-and the contraction of them will carry the agitation of the
-air as far beyond them, as that motion was carried from the
-chord, when it first moved out of the situation I&nbsp;K&nbsp;L into
-its rectilinear figure. When the chord is got into the situation
-I&nbsp;ϰ&nbsp;L, <i>l&nbsp;m</i> shall recover its natural dimensions, <i>q&nbsp;r</i> be
-reduced to its state of greatest contraction, <i>w&nbsp;x</i> brought to
-its natural dimension, the distance 2&nbsp;3 enlarged to the utmost,
-and the points 7, 8 shall have recovered their natural
-distance; and by thus recovering themselves they shall
-agitate the air to as great a length beyond them, as it was
-moved beyond the chord, when it first came into the situation
-I&nbsp;ϰ&nbsp;L. When the chord is returned back again into
-its rectilinear situation, <i>l&nbsp;m</i> shall be in its utmost dilatation,
-<i>q&nbsp;r</i> restored again to its natural distance, <i>w&nbsp;x</i> reduced into
-its state of greatest contraction, 2&nbsp;3 shall recover its natural
-dimension, and 7&nbsp;8 be in its state of greatest dilatation.
-By which means the air shall be moved as far beyond the points
-7, 8, as it was moved beyond the chord, when it before made
-its return back to its rectilinear situation; for the particles
-7, 8 have been changed from their state of rest and their
-natural distance into a state of contraction, and then have
-proceeded to the recovery of their natural distance, and after
-that to a dilatation of it, in the same manner as the
-particles contiguous to the chord were agitated before. In<span class="pagenum"><a name="Page_280" id="Page_280">[280]</a></span>
-the last place, when the chord is returned into the situation
-I&nbsp;K&nbsp;L, the particles of air from <i>l</i> to δ shall acquire their present
-rangement, and the motion of the air be extended as
-much farther. And the like will happen after every compleat
-vibration of the string.</p>
-
-<p>13. <span class="smcap gesperrt">Concerning</span> this motion of sound, our author
-shews how to compute the velocity thereof, or in what time
-it will reach to any proposed distance from the sonorous
-body. For this he requires to know the height of air, having
-the same density with the parts here at the surface of
-the earth, which we breath, that would be equivalent in
-weight to the whole incumbent atmosphere. This is to
-be found by the barometer, or common weatherglass. In
-that instrument quicksilver is included in a hollow glass
-cane firmly closed at the top. The bottom is open, but
-immerged into quicksilver contained in a vessel open to the
-air. Care is taken when the lower end of the cane is immerged,
-that the whole cane be full of quicksilver, and that no air
-insinuate itself. When the instrument is thus fixed, the quicksilver
-in the cane being higher than that in the vessel, if
-the top of the cane were open, the fluid would soon sink
-out of the glass cane, till it came to a level with that in
-the vessel. But the top of the cane being closed up, so
-that the air, which has free liberty to press on the quicksilver
-in the vessel, cannot bear at all on that, which is within
-the cane, the quicksilver in the cane will be suspended
-to such a height, as to balance the pressure of the air on
-the quicksilver in the vessel. Here it is evident, that the<span class="pagenum"><a name="Page_281" id="Page_281">[281]</a></span>
-weight of the quicksilver in the glass cane is equivalent to
-the pressure of so much of the air, as is perpendicularly over
-the hollow of the cane; for if the cane be opened that the
-air may enter, there will be no farther use of the quicksilver
-to sustain the pressure of the air without; for the quicksilver
-in the cane, as has already been observed, will then subside
-to a level with that without. Hence therefore if the proportion
-between the density of quicksilver and of the air we
-breath be known, we may know what height of such air would
-form a column equal in weight to the column of quicksilver
-within the glass cane. When the quicksilver is sustained
-in the barometer at the height of 30 inches, the height
-of such a column of air will be about 29725 feet; for in
-this case the air has about 1/870 of the density of water, and
-the density of quicksilver exceeds that of water about
-13⅔ times, so that the density of quicksilver exceeds that
-of the air about 11890 times; and so many times 30 inches
-make 29725 feet. Now Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> determines,
-that while a pendulum of the length of this column
-should make one vibration or swing, the space, which any
-sound will have moved, shall bear to this length the same
-proportion, as the circumference of a circle bears to the diameter
-thereof; that is, about the proportion of 355 to
-113<a name="FNanchor_267_267" id="FNanchor_267_267"></a><a href="#Footnote_267_267" class="fnanchor">[267]</a>. Only our author here considers singly the gradual
-progress of sound in the air from particle to particle in the
-manner we have explained, without taking into consideration
-the magnitude of those particles. And though there
-requires time for the motion to be propagated from one particle<span class="pagenum"><a name="Page_282" id="Page_282">[282]</a></span>
-to another, yet it is communicated to the whole of
-the same particle in an instant: therefore whatever proportion
-the thickness of these particles bears to their distance
-from each other, in the same proportion will the motion
-of sound be swifter. Again the air we breath is not simply
-composed of the elastic part, by which sound is conveyed,
-but partly of vapours, which are of a different nature;
-and in the computation of the motion of sound we
-ought to find the height of a column of this pure air only,
-whose weight should be equal to the weight of the quicksilver
-in the cane of the barometer, and this pure air being a
-part only of that we breath, the column of this pure air will
-be higher than 29725 feet. On both these accounts the
-motion of sound is found to be about 1142 feet in one second
-of time, or near 13 miles in a minute, whereas by the
-computation proposed above, it should move but 979 feet
-in one second.</p>
-
-<p><a name="c282" id="c282">14.</a> <span class="smcap gesperrt">We</span> may observe here, that from these demonstrations
-of our author it follows, that all sounds whether acute
-or grave move equally swift, and that sound is swiftest,
-when the quicksilver stands highest in the barometer.</p>
-
-<p>15. <span class="smcap gesperrt">Thus</span> much of the appearances, which are caused in
-these fluids from their gravitation toward the earth. They
-also gravitate toward the moon; for in the last chapter it
-has been proved, that the gravitation between the earth and
-moon is mutual, and that this gravitation of the whole bodies
-arises from that power acting in all their parts; so that<span class="pagenum"><a name="Page_283" id="Page_283">[283]</a></span>
-every particle of the moon gravitates toward the earth,
-and every particle of the earth toward the moon. But
-this gravitation of these fluids toward the moon produces
-no sensible effect, except only in the sea, where it causes
-the tides.</p>
-
-<p><a name="c283" id="c283">16.</a> <span class="smcap gesperrt">That</span> the tides depend upon the influence of the
-moon has been the receiv’d opinion of all antiquity; nor is
-there indeed the least shadow of reason to suppose otherwise,
-considering how steadily they accompany the moon’s course.
-Though how the moon caused them, and by what principle
-it was enabled to produce so distinguish’d an appearance,
-was a secret left for this philosophy to unfold: which teaches,
-that the moon is not here alone concerned, but that the
-sun likewise has a considerable share in their production;
-though they have been generally ascribed to the other luminary,
-because its effect is greatest, and by that means
-the tides more immediately suit themselves to its motion;
-the sun discovering its influence more by enlarging or restraining
-the moon’s power, than by any distinct effects.
-Our author finds the power of the moon to bear to the
-power of the sun about the proportion of 4½ to 1. This
-he deduces from the observations made at the mouth of
-the river Avon, three miles from Bristol, by Captain <span class="smcap">Sturmey</span>,
-and at Plymouth by Mr. <span class="smcap">Colepresse</span>, of the height
-to which the water is raised in the conjunction and opposition
-of the luminaries, compared with the elevation of it,
-when the moon is in either quarter; the first being caused<span class="pagenum"><a name="Page_284" id="Page_284">[284]</a></span>
-by the united actions of the sun and moon, and the other
-by the difference of them, as shall hereafter be shewn.</p>
-
-<p>17. <span class="smcap gesperrt">That</span> the sun should have a like effect on the sea,
-as the moon, is very manifest; since the sun likewise attracts
-every single particle, of which this earth is composed. And
-in both luminaries since the power of gravity is reciprocally
-in the duplicate proportion of the distance, they will not
-draw all the parts of the waters in the same manner; but
-must act upon the nearest parts stronger, than upon the remotest,
-producing by this inequality an irregular motion.
-We shall now attempt to shew how the actions of the sun
-and moon on the waters, by being combined together, produce
-all the appearances observed in the tides.</p>
-
-<p>18. <span class="smcap gesperrt">To</span> begin therefore, the reader will remember what
-has been said above, that if the moon without the sun would
-have described an orbit concentrical to the earth, the action
-of the sun would make the orbit oval, and bring the moon
-nearer to the earth at the new and full, than at the quarters<a name="FNanchor_268_268" id="FNanchor_268_268"></a><a href="#Footnote_268_268" class="fnanchor">[268]</a>.
-Now our excellent author observes, that if instead of one moon,
-we suppose a ring of moons, contiguous and occupying the
-whole orbit of the moon, his demonstration would still take
-place, and prove that the parts of this ring in passing from the
-quarter to the conjunction or opposition would be accelerated,
-and be retarded again in passing from the conjunction or opposition
-to the next quarter. And as this effect does not depend<span class="pagenum"><a name="Page_285" id="Page_285">[285]</a></span>
-on the magnitude of the bodies, whereof the ring is
-composed, the same would hold, though the magnitude of
-these moons were so far to be diminished, and their number
-increased, till they should form a fluid<a name="FNanchor_269_269" id="FNanchor_269_269"></a><a href="#Footnote_269_269" class="fnanchor">[269]</a>. Now the
-earth turns round continually upon its own center, causing
-thereby the alternate change of day and night, while
-by this revolution each part of the earth is successively
-brought toward the sun, and carried off again in the space
-of 24 hours. And as the sea revolves round along with the
-earth itself in this diurnal motion, it will represent in some
-sort such a fluid ring.</p>
-
-<p>19. <span class="smcap gesperrt">But</span> as the water of the sea does not move round
-with so much swiftness, as would carry it about the center
-of the earth in the circle it now describes, without being
-supported by the body of the earth; it will be necessary to
-consider the water under three distinct cases. The first case
-shall suppose the water to move with the degree of swiftness,
-required to carry a body round the center of the earth disingaged
-from it in a circle at the distance of the earth’s
-semidiameter, like another moon. The second case is, that
-the waters make but one turn about the axis of the earth
-in the space of a month, keeping pace with the moon;
-so that all parts of the water should preserve continually
-the same situation in respect of the moon. The third
-case shall be the real one of the waters moving with a velocity
-between these two, neither so swift as the first case
-requires, nor so slow as the second.</p>
-
-<p><span class="pagenum"><a name="Page_286" id="Page_286">[286]</a></span></p>
-
-<p>20. <span class="smcap gesperrt">In</span> the first case the waters, like the body which
-they equalled in velocity, by the action of the moon would
-be brought nearer the center under and opposite to the moon,
-than in the parts in the middle between these eastward or
-westward. That such a body would so alter its distance by
-the moon’s action upon it, is clear from what has been
-mentioned of the like changes in the moon’s motion caused
-by the sun<a name="FNanchor_270_270" id="FNanchor_270_270"></a><a href="#Footnote_270_270" class="fnanchor">[270]</a>. And computation shews, that the difference
-between the greatest and least distance of such a body
-would not be much above 4½ feet. But in the second
-case, where all the parts of the water preserve the same situation
-continually in respect of the moon, the weight of those
-parts under and opposite to the moon will be diminished
-by the moon’s action, and the parts in the middle between
-these will have their weight increased: this being effected
-just in the same manner, as the sun diminishes the attraction
-of the moon towards the earth in the conjunction and
-opposition, but increases that attraction in the quarters.
-For as the first of these consequences from the sun’s action
-on the moon is occasioned by the moon’s being attracted
-by the sun in the conjunction more than the earth,
-and in the opposition less than it, and therefore in the
-common motion of the earth and moon, the moon is
-made to advance toward the sun in one case too fast, and
-in the other is left as it were behind; so the earth will
-not have its middle parts drawn towards the moon so strongly
-as the nearer parts, and yet more forcibly than the remotest:
-and therefore since the earth and moon move each<span class="pagenum"><a name="Page_287" id="Page_287">[287]</a></span>
-month round their common center of gravity<a name="FNanchor_271_271" id="FNanchor_271_271"></a><a href="#Footnote_271_271" class="fnanchor">[271]</a>, while
-the earth moves round this center, the same effect will be
-produced, on the parts of the water nearest to that center
-or to the moon, as the moon feels from the sun when
-in conjunction, and the water on the contrary side of the
-earth will be affected by the moon, as the moon is by the
-sun, when in opposition<a name="FNanchor_272_272" id="FNanchor_272_272"></a><a href="#Footnote_272_272" class="fnanchor">[272]</a>; that is, in both cases the weight
-of the water, or its propensity towards the center of the
-earth, will be diminished. The parts in the middle between
-these will have their weight increased, by being pressed
-towards the center of the earth through the obliquity of
-the moon’s action upon them to its action upon the earth’s
-center, just as the sun increases the gravitation of the moon
-in the quarters from the same cause<a name="FNanchor_273_273" id="FNanchor_273_273"></a><a href="#Footnote_273_273" class="fnanchor">[273]</a>. But now it is manifest,
-that where the weight of the same quantity of water
-is least, there it will be accumulated; while the parts, which
-have the greatest weight, will subside. Therefore in this
-case there would be no tide or alternate rising and falling
-of the water, but the water would form it self into an
-oblong figure, whose axis prolonged would pass through
-the moon. By Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em>’s computation the
-excess of this axis above the diameters perpendicular to it,
-that is, the height of the waters under and opposite to the
-moon above their height in the middle between these places
-eastward or westward caused by the moon, is about
-8⅔ feet.</p>
-
-<p><span class="pagenum"><a name="Page_288" id="Page_288">[288]</a></span></p>
-
-<p>21. <span class="smcap gesperrt">Thus</span> the difference of height in this latter supposition
-is little short of twice that difference in the preceding.
-But the case of the sea is a middle between these
-two: for a body, which should revolve round the center
-of the earth at the distance of a semidiameter without pressing
-on the earth’s surface, must perform its period in less than
-an hour and half, whereas the earth turns round but once
-in a day; and in the case of the waters keeping pace with
-the moon it should turn round but once in a month: so
-that the real motion of the water is between the motions required
-in these two cases. Again, if the waters moved round
-as swiftly as the first case required, their weight would be
-wholly taken off by their motion; for this case supposes
-the body to move so, as to be kept revolving in a circle
-round the earth by the power of gravity without pressing
-on the earth at all, so that its motion just supports its weight.
-But if the power of gravity had been only 1/289 part of
-what it is, the body could have moved thus without pressing
-on the earth, and have been as long in moving round,
-as the earth it self is. Consequently the motion of the
-earth takes off from the weight of the water in the middle
-between the poles, where its motion is swiftest, 1/289 part
-of its weight and no more.  Since therefore in the first
-case the weight of the waters must be intirely taken off by
-their motion, and by the real motion of the earth they lose
-only 1/289 part thereof, the motion of the water will so little
-diminish their weight, that their figure will much nearer resemble
-the case of their keeping pace with the moon than the
-other. Upon the whole, if the waters moved with the<span class="pagenum"><a name="Page_289" id="Page_289">[289]</a></span>
-velocity necessary to carry a body round the center of the
-earth at the distance of the earth’s semidiameter without
-bearing on its surface, the water would be lowest under
-the moon, and rise gradually as it moved on with the earth
-eastward, till it came half way toward the place opposite
-to the moon; from thence it would subside again, till it
-came to the opposition, where it would become as low as
-at first; afterwards it would rise again, till it came half
-way to the place under the moon; and from hence it
-would subside, till it came a second time under the moon.
-But in case the water kept pace with the moon, it
-would be highest where in the other case it is lowest,
-and lowest where in the other it is highest; therefore the
-diurnal motion of the earth being between the motions of
-these two cases, it will cause the highest place of the water to
-fall between the places of the greatest height in these two
-cases. The water as it passes from under the moon shall
-for some time rise, but descend again before it arrives half
-way to the opposite place, and shall come to its least
-height before it becomes opposite to the moon; then it shall
-rise again, continuing so to do till it has passed the place
-opposite to the moon, but subside before it comes to the
-middle between the places opposite to and under the moon;
-and lastly it shall come to its lowest, before it comes a second
-time under the moon. If A (in fig. 112, 113, 114.)
-represent the moon, B the center of the earth, the oval C&nbsp;D&nbsp;E&nbsp;F
-in fig. 112. will represent the situation of the water in the
-first case; but if the water kept pace with the moon,
-the line C&nbsp;D&nbsp;E&nbsp;F in fig. 113. would represent the situation<span class="pagenum"><a name="Page_290" id="Page_290">[290]</a></span>
-of the water; but the line C&nbsp;D&nbsp;E&nbsp;F in fig. 114. will represent
-the same in the real motion of the water, as it
-accompanies the earth in its diurnal rotation: in all these
-figures C and E being the places where the water is lowest,
-and D and F the places where it is highest. Pursuant
-to this determination it is found, that on the shores,
-which lie exposed to the open sea, the high water usually
-falls out about three hours after the moon has passed the
-meridian of each place.</p>
-
-<p>22. <span class="smcap gesperrt">Let</span> this suffice in general for explaining the manner,
-in which the moon acts upon the seas. It is farther
-to be noted, that these effects are greatest, when the moon
-is over the earth’s equator<a name="FNanchor_274_274" id="FNanchor_274_274"></a><a href="#Footnote_274_274" class="fnanchor">[274]</a>, that is, when it shines perpendicularly
-upon the parts of the earth in the middle between
-the poles. For if the moon were placed over either of the
-poles, it could have no effect upon the water to make it ascend
-and descend. So that when the moon declines from the equator
-toward either pole, it’s action must be something
-diminished, and that the more, the farther it declines. The
-tides likewise will be greatest, when the moon is
-nearest to the earth, it’s action being then the strongest.</p>
-
-<p>23. <span class="smcap gesperrt">Thus</span> much of the action of the moon. That
-the sun should produce the very same effects, though in
-a less degree, is too obvious to require a particular explanation:
-but as was remarked before, this action of the<span class="pagenum"><a name="Page_291" id="Page_291">[291]</a></span>
-sun being weaker than that of the moon, will cause the
-tides to follow more nearly the moon’s course, and principally
-shew it self by heightening or diminishing the effects
-of the other luminary. Which is the occasion, that
-the highest tides are found about the conjunction and opposition
-of the luminaries, being then produced by their united
-action, and the weakest tides about the quarters of
-the moon; because the moon in this case raising the water
-where the sun depresses it, and depressing it where the
-sun raises it, the stronger action of the moon is in part
-retunded and weakened by that of the sun. Our author
-computes that the sun will add near two feet to the height
-of the water in the first case, and in the other take from
-it as much. However the tides in both comply with the
-same hour of the moon.  But at other times, between
-the conjunction or opposition and quarters, the time deviates
-from that forementioned, towards the hour in which
-the sun would make high water, though still it keeps much
-nearer to the moon’s hour than to the sun’s.</p>
-
-<p>24. <span class="smcap gesperrt">Again</span> the tides have some farther varieties from
-the situation of the places where they happen northward
-or southward. Let <i>p</i>&nbsp;P (in fig. 115.) represent the axis, on
-which the earth daily revolves, let <i>h</i>&nbsp;<i>p</i>&nbsp;H&nbsp;P represent the
-figure of the water, and let <i>n</i>&nbsp;B&nbsp;N&nbsp;D be a globe inscribed
-within this figure. Suppose the moon to be advanced
-from the equator toward the north pole, so that <i>h</i>&nbsp;H the
-axis of the figure of the water <i>p</i>&nbsp;A&nbsp;H&nbsp;P&nbsp;E&nbsp;<i>h</i> shall decline
-towards the north pole N; take any place G nearer to<span class="pagenum"><a name="Page_292" id="Page_292">[292]</a></span>
-the north pole than to the south, and from the center
-of the earth C draw C&nbsp;G&nbsp;F; then will G&nbsp;F denote the altitude
-to which the water is raised by the tide, when the moon is
-above the horizon: in the space of twelve hours, the earth
-having turned half round its axis, the place G will be removed
-to <i>g</i>; but the axis <i>h</i>&nbsp;H will have kept its place preserving its
-situation in respect of the moon, at least will have moved no
-more than the moon has done in that time, which it is not
-necessary here to take into consideration. Now in this case
-the height of the water will be equal to <i>g</i>&nbsp;<i>f</i>, which is
-not so great as G&nbsp;F. But whereas G&nbsp;F is the altitude at
-high water, when the moon is above the horizon, <i>g</i>&nbsp;<i>f</i> will
-be the altitude of the same, when the moon is under the
-horizon. The contrary happens toward the south pole, for
-K&nbsp;L is less than <i>k</i>&nbsp;<i>l</i>. Hence is proved, that when the moon
-declines from the equator, in those places, which are on
-the same side of the equator as the moon, the tides are
-greater, when the moon is above the horizon, than when
-under it; and the contrary happens on the other side of
-the equator.</p>
-
-<p>25. <span class="smcap gesperrt">Now</span> from these principles may be explained all
-the known appearances in the tides; only by the assistance
-of this additional remark, that the fluctuating motion,
-which the water has in flowing and ebbing, is of a
-durable nature, and would continue for some time, though
-the action of the luminaries should cease; for this prevents
-the difference between the tide when the moon is above<span class="pagenum"><a name="Page_293" id="Page_293">[293]</a></span>
-the horizon, and the tide when the moon is below it from
-being so great, as the rule laid down requires. This likewise
-makes the greatest tides not exactly upon the new and full
-moon, but to be a tide or two after; as at Bristol and Plymouth
-they are found the third after.</p>
-
-<p>26. <span class="smcap gesperrt">This</span> doctrine farther shews us, why not only the
-spring tides fall out about the new and full moon, and the
-neap tides about the quarters; but likewise how it comes
-to pass, that the greatest spring tides happen about the equinoxes;
-because the luminaries are then one of them over the
-equator, and the other not far from it. It appears too, why
-the neap tides, which accompany these, are the least of all,
-for the sun still continuing over the equator continues to have
-the greatest power of lessening the moon’s action, and the
-moon in the quarters being far removed toward one of the
-poles, has its power thereby weakned.</p>
-
-<p>27. <span class="smcap gesperrt">Moreover</span> the action of the moon being stronger,
-when near the earth, than when more remote; if the moon,
-when new suppose, be at its nearest distance from the earth,
-it shall when at the full be farthest off; whence it is, that
-two of the very largest spring tides do never immediately
-succeed each other.</p>
-
-<p>28. <span class="smcap gesperrt">Because</span> the sun in its passage from the winter
-solstice to the summer recedes from the earth, and passing
-from the summer solstice to the winter approaches it, and
-is therefore nearer the earth before the vernal equinox than<span class="pagenum"><a name="Page_294" id="Page_294">[294]</a></span>
-after, but nearer after the autumnal equinox than before;
-the greatest tides oftner precede the vernal equinox than
-follow it, and in the autumnal equinox on the contrary
-they oftner follow it than come before it.</p>
-
-<p>29. <span class="smcap gesperrt">The</span> altitude, to which the water is raised in the
-open ocean, corresponds very well to the forementioned calculations;
-for as it was shewn, that the water in spring tides
-should rise to the height of 10 or 11 feet, and the neap
-tides to 6 or 7; accordingly in the Pacific, Atlantic and
-Ethiopic oceans in the parts without the tropics, the
-water is observed to rise about 6, 9, 12 or 15 feet.  In the
-Pacific ocean this elevation is said to be greater than in the
-other, as it ought to be by reason of the wide extent of
-that sea. For the same reason in the Ethiopic ocean between
-the tropics the ascent of the water is less than without,
-by reason of the narrowness of the sea between the
-coasts of Africa and the southern parts of America.
-And islands in such narrow seas, if far from shore, have
-less tides than the coasts. But now in those ports where
-the water flows in with great violence upon fords and shoals,
-the force it acquires by that means will carry it to a much
-greater height, so as to make it ascend and descend to 30,
-40 or even 50 feet and more; instances of which we have
-at Plymouth, and in the Severn near Chepstow; at
-St. Michael’s and Auranches in Normandy; at Cambay and
-Pegu in the East Indies.</p>
-
-<p>30. <span class="smcap gesperrt">Again</span> the tides take a considerable time in passing
-through long straits, and shallow places. Thus the tide,<span class="pagenum"><a name="Page_295" id="Page_295">[295]</a></span>
-which is made on the west coast of Ireland and on the
-coast of Spain at the third hour after the moon’s coming
-to the meridian, in the ports eastward toward the British
-channel falls out later, and as the flood passes up that channel
-still later and later, so that the tide takes up full twelve
-hours in coming up to London bridge.</p>
-
-<p>31. <span class="smcap gesperrt">In</span> the last place tides may come to the same port
-from different seas, and as they may interfere with each
-other, they will produce particular effects.  Suppose the
-tide from one sea come to a port at the third hour after
-the moon’s passing the meridian of the place, but from
-another sea to take up six hours more in its passage.  Here
-one tide will make high water, when by the other it should
-be lowest; so that when the moon is over the equator, and
-the two tides are equal, there will be no rising and falling
-of the water at all; for as much as the water is carried off
-by one tide, it will be supplied by the other. But when the
-moon declines from the equator, the same way as the port
-is situated, we have shewn that of the two tides of the
-ocean, which are made each day, that tide, which is made
-when the moon is above the horizon, is greater than the
-other. Therefore in this case, as four tides come to this
-port each day the two greatest will come on the third, and
-on the ninth hour after the moon’s passing the meridian,
-and the two least at the fifteenth and at the twenty first
-hour. Thus from the third to the ninth hour more water
-will be in this port by the two greatest tides than from
-the ninth to the fifteenth, or from the twenty first to the<span class="pagenum"><a name="Page_296" id="Page_296">[296]</a></span>
-following third hour, where the water is brought by one
-great and one small tide; but yet there will be more
-water brought by these tides, than what will be found between
-the two least tides, that is, between the fifteenth and
-twenty first hour. Therefore in the middle between the
-third and ninth hour, or about the moon’s setting, the water
-will be at its greatest height; in the middle between the
-ninth and fifteenth, as also between the twenty first and
-following third hour it will have its mean height; and be
-lowest in the middle between the fifteenth and twenty first
-hour, that is, at the moon’s rising. Thus here the water
-will have but one flood and one ebb each day. When the
-moon is on the other side of the equator, the flood will be
-turned into ebb, and the ebb into flood; the high water falling
-out at the rising of the moon, and the low water at
-the setting. Now this is the case of the port of Batsham
-in the kingdom of Tunquin in the East Indies; to which
-port there are two inlets, one between the continent and the
-islands which are called the Manillas, and the other between
-the continent and Borneo.</p>
-
-<p><a name="c296" id="c296">32.</a> <span class="smcap gesperrt">The</span> next thing to be considered is the effect, which
-these fluids of the planets have upon the solid part of the
-bodies to which they belong. And in the first place I
-shall shew, that it was necessary upon account of these fluid
-parts to form the bodies of the planets into a figure something
-different from that of a perfect globe. Because the
-diurnal rotation, which our earth performs about its axis,
-and the like motion we see in some of the other planets,<span class="pagenum"><a name="Page_297" id="Page_297">[297]</a></span>
-(which is an ample conviction that they all do the like) will
-diminish the force, with which bodies are attracted upon
-all the parts of their surfaces, except at the very poles,
-upon which they turn. Thus a stone or other weighty
-substance resting upon the surface of the earth, by the
-force which it receives from the motion communicated to
-it by the earth, if its weight prevented not, would continue
-that motion in a straight line from the point where
-it received it, and according to the direction, in which it
-was given, that is, in a line which touches the surface at
-that point; insomuch that it would move off from the
-earth in the same manner, as a weight fasten’d to a string
-and whirled about endeavours continually to recede from
-the center of motion, and would forthwith remove it self
-to a greater distance from it, if loosed from the string which
-retains it. And farther, as the centrifugal force, with which
-such a weight presses from the center of its motion, is
-greater, by how much greater the velocity is, with which
-it moves; so such a body, as I have been supposing to lie
-on the earth, would recede from it with the greater force,
-the greater the velocity is, with which the part of the
-earth’s surface it rests upon is moved, that is, the farther
-distant it is from the poles. But now the power of gravity
-is great enough to prevent bodies in any part of the earth
-from being carried off from it by this means; however it is
-plain that bodies having an effort contrary to that of gravity,
-though much weaker than it, their weight, that is, the degree
-of force, with which they are pressed to the earth,
-will be diminished thereby, and be the more diminished,<span class="pagenum"><a name="Page_298" id="Page_298">[298]</a></span>
-the greater this contrary effort is; or in other words, the
-same body will weigh heavier at either of the poles, than
-upon any other part of the earth; and if any body be
-removed from the pole towards the equator, it will lose
-of its weight more and more, and be lightest of all at
-the equator, that is, in the middle between the poles.</p>
-
-<p>33. <span class="smcap gesperrt">This</span> now is easily applied to the waters of the seas,
-and shews that the water under the poles will press more forcibly
-to the earth, than at or near the equator: and consequently
-that which presses least, must give place, till by ascending
-it makes room for receiving a greater quantity, which by
-its additional weight may place the whole upon a ballance.
-To illustrate this more particularly I shall make use of fig. 116
-In which let A&nbsp;C&nbsp;B&nbsp;D be a circle, by whose revolution about
-the diameter A&nbsp;B a globe should be formed, representing a
-globe of solid earth. Suppose this globe covered on all sides
-with water to the same height, suppose that of E&nbsp;A or B&nbsp;F,
-at which distance the circle E&nbsp;G&nbsp;F&nbsp;H surrounds the circle
-A&nbsp;C&nbsp;B&nbsp;D; then it is evident, if the globe of earth be at rest,
-the water which surrounds it will rest in that situation.
-But if the globe be turned incessantly about its axis A&nbsp;B,
-and the water have likewise the same motion, it is also
-evident, from what has been explained, that the water between
-the circles E&nbsp;H&nbsp;F&nbsp;G and A&nbsp;D&nbsp;B&nbsp;C will remain no longer
-in the present situation, the parts of it between H and D, and
-between G and C being by this rotation become lighter, than
-the parts between E and A and between B and F; so that the
-water over the poles A and B must of necessity subside, and the<span class="pagenum"><a name="Page_299" id="Page_299">[299]</a></span>
-water be accumulated over D and C, till the greater quantity
-in these latter places supply the defect of its weight.
-This would be the case, were the globe all covered with
-water. And the same figure of the surface would also be
-preserved, if some part of the water adjoining to the globe
-in any part of it were turned into solid earth, as is too
-evident to need any proof; because the parts of the water
-remaining at rest, it is the same thing, whether they continue
-in the state of being easily separable, which denominates
-them fluid, or were to be consolidated together, so
-as to make a hard body: and this, though the water should
-in some places be thus consolidated, even to the surface of it.
-Which shews that the form of the solid part of the earth makes
-no alteration in the figure the water will take: and by
-consequence in order to the preventing some parts of the
-earth from being entirely overflowed, and other parts
-quite deserted, the solid parts of the earth must have given
-them much the same figure, as if the whole earth were
-covered on all sides with water.</p>
-
-<p>34. <span class="smcap gesperrt">Farther</span>, I say, this figure of the earth is the
-same, as it would receive, were it entirely a globe of water,
-provided that water were of the same density as the substance
-of the globe. For suppose the globe A&nbsp;C&nbsp;B&nbsp;D to be
-liquified, and that the globe E&nbsp;H&nbsp;F&nbsp;G, now entirely water,
-by its rotation about its axis should receive such a figure
-as we have been describing, and then the globe A&nbsp;C&nbsp;B&nbsp;D
-should be consolidated again, the figure of the water
-would plainly not be altered, by such a consolidation.</p>
-
-<p><span class="pagenum"><a name="Page_300" id="Page_300">[300]</a></span></p>
-
-<p>35. <span class="smcap gesperrt">But</span> from this last observation our author is enabled
-to determine the proportion between the axis of the
-earth drawn from pole to pole, and the diameter of the equator,
-upon the supposition that all the parts of the earth are
-of equal density; which he does by computing in the first
-place the proportion of the centrifugal force of the parts under
-the equator to the power of gravity; and then by considering
-the earth as a spheroid, made by the revolution
-of an ellipsis about its lesser axis, that is, supposing the
-line M&nbsp;I&nbsp;L&nbsp;K to be an exact ellipsis, from which it can differ
-but little, by reason that the difference between the
-lesser axis M&nbsp;L and the greater I&nbsp;K is but very small. From
-this supposition, and what was proved before, that all the
-particles which compose the earth have the attracting power
-explained in the preceding chapter, he finds at what distance
-the parts under the equator ought to be removed from
-the center, that the force, with which they shall be attracted
-to the center, diminished by their centrifugal force, shall
-be sufficient to keep those parts in a ballance with those which
-lie under the poles. And upon the supposition of all the
-parts of the earth having the same degree of density, the
-earth’s surface at the equator must be above 17 miles more
-distant from the center, than at the poles<a name="FNanchor_275_275" id="FNanchor_275_275"></a><a href="#Footnote_275_275" class="fnanchor">[275]</a>.</p>
-
-<p><a name="c300" id="c300">36.</a> <span class="smcap gesperrt">After</span> this it is shewn, from the proportion of the
-equatorial diameter of the earth to its axis, how the same
-may be determined of any other planet, whose density in<span class="pagenum"><a name="Page_301" id="Page_301">[301]</a></span>
-comparison of the density of the earth, and the time of its
-revolution about its axis, are known. And by the rule delivered
-for this, it is found, that the diameter of the equator
-in Jupiter should bear to its axis about the proportion
-of 10 to 9<a name="FNanchor_276_276" id="FNanchor_276_276"></a><a href="#Footnote_276_276" class="fnanchor">[276]</a>, and accordingly this planet appears of an oval
-form to the astronomers.  The most considerable effects
-of this spheroidical figure our author takes likewise
-into consideration; one of which is that bodies are not equally
-heavy in all distances from the poles; but near the equator,
-where the distance from the center is greatest, they are
-lighter than towards the poles: and nearly in this proportion,
-that the actual power, by which they are drawn to the center,
-resulting from the difference between their absolute gravity
-and centrifugal force, is reciprocally as the distance from
-the center.  That this may not appear to contradict what
-has before been said of the alteration of the power of gravity,
-in proportion to the change of the distance from the center,
-it is proper carefully to remark, that our author has
-demonstrated three things relating hereto: the first is, that
-decrease of the power of gravity as we recede from the
-center, which has been fully explained in the last chapter,
-upon supposition that the earth and planets are perfect
-spheres, from which their difference is by many degrees too
-little to require notice for the purposes there intended: the
-next is, that whether they be perfect spheres, or exactly such
-spheroids as have now been mentioned, the power of gravity,
-as we descend in the same line to the center, is at all
-distances as the distance from the center, the parts of the<span class="pagenum"><a name="Page_302" id="Page_302">[302]</a></span>
-earth above the body by drawing the body towards them
-lessening its gravitation towards the center<a name="FNanchor_277_277" id="FNanchor_277_277"></a><a href="#Footnote_277_277" class="fnanchor">[277]</a>; and both
-these assertions relate to gravity alone: the third is what
-we mentioned in this place, that the actual force on different
-parts of the surface, with which bodies are drawn to the
-center, is in the proportion here assigned<a name="FNanchor_278_278" id="FNanchor_278_278"></a><a href="#Footnote_278_278" class="fnanchor">[278]</a>.</p>
-
-<p><a name="c302" id="c302">38.</a> <span class="smcap gesperrt">The</span> next effect of this figure of the earth is an
-obvious consequence of the former: that pendulums of
-the same length do not in different distances from the pole
-make their vibrations in the same time; but towards the poles,
-where the gravity is strongest, they move quicker than near
-the equator, where they are less impelled to the center; and
-accordingly pendulums, that measure the same time by their
-vibrations, must be shorter near the poles than at a greater
-distance. Both which deductions are found true in fact; of
-which our author has recounted particularly several experiments,
-in which it was found, that clocks exactly adjusted to
-the true measure of time at Paris, when transported nearer to
-the equator, became erroneous and moved too slow, but were
-reduced to their true motion by contracting their pendulums.
-Our author is particular in remarking, how much they lost of
-their motion, while the pendulums remained unaltered; and
-what length the observers are said to have shortened them, to
-bring them to time. And the experiments, which appear
-to be most carefully made, shew the earth to be raised in
-the middle between the poles, as much as our author found
-it by his computation<a name="FNanchor_279_279" id="FNanchor_279_279"></a><a href="#Footnote_279_279" class="fnanchor">[279]</a>.</p>
-
-<p><span class="pagenum"><a name="Page_303" id="Page_303">[303]</a></span></p>
-
-<p>39. <span class="smcap gesperrt">These</span> experiments on the pendulum our author
-has been very exact in examining, inquiring particularly
-how much the extension of the rod of the pendulum by
-the great heats in the torrid zone might make it necessary
-to shorten it. For by an experiment made by <span class="smcap">Picart</span>, and
-another made by <span class="smcap">De la Hire</span>, heat, though not very intense,
-was found to increase the length of rods of iron. The experiment
-of <span class="smcap">Picart</span> was made with a rod one foot long,
-which in winter, at the time of frost, was found to increase
-in length by being heated at the fire. In the experiment
-of <span class="smcap">De la Hire</span> a rod of six foot in length was found,
-when heated by the summer sun only, to grow to a greater
-length, than it had in the aforesaid cold season. From which
-observations a doubt has been raised, whether the rod of the
-pendulums in the aforementioned experiments was not
-extended by the heat of those warm climates to all that
-excess of length, the observers found themselves obliged
-to lessen them by. But the experiments now mentioned
-shew the contrary. For in the first of them the rod of a
-foot long was lengthened no more than 1/9 part of what the
-pendulum under the equator must be diminished; and therefore
-a rod of the length of the pendulum would not have been
-extended above ⅓ of that length. In the experiment
-of <span class="smcap">De la Hire</span>, where the heat was less, the rod of six foot
-long was extended no more than 3/10 of what the pendulum
-must be shortened; so that a rod of the length of the pendulum
-would not have gained above 3/20 or 1/7 of that length.
-And the heat in this latter experiment, though less than in the
-former, was yet greater than the rod of a pendulum can ordinarily<span class="pagenum"><a name="Page_304" id="Page_304">[304]</a></span>
-contract in the hottest country; for metals receive a
-great heat when exposed to the open sun, certainly much
-greater than that of a human body. But pendulums are not
-usually so exposed, and without doubt in these experiments
-were kept cool enough to appear so to the touch; which they
-would do in the hottest place, if lodged in the shade. Our
-author therefore thinks it enough to allow about 1/10 of the
-difference observed upon account of the greater warmth of
-the pendulum.</p>
-
-<p><a name="c304" id="c304">40.</a> <span class="smcap gesperrt">There</span> is a third effect, which the water has on the
-earth by changing its figure, that is taken notice of by
-our author; for the explaining of which we shall first prove,
-that bodies descend perpendicularly to the surface of the
-earth in all places. The manner of collecting this from observation,
-is as follows. The surfaces of all fluids rest parallel
-to that part of the surface of the sea, which is in the same
-place with them, to the figure of which, as has been particularly
-shewn, the figure of the whole earth is formed. For
-if any hollow vessel, open at the bottom, be immersed into
-the sea; it is evident, that the surface of the sea within the
-vessel will retain the same figure it had, before the vessel
-inclosed it; since its communication with the external water
-is not cut off by the vessel. But all the parts of the water
-being at rest, it is as clear, that if the bottom of the vessel
-were closed, the figure of the water could receive no change
-thereby, even though the vessel were raised out of the
-sea; any more than from the insensible alteration of the
-power of gravity, consequent upon the augmentation of<span class="pagenum"><a name="Page_305" id="Page_305">[305]</a></span>
-the distance from the center. But now it is clear, that bodies
-descend in lines perpendicular to the surfaces of quiescent fluids;
-for if the power of gravity did not act perpendicularly
-to the surface of fluids, bodies which swim on them
-could not rest, as they are seen to do; because, if the power
-of gravity drew such bodies in a direction oblique to the
-surface whereon they lay, they would certainly be put in
-motion, and be carried to the side of the vessel, in which
-the fluid was contained, that way the action of gravity inclined.</p>
-
-<p>41. <span class="smcap gesperrt">Hence</span> it follows, that as we stand, our bodies are
-perpendicular to the surface of the earth. Therefore in
-going from north to south our bodies do not keep in a
-parallel direction. Now in all distances from the pole the
-same length gone on the earth will not make the same
-change in the position of our bodies, but the nearer we
-are to the poles, we must go greater length to cause the
-same variation herein. Let M&nbsp;I&nbsp;L&nbsp;K (in fig. 117) represent
-the figure of the earth, M, L the poles, I, K two opposite
-points in the middle between these poles. Let T&nbsp;V
-and P&nbsp;O be two arches, T&nbsp;V being most remote from the pole
-L; draw T&nbsp;W, V&nbsp;X, P&nbsp;Q, O&nbsp;R, each perpendicular to the
-surface of the earth, and let T&nbsp;W, V&nbsp;X meet in Y, and
-P&nbsp;Q, O&nbsp;R in S. Here it is evident, that in passing from V to
-T the position of a man’s body would be changed by the
-angle under T&nbsp;Y&nbsp;V, for at V he would stand in the line Y&nbsp;V
-continued upward, and at T in the line Y&nbsp;T; but in passing
-from O to P the position of his body would be changed by<span class="pagenum"><a name="Page_306" id="Page_306">[306]</a></span>
-the angle under O&nbsp;S&nbsp;P. Now I say, if these two angles are
-equal the arch O&nbsp;P is longer than T&nbsp;V: for the figure M&nbsp;I&nbsp;L&nbsp;K
-being oblong, and I&nbsp;K longer than M&nbsp;L, the figure will be
-more incurvated toward I than toward L; so that the lines
-T&nbsp;W and V&nbsp;X will meet in Y before they are drawn out to
-so great a length as the lines P&nbsp;Q and O&nbsp;R must be continued
-to, before they will meet in S. Since therefore Y&nbsp;T and
-Y&nbsp;V are shorter than P&nbsp;S and S&nbsp;V, T&nbsp;V must be less than O&nbsp;P.
-If these angles under T&nbsp;Y&nbsp;V and O&nbsp;S&nbsp;P are each 1/90 part of
-the angle made by a perpendicular line, they are said each
-to contain one degree.  And the unequal length of these
-arches O&nbsp;P and V&nbsp;T gives occasion to the assertion, that in
-passing from north to south the degrees on the earth’s surface
-are not of an equal length, but those near the pole
-longer than those toward the equator. For the length of
-the arch on the earth lying between the two perpendiculars,
-which make an angle of a degree with each other, is
-called the length of a degree on the earth’s surface.</p>
-
-<p>42. <span class="smcap gesperrt">This</span> figure of the earth has some effect on eclipses.
-It has been observed above, that sometimes the nodes of the
-moon’s orbit lie in a straight line drawn from the sun to
-the earth; in which case the moon will cross the plane of
-the earth’s motion at the new and full. But whenever the
-moon passes near the plane at the full, some part of the
-earth will intercept the sun’s light, and the moon shining
-only with light borrow’d from the sun, when that light is
-prevented from falling on any part of the moon, so much
-of her body will be darkened. Also when the moon at the<span class="pagenum"><a name="Page_307" id="Page_307">[307]</a></span>
-new is near the plane of the earth’s motion, the inhabitants
-on some part of the earth will see the moon come under
-the sun, and the sun thereby be covered from them either
-wholly or in part. Now the figure, which we have shewn
-to belong to the earth, will occasion the shadow of the
-earth on the moon not to be perfectly round, but cause the
-diameter from east to west to be somewhat longer than the
-diameter from north to south. In eclipse of the sun this
-figure of the earth will make some little difference in the
-place, where the sun shall appear wholly or in any given
-part covered. Let A&nbsp;B&nbsp;C&nbsp;D (in fig. 118.) represent the earth,
-A&nbsp;C the axis whereon it turns daily, E the center. Let F&nbsp;A&nbsp;G&nbsp;C
-represent a perfect globe inscribed within the earth. Let H&nbsp;I
-be a line drawn through the centers of the sun and moon, crossing
-the surface of the earth in K, and the surface of the
-globe inscribed in L. Draw E&nbsp;L, which will be perpendicular
-to the surface of the globe in L: and draw likewise K&nbsp;M,
-so that it shall be perpendicular to the surface of the earth
-in K. Now whereas the eclipse would appear central at L,
-if the earth were the globe A&nbsp;G&nbsp;C&nbsp;F, and does really appear
-so at K; I say, the latitude of the place K on the real earth
-is different from the latitude of the place L on the globe
-F&nbsp;A&nbsp;G&nbsp;C. What is called the latitude of any place is determined
-by the angle which the line perpendicular to the surface of
-the earth at that place makes with the axis; the difference
-between this angle, and that made by a perpendicular line or
-square being called the latitude of each place. But it might
-here be proved, that the angle which K&nbsp;M makes with M&nbsp;C
-is less, than the angle made between L&nbsp;E and E&nbsp;C: consequently<span class="pagenum"><a name="Page_308" id="Page_308">[308]</a></span>
-the latitude of the place K is greater, than the latitude,
-which the place L would have.</p>
-
-<p>43. <span class="smcap gesperrt">The</span> next effect, which follows from this figure of
-the earth, is that gradual change in the distance of the fixed
-stars from the equinoctial points, which astronomers observe.
-But before this can be explained, it is necessary to
-say something more particular, than has yet been done,
-concerning the manner of the earth’s motion round the sun.</p>
-
-<p>44. <span class="smcap gesperrt">It</span> has already been said, that the earth turns round
-each day on its own axis, while its whole body is carried
-round the sun once in a year. How these two motions
-are joined together may be conceived in some degree by
-the motion of a bowl on the ground, where the bowl in
-rouling on continually turns upon its axis, and at the same
-time the whole body thereof is carried straight on. But
-to be more express let A (in fig. 119) represent the sun
-B&nbsp;C&nbsp;D&nbsp;E four different situations of the earth in its orbit
-moving about the sun. In all these let F&nbsp;G represent the
-axis, about which the earth daily turns. The points F, G
-are called the poles of the earth; and this axis is supposed
-to keep always parallel to it self in every situation of
-the earth; at least that it would do so, were it not for a
-minute deviation, the cause whereof will be explained in
-what follows. When the earth is in B, the half H&nbsp;I&nbsp;K will
-be illuminated by the sun, and the other half H&nbsp;L&nbsp;K will
-be in darkness. Now if on the globe any point be taken<span class="pagenum"><a name="Page_309" id="Page_309">[309]</a></span>
-in the middle between the poles, this point shall describe
-by the motion of the globe the circle M&nbsp;N, half of which
-is in the enlightened part of the globe, and half in the
-dark part. But the earth is supposed to move round its axis
-with an equable motion; therefore on this point of the
-globe the sun will be seen just half the day, and be invisible
-the other half. And the same will happen to every
-point of this circle, in all situations of the earth during its
-whole revolution round the sun. This circle M&nbsp;N is called
-the equator, of which we have before made mention.</p>
-
-<p>45. <span class="smcap gesperrt">Now</span> suppose any other point taken on the surface
-of the globe toward the pole F, which in the diurnal revolution
-of the globe shall describe the circle O&nbsp;P. Here
-it appears that more than half this circle is enlightned by
-the sun, and consequently that in any particular point of
-this circle the sun will be longer seen than lie hid, that is
-the day will be longer than the night. Again if we consider
-the same circle O&nbsp;P on the globe situated in D the opposite
-part of the orbit from B, we shall see, that here in
-any place of this circle the night will be as much longer
-than the day.</p>
-
-<p>46. <span class="smcap gesperrt">In</span> these situations of the globe of earth a line
-drawn from the sun to the center of the earth will be
-obliquely inclined toward the axis F&nbsp;G. Now suppose, that
-such a line drawn from the sun to the center of the earth,
-when in C or E, would be perpendicular to the axis F&nbsp;G;<span class="pagenum"><a name="Page_310" id="Page_310">[310]</a></span>
-in which cases the sun will shine perpendicularly upon the
-equator, and consequently the line drawn from the center
-of the earth to the sun will cross the equator, as it passes
-through the surface of the earth; whereas in all other situations
-of the globe this line will pass through the surface
-of the globe at a distance from the equator either northward
-or southward. Now in both these cases half the circle
-O&nbsp;P will be in the light, and half in the dark; and therefore
-to every place in this circle the day will be equal
-to the night. Thus it appears, that in these two opposite
-situations of the earth the day is equal to the night in all
-parts of the globe; but in all other situations this equality
-will only be found in places situated in the very middle
-between the poles, that is, on the equator.</p>
-
-<p>47. <span class="smcap gesperrt">The</span> times, wherein this universal equality between
-the day and night happens, are called the equinoxes. Now
-it has been long observed by astronomers, that after the
-earth hath set out from either equinox, suppose from E
-(which will be the spring equinox, if F be the north pole)
-the same equinox shall again return a little before the earth
-has made a compleat revolution round the sun. This return
-of the equinox preceding the intire revolution of the
-earth is called the precession of the equinox, and is caused
-by the protuberant figure of the earth.</p>
-
-<p>49. <span class="smcap gesperrt">Since</span> the sun shines perpendicularly upon the equator,
-when the line drawn from the sun to the center
-of the earth is perpendicular to the earth’s axis, in this case<span class="pagenum"><a name="Page_311" id="Page_311">[311]</a></span>
-the plane, which should cut through the earth at the equator,
-may be extended to pass through the sun; but it
-will not do so in any other position of the earth. Now
-let us consider the prominent part of the earth about the
-equator, as a solid ring moving with the earth round the
-sun. At the time of the equinoxes, this ring will have
-the same kind of situation in respect of the sun, as the
-orbit of the moon has, when the line of the nodes is directed
-to the sun; and at all other times will resemble the
-moon’s orbit in other situations. Consequently this ring,
-which otherwise would keep throughout its motion parallel
-to it self, will receive some change in its position from
-the action of the sun upon it, except only at the time of
-the equinox. The manner of this change may be understood
-as follows. Let A&nbsp;B&nbsp;C&nbsp;D (in fig. 120) represent this ring,
-E the center of the earth, S the sun, A&nbsp;F&nbsp;C&nbsp;G a circle described
-in the plane of the earth’s motion to the center E.
-Here A and C are the two points, in which the earth’s equator
-crosses the plane of the earth’s motion; and the time
-of the equinox falls out, when the straight line A&nbsp;C continued
-would pass through the sun. Now let us recollect
-what was said above concerning the moon, when her orbit
-was in the same situation with this ring. From thence
-it will be understood, if a body were supposed to be moving
-in any part of this circle A&nbsp;B&nbsp;C&nbsp;D, what effect the action
-of the sun on the body would have toward changing
-the position of the line A&nbsp;C. In particular H&nbsp;I being drawn
-perpendicular to S&nbsp;E, if the body be in any part of this
-circle between A and H, or between C and I, the line A&nbsp;C<span class="pagenum"><a name="Page_312" id="Page_312">[312]</a></span>
-would be so turned, that the point A shall move toward B,
-and the point C toward D; but if it were in any other part
-of the circle, either between H and C, or between I and A,
-the line A&nbsp;C would be turned the contrary way. Hence
-it follows, that as this solid ring turns round the center
-of the earth, the parts of this ring between A and H, and
-between C and I, are so influenced by the sun, that they
-will endeavour, so to change the situation of the line A&nbsp;C
-as to cause the point A to move toward B, and the point
-C to move toward D; but all the parts of the ring between
-H and C, and between I and A, will have the opposite
-tendency, and dispose the line A&nbsp;C to move the contrary
-way. And since these last named parts are larger than
-the other, they will prevail over the other, so that by the
-action of the sun upon this ring, the line A&nbsp;C will be so
-turned, that A shall continually be more and more moving
-toward D, and C toward B. Thus no sooner shall the
-sun in its visible motion have departed from A, but the motion
-of the line A&nbsp;C shall hasten its meeting with C, and
-from thence the motion of this line shall again hasten the
-sun’s second conjunction with A; for as this line so turns,
-that A is continually moving toward D, so the sun’s visible
-motion is the same way as from S toward T.</p>
-
-<p>49. <span class="smcap gesperrt">The</span> moon will have on this ring the like effect as
-the sun, and operate on it more strongly, in the same proportion
-as its force on the sea exceeded that of the sun on the
-same. But the effect of the action of both luminaries will
-be greatly diminished by reason of this ring’s being connected<span class="pagenum"><a name="Page_313" id="Page_313">[313]</a></span>
-to the rest of the earth; for by this means the sun and
-moon have not only this ring to move, but likewise the
-whole globe of the earth, upon whose spherical part they have
-no immediate influence. Beside the effect is also rendred
-less, by reason that the prominent part of the earth is not
-collected all under the equator, but spreads gradually from
-thence toward both poles. Upon the whole, though the
-sun alone carries the nodes of the moon through an intire
-revolution in about 19 years, the united force of both luminaries
-on the prominent parts of the earth will hardly
-carry round the equinox in a less space of time than 26000
-years.</p>
-
-<p><a name="c313a" id="c313a">50.</a> <span class="smcap gesperrt">To</span> this motion of the equinox we must add another
-consequence of this action of the sun and moon upon
-the elevated parts of the earth, that this annular part of the
-earth about the equator, and consequently the earth’s axis,
-will twice a year and twice a month change its inclination
-to the plane of the earth’s motion, and be again restored,
-just as the inclination of the moon’s orbit by the action of
-the sun is annually twice diminished, and as often recovers its
-original magnitude. But this change is very insensible.</p>
-
-<p><a name="c313b" id="c313b">51.</a> <span class="smcap gesperrt">I shall</span> now finish the present chapter with our great
-author’s inquiry into the figure of the secondary planets, particularly
-of our moon, upon the figure of which its fluid
-parts will have an influence. The moon turns always the
-same side towards the earth, and consequently revolves
-but once round its axis in the space of an entire month;<span class="pagenum"><a name="Page_314" id="Page_314">[314]</a></span>
-for a spectator placed without the circle, in which the moon
-moves, would in that time observe all the parts of the moon
-successively to pass once before his view and no more, that
-is, that the whole globe of the moon has turned once round.
-Now the great slowness of this motion will render the centrifugal
-force of the parts of the waters very weak, so that
-the figure of the moon cannot, as in the earth, be much affected
-by this revolution upon its axis: but the figure of those
-waters are made different from spherical by another cause,
-viz. the action of the earth upon them; by which they will
-be reduced to an oblong oval form, whose axis prolonged
-would pass through the earth; for the same reason, as we
-have above observed, that the waters of the earth would
-take the like figure, if they had moved so slowly, as to keep
-pace with the moon. And the solid part of the moon must
-correspond with this figure of the fluid part: but this elevation
-of the parts of the moon is nothing near so great as
-is the protuberance of the earth at the equator, for it will not
-exceed 93 english feet.</p>
-
-<p>52. The waters of the moon will have no tide, except
-what will arise from the motion of the moon round the
-earth. For the conversion of the moon about her axis is equable,
-whereby the inequality in the motion round the
-earth discovers to us at some times small parts of the moon’s
-surface towards the east or west, which at other times lie
-hid; and as the axis, whereon the moon turns, is oblique to
-her motion round the earth, sometimes small parts of her<span class="pagenum"><a name="Page_315" id="Page_315">[315]</a></span>
-surface toward the north, and sometimes the like toward
-the south are visible, which at other times are out of sight.
-These appearances make what is called the libration of the
-moon, discovered by <span class="smcap">Hevelius</span>.  But now as the axis of
-the oval figure of the waters will he pointed towards the
-earth, there must arise from hence some fluctuation in them;
-and beside, by the change of the moon’s distance from the
-earth, they will not always have the very same height.</p>
-
-<div class="figcenter">
-     <img src="images/ill-381.jpg" width="300" height="184"
-         alt=""
-         title="" />
-</div>
-
-</div>
-
-<p><span class="pagenum"><a name="Page_316" id="Page_316">[316]</a></span></p>
-
-<div class="chapter">
-
-<div class="figcenter">
-     <img src="images/ill-382.jpg" width="400" height="208"
-         alt=""
-         title="" />
-</div>
-
-<p class="pc xlarge"><em class="gesperrt">BOOK III</em>.</p>
-
-<hr class="d3" />
-
-<h2><a name="c316" id="c316"><span class="smcap"><em class="gesperrt">Chap</em> I.</span></a><br />
-Concerning the cause of COLOURS inherent in the LIGHT.</h2>
-
-<div>
-  <img class="dcap1" src="images/da1.jpg" width="80" height="81" alt=""/>
-</div>
-<p class="cap13">AFTER this view which has been taken
-of Sir <span class="smcap">Isaac Newton’s</span> mathematical
-principles of philosophy, and the
-use he has made of them, in explaining
-the system of the world, &amp;c. the
-course of my design directs us to turn
-our eyes to that other philosophical
-work, his treatise of Optics, in which we shall find our great
-author’s inimitable genius discovering it self no less, than in<span class="pagenum"><a name="Page_317" id="Page_317">[317]</a></span>
-the former; nay perhaps even more, since this work gives
-as many instances of his singular force of reasoning, and
-of his unbounded invention, though unassisted in great
-measure by those rules and general precepts, which facilitate
-the invention of mathematical theorems. Nor yet is
-this work inferior to the other in usefulness; for as that
-has made known to us one great principle in nature, by
-which the celestial motions are continued, and by which
-the frame of each globe is preserved; so does this point out
-to us another principle no less universal, upon which depends
-all those operations in the smaller parts of matter,
-for whose sake the greater frame of the universe is erected;
-all those immense globes, with which the whole heavens are
-filled, being without doubt only design’d as so many convenient
-apartments for carrying on the more noble operations
-of nature in vegetation and animal life. Which single
-consideration gives abundant proof of the excellency of
-our author’s choice, in applying himself carefully to examine
-the action between light and bodies, so necessary
-in all the varieties of these productions, that none of them
-can be successfully promoted without the concurrence of
-heat in a greater or less degree.</p>
-
-<p>2. <span class="smcap gesperrt">’Tis</span> true, our author has not made so full a discovery
-of the principle, by which this mutual action between light
-and bodies is caused; as he has in relation to the power, by
-which the planets are kept in their courses: yet he has led
-us to the very entrance upon it, and pointed out the path
-so plainly which must be followed to reach it; that one may<span class="pagenum"><a name="Page_318" id="Page_318">[318]</a></span>
-be bold to say, whenever mankind shall be blessed with this
-improvement of their knowledge, it will be derived so directly
-from the principles laid down by our author in this
-book, that the greatest share of the praise due to the discovery
-will belong to him.</p>
-
-<p><a name="c318" id="c318">3.</a> <span class="smcap gesperrt">In</span> speaking of the progress our author has made,
-I shall distinctly pursue three things, the two first relating
-to the colours of natural bodies: for in the first head shall
-be shewn, how those colours are derived from the properties
-of the light itself; and in the second upon what
-properties of the bodies they depend: but the third head
-of my discourse shall treat of the action of bodies upon
-light in refracting, reflecting, and inflecting it.</p>
-
-<p>4. <span class="smcap gesperrt">The</span> first of these, which shall be the business of
-the present chapter, is contained in this one proposition: that
-the sun’s direct light is not uniform in respect of colour, not
-being disposed in every part of it to excite the idea of whiteness,
-which the whole raises; but on the contrary is a composition
-of different kinds of rays, one sort of which if alone
-would give the sense of red, another of orange, a
-third of yellow, a fourth of green, a fifth of light blue,
-a sixth of indigo, and a seventh of a violet purple; that
-all these rays together by the mixture of their sensations
-impress upon the organ of sight the sense of whiteness,
-though each ray always imprints there its own colour; and
-all the difference between the colours of bodies when viewed
-in open day light arises from this, that coloured bodies<span class="pagenum"><a name="Page_319" id="Page_319">[319]</a></span>
-do not reflect all the sorts of rays falling upon them in equal
-plenty, but some sorts much more copiously than others;
-the body appearing of that colour, of which the
-light coming from it is most composed.</p>
-
-<p><a name="c319" id="c319">5.</a> <span class="smcap gesperrt">That</span> the light of the sun is compounded, as has been
-said, is proved by refracting it with a prism. By a prism I here
-mean a glass or other body of a triangular form, such as is represented
-in fig. 121. But before we proceed to the illustration
-of the proposition we have just now laid down, it will be necessary
-to spend a few words in explaining what is meant by
-the refraction of light; as the design of our present labour is
-to give some notion of the subject, we are engaged in, to
-such as are not versed in the mathematics.</p>
-
-<p>6. <span class="smcap gesperrt">It</span> is well known, that when a ray of light passing
-through the air falls obliquely upon the surface of any transparent
-body, suppose water or glass, and enters it, the ray
-will not pass on in that body in the same line it described
-through the air, but be turned off from the surface, so
-as to be less inclined to it after passing it, than before. Let
-A&nbsp;B&nbsp;C&nbsp;D (in fig. 122.) represent a portion of water, or glass,
-A&nbsp;B the surface of it, upon which the ray of light E&nbsp;F falls
-obliquely; this ray shall not go right on in the course delineated
-by the line F&nbsp;G, but be turned off from the surface
-A&nbsp;B into the line F&nbsp;H, less inclined to the surface A&nbsp;B
-than the line E&nbsp;F is, in which the ray is incident upon that
-surface.</p>
-
-<p><span class="pagenum"><a name="Page_320" id="Page_320">[320]</a></span></p>
-
-<p>7. <span class="smcap gesperrt">On</span> the other hand, when the light passes out of any
-such body into the air, it is inflected the contrary way,
-being after its emergence rendred more oblique to the surface
-it passes through, than before. Thus the ray F&nbsp;H, when
-it goes out of the surface C&nbsp;D, will be turned up towards
-that surface, going out into the air in the line H&nbsp;I.</p>
-
-<p>8. <span class="smcap gesperrt">This</span> turning of the light out of its way, as it passes
-from one transparent body into another is called its refraction.
-Both these cases may be tried by an easy experiment with
-a bason and water. For the first case set an empty bason
-in the sunshine or near a candle, making a mark upon
-the bottom at the extremity of the shadow cast by the brim
-of the bason, then by pouring water into the bason you
-will observe the shadow to shrink, and leave the bottom
-of the bason enlightned to a good distance from the mark.
-Let A&nbsp;B&nbsp;C (in fig. 123.) denote the empty bason, E&nbsp;A&nbsp;D the
-light shining over the brim of it, so that all the part A&nbsp;B&nbsp;D
-be shaded. Then a mark being made at D, if water be
-poured into the bason (as in fig. 124.) to F&nbsp;G, you shall observe
-the light, which before went on to D, now to come
-much short of the mark D, falling on the bottom in the
-point H, and leaving the mark D a good way within the
-enlightened part; which shews that the ray E&nbsp;A, when it
-enters the water at I, goes no longer straight forwards, but
-is at that place incurvated, and made to go nearer the
-perpendicular.  The other case may be tryed by putting
-any small body into an empty bason, placed lower than your
-eye, and then receding from the bason, till you can but just<span class="pagenum"><a name="Page_321" id="Page_321">[321]</a></span>
-see the body over the brim. After which, if the bason be
-filled with water, you shall presently observe the body to be
-visible, though you go farther off from the bason. Let
-A&nbsp;B&nbsp;C (in fig. 125.) denote the bason as before, D the body
-in it, E the place of your eye, when the body is seen just
-over the edge A, while the bason is empty. If it be then
-filled with water, you will observe the body still to be visible,
-though you take your eye farther off. Suppose you see
-the body in this case just over the brim A, when your eye
-is at F, it is plain that the rays of light, which come from
-the body to your eye have not come straight on, but are
-bent at A, being turned downwards, and more inclined to
-the surface of the water, between A and your eye at F,
-than they are between A and the body D.</p>
-
-<p>9. <span class="smcap gesperrt">This</span> we hope is sufficient to make all our readers
-apprehend, what the writers of optics mean, when they
-mention the refraction of the light, or speak of the rays of
-light being refracted. We shall therefore now go on to prove
-the assertion advanced in the forementioned proposition, in
-relation to the different kinds of colours, that the direct light
-of the sun exhibits to our sense: which may be done in
-the following manner.</p>
-
-<p>10. <span class="smcap gesperrt">If</span> a room be darkened, and the sun permitted to
-shine into it through a small hole in the window shutter, and
-be made immediately to fall upon a glass prism, the beam of
-light shall in passing through such a prism be parted into rays,
-which exhibit all the forementioned colours. In this manner<span class="pagenum"><a name="Page_322" id="Page_322">[322]</a></span>
-if A&nbsp;B (in fig. 126) represent the window shutter; C the
-hole in it; D&nbsp;E&nbsp;F the prism; Z&nbsp;Y a beam of light coming
-from the sun, which passes through the hole, and falls upon
-the prism at Y, and if the prism were removed would
-go on to X, but in entring the surface B&nbsp;F of the glass it
-shall be turned off, as has been explained, into the course Y&nbsp;W
-falling upon the second surface of the prism D&nbsp;F in W,
-going out of which into the air it shall be again farther inflected.
-Let the light now, after it has passed the prism, be
-received upon a sheet of paper held at a proper distance,
-and it shall paint upon the paper the picture, image, or spectrum
-L&nbsp;M of an oblong figure, whose length shall much exceed
-its breadth; though the figure shall not be oval, the
-ends L and M being semicircular and the sides straight.
-But now this figure will be variegated with colours in this
-manner. From the extremity M to some length, suppose
-to the line <i>n&nbsp;o</i>, it shall be of an intense red; from <i>n&nbsp;o</i> to
-<i>p&nbsp;q</i> it shall be an orange; from <i>p&nbsp;q</i> to <i>r&nbsp;s</i> it shall be yellow;
-from thence to <i>t&nbsp;u</i> it shall be green; from thence to
-<i>w&nbsp;x</i> blue; from thence to <i>y&nbsp;z</i> indigo; and from thence
-to the end violet.</p>
-
-<p>11. <span class="smcap gesperrt">Thus</span> it appears that the sun’s white light by its passage
-through the prism, is so changed as now to be divided
-into rays, which exhibit all these several colours. The
-question is, whether the rays while in the sun’s beam before
-this refraction possessed these properties distinctly; so
-that some part of that beam would without the rest have
-given a red colour, and another part alone have given an..orange, &amp;c. That this is possible to be the case, appears from
-hence; that if a convex glass be placed between the paper
-and the prism, which may collect all the rays proceeding
-out of the prism into its focus, as a burning glass does the
-sun’s direct rays; and if that focus fall upon the paper, the
-spot formed by such a glass upon the paper shall appear
-white, just like the sun’s direct light.</p>
-
-<div class="figcenter">
-     <img src="images/ill-389.jpg" width="400" height="513"
-         alt=""
-         title="" />
-</div>
-
-<p><span class="pagenum"><a name="Page_323" id="Page_323">[323]</a></span></p>
-
-<p>The rest remaining
-as before, let P&nbsp;Q. (in fig. 127.) be the convex glass, causing
-the rays to meet upon the paper H&nbsp;G&nbsp;I&nbsp;K in the point
-N, I say that point or rather spot of light shall appear white,
-without the least tincture of any colour.  But it is evident
-that into this spot are now gathered all those rays, which before
-when separate gave all those different colours; which
-shews that whiteness may be made by mixing those colours:
-especially if we consider, it can be proved that the glass
-P&nbsp;Q does not alter the colour of the rays which pass
-through it. Which is done thus: if the paper be made
-to approach the glass P&nbsp;Q, the colours will manifest themselves
-as far as the magnitude of the spectrum, which the
-paper receives, will permit. Suppose it in the situation <i>h&nbsp;g&nbsp;i&nbsp;k</i>,
-and that it then receive the spectrum <i>l&nbsp;m</i>, this spectrum
-shall be much smaller, than if the glass P&nbsp;Q were removed,
-and therefore the colours cannot be so much separated; but
-yet the extremity <i>m</i> shall manifestly appear red, and
-the other extremity <i>l</i> shall be blue; and these colours as
-well as the intermediate ones shall discover themselves more
-perfectly, the farther the paper is removed from N, that
-is, the larger the spectrum is: the same thing happens, if
-the paper be removed farther off from P&nbsp;Q than N. Suppose<span class="pagenum"><a name="Page_324" id="Page_324">[324]</a></span>
-into the position θ&nbsp;γ&nbsp;η&nbsp;ϰ, the spectrum λ&nbsp;μ painted upon it
-shall again discover its colours, and that more distinctly, the
-farther the paper is removed, but only in an inverted order:
-for as before, when the paper was nearer the convex
-glass, than at N, the upper part of the image was
-blue, and the under red; now the upper part shall be red,
-and the under blue: because the rays cross at N.</p>
-
-<p>12. <span class="smcap gesperrt">Nay</span> farther that the whiteness at the focus N, is made
-by the union of the colours may be proved without removing
-the paper out of the focus, by intercepting with
-any opake body part of the light near the glass; for if the
-under part, that is the red, or more properly the red-making
-rays, as they are styled by our author, are intercepted, the
-spot shall take a bluish hue; and if more of the inferior
-rays are cut off, so that neither the red-making nor orange-making
-rays, and if you please the yellow-making rays likewise,
-shall fall upon the spot; then shall the spot incline more
-and more to the remaining colours. In like manner if you
-cut off the upper part of the rays, that is the violet coloured
-or indigo-making rays, the spot shall turn reddish, and become,
-more so, the more of those opposite colours are intercepted.</p>
-
-<p>13. <span class="smcap gesperrt">This</span> I think abundantly proves that whiteness may
-be produced by a mixture of all the colours of the spectrum.
-At least there is but one way of evading the present
-arguments, which is, by asserting that the rays of light
-after passing the prism have no different properties to exhibit
-this or the other colour, but are in that respect perfectly<span class="pagenum"><a name="Page_325" id="Page_325">[325]</a></span>
-homogeneal, so that the rays which pass to the under
-and red part of the image do not differ in any properties
-whatever from those, which go to the upper and
-violet part of it; but that the colours of the spectrum are
-produced only by some new modifications of the rays, made
-at their incidence upon the paper by the different terminations
-of light and shadow: if indeed this assertion can
-be allowed any place, after what has been said; for it seems
-to be sufficiently obviated by the latter part of the preceding
-experiment, that by intercepting the inferior part
-of the light, which comes from the prism, the white spot
-shall receive a bluish cast, and by stopping the upper part the
-spot shall turn red, and in both cases recover its colour, when
-the intercepted light is permitted to pass again; though
-in all these trials there is the like termination of light and
-shadow. However our author has contrived some experiments
-expresly to shew the absurdity of this supposition;
-all which he has explained and enlarged upon in so distinct
-and expressive a manner, that it would be wholly unnecessary
-to repeat them in this place<a name="FNanchor_280_280" id="FNanchor_280_280"></a><a href="#Footnote_280_280" class="fnanchor">[280]</a>. I shall only mention
-that of them, which may be tried in the experiment
-before us. If you draw upon the paper H&nbsp;G&nbsp;I&nbsp;K, and through
-the spot N, the straight line <i>w&nbsp;x</i> parallel to the horizon,
-and then if the paper be much inclined into the situation
-<i>r&nbsp;s&nbsp;v&nbsp;t</i> the line <i>w&nbsp;x</i> still remaining parallel to the horizon,
-the spot N shall lose its whiteness and receive a blue tincture;
-but if it be inclined as much the contrary way, the
-same spot shall exchange its white colour for a reddish dye.<span class="pagenum"><a name="Page_326" id="Page_326">[326]</a></span>
-All which can never be accounted for by any difference in
-the termination of the light and shadow, which here is
-none at all; but are easily explained by supposing the upper
-part of the rays, whenever they enter the eye, disposed
-to give the sensation of the dark colours blue, indigo and
-violet; and that the under part is fitted to produce the
-bright colours yellow, orange and red: for when the paper
-is in the situation <i>r&nbsp;s&nbsp;t&nbsp;u</i>, it is plain that the upper part of
-the light falls more directly upon it, than the under part,
-and therefore those rays will be most plentifully reflected
-from it; and by their abounding in the reflected light will
-cause it to incline to their colour. Just so when the paper
-is inclined the contrary way, it will receive the inferior rays
-most directly, and therefore ting the light it reflects with their
-colour.</p>
-
-<p>14. <span class="smcap gesperrt">It</span> is now to be proved that these dispositions of the
-rays of light to produce some one colour and some another,
-which manifest themselves after their being refracted, are not
-wrought by any action of the prism upon them, but are
-originally inherent in those rays; and that the prism only
-affords each species an occasion of shewing its distinct quality
-by separating them one from another, which before,
-while they were blended together in the direct beam of the
-sun’s light, lay conceal’d. But that this is so, will be proved,
-if it can be shewn that no prism has any power upon
-the rays, which after their passage through one prism are
-rendered uncompounded and contain in them but one colour,
-either to divide that colour into several, as the sun’s<span class="pagenum"><a name="Page_327" id="Page_327">[327]</a></span>
-light is divided, or so much as to change it into any other
-colour. This will be proved by the following experiment<a name="FNanchor_281_281" id="FNanchor_281_281"></a><a href="#Footnote_281_281" class="fnanchor">[281]</a>.
-The same thing remaining, as in the first experiment, let
-another prism N&nbsp;O (in fig. 128.) be placed either immediately,
-or at some distance after the first, in a perpendicular
-posture, so that it shall refract the rays issuing from the
-first sideways. Now if this prism could divide the light
-falling upon it into coloured rays, as the first has done, it
-would divide the spectrum breadthwise into colours, as
-before it was divided lengthwise; but no such thing is observed.
-If L&nbsp;M were the spectrum, which the first prism
-D&nbsp;E&nbsp;F would paint upon the paper H&nbsp;G&nbsp;I&nbsp;K; P&nbsp;Q lying in
-an oblique posture shall be the spectrum projected by the
-second, and shall be divided lengthwise into colours corresponding
-to the colours of the spectrum L&nbsp;M, and occasioned
-like them by the refraction of the first prism, but
-its breadth shall receive no such division; on the contrary
-each colour shall be uniform from side to side, as much
-as in the spectrum L&nbsp;M, which proves the whole assertion.</p>
-
-<p>15. <span class="smcap gesperrt">The</span> same is yet much farther confirmed by another
-experiment. Our author teaches that the colours of
-the spectrum L&nbsp;M in the first experiment are yet compounded,
-though not so much as in the sun’s direct light. He
-shews therefore how, by placing the prism at a distance from
-the hole, and by the use of a convex glass, to separate the
-colours of the spectrum, and make them uncompounded
-to any degree of exactness<a name="FNanchor_282_282" id="FNanchor_282_282"></a><a href="#Footnote_282_282" class="fnanchor">[282]</a>. And he shews when this<span class="pagenum"><a name="Page_328" id="Page_328">[328]</a></span>
-is done sufficiently, if you make a small hole in the paper
-whereon the spectrum is received, through which any one sort
-of rays may pass, and then let that coloured ray fall so upon a
-prism, as to be refracted by it, it shall in no case whatever
-change its colour; but shall always retain it perfectly as at
-first, however it be refracted<a name="FNanchor_283_283" id="FNanchor_283_283"></a><a href="#Footnote_283_283" class="fnanchor">[283]</a>.</p>
-
-<p>16. <span class="smcap gesperrt">Nor</span> yet will these colours after this full separation
-of them suffer any change by reflection from bodies of different
-colours; on the other hand they make all bodies placed
-in these colours appear of the colour which falls upon
-them<a name="FNanchor_284_284" id="FNanchor_284_284"></a><a href="#Footnote_284_284" class="fnanchor">[284]</a>: for minium in red light will appear as in open day
-light; but in yellow light will appear yellow; and which
-is more extraordinary, in green light will appear green, in blue,
-blue; and in the violet-purple coloured light will appear of a
-purple colour; in like manner verdigrease, or blue bise, will
-put on the appearance of that colour, in which it is placed;
-so that neither bise placed in the red light shall be able to
-give that light the least blue tincture, or any other different
-from red; nor shall minium in the indigo or violet
-light exhibit the least appearance of red, or any other colour
-distinct from that it is placed in. The only difference
-is, that each of these bodies appears most luminous and bright
-in the colour, which corresponds with that it exhibits in
-the day light, and dimmed in the colours most remote from
-that; that is, though minium and bise placed in blue light
-shall both appear blue, yet the bise shall appear of a bright
-blue, and the minium of a dusky and obscure blue: but<span class="pagenum"><a name="Page_329" id="Page_329">[329]</a></span>
-if minium and bise be compared together in red light, the
-minium shall afford a brisk red, the bise a duller colour,
-though of the same species.</p>
-
-<p><a name="c329" id="c329">17.</a> <span class="smcap gesperrt">And</span> this not only proves the immutability of all
-these simple and uncompounded colours; but likewise unfolds
-the whole mystery, why bodies appear in open day-light
-of such different colours, it consisting in nothing more
-than this, that whereas the white light of the day is composed
-of all sorts of colours, some bodies reflect the rays
-of one sort in greater abundance than the rays of any other<a name="FNanchor_285_285" id="FNanchor_285_285"></a><a href="#Footnote_285_285" class="fnanchor">[285]</a>.
-Though it appears by the fore-cited experiment, that almost
-all these bodies reflect some portion of the rays of every
-colour, and give the sense of particular colours only by the
-predominancy of some sorts of rays above the rest. And what
-has before been explained of composing white by mingling
-all the colours of the spectrum together shews clearly, that
-nothing more is required to make bodies look white, than
-a power to reflect indifferently rays of every colour. But
-this will more fully appear by the following method: if
-near the coloured spectrum in our first experiment a piece
-of white paper be so held, as to be illuminated equally by
-all the parts of that spectrum, it shall appear white; whereas
-if it be held nearer to the red end of the image, than to the
-other, it shall turn reddish; if nearer the blue end, it shall
-seem bluish<a name="FNanchor_286_286" id="FNanchor_286_286"></a><a href="#Footnote_286_286" class="fnanchor">[286]</a>.</p>
-
-<p><span class="pagenum"><a name="Page_330" id="Page_330">[330]</a></span></p>
-
-<p>18. <span class="smcap gesperrt">Our</span> indefatigable and circumspect author farther
-examined his theory by mixing the powders which painters
-use of several colours, in order if possible to produce
-a white powder by such a composition<a name="FNanchor_287_287" id="FNanchor_287_287"></a><a href="#Footnote_287_287" class="fnanchor">[287]</a>.  But in this he
-found some difficulties for the following reasons.  Each
-of these coloured powders reflects but part of the light, which
-is cast upon them; the red powders reflecting little green
-or blue, and the blue powders reflecting very little red or
-yellow, nor the green powders reflecting near so much of
-the red or indigo and purple, as of the other colours: and
-besides, when any of these are examined in homogeneal light,
-as our author calls the colours of the prism, when well separated,
-though each appears more bright and luminous in
-its own day-light colour, than in any other; yet white bodies,
-suppose white paper for instance, in those very colours
-exceed these coloured bodies themselves in brightness; so
-that white bodies reflect not only more of the whole light
-than coloured bodies do in the day-light, but even more
-of that very colour which they reflect most copiously. All
-which considerations make it manifest that a mixture of these
-will not reflect so great a quantity of light, as a white body of
-the same size; and therefore will compose such a colour as
-would result from a mixture of white and black, such as
-are all grey and dun colours, rather than a strong white.
-Now such a colour he compounded of certain ingredients,
-which he particularly sets down, in so much that when the
-composition was strongly illuminated by the sun’s direct
-beams, it would appear much whiter than even white paper,<span class="pagenum"><a name="Page_331" id="Page_331">[331]</a></span>
-if considerably shaded. Nay he found by trials how
-to proportion the degree of illumination of the mixture
-and paper, so that to a spectator at a proper distance it
-could not well be determined which was the more perfect
-colour; as he experienced not only by himself, but by the
-concurrent opinion of a friend, who chanced to visit him
-while he was trying this experiment. I must not here omit
-another method of trying the whiteness of such a mixture,
-proposed in one of our author’s letters on this subject<a name="FNanchor_288_288" id="FNanchor_288_288"></a><a href="#Footnote_288_288" class="fnanchor">[288]</a>:
-which is to enlighten the composition by a beam of
-the sun let into a darkened room, and then to receive the
-light reflected from it upon a piece of white paper, observing
-whether the paper appears white by that reflection;
-for if it does, it gives proof of the composition’s being white;
-because when the paper receives the reflection from any
-coloured body, it looks of that colour. Agreeable to this
-is the trial he made upon water impregnated with soap,
-and agitated into a froth<a name="FNanchor_289_289" id="FNanchor_289_289"></a><a href="#Footnote_289_289" class="fnanchor">[289]</a>: for when this froth after some
-short time exhibited upon the little bubbles, which composed
-it, a great variety of colours, though these colours to a
-spectator at a small distance discover’d themselves distinctly;
-yet when the eye was so far removed, that each little bubble
-could no longer be distinguished, the whole froth by
-the mixture of all these colours appeared intensly white.</p>
-
-<p>19. <span class="smcap gesperrt">Our</span> author having fully satisfied himself by these
-and many other experiments, what the result is of mixing<span class="pagenum"><a name="Page_332" id="Page_332">[332]</a></span>
-together all the prismatic colours; he proceeds in the next
-place to examine, whether this appearance of whiteness be
-raised by the rays of these different kinds acting so, when
-they meet, upon one another, as to cause each of them to
-impress the sense of whiteness upon the optic nerve; or whether
-each ray does not make upon the organ of sight the
-same impression, as when separate and alone; so that the
-idea of whiteness is not excited by the impression from any
-one part of the rays, but results from the mixture of all those
-different sensations. And that the latter sentiment is the
-true one, he evinces by undeniable experiments.</p>
-
-<p>20. <span class="smcap gesperrt">In</span> particular the foregoing experiment<a name="FNanchor_290_290" id="FNanchor_290_290"></a><a href="#Footnote_290_290" class="fnanchor">[290]</a>, wherein
-the convex glass was used, furnishes proofs of this: in that
-when the paper is brought into the situation θ&nbsp;γ&nbsp;η&nbsp;ϰ, beyond, beyond
-N the colours, that at N disappeared, begin to emerge again;
-which shews that by mingling at N they did not lose their
-colorific qualities, though for some reason they lay concealed.
-This farther appears by that part of the experiment,
-when the paper, while in the focus, was directed to be enclined
-different ways; for when the paper was in such a
-situation, that it must of necessity reflect the rays, which
-before their arrival at the point N would have given a blue
-colour, those rays in this very point itself by abounding in
-the reflected light tinged it with the same colour; so when the
-paper reflects most copiously the rays, which before they
-come to the point N exhibit redness, those same rays tincture<span class="pagenum"><a name="Page_333" id="Page_333">[333]</a></span>
-the light reflected by the paper from that very point
-with their own proper colour.</p>
-
-<p>21. <span class="smcap gesperrt">There</span> is a certain condition relating to sight, which
-affords an opportunity of examining this still more fully:
-it is this, that the impressions of light remain some short
-space upon the eye; as when a burning coal is whirl’d about
-in a circle, if the motion be very quick, the eye shall not
-be able to distinguish the coal, but shall see an entire circle
-of fire. The reason of which appearance is, that the impression
-made by the coal upon the eye in any one situation
-is not worn out, before the coal returns again to the same
-place, and renews the sensation. This gives our author the
-hint to try, whether these colours might not be transmitted
-successively to the eye so quick, that no one of the colours
-should be distinctly perceived, but the mixture of the sensations
-should produce a uniform whiteness; when the rays
-could not act upon each other, because they never should
-meet, but come to the eye one after another. And this thought
-he executed by the following expedient<a name="FNanchor_291_291" id="FNanchor_291_291"></a><a href="#Footnote_291_291" class="fnanchor">[291]</a>. He made an instrument
-in shape like a comb, which he applied near the
-convex glass, so that by moving it up and down slowly
-the teeth of it might intercept sometimes one and sometimes
-another colour; and accordingly the light reflected from the
-paper, placed at N, should change colour continually. But
-now when the comb-like instrument was moved very quick,
-the eye lost all preception of the distinct colours, which came
-to it from time to time, a perfect whiteness resulting from the<span class="pagenum"><a name="Page_334" id="Page_334">[334]</a></span>
-mixture of all those distinct impressions in the sensorium.
-Now in this case there can be no suspicion of the several
-coloured rays acting upon one another, and making any
-change in each other’s manner of affecting the eye, seeing
-they do not so much as meet together there.</p>
-
-<p>22. <span class="smcap gesperrt">Our</span> author farther teaches us how to view the spectrum
-of colours produced in the first experiment with another
-prism, so that it shall appear to the eye under the
-shape of a round spot and perfectly white<a name="FNanchor_292_292" id="FNanchor_292_292"></a><a href="#Footnote_292_292" class="fnanchor">[292]</a>. And in this
-case if the comb be used to intercept alternately some of
-the colours, which compose the spectrum, the round spot
-shall change its colour according to the colours intercepted;
-but if the comb be moved too swiftly for those changes to
-be distinctly perceived, the spot shall seem always white, as
-before<a name="FNanchor_293_293" id="FNanchor_293_293"></a><a href="#Footnote_293_293" class="fnanchor">[293]</a>.</p>
-
-<p><a name="c334" id="c334">23.</a> <span class="smcap gesperrt">Besides</span> this whiteness, which results from an universal
-composition of all sorts of colours, our author particularly
-explains the effects of other less compounded mixtures;
-some of which compound other colours like some
-of the simple ones, but others produce colours different from
-any of them. For instance, a mixture of red and yellow
-compound a colour like in appearance to the orange, which
-in the spectrum lies between them; as a composition of yellow
-and blue is made use of in all dyes to make a green.
-But red and violet purple compounded make purples unlike
-to any of the prismatic colours, and these joined with<span class="pagenum"><a name="Page_335" id="Page_335">[335]</a></span>
-yellow or blue make yet new colours. Besides one rule is here
-to be observed, that when many different colours are mixed, the
-colour which arises from the mixture grows languid and degenerates
-into whiteness. So when yellow green and blue
-are mixed together, the compound will be green; but if
-to this you add red and purple, the colour shall first grow dull
-and less vivid, and at length by adding more of these colours
-it shall turn to whiteness, or some other colour<a name="FNanchor_294_294" id="FNanchor_294_294"></a><a href="#Footnote_294_294" class="fnanchor">[294]</a>.</p>
-
-<p>24. <span class="smcap gesperrt">Only</span> here is one thing remarkable of those compounded
-colours, which are like in appearance to the simple
-ones; that the simple ones when viewed through a prism shall
-still retain their colour, but the compounded colours seen
-through such a glass shall be parted into the simple ones of
-which they are the aggregate. And for this reason any body
-illuminated by the simple light shall appear through a prism
-distinctly, and have its minutest parts observable, as may easily
-be tried with flies, or other such little bodies, which have
-very small parts; but the same viewed in this manner when
-enlighten’d with compounded colours shall appear confused,
-their smallest parts not being distinguishable. How the
-prism separates these compounded colours, as likewise how
-it divides the light of the sun into its colours, has not yet
-been explained; but is reserved for our third chapter.</p>
-
-<p>25. <span class="smcap gesperrt">In</span> the mean time what has been said, I hope, will
-suffice to give a taste of our author’s way of arguing, and<span class="pagenum"><a name="Page_336" id="Page_336">[336]</a></span>
-in some measure to illustrate the proposition laid down in
-this chapter.</p>
-
-<p>26. <span class="smcap gesperrt">There</span> are methods of separating the heterogeneous
-rays of the sun’s light by reflection, which perfectly
-conspire with and confirm this reasoning.  One of which
-ways may be this. Let A&nbsp;B (in fig. 129) represent the window
-shutter of a darkened room; C a hole to let in the sun’s
-rays; D&nbsp;E&nbsp;F, G&nbsp;H&nbsp;I two prisms so applied together, that the
-sides E&nbsp;F and G&nbsp;I be contiguous, and the sides D&nbsp;F, G&nbsp;H
-parallel; by this means the light will pass through them without
-any separation into colours: but if it be afterwards received
-by a third prism I&nbsp;K&nbsp;L, it shall be divided so as to
-form upon any white body P&nbsp;Q the usual colours, violet
-at <i>m</i>, blue at <i>n</i>, green at <i>o</i>, yellow at <i>r</i>, and red at <i>s</i>. But
-because it never happens that the two adjacent surfaces E&nbsp;F
-and G&nbsp;I perfectly touch, part only of the light incident upon
-the surface E&nbsp;F shall be transmitted, and part shall be
-reflected. Let now the reflected part be received by a fourth
-prism Δ&nbsp;Θ&nbsp;Λ, and passing through it paint upon a white body
-Ζ&nbsp;Γ the colours of the prism, red at <i>t</i>, yellow at <i>u</i>, green
-at <i>w</i>, blue at <i>x</i>, violet at <i>y</i>. If the prisms D&nbsp;E&nbsp;F, G&nbsp;H&nbsp;I
-be slowly turned about while they remain contiguous, the
-colours upon the body P&nbsp;Q shall not sensibly change their
-situation, till such time as the rays become pretty oblique
-to the surface E&nbsp;F; but then the light incident upon the
-surface E&nbsp;F shall begin to be wholly reflected. And first
-of all the violet light shall be wholly reflected, and thereupon
-will disappear at <i>m</i>, appearing instead thereof<span class="pagenum"><a name="Page_337" id="Page_337">[337]</a></span>
-at <i>y</i>, and increasing the violet light falling there, the
-other colours remaining as before. If the prisms D&nbsp;E&nbsp;F, G&nbsp;H&nbsp;I
-be turned a little farther about, that the incident rays become
-yet more inclined to the surface E&nbsp;F, the blue shall
-be totally reflected, and shall disappear in <i>n</i>, but appear at
-<i>x</i> by making the colour there more intense. And the same
-may be continued, till all the colours are successively removed
-from the surface P&nbsp;Q to Ζ&nbsp;Γ. But in any case, suppose
-when the violet and the blue have forsaken the surface P&nbsp;Q, and
-appear upon the surface Ζ&nbsp;Γ, Ζ&nbsp;Γ, the green, yellow, and red only
-remaining upon the surface P&nbsp;Q; if the light be received upon
-a paper held any where in its whole passage between the
-light’s coming out of the prisms D&nbsp;E&nbsp;F, G&nbsp;I&nbsp;H and its incidence
-upon the prism I&nbsp;K&nbsp;L, it shall appear of the colour
-compounded of all the colours seen upon P&nbsp;Q; and the reflected
-ray, received upon a piece of white paper held any
-where between the prisms D&nbsp;E&nbsp;F and Δ&nbsp;Θ&nbsp;Σ shall exhibit the colour
-compounded of those the surface P&nbsp;Q is deprived of mixed
-with the sun’s light: whereas before any of the light was reflected
-from the surface E&nbsp;F, the rays between the prisms G&nbsp;H&nbsp;I and
-I&nbsp;K&nbsp;L would appear white; as will likewise the reflected ray
-both before and after the total reflection, provided the difference
-of refraction by the surfaces D&nbsp;F and D&nbsp;E be inconsiderable.
-I call here the sun’s light white, as I have all along done; but it
-is more exact to ascribe to it something of a yellowish tincture,
-occasioned by the brighter colours abounding in it; which
-caution is necessary in examining the colours of the reflected
-beam, when all the violet and blue are in it: for this<span class="pagenum"><a name="Page_338" id="Page_338">[338]</a></span>
-yellowish turn of the sun’s light causes the blue not to be
-quite so visible in it, as it should be, were the light perfectly
-white; but makes the beam of light incline rather towards
-a pale white.</p>
-
-</div>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c338" id="c338"><span class="smcap"><em class="gesperrt">Chap</em>. II.</span></a><br />
-Of the properties of BODIES, upon which
-their COLOURS depend.</h2>
-
-<p class="drop-cap16">AFTER having shewn in the last chapter, that the
-difference between the colours of bodies viewed in open
-day-light is only this, that some bodies are disposed to
-reflect rays of one colour in the greatest plenty, and other
-bodies rays of some other colour; order now requires us
-to examine more particularly into the property of bodies,
-which gives them this difference.  But this our author shews
-to be nothing more, than the different magnitude of the
-particles, which compose each body: this I question not
-will appear no small paradox. And indeed this whole chapter
-will contain scarce any assertions, but what will be almost
-incredible, though the arguments for them are so strong
-and convincing, that they force our assent. In the former
-chapter have been explained properties of light, not in the
-least thought of before our author’s discovery of them; yet
-are they not difficult to admit, as soon as experiments are
-known to give proof of their reality; but some of the propositions
-to be stated here will, I fear, be accounted almost
-past belief; notwithstanding that the arguments, by which<span class="pagenum"><a name="Page_339" id="Page_339">[339]</a></span>
-they are established are unanswerable. For it is proved by
-our author, that bodies are rendered transparent by the minuteness
-of their pores, and become opake by having them large;
-and more, that the most transparent body by being reduced
-to a great thinness will become less pervious to the light.</p>
-
-<p>2. <span class="smcap gesperrt">But</span> whereas it had been the received opinion, and
-yet remains so among all who have not studied this philosophy,
-that light is reflected from bodies by its impinging
-against their solid parts, rebounding from them, as a tennis
-ball or other elastic substance would do, when struck against
-any hard and resisting surface; it will be proper to
-begin with declaring our author’s sentiment concerning this,
-who shews by many arguments that reflection cannot be
-caused by any such means<a name="FNanchor_295_295" id="FNanchor_295_295"></a><a href="#Footnote_295_295" class="fnanchor">[295]</a>: some few of his proofs I shall
-set down, referring the reader to our author himself for
-the rest.</p>
-
-<p><a name="c339" id="c339">3.</a> <span class="smcap gesperrt">It</span> is well known, that when light falls upon any
-transparent body, glass for instance, part of it is reflected and
-part transmitted; for which it is ready to account, by saying
-that part of the light enters the pores of the glass, and
-part impinges upon its solid parts. But when the transmitted
-light arrives at the farther surface of the glass, in passing
-out of glass into air there is as strong a reflection caused,
-or rather something stronger. Now it is not to be conceived,
-how the light should find as many solid parts in the
-air to strike against as in the glass, or even a greater number<span class="pagenum"><a name="Page_340" id="Page_340">[340]</a></span>
-of them. And to augment the difficulty, if water
-be placed behind the glass, the reflection becomes much
-weaker. Can we therefore say, that water has fewer solid
-parts for the light to strike against, than the air? And if
-we should, what reason can be given for the reflection’s being
-stronger, when the air by the air-pump is removed
-from behind the glass, than when the air receives the rays
-of light. Besides the light may be so inclined to the hinder
-surface of the glass, that it shall wholly be reflected,
-which happens when the angle which the ray makes with
-the surface does not exceed about 49⅓ degrees; but if the
-inclination be a very little increased, great part of the light
-will be transmitted; and how the light in one case should
-meet with nothing but the solid parts of the air, and by
-so small a change of its inclination find pores in great plenty,
-is wholly inconceivable. It cannot be said, that the light
-is reflected by striking against the solid parts of the surface
-of the glass; because without making any change in that
-surface, only by placing water contiguous to it instead of
-air, great part of that light shall be transmitted, which could
-find no passage through the air. Moreover in the last experiment
-recited in the preceding chapter, when by turning
-the prisms D&nbsp;E&nbsp;F, G&nbsp;H&nbsp;I, the blue light became wholly
-reflected, while the rest was mostly transmitted, no possible
-reason can be assigned, why the blue-making rays should
-meet with nothing but the solid parts of the air between
-the prisms, and the rest of the light in the very same obliquity
-find pores in abundance. Nay farther, when two glasses
-touch each other, no reflection at all is made; though<span class="pagenum"><a name="Page_341" id="Page_341">[341]</a></span>
-it does not in the least appear, how the rays should avoid
-the solid parts of glass, when contiguous to other glass, any
-more than when contiguous to air. But in the last place
-upon this supposition it is not to be comprehended, how
-the most polished substances could reflect the light in that
-regular manner we find they do; for when a polished looking
-glass is covered over with quicksilver, we cannot suppose
-the particles of light so much larger than those of the quicksilver
-that they should not be scattered as much in reflection,
-as a parcel of marbles thrown down upon a rugged pavement.
-The only cause of so uniform and regular a reflection must be
-some more secret cause, uniformly spread over the whole surface
-of the glass.</p>
-
-<p><a name="c341" id="c341">4.</a> <span class="smcap gesperrt">But</span> now, since the reflection of light from bodies
-does not depend upon its impinging against their solid parts,
-some other reason must be sought for. And first it is
-past doubt that the least parts of almost all bodies are transparent,
-even the microscope shewing as much<a name="FNanchor_296_296" id="FNanchor_296_296"></a><a href="#Footnote_296_296" class="fnanchor">[296]</a>; besides that
-it may be experienced by this method. Take any thin plate
-of the opakest body, and apply it to a small hole designed
-for the admission of light into a darkened room; however
-opake that body may seem in open day-light, it shall under
-these circumstances sufficiently discover its transparency,
-provided only the body be very thin. White metals indeed
-do not easily shew themselves transparent in these trials, they
-reflecting almost all the light incident upon them at their
-first superficies; the cause of which will appear in what<span class="pagenum"><a name="Page_342" id="Page_342">[342]</a></span>
-follows<a name="FNanchor_297_297" id="FNanchor_297_297"></a><a href="#Footnote_297_297" class="fnanchor">[297]</a>. But yet these substances, when reduced into parts
-of extraordinary minuteness by being dissolved in aqua fortis
-or the like corroding liquors do also become transparent.</p>
-
-<p><a name="c342" id="c342">5.</a> <span class="smcap gesperrt">Since</span> therefore the light finds free passage through
-the least parts of bodies, let us consider the largeness of
-their pores, and we shall find, that whenever a ray of light
-has passed through any particle of a body, and is come
-to its farther surface, if it finds there another particle contiguous,
-it will without interruption pass into that particle;
-just as light will pass through one piece of glass into another
-piece in contact with it without any impediment, or
-any part being reflected: but as the light in passing out of
-glass, or any other transparent body, shall part of it be reflected
-back, if it enter into air or other transparent body
-of a different density from that it passes out of; the same
-thing will happen in the light’s passage through any particle
-of a body, whenever at its exit out of that particle it
-meets no other particle contiguous, but must enter into a
-pore, for in this case it shall not all pass through, but part
-of it be reflected back. Thus will the light, every time it
-enters a pore, be in part reflected; so that nothing more
-seems necessary to opacity, than that the particles, which compose
-any body, touch but in very few places, and that the
-pores of it are numerous and large, so that the light may
-in part be reflected from it, and the other part, which enters
-too deep to be returned out of the body, by numerous
-reflections may be stifled and lost<a name="FNanchor_298_298" id="FNanchor_298_298"></a><a href="#Footnote_298_298" class="fnanchor">[298]</a>; which in all probability<span class="pagenum"><a name="Page_343" id="Page_343">[343]</a></span>
-happens, as often as it impinges against the solid part
-of the body, all the light which does so not being reflected
-back, but stopt, and deprived of any farther motion<a name="FNanchor_299_299" id="FNanchor_299_299"></a><a href="#Footnote_299_299" class="fnanchor">[299]</a>.</p>
-
-<p>6. <span class="smcap gesperrt">This</span> notion of opacity is greatly confirmed by the
-observation, that opake bodies become transparent by filling
-up the pores with any substance of near the same density
-with their parts. As when paper is wet with water or
-oyl; when linnen cloth is either dipt in water, oyled, or
-varnished; or the oculus mundi stone steeped in water<a name="FNanchor_300_300" id="FNanchor_300_300"></a><a href="#Footnote_300_300" class="fnanchor">[300]</a>.
-All which experiments confirm both the first assertion, that
-light is not reflected by striking upon the solid parts of
-bodies; and also the second, that its passage is obstructed
-by the reflections it undergoes in the pores; since we find
-it in these trials to pass in greater abundance through bodies,
-when the number of their solid parts is increased, only
-by taking away in great measure those reflections; which
-filling the pores with a substance of near the same density
-with the parts of the body will do. Besides as filling
-the pores of a dark body makes it transparent; so on the
-other hand evacuating the pores of a body transparent, or
-separating the parts of such a body, renders it opake. As
-salts or wet paper by being dried, glass by being reduced to
-powder or the surface made rough; and it is well known that
-glass vessels discover cracks in them by their opacity. Just
-so water itself becomes impervious to the light by being
-formed into many small bubbles, whether in froth, or by
-being mixed and agitated with any quantity of a liquor<span class="pagenum"><a name="Page_344" id="Page_344">[344]</a></span>
-with which it will not incorporate, such as oyl of turpentine,
-or oyl olive.</p>
-
-<p>7. <span class="smcap gesperrt">A certain</span> electrical experiment made by Mr. <span class="smcap">Hauksbee</span>
-may not perhaps be useless to clear up the present speculation,
-by shewing that something more is necessary besides
-mere porosity for transmitting freely other fine substances.
-The experiment is this; that a glass cane rubbed
-till it put forth its electric quality would agitate leaf brass
-inclosed under a glass vessel, though not at so great a distance,
-as if no body had intervened; yet the same cane
-would lose all its influence on the leaf brass by the interposition
-of a piece of the finest muslin, whose pores are
-immensely larger and more patent than those of glass.</p>
-
-<p><a name="c344" id="c344">8.</a> <span class="smcap gesperrt">Thus</span> I have endeavoured to smooth my way, as much
-as I could, to the unfolding yet greater secrets in nature;
-for I shall now proceed to shew the reason why bodies appear
-of different colours. My reader no doubt will be
-sufficiently surprized, when I inform him that the knowledge
-of this is deduced from that ludicrous experiment, with
-which children divert themselves in blowing bubbles of water
-made tenacious by the solution of soap.  And that these
-bubbles, as they gradually grow thinner and thinner till
-they break, change successively their colours from the same
-principle, as all natural bodies preserve theirs.</p>
-
-<p>9. <span class="smcap gesperrt">Our</span> author after preparing water with soap, so as to
-render it very tenacious, blew it up into a bubble, and placing<span class="pagenum"><a name="Page_345" id="Page_345">[345]</a></span>
-it under a glass, that it might not be irregularly agitated
-by the air, observed as the water by subsiding changed the
-thickness of the bubble, making it gradually less and less till
-the bubble broke; there successively appeared colours at the
-top of the bubble, which spread themselves into rings surrounding
-the top and descending more and more, till they vanished
-at the bottom in the same order in which they appeared<a name="FNanchor_301_301" id="FNanchor_301_301"></a><a href="#Footnote_301_301" class="fnanchor">[301]</a>.
-The colours emerged in this order: first red, then blue; to which
-succeeded red a second time, and blue immediately followed;
-after that red a third time, succeeded by blue; to which
-followed a fourth red, but succeeded by green; after this a
-more numerous order of colours, first red, then yellow,
-next green, and after that blue, and at last purple; then
-again red, yellow, green, blue, violet followed each other
-in order; and in the last place red, yellow, white, blue;
-to which succeeded a dark spot, which reflected scarce any
-light, though our author found it did make some very obscure
-reflection, for the image of the sun or a candle might
-be faintly discerned upon it; and this last spot spread itself
-more and more, till the bubble at last broke. These colours
-were not simple and uncompounded colours, like those
-which are exhibited by the prism, when due care is taken
-to separate them; but were made by a various mixture of
-those simple colours, as will be shewn in the next chapter:
-whence these colours, to which I have given the name of
-blue, green, or red, were not all alike, but differed as follows.
-The blue, which appeared next the dark spot, was a
-pure colour, but very faint, resembling the sky-colour; the<span class="pagenum"><a name="Page_346" id="Page_346">[346]</a></span>
-white next to it a very strong and intense white, brighter
-much than the white, which the bubble reflected, before
-any of the colours appeared. The yellow which preceded
-this was at first pretty good, but soon grew dilute; and
-the red which went before the yellow at first gave a tincture
-of scarlet inclining to violet, but soon changed into
-a brighter colour; the violet of the next series was deep
-with little or no redness in it; the blue a brisk colour, but
-came much short of the blue in the next order; the green
-was but dilute and pale; the yellow and red were very
-bright and full, the best of all the yellows which appeared
-among any of the colours: in the preceding orders the purple
-was reddish, but the blue, as was just now said, the brightest
-of all; the green pretty lively better than in the order
-which appeared before it, though that was a good willow
-green; the yellow but small in quantity, though bright; the
-red of this order not very pure: those which appeared before
-yet more obscure, being very dilute and dirty; as were
-likewise the three first blues.</p>
-
-<p>10. <span class="smcap gesperrt">Now</span> it is evident, that these colours arose at the
-top of the bubble, as it grew by degrees thinner and thinner:
-but what the express thickness of the bubble was, where
-each of these colours appeared upon it, could not be determined
-by these experiments; but was found by another
-means, viz. by taking the object glass of a long telescope,
-which is in a small degree convex, and placing it upon a
-flat glass, so as to touch it in one point, and then water being
-put between them, the same colours appeared as in the<span class="pagenum"><a name="Page_347" id="Page_347">[347]</a></span>
-bubble, in the form of circles or rings surrounding the
-point where the glasses touched, which appeared black for
-want of any reflection from it, like the top of the bubble
-when thinnest<a name="FNanchor_302_302" id="FNanchor_302_302"></a><a href="#Footnote_302_302" class="fnanchor">[302]</a>: next to this spot lay a blue circle, and
-next without that a white one; and so on in the same order
-as before, reckoning from the dark spot. And henceforward
-I shall speak of each colour, as being of the first, second,
-or any following order, as it is the first, second, or any
-following one, counting from the black spot in the center
-of these rings; which is contrary to the order in which
-I must have mentioned them, if I should have reputed
-them the first, second, or third, &amp;c. in order, as they arise
-after one another upon the top of the bubble.</p>
-
-<p>11. But now by measuring the diameters of each of these
-rings, and knowing the convexity of the telescope glass, the
-thickness of the water at each of those rings may be determined
-with great exactness: for instance the thickness of it,
-where the white light of the first order is reflected, is about
-3⅞ such parts, of which an inch contains 1000000<a name="FNanchor_303_303" id="FNanchor_303_303"></a><a href="#Footnote_303_303" class="fnanchor">[303]</a>.
-And this measure gives the thickness of the bubble, where
-it appeared of this white colour, as well as of the water
-between the glasses; though the transparent body which
-surrounds the water in these two cases be very different:
-for our author found, that the condition of the ambient
-body would not alter the species of the colour at all, though
-it might its strength and brightness; for pieces of Muscovy
-glass, which were so thin as to appear coloured by being<span class="pagenum"><a name="Page_348" id="Page_348">[348]</a></span>
-wet with water, would have their colours faded and made
-less bright thereby; but he could not observe their species
-at all to be changed. So that the thickness of any transparent
-body determines its colour, whatever body the light
-passes through in coming to it<a name="FNanchor_304_304" id="FNanchor_304_304"></a><a href="#Footnote_304_304" class="fnanchor">[304]</a>.</p>
-
-<p>12. <span class="smcap gesperrt">But</span> it was found that different transparent bodies
-would not under the same thicknesses exhibit the same colours:
-for if the forementioned glasses were laid upon each
-other without any water between their surfaces, the air itself
-would afford the same colours as the water, but more
-expanded, insomuch that each ring had a larger diameter,
-and all in the same proportion. So that the thickness of the
-air proper to each colour was in the same proportion larger,
-than the thickness of the water appropriated to the same<a name="FNanchor_305_305" id="FNanchor_305_305"></a><a href="#Footnote_305_305" class="fnanchor">[305]</a>.</p>
-
-<p>13. <span class="smcap gesperrt">If</span> we examine with care all the circumstances of these
-colours, which will be enumerated in the next chapter,
-we shall not be surprized, that our author takes them to
-bear a great analogy to the colours of natural bodies<a name="FNanchor_306_306" id="FNanchor_306_306"></a><a href="#Footnote_306_306" class="fnanchor">[306]</a>. For
-the regularity of those various and strange appearances relating
-to them, which makes the most mysterious part of the action
-between light and bodies, as the next chapter will shew,
-is sufficient to convince us that the principle, from which
-they flow, is of the greatest importance in the frame of
-nature; and therefore without question is designed for no
-less a purpose than to give bodies their various colours, to
-which end it seems very fitly suited. For if any such transparent<span class="pagenum"><a name="Page_349" id="Page_349">[349]</a></span>
-substance of the thickness proper to produce
-any one colour should be cut into slender threads,
-or broken into fragments, it does not appear but
-these should retain the same colour; and a heap of such
-fragments should frame a body of that colour. So that this
-is without dispute the cause why bodies are of this or the
-other colour, that the particles of which they are composed
-are of different sizes. Which is farther confirmed by
-the analogy between the colours of thin plates, and the colours
-of many bodies. For example, these plates do not
-look of the same colour when viewed obliquely, as when
-seen direct; for if the rings and colours between a convex
-and plane glass are viewed first in a direct manner, and then at
-different degrees of obliquity, the rings will be observed to dilate
-themselves more and more as the obliquity is increased<a name="FNanchor_307_307" id="FNanchor_307_307"></a><a href="#Footnote_307_307" class="fnanchor">[307]</a>;
-which shews that the transparent substance between the glasses
-does not exhibit the same colour at the same thickness in all
-situations of the eye: just so the colours in the very same
-part of a peacock’s tail change, as the tail changes posture
-in respect of the sight. Also the colours of silks, cloths,
-and other substances, which water or oyl can intimately
-penetrate, become faint and dull by the bodies being wet
-with such fluids, and recover their brightness again when
-dry; just as it was before said that plates of Muscovy glass
-grew faint and dim by wetting. To this may be added, that
-the colours which painters use will be a little changed by being
-ground very elaborately, without question by the diminution
-of their parts. All which particulars, and many more that<span class="pagenum"><a name="Page_350" id="Page_350">[350]</a></span>
-might be extracted from our author, give abundant proof of the
-present point. I shall only subjoin one more: these transparent
-plates transmit through them all the light they do not reflect;
-so that when looked through they exhibit those colours,
-which result from the depriving white light of the colour reflected.
-This may commodiously be tryed by the glasses so
-often mentioned; which if looked through exhibit coloured
-rings as by reflected light, but in a contrary order; for the middle
-spot, which in the other view appears black for want
-of reflected light, now looks perfectly white, opposite to
-the blue circle; next without this spot the light appears
-tinged with a yellowish red; where the white circle appeared
-before, it now seems dark; and so of the rest<a name="FNanchor_308_308" id="FNanchor_308_308"></a><a href="#Footnote_308_308" class="fnanchor">[308]</a>.
-Now in the same manner, the light transmitted through foliated
-gold into a darkened room appears greenish by the
-loss of the yellow light, which gold reflects.</p>
-
-<p>14. <span class="smcap gesperrt">Hence</span> it follows, that the colours of bodies
-give a very probable ground for making conjecture concerning
-the magnitude of their constituent particles<a name="FNanchor_309_309" id="FNanchor_309_309"></a><a href="#Footnote_309_309" class="fnanchor">[309]</a>. My reason for
-calling it a conjecture is, its being difficult to fix certainly the
-order of any colour. The green of vegetables our author
-judges to be of the third order, partly because of the intenseness
-of their colour; and partly from the changes they
-suffer when they wither, turning at first into a greenish or
-more perfect yellow, and afterwards some of them to an orange
-or red; which changes seem to be effected from their
-ringing particles growing denser by the exhalation of their<span class="pagenum"><a name="Page_351" id="Page_351">[351]</a></span>
-moisture, and perhaps augmented likewise by the accretion
-of the earthy and oily parts of that moisture. How the mentioned
-colours should arise from increasing the bulk of those particles,
-is evident; seeing those colours lie without the ring of
-green between the glasses, and are therefore formed where
-the transparent substance which reflects them is thicker. And
-that the augmentation of the density of the colorific
-particles will conspire to the production of the same effect,
-will be evident; if we remember what was said of the different
-size of the rings, when air was included between the
-glasses, from their size when water was between them;
-which shewed that a substance of a greater density than
-another gives the same colour at a less thickness. Now
-the changes likely to be wrought in the density or magnitude
-of the parts of vegetables by withering seem not
-greater, than are sufficient to change their colour into those of
-the same order; but the yellow and red of the fourth order
-are not full enough to agree with those, into which these substances
-change, nor is the green of the second sufficiently
-good to be the colour of vegetables; so that their colour
-must of necessity be of the third order.</p>
-
-<p>15. <span class="smcap gesperrt">The</span> blue colour of syrup of violets our author
-supposes to be of the third order; for acids, as vinegar, with
-this syrup change it red, and salt of tartar or other alcalies
-mixed therewith turn it green. But if the blue colour
-of the syrup were of the second order, the red colour,
-which acids by attenuating its parts give it, must be of the
-first order, and the green given it by alcalies by incrassating<span class="pagenum"><a name="Page_352" id="Page_352">[352]</a></span>
-its particles should be of the second; whereas neither of those
-colours is perfect enough, especially the green, to answer
-those produced by these changes; but the red may well enough
-be allowed to be of the second order, and the green
-of the third; in which case the blue must be likewise of
-the third order.</p>
-
-<p>16. <span class="smcap gesperrt">The</span> azure colour of the skies our author takes to
-be of the first order, which requires the smallest particles
-of any colour, and therefore most like to be exhibited by
-vapours, before they have sufficiently coalesced to produce
-clouds of other colours.</p>
-
-<p>17. <span class="smcap gesperrt">The</span> most intense and luminous white is of the
-first order, if less strong it is a mixture of the colours of
-all the orders. Of the latter sort he takes the colour of linnen,
-paper, and such like substances to be; but white metals
-to be of the former sort. The arguments for it are
-these. The opacity of all bodies has been shewn to arise
-from the number and strength of the reflections made within
-them; but all experiments shew, that the strongest reflection
-is made at those surfaces, which intercede transparent
-bodies differing most in density. Among other instances
-of this, the experiments before us afford one; for
-when air only is included between the glasses, the coloured
-rings are not only more dilated, as has before been said,
-than when water is between them; but are likewise much
-more luminous and bright. It follows therefore, that whatever
-medium pervades the pores of bodies, if so be there<span class="pagenum"><a name="Page_353" id="Page_353">[353]</a></span>
-is any, those substances must be most opake, the density of
-whose parts differs most from the density of the medium,
-which fills their pores. But it has been sufficiently proved in
-the former part of this tract, that there is no very dense
-medium lodging in, at least pervading at liberty the pores
-of bodies. And it is farther proved by the present experiments.
-For when air is inclosed by the denser substance
-of glass, the rings dilate themselves, as has been said, by being
-viewed obliquely; this they do so very much, that at
-different obliquities the same thickness of air will exhibit all
-sorts of colours. The bubble of water, though surrounded
-with the thinner substance of air, does likewise change its
-colour by being viewed obliquely; but not any thing near
-so much, as in the other case; for in that the same colour
-might be seen, when the rings were viewed most obliquely,
-at more than twelve times the thickness it appeared at under
-a direct view; whereas in this other case the thickness
-was never found considerably above half as much again.
-Now the colours of bodies not depending only on the light,
-that is incident upon them perpendicularly, but likewise
-upon that, which falls on them in all degrees of obliquity;
-if the medium surrounding their particles were denser than
-those particles, all sorts of colours must of necessity be reflected
-from them so copiously, as would make the colours of all bodies
-white, or grey, or at best very dilute and imperfect. But on the
-other hand, if the medium in the pores of bodies be much rarer
-than their particles, the colour reflected will be so little
-changed by the obliquity of the rays, that the colour produced
-by the rays, which fall near the perpendicular, may<span class="pagenum"><a name="Page_354" id="Page_354">[354]</a></span>
-so much abound in the reflected light, as to give the body
-their colour with little allay. To this may be added, that
-when the difference of the contiguous transparent substances
-is the same, a colour reflected from the denser substance
-reduced into a thin plate and surrounded by the rarer will
-be more brisk, than the same colour will be, when reflected
-from a thin plate formed of the rarer substance, and surrounded
-by the denser; as our author experienced by
-blowing glass very thin at a lamp furnace, which exhibited
-in the open air more vivid colours, than the air does between
-two glasses. From these considerations it is manifest,
-that if all other circumstances are alike, the densest bodies
-will be most opake. But it was observed before, that these
-white metals can hardly be made so thin, except by being
-dissolved in corroding liquors, as to be rendred transparent;
-though none of them are so dense as gold, which proves
-their great opacity to have some other cause besides their
-density; and none is more fit to produce this, than such a
-size of their particles, as qualifies them to reflect the white
-of the first order.</p>
-
-<p>18. <span class="smcap gesperrt">For</span> producing black the particles ought to be
-smaller than for exhibiting any of the colours, viz. of a
-size answering to the thickness of the bubble, where by reflecting
-little or no light it appears colourless; but
-yet they must not be too small, for that will make them
-transparent through deficiency of reflections in the inward
-parts of the body, sufficient to stop the light from going
-through it; but they must be of a size bordering upon that<span class="pagenum"><a name="Page_355" id="Page_355">[355]</a></span>
-disposed to reflect the faint blue of the first order, which
-affords an evident reason why blacks usually partake a little
-of that colour. We see too, why bodies dissolved by fire
-or putrefaction turn black: and why in grinding glasses upon
-copper plates the dust of the glass, copper, and sand
-it is ground with, become very black: and in the last place
-why these black substances communicate so easily to others
-their hue; which is, that their particles by reason of the
-great minuteness of them easily overspread the grosser particles
-of others.</p>
-
-<p><a name="c355" id="c355">19.</a> <span class="smcap gesperrt">I shall</span> now finish this chapter with one remark
-of the exceeding great porosity in bodies necessarily required
-in all that has here been said; which, when duly considered,
-must appear very surprizing; but perhaps it will be matter
-of greater surprize, when I affirm that the sagacity of our
-author has discovered a method, by which bodies may easily
-become so; nay how any the least portion of matter may
-be wrought into a body of any assigned dimensions how
-great so ever, and yet the pores of that body none of
-them greater, than any the smallest magnitude proposed at
-pleasure; notwithstanding which the parts of the body shall
-so touch, that the body itself shall be hard and solid<a name="FNanchor_310_310" id="FNanchor_310_310"></a><a href="#Footnote_310_310" class="fnanchor">[310]</a>. The
-manner is this: suppose the body be compounded of particles of
-such figures, that when laid together the pores found between
-them may be equal in bigness to the particles; how
-this may be effected, and yet the body be hard and solid,
-is not difficult to understand; and the pores of such a body<span class="pagenum"><a name="Page_356" id="Page_356">[356]</a></span>
-may be made of any proposed degree of smallness. But
-the solid matter of a body so framed will take up only half
-the space occupied by the body; and if each constituent
-particle be composed of other less particles according to
-the same rule, the solid parts of such a body will be but a
-fourth part of its bulk; if every one of these lesser particles
-again be compounded in the same manner, the solid
-parts of the whole body shall be but one eighth of its bulk;
-and thus by continuing the composition the solid parts of
-the body may be made to bear as small a proportion to the
-whole magnitude of the body, as shall be desired, notwithstanding
-the body will be by the contiguity of its parts capable
-of being in any degree hard. Which shews that this
-whole globe of earth, nay all the known bodies in the universe
-together, as far as we know, may be compounded
-of no greater a portion of solid matter, than might be reduced
-into a globe of one inch only in diameter, or even
-less. We see therefore how by this means bodies may easily
-be made rare enough to transmit light, with all that
-freedom pellucid bodies are found to do.  Though what
-is the real structure of bodies we yet know not.</p>
-
-</div>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c356" id="c356"><span class="smcap"><em class="gesperrt">Chap. III.</em></span></a><br />
-Of the <span class="smcap">Refraction</span>, <span class="smcap">Reflection,</span>
-and <span class="smcap">Inflection</span> of <span class="smcap">Light</span>.</h2>
-
-<p class="drop-cap04">THUS much of the colours of natural bodies; our
-method now leads us to speculations yet greater, no<span class="pagenum"><a name="Page_357" id="Page_357">[357]</a></span>
-less than to lay open the causes of all that has hitherto been
-related. For it must in this chapter be explained, how the
-prism separates the colours of the sun’s light, as we found
-in the first chapter; and why the thin transparent plates
-discoursed of in the last chapter, and consequently the particles
-of coloured bodies, reflect that diversity of colours
-only by being of different thicknesses.</p>
-
-<p><a name="c357" id="c357">2.</a> <span class="smcap gesperrt">For</span> the first it is proved by our author, that the colours
-of the sun’s light are manifested by the prism, from the rays
-undergoing different degrees of refraction; that the violet-making
-rays, which go to the upper part of the coloured
-image in the first experiment of the first chapter, are the
-most refracted; that the indigo-making rays are refracted,
-or turned out of their course by passing through the prism,
-something less than the violet-making rays, but more than
-the blue-making rays; and the blue-making rays more than
-the green; the green-making rays more than the yellow;
-the yellow more than the orange; and the orange-making
-rays more than the red-making, which are least of all refracted.
-The first proof of this, that rays of different colours
-are refracted unequally is this. If you take any body,
-and paint one half of it red and the other half blue, then
-upon viewing it through a prism those two parts shall appear
-separated from each other; which can be caused no
-otherwise than by the prism’s refracting the light of one
-half more than the light of the other half. But the blue
-half will be most refracted; for if the body be seen through
-the prism in such a situation, that the body shall appear<span class="pagenum"><a name="Page_358" id="Page_358">[358]</a></span>
-lifted upwards by the refraction, as a body within a bason
-of water, in the experiment mentioned in the first chapter,
-appeared to be lifted up by the refraction of the water, so
-as to be seen at a greater distance than when the bason is
-empty, then shall the blue part appear higher than the red;
-but if the refraction of the prism be the contrary way, the
-blue part shall be depressed more than the other. Again,
-after laying fine threads of black silk across each of the colours,
-and the body well inlightened, if the rays coming
-from it be received upon a convex glass, so that it
-may by refracting the rays cast the image of the body
-upon a piece of white paper held beyond the glass; then
-it will be seen that the black threads upon the red part of
-the image, and those upon the blue part, do not at the same
-time appear distinctly in the image of the body projected
-by the glass; but if the paper be held so, that the threads
-on the blue part may distinctly appear, the threads cannot
-be seen distinct upon the red part; but the paper
-must be drawn farther off from the convex glass to make the
-threads on this part visible; and when the distance is great enough
-for the threads to be seen in this red part, they become
-indistinct in the other. Whence it appears that the rays proceeding
-from each point of the blue part of the body are
-sooner united again by the convex glass than the rays which
-come from each point of the red parts<a name="FNanchor_311_311" id="FNanchor_311_311"></a><a href="#Footnote_311_311" class="fnanchor">[311]</a>. But both these experiments
-prove that the blue-making rays, as well in the small
-refraction of the convex glass, as in the greater refraction
-of the prism, are more bent, than the red-making rays.</p>
-
-<p><span class="pagenum"><a name="Page_359" id="Page_359">[359]</a></span></p>
-
-<p>3. <span class="smcap gesperrt">This</span> seems already to explain the reason of the coloured
-spectrum made by refracting the sun’s light with a prism,
-though our author proceeds to examine that in particular,
-and proves that the different coloured rays in that spectrum
-are in different degrees refracted; by shewing how to place
-the prism in such a posture, that if all the rays were refracted
-in the same manner, the spectrum should of necessity
-be round: whereas in that case if the angle made by
-the two surfaces of the prism, through which the light
-passes, that is the angle D&nbsp;F&nbsp;E in fig. 126, be about 63 or 64
-degrees, the image instead of being round shall be near
-five times as long as broad; a difference enough to shew
-a great inequality in the refractions of the rays, which go to
-the opposite extremities of the image. To leave no scruple
-unremoved, our author is very particular in shewing by a
-great number of experiments, that this inequality of refraction
-is not casual, and that it does not depend upon any irregularities
-of the glass; no nor that the rays are in their
-passage through the prism each split and divided; but on
-the contrary that every ray of the sun has its own peculiar
-degree of refraction proper to it, according to which it is
-more or less refracted in passing through pellucid substances
-always in the same manner<a name="FNanchor_312_312" id="FNanchor_312_312"></a><a href="#Footnote_312_312" class="fnanchor">[312]</a>. That the rays are not split
-and multiplied by the refraction of the prism, the third of
-the experiments related in our first chapter shews very clearly;
-for if they were, and the length of the spectrum in
-the first refraction were thereby occasioned, the breadth
-should be no less dilated by the cross refraction of the second<span class="pagenum"><a name="Page_360" id="Page_360">[360]</a></span>
-prism; whereas the breadth is not at all increased,
-but the image is only thrown into an oblique posture by the
-upper part of the rays which were at first more refracted
-than the under part, being again turned farthest out of their
-course. But the experiment most expressly adapted to prove
-this regular diversity of refraction is this, which follows<a name="FNanchor_313_313" id="FNanchor_313_313"></a><a href="#Footnote_313_313" class="fnanchor">[313]</a>.
-Two boards A&nbsp;B, C&nbsp;D (in fig. 130.) being erected in a darkened
-room at a proper distance, one of them A&nbsp;B being
-near the window-shutter E&nbsp;F, a space only being left for
-the prism G&nbsp;H&nbsp;I to be placed between them; so that the
-rays entring at the hole M of the window-shutter may after
-passing through the prism be trajected through a smaller
-hole K made in the board A&nbsp;B, and passing on from thence
-go out at another hole L made in the board C&nbsp;D of
-the same size as the hole K, and small enough to transmit
-the rays of one colour only at a time; let another prism
-N&nbsp;O&nbsp;P be placed after the board C&nbsp;D to receive the rays passing
-through the holes K and L, and after refraction by that
-prism let those rays fall upon the white surface Q&nbsp;R. Suppose
-first the violet light to pass through the holes, and to
-be refracted by the prism N&nbsp;O&nbsp;P to <i>s</i>, which if the prism
-N&nbsp;O&nbsp;P were removed should have passed right onto W. If the
-prism G&nbsp;H&nbsp;I be turned slowly about, while the boards and
-prism N&nbsp;O&nbsp;P remain fixed, in a little time another colour
-will fall upon the hole L, which, if the prism N&nbsp;O&nbsp;P were
-taken away, would proceed like the former rays to the same
-point W; but the refraction of the prism N&nbsp;O&nbsp;P shall not carry
-these rays to <i>s</i>, but to some place less distant from W as<span class="pagenum"><a name="Page_361" id="Page_361">[361]</a></span>
-to <i>t</i>. Suppose now the rays which go to <i>t</i> to be the indigo-making
-rays. It is manifest that the boards A&nbsp;B, C&nbsp;D, and
-prism N&nbsp;O&nbsp;P remaining immoveable, both the violet-making
-and indigo-making rays are incident alike upon the prism
-N&nbsp;O&nbsp;P, for they are equally inclined to its surface O&nbsp;P, and enter it
-in the same part of that surface; which shews that the indigo-making
-rays are less diverted out of their course by the refraction
-of the prism, than the violet-making rays under an
-exact parity of all circumstances. Farther, if the prism G&nbsp;H&nbsp;I
-be more turned about, ’till the blue-making rays pass
-through the hole L, these shall fall upon the surface Q&nbsp;R
-below I, as at <i>v</i>, and therefore are subjected to a less refraction
-than the indigo-making rays. And thus by proceeding
-it will be found that the green-making rays are
-less refracted than the blue-making rays, and so of the rest,
-according to the order in which they lie in the coloured
-spectrum.</p>
-
-<p>4. <span class="smcap gesperrt">This</span> disposition of the different coloured rays to
-be refracted some more than others our author calls their
-respective degrees of refrangibility. And since this difference
-of refrangibility discovers it self to be so regular, the
-next step is to find the rule it observes.</p>
-
-<p><a name="c361" id="c361">5.</a> <span class="smcap gesperrt">It</span> is a common principle in optics, that the sine of
-the angle of incidence bears to the sine of the refracted angle
-a given proportion. If A&nbsp;B (in fig. 131, 132) represent
-the surface of any refracting substance, suppose of
-water or glass, and C&nbsp;D a ray of light incident upon that face<span class="pagenum"><a name="Page_362" id="Page_362">[362]</a></span>
-in the point D, let D&nbsp;E be the ray, after it has passed the
-surface A&nbsp;B; if the ray pass out of the air into the substance
-whose surface is A&nbsp;B (as in fig. 131) it shall be turned
-from the surface, and if it pass out of that substance into
-air it shall be bent towards it (as in fig. 132) But if
-F&nbsp;G be drawn through the point D perpendicular to the
-surface A&nbsp;B, the angle under C&nbsp;D&nbsp;F made by the incident
-ray and this perpendicular is called the angle of incidence;
-and the angle under E&nbsp;D&nbsp;G, made by this perpendicular and the
-ray after refraction, is called the refracted angle. And if
-the circle H&nbsp;F&nbsp;I&nbsp;G be described with any interval cutting C&nbsp;D
-in H and D&nbsp;E in I, then the perpendiculars H&nbsp;K, I&nbsp;L being
-let fall upon F&nbsp;G, H&nbsp;K is called the sine of the angle
-under C&nbsp;D&nbsp;F the angle of incidence, and I&nbsp;L the sine of
-the angle under E&nbsp;D&nbsp;G the refracted angle. The first of
-these sines is called the sine of the angle of incidence, or
-more briefly the sine of incidence, the latter is the sine
-of the refracted angle, or the sine of refraction. And it
-has been found by numerous experiments that whatever
-proportion the sine of incidence H&nbsp;K bears to the sine of
-refraction I&nbsp;L in any one case, the same proportion shall
-hold in all cases; that is, the proportion between these sines
-will remain unalterably the same in the same refracting substance,
-whatever be the magnitude of the angle under C&nbsp;D&nbsp;F.</p>
-
-<p>6. <span class="smcap gesperrt">But</span> now because optical writers did not observe that
-every beam of white light was divided by refraction, as has
-been here explained, this rule collected by them can only
-be understood in the gross of the whole beam after refraction,<span class="pagenum"><a name="Page_363" id="Page_363">[363]</a></span>
-and not so much of any particular part of it, or
-at most only of the middle part of the beam. It therefore
-was incumbent upon our author to find by what law the
-rays were parted from each other; whether each ray apart
-obtained this property, and that the separation was made
-by the proportion between the sines of incidence and refraction
-being in each species of rays different; or whether
-the light was divided by some other rule. But he
-proves by a certain experiment that each ray has its sine of
-incidence proportional to its sine of refraction; and farther
-shews by mathematical reasoning, that it must be so upon
-condition only that bodies refract the light by acting
-upon it, in a direction perpendicular to the surface of the
-refracting body, and upon the same sort of rays always in
-an equal degree at the same distances<a name="FNanchor_314_314" id="FNanchor_314_314"></a><a href="#Footnote_314_314" class="fnanchor">[314]</a>.</p>
-
-<p>7. <span class="smcap gesperrt">Our</span> great author teaches in the next place how from
-the refraction of the most refrangible and least refrangible rays
-to find the refraction of all the intermediate ones<a name="FNanchor_315_315" id="FNanchor_315_315"></a><a href="#Footnote_315_315" class="fnanchor">[315]</a>. The
-method is this: if the sine of incidence be to the sine of refraction
-in the least refrangible rays as A to B&nbsp;C, (in fig. 133) and
-to the sine of refraction in the most refrangible as A to B&nbsp;D;
-if C&nbsp;E be taken equal to C&nbsp;D, and then E&nbsp;D be so divided
-in F, G, H, I, K, L, that E&nbsp;D, E&nbsp;F, E&nbsp;G, E&nbsp;H, E&nbsp;I, E&nbsp;K, E&nbsp;L,
-E&nbsp;C, shall be proportional to the eight lengths of musical
-chords, which found the notes in an octave, E&nbsp;D being
-the length of the key, E&nbsp;F the length of the tone above<span class="pagenum"><a name="Page_364" id="Page_364">[364]</a></span>
-that key, E&nbsp;G the length of the lesser third, E&nbsp;H of the
-fourth, E&nbsp;I of the fifth, E&nbsp;K of the greater sixth, E&nbsp;L of
-the seventh, and E&nbsp;C of the octave above that key; that is if
-the lines E&nbsp;D, E&nbsp;F, E&nbsp;G, E&nbsp;H, E&nbsp;I, E&nbsp;K, E&nbsp;L, and E&nbsp;C bear the same
-proportion as the numbers, 1, 9/8, 5/6, ¾, ⅓, ¾, 9/61, ½, respectively
-then shall B&nbsp;D, B&nbsp;F, be the two limits of the sines of refraction of
-the violet-making rays, that is the violet-making rays shall
-not all of them have precisely the same sine of refraction,
-but none of them shall have a greater sine than B&nbsp;D, nor
-a less than B&nbsp;F, though there are violet-making rays which
-answer to any sine of refraction that can be taken between
-these two. In the same manner B&nbsp;F and B&nbsp;G
-are the limits of the sines of refraction of the indigo-making
-rays; B&nbsp;G, B&nbsp;H are the limits belonging to the blue-making
-rays; B&nbsp;H, B&nbsp;I the limits pertaining to the green-making
-rays, B&nbsp;I, B&nbsp;K the limits for the yellow-making rays;
-B&nbsp;K, B&nbsp;L the limits for the orange-making rays; and lastly,
-B&nbsp;L and B&nbsp;C the extreme limits of the sines of refraction
-belonging to the red-making rays. These are the proportions
-by which the heterogeneous rays of light are separated
-from each other in refraction.</p>
-
-<p>8. <span class="smcap gesperrt">When</span> light passes out of glass into air, our author
-found A to B&nbsp;C as 50 to 77, and the same A to B&nbsp;D as 50
-to 78. And when it goes out of any other refracting substance
-into air, the excess of the sine of refraction of any
-one species of rays above its sine of incidence bears a constant
-proportion, which holds the same in each species, to
-the excess of the sine of refraction of the same sort of rays<span class="pagenum"><a name="Page_365" id="Page_365">[365]</a></span>
-above the sine of incidence into the air out of glass; provided
-the sines of incidence both in glass and the other substance
-are equal. This our author verified by transmitting the
-light through prisms of glass included within a prismatic
-vessel of water; and draws from those experiments the following
-observations: that whenever the light in passing
-through so many surfaces parting diverse transparent substances
-is by contrary refractions made to emerge into the
-air in a direction parallel to that of its incidence, it will
-appear afterwards white at any distance from the prisms,
-where you shall please to examine it; but if the direction
-of its emergence be oblique to its incidence, in receding
-from the place of emergence its edges shall appear tinged
-with colours: which proves that in the first case there is
-no inequality in the refractions of each species of rays, but
-that when any one species is so refracted as to emerge parallel
-to the incident rays, every sort of rays after refraction
-shall likewise be parallel to the same incident rays, and
-to each other; whereas on the contrary, if the rays of
-any one sort are oblique to the incident light, the several
-species shall be oblique to each other, and be gradually
-separated by that obliquity. From hence he deduces
-both the forementioned theorem, and also this other;
-that in each sort of rays the proportion of the sine of incidence
-to the sine of refraction, in the passage of the ray
-out of any refracting substance into another, is compounded
-of the proportion to which the sine of incidence would have to
-the sine of refraction in the passage of that ray out of the
-first substance into any third, and of the proportion which<span class="pagenum"><a name="Page_366" id="Page_366">[366]</a></span>
-the sine of incidence would have to the sine of refraction
-in the passage of the ray out of that third substance into
-the second. From so simple and plain an experiment has
-our most judicious author deduced these important theorems,
-by which we may learn how very exact and circumspect
-he has been in this whole work of his optics; that
-notwithstanding his great particularity in explaining his
-doctrine, and the numerous collection of experiments he
-has made to clear up every doubt which could arise, yet
-at the same time he has used the greatest caution to make
-out every thing by the simplest and easiest means possible.</p>
-
-<p><a name="c366" id="c366">9.</a> <span class="smcap gesperrt">Our</span> author adds but one remark more upon refraction,
-which is, that if refraction be performed in the manner
-he has supposed from the light’s being pressed by the
-refracting power perpendicularly toward the surface of the
-refracting body, and consequently be made to move swifter
-in the body than before its incidence; whether this power
-act equally at all distances or otherwise, provided only its
-power in the same body at the same distances remain without
-variation the same in one inclination of the incident
-rays as well as another; he observes that the refracting powers
-in different bodies will be in the duplicate proportion
-of the tangents of the lead angles, which the refracted light
-can make with the surfaces of the refracting bodies<a name="FNanchor_316_316" id="FNanchor_316_316"></a><a href="#Footnote_316_316" class="fnanchor">[316]</a>. This
-observation may be explained thus. When the light passes
-into any refracting substance, it has been shewn above that
-the sine of incidence bears a constant proportion to the sine<span class="pagenum"><a name="Page_367" id="Page_367">[367]</a></span>
-of refraction. Suppose the light to pass to the refracting
-body A&nbsp;B&nbsp;C&nbsp;D (in fig. 134) in the line E&nbsp;F, and to fall upon it at the
-point F, and then to proceed within the body in the line
-F&nbsp;G. Let H&nbsp;I be drawn through F perpendicular to the surface
-A&nbsp;B, and any circle K&nbsp;L&nbsp;M&nbsp;N be described to the center
-F. Then from the points O and P where this circle cuts
-the incident and refracted ray, the perpendiculars O&nbsp;Q, P&nbsp;R
-being drawn, the proportion of O&nbsp;Q to P&nbsp;R will remain
-the same in all the different obliquities, in which the same ray
-of light can fall on the surface A&nbsp;B. Now O&nbsp;Q is less than
-F&nbsp;L the semidiameter of the circle K&nbsp;L&nbsp;M&nbsp;N, but the more
-the ray E&nbsp;F is inclined down toward the surface A&nbsp;B, the
-greater will O&nbsp;Q be, and will approach nearer to the magnitude
-of F&nbsp;L. But the proportion of O&nbsp;Q to P&nbsp;R remaining
-always the same, when O&nbsp;Q, is largest, P&nbsp;R will also be
-greatest; so that the more the incident ray E&nbsp;F is inclined
-toward the surface A&nbsp;B, the more the ray F&nbsp;G after refraction
-will be inclined toward the same. Now if the line
-F&nbsp;S&nbsp;T be so drawn, that S&nbsp;V being perpendicular to F&nbsp;I shall
-be to F&nbsp;L the semidiameter of the circle in the constant proportion
-of P&nbsp;R to O&nbsp;Q; then the angle under N&nbsp;F&nbsp;T is that
-which I meant by the least of all that can be made by the
-refracted ray with this surface, for the ray after refraction
-would proceed in this line, if it were to come to the point
-F lying on the very surface A&nbsp;B; for if the incident ray
-came to the point F in any line between A&nbsp;F and F&nbsp;H, the
-ray after refraction would proceed forward in some line
-between F&nbsp;T and F&nbsp;I. Here if N&nbsp;W be drawn perpendicular
-to F&nbsp;N, this line N&nbsp;W in the circle K&nbsp;L&nbsp;M&nbsp;N is called<span class="pagenum"><a name="Page_368" id="Page_368">[368]</a></span>
-the tangent of the angle under N&nbsp;F&nbsp;S. Thus much being premised,
-the sense of the forementioned proposition is this. Let there
-be two refracting substances (in fig. 135) A&nbsp;B&nbsp;C&nbsp;D, and E&nbsp;F&nbsp;G&nbsp;H.
-Take a point, as I, in the surface A&nbsp;B, and to the center I
-with any semidiameter describe the circle K&nbsp;L&nbsp;M. In like
-manner on the surface E&nbsp;F take some point N, as a center,
-and describe with the same semidiameter the circle O&nbsp;P&nbsp;Q.
-Let the angle under B&nbsp;I&nbsp;R be the least which the refracted
-light can make with the surface A&nbsp;B, and the angle under
-F&nbsp;N&nbsp;S the least which the refracted light can make with
-the surface E&nbsp;F. Then if L&nbsp;T be drawn perpendicular to
-A&nbsp;B, and P&nbsp;V perpendicular to E&nbsp;F; the whole power, wherewith
-the substance A&nbsp;B&nbsp;C&nbsp;D acts on the light, will bear to
-the whole power wherewith the substance E&nbsp;F&nbsp;G&nbsp;H acts on,
-the light, a proportion, which is duplicate of the proportion,
-which L&nbsp;T bears to P&nbsp;V.</p>
-
-<p><a name="c368" id="c368">10.</a> <span class="smcap gesperrt">Upon</span> comparing according to this rule the refractive
-powers of a great many bodies it is found, that unctuous
-bodies which abound most with sulphureous parts
-refract the light two or three times more in proportion to
-their density than others: but that those bodies, which seem
-to receive in their composition like proportions of sulphureous
-parts, have their refractive powers proportional to their
-densities; as appears beyond contradiction by comparing
-the refractive power of so rare a substance as the air with
-that of common glass or rock crystal, though these substances
-are 2000 times denser than air; nay the same proportion<span class="pagenum"><a name="Page_369" id="Page_369">[369]</a></span>
-is found to hold without sensible difference in comparing
-air with pseudo-topar and glass of antimony, though
-the pseudo-topar be 3500 times denser than air, and glass
-of antimony no less than 4400 times denser. This power
-in other substances, as salts, common water, spirit of
-wine, &amp;c. seems to bear a greater proportion to their densities
-than these last named, according as they abound with
-sulphurs more than these; which makes our author conclude
-it probable, that bodies act upon the light chiefly, if not
-altogether, by means of the sulphurs in them; which kind
-of substances it is likely enters in some degree the composition
-of all bodies. Of all the substances examined by
-our author, none has so great a refractive power, in respect
-of its density, as a diamond.</p>
-
-<p><a name="c369" id="c369">11.</a> <span class="smcap gesperrt">Our</span> author finishes these remarks, and all he offers
-relating to refraction, with observing, that the action between
-light and bodies is mutual, since sulphureous bodies,
-which are most readily set on fire by the sun’s light, when
-collected upon them with a burning glass, act more upon
-light in refracting it, than other bodies of the same density
-do. And farther, that the densest bodies, which have
-been now shewn to act most upon light, contract the greatest
-heat by being exposed to the summer sun.</p>
-
-<p>12. <span class="smcap gesperrt">Having</span> thus dispatched what relates to refraction,
-we must address ourselves to discourse of the other operation
-of bodies upon light in reflecting it. When light
-passes through a surface, which divides two transparent bodies<span class="pagenum"><a name="Page_370" id="Page_370">[370]</a></span>
-differing in density, part of it only is transmitted,
-another part being reflected.  And if the light pass out of
-the denser body into the rarer, by being much inclined to
-the foresaid surface at length no part of it shall pass through,
-but be totally reflected. Now that part of the light, which
-suffers the greatest refraction, shall be wholly reflected with
-a less obliquity of the rays, than the parts of the light
-which undergo a less degree of refraction; as is evident
-from the last experiment recited in the first chapter; where,
-as the prisms D&nbsp;E&nbsp;F, G&nbsp;H&nbsp;I, (in fig. 129.) were turned about,
-the violet light was first totally reflected, and then
-the blue, next to that the green, and so of the rest. In consequence
-of which our author lays down this proportion; that
-the sun’s light differs in reflexibility, those rays being most reflexible,
-which are most refrangible. And collects from this,
-in conjunction with other arguments, that the refraction
-and reflection, of light are produced by the same cause,
-compassing those different effects only by the difference of
-circumstances with which it is attended. Another proof
-of this being taken by our author from what he has discovered
-of the passage of light through thin transparent
-plates, viz. that any particular species of light, suppose,
-for instance, the red-making rays, will enter and pass out
-of such a plate, if that plate be of some certain thicknesses;
-but if it be of other thicknesses, it will not break through
-it, but be reflected back: in which is seen, that the thickness
-of the plate determines whether the power, by which
-that plate acts upon the light, shall reflect it, or suffer it to
-pass through.</p>
-
-<p><span class="pagenum"><a name="Page_371" id="Page_371">[371]</a></span></p>
-
-<p>13. <span class="smcap gesperrt">But</span> this last mentioned surprising property of the
-action between light and bodies affords the reason of all
-that has been said in the preceding chapter concerning the
-colours of natural bodies; and must therefore more particularly
-be illustrated and explained, as being what will
-principally unfold the nature of the action of bodies upon
-light.</p>
-
-<p><a name="c371" id="c371">14.</a> <span class="smcap gesperrt">To</span> begin: The object glass of a long telescope being
-laid upon a plane glass, as proposed in the foregoing chapter,
-in open day-light there will be exhibited rings of various
-colours, as was there related; but if in a darkened
-room the coloured spectrum be formed by the prism, as in
-the first experiment of the first chapter, and the glasses be
-illuminated by a reflection from the spectrum, the rings
-shall not in this case exhibit the diversity of colours before
-described, but appear all of the colour of the light
-which falls upon the glasses, having dark rings between.
-Which shews that the thin plate of air between the
-glasses at some thicknesses reflects the incident light, at
-other places does not reflect it, but is found in those places
-to give the light passage; for by holding the glasses in
-the light as it passes from the prism to the spectrum, suppose
-at such a distance from the prism that the several sorts
-of light must be sufficiently separated from each other, when
-any particular sort of light falls on the glasses, you will find
-by holding a piece of white paper at a small distance beyond
-the glasses, that at those intervals, where the dark
-lines appeared upon the glasses, the light is so transmitted,<span class="pagenum"><a name="Page_372" id="Page_372">[372]</a></span>
-as to paint upon the paper rings of light having that colour
-which falls upon the glasses. This experiment therefore
-opens to us this very strange property of reflection,
-that in these thin plates it should bear such a relation to the
-thickness of the plate, as is here shewn. Farther, by carefully
-measuring the diameters of each ring it is found, that
-whereas the glasses touch where the dark spot appears in
-the center of the rings made by reflexion, where the air
-is of twice the thickness at which the light of the first ring
-is reflected, there the light by being again transmitted makes
-the first dark ring; where the plate has three times
-that thickness which exhibits the first lucid ring, it again
-reflects the light forming the second lucid ring; when
-the thickness is four times the first, the light is again transmitted
-so as to make the second dark ring; where the air
-is five times the first thickness, the third lucid ring is made;
-where it has six times the thickness, the third dark ring appears,
-and so on: in so much that the thicknesses, at which
-the light is reflected, are in proportion to the numbers 1, 3,
-5, 7, 9, &amp;c. and the thicknesses, where the light is transmitted,
-are in the proportion of the numbers 0, 2, 4, 6, 8,
-&amp;c. And these proportions between the thicknesses which
-reflect and transmit the light remain the same in all situations
-of the eye, as well when the rings are viewed obliquely,
-as when looked on perpendicularly. We must farther here
-observe, that the light, when it is reflected, as well as when it is
-transmitted, enters the thin plate, and is reflected from its farther
-surface; because, as was before remarked, the altering
-the transparent body behind the farther surface alters the degree<span class="pagenum"><a name="Page_373" id="Page_373">[373]</a></span>
-of reflection as when a thin piece of Muscovy glass
-has its farther surface wet with water, and the colour of
-the glass made dimmer by being so wet; which shews that
-the light reaches to the water, otherwise its reflection could
-not be influenced by it. But yet this reflection depends
-upon some power propagated from the first surface to the
-second; for though made at the second surface it depends
-also upon the first, because it depends upon the distance
-between the surfaces; and besides, the body through
-which the light passes to the first surface influences the reflection:
-for in a plate of Muscovy glass, wetting the surface,
-which first receives the light, diminishes the reflection,
-though not quite so much as wetting the farther surface will
-do. Since therefore the light in passing through these thin
-plates at some thicknesses is reflected, but at others transmitted
-without reflection, it is evident, that this reflection is
-caused by some power propagated from the first surface,
-which intermits and returns successively. Thus is every ray
-apart disposed to alternate reflections and transmissions at
-equal intervals; the successive returns of which disposition
-our author calls the fits of easy reflection, and of easy transmission.
-But these fits, which observe the same law of
-returning at equal intervals, whether the plates are viewed
-perpendicularly or obliquely, in different situations of the
-eye change their magnitude. For what was observed before
-in respect of those rings, which appear in open day-light,
-holds likewise in these rings exhibited by simple lights; namely,
-that these two alter in bigness according to the different
-angle under which they are seen: and our author<span class="pagenum"><a name="Page_374" id="Page_374">[374]</a></span>
-lays down a rule whereby to determine the thicknesses of
-the plate of air, which shall exhibit the same colour under
-different oblique views<a name="FNanchor_317_317" id="FNanchor_317_317"></a><a href="#Footnote_317_317" class="fnanchor">[317]</a>. And the thickness of the aereal
-plate, which in different inclinations of the rays will exhibit
-to the eye in open day-light the same colour, is also varied
-by the same rule<a name="FNanchor_318_318" id="FNanchor_318_318"></a><a href="#Footnote_318_318" class="fnanchor">[318]</a>.  He contrived farther a method
-of comparing in the bubble of water the proportion between
-the thickness of its coat, which exhibited any colour
-when seen perpendicularly, to the thickness of it, where the
-same colour appeared by an oblique view; and he found
-the same rule to obtain here likewise<a name="FNanchor_319_319" id="FNanchor_319_319"></a><a href="#Footnote_319_319" class="fnanchor">[319]</a>. But farther, if the
-glasses be enlightened successively by all the several species
-of light, the rings will appear of different magnitudes; in
-the red light they will be larger than in the orange colour,
-in that larger than in the yellow, in the yellow larger than
-in the green, less in the blue, less yet in the indigo, and
-least of all in the violet: which shew that the same thickness
-of the aereal plate is not fitted to reflect all colours, but
-that one colour is reflected where another would have been
-transmitted; and as the rays which are most strongly refracted
-form the least rings, a rule is laid down by our author
-for determining the relation, which the degree of refraction
-of each species of colour has to the thicknesses of
-the plate where it is reflected.</p>
-
-<p>15. <span class="smcap gesperrt">From</span> these observations our author shews the reason
-of that great variety of colours, which appears in these thin
-plates in the open white light of the day. For when this white<span class="pagenum"><a name="Page_375" id="Page_375">[375]</a></span>
-light falls on the plate, each part of the light forms rings of
-its own colour; and the rings of the different colours not
-being of the same bigness are variously intermixed, and form
-a great variety of tints<a name="FNanchor_320_320" id="FNanchor_320_320"></a><a href="#Footnote_320_320" class="fnanchor">[320]</a>.</p>
-
-<p><a name="c375a" id="c375a">16.</a> <span class="smcap gesperrt">In</span> certain experiments, which our author made with
-thick glasses, he found, that these fits of easy reflection and
-transmission returned for some thousands of times, and thereby
-farther confirmed his reasoning concerning them<a name="FNanchor_321_321" id="FNanchor_321_321"></a><a href="#Footnote_321_321" class="fnanchor">[321]</a>.</p>
-
-<p><a name="c375b" id="c375b">17.</a> <span class="smcap gesperrt">Upon</span> the whole, our great author concludes from
-some of the experiments made by him, that the reason why all
-transparent bodies refract part of the light incident upon them,
-and reflect another part, is, because some of the light, when it
-comes to the surface of the body, is in a fit of easy transmission,
-and some part of it in a fit of easy reflection; and from
-the durableness of these fits he thinks it probable, that the
-light is put into these fits from their first emission out of the
-luminous body; and that these fits continue to return at equal
-intervals without end, unless those intervals be changed
-by the light’s entring into some refracting substance<a name="FNanchor_322_322" id="FNanchor_322_322"></a><a href="#Footnote_322_322" class="fnanchor">[322]</a>. He
-likewise has taught how to determine the change which is
-made of the intervals of the fits of easy transmission and reflection,
-when the light passes out of one transparent space or
-substance into another. His rule is, that when the light passes
-perpendicularly to the surface, which parts any two transparent
-substances, these intervals in the substance, out of<span class="pagenum"><a name="Page_376" id="Page_376">[376]</a></span>
-which the light passes, bear to the intervals in the substance,
-whereinto the light enters, the same proportion, as the sine of
-incidence bears to the sine of refraction<a name="FNanchor_323_323" id="FNanchor_323_323"></a><a href="#Footnote_323_323" class="fnanchor">[323]</a>. It is farther to be
-observed, that though the fits of easy reflection return at constant
-intervals, yet the reflecting power never operates, but at
-or near a surface where the light would suffer refraction; and
-if the thickness of any transparent body shall be less than the
-intervals of the fits, those intervals shall scarce be disturbed by
-such a body, but the light shall pass through without any reflection<a name="FNanchor_324_324" id="FNanchor_324_324"></a><a href="#Footnote_324_324" class="fnanchor">[324]</a>.</p>
-
-<p><a name="c376" id="c376">18.</a> <span class="smcap gesperrt">What</span> the power in nature is, whereby this action
-between light and bodies is caused, our author has not discovered.
-But the effects, which he has discovered, of this
-power are very surprising, and altogether wide from any conjectures
-that had ever been framed concerning it; and from
-these discoveries of his no doubt this power is to be deduced,
-if we ever can come to the knowledge of it. Sir&nbsp;<span class="smcap">Isaac
-Newton</span> has in general hinted at his opinion concerning it;
-that probably it is owing to some very subtle and elastic substance
-diffused through the universe, in which such vibrations
-may be excited by the rays of light, as they pass through
-it, that shall occasion it to operate so differently upon the
-light in different places as to give rise to these alternate fits
-of reflection and transmission, of which we have now been
-speaking<a name="FNanchor_325_325" id="FNanchor_325_325"></a><a href="#Footnote_325_325" class="fnanchor">[325]</a>. He is of opinion, that such a substance may produce
-this and other effects also in nature, though it be so
-rare as not to give any sensible resistance to bodies in motion<a name="FNanchor_326_326" id="FNanchor_326_326"></a><a href="#Footnote_326_326" class="fnanchor">[326]</a>;<span class="pagenum"><a name="Page_377" id="Page_377">[377]</a></span>
-and therefore not inconsistent with what has been said
-above, that the planets move in spaces free from resistance<a name="FNanchor_327_327" id="FNanchor_327_327"></a><a href="#Footnote_327_327" class="fnanchor">[327]</a>.</p>
-
-<p><a name="c377a" id="c377a">19.</a> <span class="smcap gesperrt">In</span> order for the more full discovery of this action between
-light and bodies, our author began another set of experiments,
-wherein he found the light to be acted on as it passes
-near the edges of solid bodies; in particular all small bodies,
-such as the hairs of a man’s head or the like, held in a
-very small beam of the sun’s light, cast extremely broad shadows.
-And in one of these experiments the shadow was
-35 times the breadth of the body<a name="FNanchor_328_328" id="FNanchor_328_328"></a><a href="#Footnote_328_328" class="fnanchor">[328]</a>. These shadows are also
-observed to be bordered with colours<a name="FNanchor_329_329" id="FNanchor_329_329"></a><a href="#Footnote_329_329" class="fnanchor">[329]</a>. This our author calls
-the inflection of light; but as he informs us, that he was interrupted
-from prosecuting these experiments to any length, I need
-not detain my readers with a more particular account of them.</p>
-
-</div>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c377b" id="c377b"><em class="gesperrt"><span class="smcap">Chap. IV.</span></em></a><br />
-Of OPTIC GLASSES.</h2>
-
-<p class="drop-cap08">SIR <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> having deduced from his doctrine
-of light and colours a surprising improvement of telescopes,
-of which I intend here to give an account, I shall
-first premise something in general concerning those instruments.</p>
-
-<p><span class="pagenum"><a name="Page_378" id="Page_378">[378]</a></span></p>
-
-<p><a name="c378" id="c378">2.</a> <span class="smcap gesperrt">It</span> will be understood from what has been said above,
-that when light falls upon the surface of glass obliquely, after
-its entrance into the glass it is more inclined to the line
-drawn through the point of incidence perpendicular to that
-surface, than before. Suppose a ray of light issuing from the
-point A (in fig. 136) falls on a piece of glass B&nbsp;C&nbsp;D&nbsp;E, whose
-surface B&nbsp;C, whereon the ray falls, is of a spherical or globular
-figure, the center whereof is F. Let the ray proceed in
-the line A&nbsp;G falling on the surface B&nbsp;C in the point G, and draw
-F&nbsp;G&nbsp;H. Here the ray after its entrance into the glass will
-pass on in some line, as G&nbsp;I, more inclined toward the line F&nbsp;G&nbsp;H
-that the line A&nbsp;G is inclined thereto; for the line F&nbsp;G&nbsp;H is perpendicular
-to the surface B&nbsp;C in the point G. By this means,
-if a number of rays proceeding from any one point
-fall on a convex spherical surface of glass, they shall be
-inflected (as is represented in fig. 137,) so as to be gathered
-pretty close together about the line drawn through the center
-of the glass from the point, whence the rays proceed; which
-line henceforward we shall call the axis of the glass: or the
-point from whence the rays proceed may be so near the glass,
-that the rays shall after entring the glass still go on to spread
-themselves, but not so much as before; so that if the rays
-were to be continued backward (as in fig. 138,) they should
-gather together about the axis at a place more remote from
-the glass, than the point is, whence they actually proceed. In
-these and the following figures A denotes the point to which
-the rays are related before refraction, B the point to which they
-are directed afterwards, and C the center of the refracting surface.
-Here we may observe, that it is possible to form the glass of
-such a figure, that all the rays which proceed from one point<span class="pagenum"><a name="Page_379" id="Page_379">[379]</a></span>
-shall after refraction be reduced again exactly into one point on
-the axis of the glass. But in glasses of a spherical form though this
-does not happen; yet the rays, which fall within a moderate distance
-from the axis, will unite extremely near together. If the
-light fall on a concave spherical surface, after refraction it shall
-spread quicker than before (as in fig. 139,) unless the rays proceed
-from a point between the center and the surface of the glass. If
-we suppose the rays of light, which fall upon the glass, not to
-proceed from any point, but to move so as to tend all to some
-point in the axis of the glass beyond the surface; if the glass
-have a convex surface, the rays shall unite about the axis
-sooner, than otherwise they would do (as in fig. 140,) unless
-the point to which they tended was between the surface and
-the center of that surface. But if the surface be concave,
-they shall not meet so soon: nay perhaps converge. (See
-fig. 141 and 142.)</p>
-
-<p>5. <span class="smcap gesperrt">Farther</span>, because the light in passing out of glass into
-the air is turned by the refraction farther off from the
-line drawn through the point of incidence perpendicular to
-the refracting surface, than it was before; the light which
-spreads from a point shall by parting through a convex surface
-of glass into the air be made either to spread less than
-before (as in fig. 143,) or to gather about the axis beyond
-the glass (as in fig. 144.) But if the rays of light were proceeding
-to a point in the axis of the glass, they should by
-the refraction be made to unite sooner about that axis
-(as in fig. 145.) If the surface of the glass be concave, rays which
-proceed from a point shall be made to spread faster (as in
-fig 146,) but rays which are tending to a point in the axis of<span class="pagenum"><a name="Page_380" id="Page_380">[380]</a></span>
-the glass, shall be made to gather about the axis farther from
-the glass (as in fig. 147) or even to diverge (as in fig. 148,)
-unless the point, to which the rays are directed, lies between
-the surface of the glass and its center.</p>
-
-<p>4. <span class="smcap gesperrt">The</span> rays, which spread themselves from a point, are
-called diverging; and such as move toward a point, are called
-converging rays. And the point in the axis of the glass, about
-which the rays gather after refraction, is called the focus of
-those rays.</p>
-
-<p><a name="c380" id="c380">5.</a> <span class="smcap gesperrt">If</span> a glass be formed of two convex spherical surfaces
-(as in fig. 149,) where the glass AB is formed of the surfaces
-A&nbsp;C&nbsp;B and A&nbsp;D&nbsp;B, the line drawn through the centers of the
-two surfaces, as the line E&nbsp;F, is called the axis of the glass;
-and rays, which diverge from any point of this axis, by the
-refraction of the glass will be caused to converge toward some
-part of the axis, or at least to diverge as from a point more
-remote from the glass, than that from whence they proceeded;
-for the two surfaces both conspire to produce this effect
-upon the rays. But converging rays will be caused by such a
-glass as this to converge sooner. If a glass be formed of two
-concave surfaces, as the glass A&nbsp;B (in fig. 150,) the line C&nbsp;D
-drawn through the centers, to which the two surfaces are
-formed, is called the axis of the glass. Such a glass shall
-cause diverging rays, which proceed from any point in the
-axis of the glass, to diverge much more, as if they came from
-some place in the axis of the glass nearer to it than the point,
-whence the rays actually proceed. But converging rays will
-be made either to converge less, or even to diverge.</p>
-
-<div class="figcenter">
-     <img src="images/ill-449.jpg" width="400" height="519"
-         alt=""
-         title="" />
-</div>
-
-<p><span class="pagenum"><a name="Page_381" id="Page_381">[381]</a></span></p>
-
-<p><a name="c381" id="c381">6.</a> <span class="smcap gesperrt">In</span> these glasses rays, which proceed from any point
-near the axis, will be affected as it were in the same manner,
-as if they proceeded from the very axis it self, and such as
-converge toward a point at a small distance from the axis will
-suffer much the same effects from the glass, as if they converged to
-some point in the very axis. By this means any luminous body
-exposed to a convex glass may have an image formed upon
-any white body held beyond the glass. This may be easily
-tried with a common spectacle-glass. For if such a glass
-be held between a candle and a piece of white paper, if the
-distances of the candle, glass, and paper be properly adjusted,
-the image of the candle will appear very distinctly upon the
-paper, but be seen inverted; the reason whereof is this.
-Let A&nbsp;B (in fig. 151) be the glass, C&nbsp;D an object placed
-cross the axis of the glass. Let the rays of light, which issue
-from the point E, where the axis of the glass crosses the object,
-be so refracted by the glass, as to meet again about the
-point F. The rays, which diverge from the point C of the
-object, shall meet again almost at the same distance from
-the glass, but on the other side of the axis, as at G; for the
-rays at the glass cross the axis. In like manner the rays,
-which proceed from the point D, will meet about H on the
-other side of the axis. None of these rays, neither those
-which proceed from the point E in the axis, nor those which
-issue from C or D, will meet again exactly in one point; but
-yet in one place, as is here supposed at F, G, and H, they<span class="pagenum"><a name="Page_382" id="Page_382">[382]</a></span>
-will be crouded so close together, as to make a distinct
-image of the object upon any body proper to reflect it,
-which shall be held there.</p>
-
-<p>7. <span class="smcap gesperrt">If</span> the object be too near the glass for the rays to
-converge after the refraction, the rays shall issue out of the
-glass, as if they diverged from a point more distant from
-the glass, than that from whence they really proceed (as
-in fig. 152,) where the rays coming from the point E
-of the object, which lies on the axis of the glass A&nbsp;B, issue
-out of the glass, as if they came from the point F
-more remote from the glass than E; and the rays proceeding
-from the point C issue out of the glass, as if they proceeded
-from the point G; likewise the rays which issue
-from the point D emerge out of the glass, as if they came
-from the point H. Here the point G is on the same side
-of the axis, as the point C; and the point H on the same
-side, as the point D. In this case to an eye placed beyond
-the glass the object should appear, as if it were in the situation
-G&nbsp;F&nbsp;H.</p>
-
-<p>8. <span class="smcap gesperrt">If</span> the glass A&nbsp;B had been concave (as in, fig. 153,) to
-an eye beyond the glass the object C&nbsp;D would appear in
-the situation G&nbsp;H, nearer to the glass than really it is. Here
-also the object will not be inverted; but the point G is on
-the same side the axe with the point C, and H on the
-same side as D.</p>
-
-<p><span class="pagenum"><a name="Page_383" id="Page_383">[383]</a></span></p>
-
-<p>9. <span class="smcap gesperrt">Hence</span> may be understood, why spectacles made
-with convex glasses help the sight in old age: for the eye
-in that age becomes unfit to see objects distinctly, except
-such as are remov’d to a very great distance; whence all
-men, when they first stand in need of spectacles, are observed
-to read at arm’s length, and to hold the object at a
-greater distance, than they used to do before. But when an
-object is removed at too great a distance from the sight,
-it cannot be seen clearly, by reason that a less quantity of
-light from the object will enter the eye, and the whole
-object will also appear smaller. Now by help of a convex
-glass an object may be held near, and yet the rays of
-light issuing from it will enter the eye, as if the object
-were farther removed.</p>
-
-<p>10. <span class="smcap gesperrt">After</span> the same manner concave glasses assist such,
-as are short sighted. For these require the object to be
-brought inconveniently near to the eye, in order to their
-seeing it distinctly; but by such a glass the object may be
-removed to a proper distance, and yet the rays of light
-enter the eye, as if they came from a place much nearer.</p>
-
-<p><a name="c383" id="c383">11.</a> <span class="smcap gesperrt">Whence</span> these defects of the sight arise, that in
-old age objects cannot be seen distinct within a moderate
-distance, and in short-sightedness not without being brought
-too near, will be easily understood, when the manner of
-vision in general shall be explain’d; which I shall now endeavour
-to do, in order to be better understood in what<span class="pagenum"><a name="Page_384" id="Page_384">[384]</a></span>
-follows. The eye is form’d, as is represented in fig. 154.
-It is of a globular figure, the fore part whereof scarce
-more protuberant than the rest is transparent. Underneath
-this transparent part is a small collection of an humour in
-appearance like water, and it has also the same refractive
-power as common water; this is called the aqueous humour,
-and fills the space A&nbsp;B&nbsp;C&nbsp;D in the figure. Next beyond
-lies the body D&nbsp;E&nbsp;F&nbsp;G; this is solid but transparent, it is
-composed with two convex surfaces, the hinder surface E&nbsp;F&nbsp;G
-being more convex, than the anterior E&nbsp;D&nbsp;G. Between the
-outer membrane A&nbsp;B&nbsp;C, and this body E&nbsp;D&nbsp;G&nbsp;F is placed that
-membrane, which exhibits the colours, that are seen round
-the sight of the eye; and the black spot, which is called the
-sight or pupil, is a hole in this membrane, through which the
-light enters, whereby we see. This membrane is fixed only
-by its outward circuit, and has a muscular power, whereby
-it dilates the pupil in a weak light, and contracts it in
-a strong one. The body D&nbsp;E&nbsp;F&nbsp;G is called the crystalline
-humour, and has a greater refracting power than water.
-Behind this the bulk of the eye is filled up with what is
-called the vitreous humor, this has much the same refractive
-power with water. At the bottom of the eye toward
-the inner side next the nose the optic glass enters, as at
-H, and spreads it self all over the inside of the eye, till
-within a small diftance from A and C. Now any object, as
-I&nbsp;K, being placed before the eye, the rays of light issuing
-from each point of this object are so refracted by the convex
-surface of the aqueous humour, as to be caused to converge;
-after this being received by the convex surface E&nbsp;D&nbsp;G<span class="pagenum"><a name="Page_385" id="Page_385">[385]</a></span>
-of the crystalline humour, which has a greater refractive
-power than the aqueous, the rays, when they are entered
-into this surface, still more converge, and at going out of
-the surface E&nbsp;F&nbsp;G into a humour of a less refractive power
-than the crystalline they are made to converge yet farther. By
-all these successive refractions they are brought to converge at
-the bottom of the eye, so that a distinct image of the object
-as L&nbsp;M is impress’d on the nerve. And by this means
-the object is seen.</p>
-
-<p>11. <span class="smcap gesperrt">It</span> has been made a difficulty, that the image of
-the object impressed on the nerve is inverted, so that the
-upper part of the image is impressed on the lower part of
-the eye. But this difficulty, I think, can no longer remain,
-if we only consider, that upper and lower are terms
-merely relative to the ordinary position of our bodies:
-and our bodies, when view’d by the eye, have their image as
-much inverted as other objects; so that the image of our
-own bodies, and of other objects, are impressed on the eye
-in the same relation to one another, as they really have.</p>
-
-<p><a name="c385" id="c385">12.</a> <span class="smcap gesperrt">The</span> eye can see objects equally distinct at very
-different distances, but in one distance only at the same
-time.  That the eye may accomodate itself to different
-distances, some change in its humours is requir’d.  It is
-my opinion, that this change is made in the figure of the
-crystalline humour, as I have indeavoured to prove in another
-place.</p>
-
-<p><span class="pagenum"><a name="Page_386" id="Page_386">[386]</a></span></p>
-
-<p>13. <span class="smcap gesperrt">If</span> any of the humours of the eye are too flat,
-they will refract the light too little; which is the case in
-old age. If they are too convex, they refract too much;
-as in those who are short-sighted.</p>
-
-<p>14. <span class="smcap gesperrt">The</span> manner of direct vision being thus explained,
-I proceed to give some account of telescopes, by which we
-view more distinctly remote objects; and also of microscopes,
-whereby we magnify the appearance of small objects. In
-the first place, the most simple sort of telescope is composed
-of two glasses, either both convex, or one convex,
-and the other concave. (The first sort of these is represented
-in fig. 155, the latter in fig. 156.)</p>
-
-<p><a name="c386" id="c386">15.</a> <span class="smcap gesperrt">In</span> fig. 155 let A&nbsp;B represent the convex glass next
-the object, C&nbsp;D the other glass more convex near the eye.
-Suppose the object-glass A&nbsp;B to form the image of the object
-at E&nbsp;F; so that if a sheet of white paper were to be
-held in this place, the object would appear. Now suppose
-the rays, which pass the glass A&nbsp;B, and are united about
-F, to proceed to the eye glass C&nbsp;D, and be there refracted.
-Three only of these rays are drawn in the figure,
-those which pass by the extremities of the glass A&nbsp;B, and
-that which passes its middle. If the glass C&nbsp;D be
-placed at such a distance from the image E&nbsp;F, that the rays,
-which pass by the point F, after having proceeded through
-the glass diverge so much, as the rays do that come from
-an object, which is at such a distance from the eye as<span class="pagenum"><a name="Page_387" id="Page_387">[387]</a></span>
-to be seen distinctly, these being received by the eye will
-make on the bottom of the eye a distinct representation of
-the point F. In like manner the rays, which pass through
-the object glass A&nbsp;B to the point E after proceeding through
-the eye-glass C&nbsp;D will on the bottom of the eye make a
-distinct representation of the point E.  But if the eye be
-placed where these rays, which proceed from E, cross those,
-which proceed from F, the eye will receive the distinct impression
-of both these points at the same time; and consequently
-will also receive a distinct impression from all the
-intermediate parts of the image E&nbsp;F, that is, the eye will
-see the object, to which the telescope is directed, distinctly.
-The place of the eye is about the point G, where the rays
-H&nbsp;E, H&nbsp;F cross, which pass through the middle of the object-glass
-A&nbsp;B to the points E and F; or at the place where
-the focus would be formed by rays coming from the point
-H, and refracted by the glass C&nbsp;D.  To judge how much
-this instrument magnifies any object, we must first observe,
-that the angle under E&nbsp;H&nbsp;F, in which the eye at the point H
-would see the image E&nbsp;F, is nearly the same as the angle,
-under which the object appears by direct vision; but when
-the eye is in G, and views the object through the telescope,
-it sees the same under a greater angle; for the rays, which
-coming from E and F cross in G, make a greater angle than
-the rays, which proceed from the point H to these points E
-and F.  The angle at G is greater than that at H in the
-proportion, as the distance between the glasses A&nbsp;B and C&nbsp;D
-is greater than the distance of the point G from the glass
-C&nbsp;D.</p>
-
-<p><span class="pagenum"><a name="Page_388" id="Page_388">[388]</a></span></p>
-
-<p><a name="c388a" id="c388a">16.</a> <span class="smcap gesperrt">This</span> telescope inverts the object; for the rays, which
-came from the right-hand side of the object, go to the
-point E the left side of the image; and the rays, which
-come from the left side of the object, go to F the right
-side of the image. These rays cross again in G, so that
-the rays, which come from the right side of the object, go
-to the right side of the eye; and the rays from the left
-side of the object go to the left side of the eye. Therefore
-in this telescope the image in the eye has the same
-situation as the object; and seeing that in direct vision
-the image in the eye has an inverted situation, here, where
-the situation is not inverted, the object must appear so.
-This is no inconvenience to astronomers in celestial observations;
-but for objects here on the earth it is usual to add
-two other convex glasses, which may turn the object again
-(as is represented in fig. 157,) or else to use the other kind of
-telescope with a concave eye-glass.</p>
-
-<p><a name="c388b" id="c388b">17.</a> <span class="smcap gesperrt">In</span> this other kind of telescope the effect is founded
-on the same principles, as in the former. The distinctness
-of the appearance is procured in the same manner. But
-here the eye-glass C&nbsp;D (in fig. 156) is placed between the
-image E&nbsp;F, and the object glass A&nbsp;B. By this means the rays,
-which come from the right-hand side of the object, and proceed
-toward E the left side of the image, being intercepted
-by the eye-glass are carried to the left side of the eye; and
-the rays, which come from the left side of the object, go
-to the right side of the eye; so that the impression in the
-eye being inverted the object appears in the same situation,<span class="pagenum"><a name="Page_389" id="Page_389">[389]</a></span>
-as when view’d by the naked eye. The eye must here be
-placed close to the glass. The degree of magnifying in
-this instrument is thus to be found. Let the rays, which
-pass through the glass A&nbsp;B at H, after the refraction of
-the eye-glass C&nbsp;D diverge, as if they came from the point
-G; then the rays, which come from the extremities of the
-object, enter the eye under the angle at G; so that here
-also the object will be magnified in the proportion of the
-distance between the glasses, to the distance of G from
-the eye-glass.</p>
-
-<p>18. <span class="smcap gesperrt">The</span> space, that can be taken in at one view in
-this telescope, depends on the breadth of the pupil of the
-eye; for as the rays, which go to the points E, F of the
-image, are something distant from each other, when they
-come out of the glass C&nbsp;D, if they are wider asunder
-than the pupil, it is evident, that they cannot both enter
-the eye at once. In the other telescope the eye is placed
-in the point G, where the rays that come from the points
-E or F cross each other, and therefore must enter the eye
-together. On this account the telescope with convex glasses
-takes in a larger view, than those with concave. But in
-these also the extent of the view is limited, because the eye-glass
-does not by the refraction towards its edges form so
-distinct a representation of the object, as near the middle.</p>
-
-<p><a name="c389" id="c389">18.</a><span class="smcap">Microscopes</span> are of two sorts. One kind is only a
-very convex glass, by the means of which the object may
-be brought very near the eye, and yet be seen distinctly.<span class="pagenum"><a name="Page_390" id="Page_390">[390]</a></span>
-This microscope magnifies in proportion, as the object by
-being brought near the eye will form a broader impression
-on the optic nerve. The other kind made with convex
-glasses produces its effects in the same manner as the telescope.
-Let the object A&nbsp;B (in fig. 158) be placed under the glass C&nbsp;D,
-and by this glass let an image be formed of this object.
-Above this image let the glass G&nbsp;H be placed. By this glass
-let the rays, which proceed from the points A and B, be
-refracted, as is expressed in the figure.  In particular, let
-the rays, which from each of these points pass through the
-middle of the glass C&nbsp;D, cross in I, and there let the eye
-be placed. Here the object will appear larger, when seen
-through the microscope, than if that instrument were removed,
-in proportion as the angle, in which these rays cross
-in I, is greater than the angle, which the lines would make,
-that should be drawn from I to A and B; that is, in the
-proportion made up of the proportion of the distance of the
-object A&nbsp;B from I, to the distance of I from the glass G&nbsp;H;
-and of the proportion of the distance between the glasses,
-to the distance of the object A&nbsp;B from the glass C&nbsp;D.</p>
-
-
-<p><a name="c390" id="c390">19.</a> <span class="smcap gesperrt">I shall</span> now proceed to explain the imperfection in
-these instruments, occasioned by the different refrangibility of
-the light which comes from every object. This prevents the
-image of the object from being formed in the focus of the object
-glass with perfect distinctness; so that if the eye-glass magnify
-the image overmuch, the imperfections of it must be visible,
-and make the whole appear confused. Our author more fully
-to satisfy himself, that the different refrangibility of the<span class="pagenum"><a name="Page_391" id="Page_391">[391]</a></span>
-several sorts of rays is sufficient to produce this irregularity,
-underwent the labour of a very nice and difficult experiment,
-whose process he has at large set down, to prove,
-that the rays of light are refracted as differently in the small
-refraction of telescope glasses as in the larger of the prism;
-so exceeding careful has he been in searching out the true
-cause of this effect. And he used, I suppose, the greater
-caution, because another reason had before been generally
-assigned for it.  It was the opinion of all mathematicians,
-that this defect in telescopes arose from the figure, in
-which the glasses were formed; a spherical refracting surface
-not collecting into an exact point all the rays which
-come from any one point of an object, as has before been
-said<a name="FNanchor_330_330" id="FNanchor_330_330"></a><a href="#Footnote_330_330" class="fnanchor">[330]</a>.  But after our author has proved, that in these small
-refractions, as well as in greater, the sine of incidence into
-air out of glass, to the sine of refraction in the red-making
-rays, is as 50 to 77, and in the blue-making rays
-50 to 78; he proceeds to compare the inequalities of refraction
-arising from this different refrangibility of the rays,
-with the inequalities, which would follow from the figure
-of the glass, were light uniformly refracted. For this purpose
-he observes, that if rays issuing from a point so remote
-from the object glass of a telescope, as to be esteemed
-parallel, which is the case of the rays, which come from the
-heavenly bodies; then the distance from the glass of the
-point, in which the least refrangible rays are united, will
-be to the distance, at which the most refrangible rays unite,
-as 28 to 27; and therefore that the least space, into which<span class="pagenum"><a name="Page_392" id="Page_392">[392]</a></span>
-all the rays can be collected, will not be less than the 55th
-part of the breadth of the glass. For if A&nbsp;B (in fig. 159) be
-the glass, C&nbsp;D its axis, E&nbsp;A, F&nbsp;B two rays of the light parallel
-to that axis entring the glass near its edges; after refraction
-let the least refrangible part of these rays meet in G,
-the most refrangible in H; then, as has been said, G&nbsp;I will
-be to I&nbsp;H, as 28 to 27; that is, G&nbsp;H will be the 28th
-part of G&nbsp;I, and the 27th part of H&nbsp;I; whence if K&nbsp;L be
-drawn through G, and M&nbsp;N through H, perpendicular to
-C&nbsp;D, M&nbsp;N will be the a 28th part of A&nbsp;B, the breadth of
-the glass, and K&nbsp;L the 27th part of the same; so that O&nbsp;P
-the least space, into which the rays are gathered, will be
-about half the mean between these two, that is the 55th
-part of A&nbsp;B.</p>
-
-<p>20. <span class="smcap gesperrt">This</span> is the error arising from the different refrangibility
-of the rays of light, which our author finds
-vastly to exceed the other, consequent upon the figure of
-the glass. In particular, if the telescope glass be flat on
-one side, and convex on the other; when the flat side is
-turned towards the object, by a theorem, which he has
-laid down, the error from the figure comes out above 5000
-times less than the other. This other inequality is so
-great, that telescopes could not perform so well as they
-do, were it not that the light does not equally fill all the
-space O&nbsp;P, over which it is scattered, but is much more dense
-toward the middle of that space than at the extremities.
-And besides, all the kinds of rays affect not the sense equally
-strong, the yellow and orange being the strongest,
-the red and green next to them, the blue indigo and violet
-being much darker and fainter colours; and it is shewn
-that all the yellow and orange, and three fifths of the
-brighter half of the red next the orange, and as great a
-share of the brighter half of the green next the yellow,
-will be collected into a space whose breadth is not above
-the 250th part of the breadth of the glass.</p>
-
-<div class="figcenter">
-     <img src="images/ill-463.jpg" width="400" height="509"
-         alt=""
-         title="" />
-</div>
-
-<p><span class="pagenum"><a name="Page_393" id="Page_393">[393]</a></span></p>
-
-<p>And the remaining
-colours, which fall without this space, as they are
-much more dull and obscure than these, so will they be
-likewise much more diffused; and therefore call hardly affect
-the sense in comparison of the other. And agreeable
-to this is the observation of astronomers, that
-telescopes between twenty and sixty feet in length represent
-the fixed stars, as being about 5 or 6, at most
-about 8 or 10 seconds in diameter. Whereas other arguments
-shew us, that they do not really appear to us of any
-sensible magnitude any otherwise than as their light is
-dilated by refraction. One proof that the fixed stars do
-not appear to us under any sensible angle is, that when
-the moon passes over any of them, their light does not, like
-the planets on the same occasion, disappear by degrees, but
-vanishes at once.</p>
-
-<p><a name="c393" id="c393">21.</a> <span class="smcap gesperrt">Our</span> author being thus convinced, that telescopes
-were not capable of being brought to much greater perfection
-than at present by refractions, contrived one by reflection, in
-which there is no separation made of the different coloured
-light; for in every kind of light the rays after reflection
-have the same degree of inclination to the surface, from
-whence they are reflected, as they have at their incidence, so<span class="pagenum"><a name="Page_394" id="Page_394">[394]</a></span>
-that those rays which come to the surface in one line, will go
-off also in one line without any parting from one another. Accordingly
-in the attempt he succeeded so well, that a short
-one, not much exceeding six inches in length, equalled an ordinary
-telescope whose length was four feet. Instruments of
-this kind to greater lengths, have of late been made, which
-fully answer expectation<a name="FNanchor_331_331" id="FNanchor_331_331"></a><a href="#Footnote_331_331" class="fnanchor">[331]</a>.</p>
-
-</div>
-
-<div class="chapter">
-
-<h2 class="p4"><a name="c394a" id="c394a"><span class="smcap"><em class="gesperrt">Chap. V.</em></span></a><br />
-Of the RAINBOW.</h2>
-
-<p class="drop-cap00">I SHALL now explain the rainbow. The manner of its
-production was understood, in the general, before Sir
-<em class="gesperrt"><span class="smcap">Isaac Newton</span></em> had discovered his theory of colours; but
-what caused the diversity of colours in it could not then be
-known, which obliges him to explain this appearance particularly;
-whom we shall imitate as follows. The first person,
-who expressly shewed the rainbow to be formed by the
-reflection of the sun-beams from drops of falling rain,
-was <span class="smcap">Antonio de Dominis</span>. But this was afterwards
-more fully and distinctly explained by <span class="smcap">DesCartes</span>.</p>
-
-<p><a name="c394b" id="c394b">2.</a> <span class="smcap gesperrt">There</span> appears most frequently two rainbows; both
-of which are caused by the foresaid reflection of the sun-beams
-from the drops of falling rain, but are not produced
-by all the light which falls upon and are reflected
-from the drops. The inner bow is produced by those
-rays only which enter the drop, and at their entrance are
-so refracted as to unite into a point, as it were, upon the farther
-surface of the drop, as is represented in fig. 160;
-where the contiguous rays <i>a&nbsp;b</i>, <i>c&nbsp;d</i>, <i>e&nbsp;f</i>, coming from the<span class="pagenum"><a name="Page_395" id="Page_395">[395]</a></span>
-sun, and therefore to sense parallel, upon their entrance into
-the drop in the points <i>b, d, f</i>, are so refracted as to meet
-together in the point <i>g</i>, upon the farther surface of the drop.
-Now these rays being reflected nearly from the same point
-of the surface, the angle of incidence of each ray upon
-the point g being equal to the angle of reflection, the
-rays will return in the lines <i>g&nbsp;h, g&nbsp;k, g&nbsp;l</i>, in the same manner
-inclined to each other, as they were before their incidence
-upon the point <i>g</i>, and will make the same angles with
-the surface of the drop at the points <i>b, k, l</i>, as at the points
-<i>b, d, f</i>, after their entrance; and therefore after their emergence
-out of the drop each ray will be inclined to the surface
-in the same angle, as when it first entered it; whence
-the lines <i>b&nbsp;m, k&nbsp;n, l&nbsp;o</i>, in which the rays emerge, must be
-parallel to each other, as well as the lines <i>a&nbsp;b, c&nbsp;d, e&nbsp;f</i>, in
-which they were incident. But these emerging rays being
-parallel will not spread nor diverge from each other in
-their passage from the drop, and therefore will enter the
-eye conveniently situated in sufficient plenty to cause a
-sensation. Whereas all the other rays, whether those nearer
-the center of the drop, as <i>p&nbsp;q, r&nbsp;s</i>, or those farther off, as
-<i>t&nbsp;u, w&nbsp;x</i>, will be reflected from other points in the hinder
-surface of the drop; namely, the ray <i>p&nbsp;q</i> from the point
-<i>y, r&nbsp;s</i> from <i>z, t&nbsp;v</i> from α, and <i>w&nbsp;x</i> from β. And for this
-reason by their reflection and succeeding refraction they
-will be scattered after their emergence from the forementioned
-rays and from each other, and therefore cannot enter
-the eye placed to receive them copious enough to excite
-any distinct sensation.</p>
-
-<p><span class="pagenum"><a name="Page_396" id="Page_396">[396]</a></span></p>
-
-<p><a name="c396" id="c396">3.</a> <span class="smcap gesperrt">The</span> external rainbow is formed by two reflections
-made between the incidence and emergence of the rays;
-for it is to be noted, that the rays <i>g&nbsp;h, g&nbsp;k, g&nbsp;l</i>, at the
-points <i>h, k, l</i>, do not wholly pass out of the drop, but
-are in part reflected back; though the second reflection
-of these particular rays does not form the outer bow.
-For this bow is made by those rays, which after their entrance
-into the drop are by the refraction of it united, before
-they arrive at the farther surface, at such a distance from
-it, that when they fall upon that surface, they may be reflected
-in parallel lines, as is represented in fig. 161;
-where the rays <i>a&nbsp;b, c&nbsp;d, e&nbsp;f</i>, are collected by the refraction
-of the drop into the point <i>g</i>, and passing on from thence
-strike upon the surface of the drop in the points <i>h, k, l</i>, and
-are thence reflected to <i>m, n, o</i>, passing from <i>h</i> to <i>m</i>, from <i>k</i> to
-<i>n</i>, and from <i>l</i> to <i>o</i> in parallel lines. For these rays after
-reflection at <i>m, n, o</i>, will meet again in the point <i>p</i>, at
-the same distance from these points of reflection <i>m, n, o</i>,
-as the point <i>g</i> is from the former points of reflection <i>h,
-k, l</i>. Therefore these rays in passing from <i>p</i> to the surface
-of the drop will fall upon that surface in the points <i>q,
-r, s</i> in the same angles, as these rays made with the surface
-in <i>b, d, f</i>, after refraction. Consequently, when these rays
-emerge out of the drop into the air, each ray will make
-with the surface of the drop the same angle, as it made at
-its first incidence; so that the lines <i>q&nbsp;t, r&nbsp;v, s&nbsp;w</i>, in which
-they come from the drop, will be parallel to each other, as
-well as the lines <i>a&nbsp;b, c&nbsp;d, e&nbsp;f</i>, in which they came to the<span class="pagenum"><a name="Page_397" id="Page_397">[397]</a></span>
-drop. By this means these rays to a spectator commodiously
-situated will become visible. But all the other rays, as well
-those nearer the center of the drop <i>x&nbsp;y</i>, <i>z</i>&nbsp;α, as those more
-remote from it β&nbsp;γ, δ&nbsp;ε, will be reflected in lines not parallel
-to the lines <i>h&nbsp;m, k&nbsp;n, l&nbsp;o</i>; namely, the ray <i>x&nbsp;y</i>, in the
-line ζ&nbsp;η, the ray ϰ&nbsp;α in the line θ&nbsp;ϰ, the ray β&nbsp;γ in the line
-λ&nbsp;μ, and the ray δ&nbsp;ε in the line ν&nbsp;χ. Whence these rays
-after their next reflection and subsequent refraction will be
-scattered from the forementioned rays, and from one another,
-and by that means become invisible.</p>
-
-<p>4. <span class="smcap gesperrt">It</span> is farther to be remarked, that if in the first case
-the incident rays <i>a&nbsp;b, c&nbsp;d, e&nbsp;f</i>, and their correspondent emergent
-rays <i>h&nbsp;m, k&nbsp;n, l&nbsp;o</i>, are produced till they meet,
-they will make with each other a greater angle, than any
-other incident ray will make with its corresponding emergent
-ray. And in the latter case, on the contrary, the emergent
-rays <i>q&nbsp;t, r&nbsp;v, s&nbsp;w</i> make with the incident rays an
-acuter angle, than is made by any other of the emergent
-rays.</p>
-
-<p>5. <span class="smcap gesperrt">Our</span> author delivers a method of finding each of
-these extream angles from the degree of refraction being
-given; by which method it appears, that the first of these
-angles is the less, and the latter the greater, by how much
-the refractive power of the drop, or the refrangibility of
-the rays is greater. And this last consideration fully compleats
-the doctrine of the rainbow, and shews, why the colours
-of each bow are ranged in the order wherein they
-are seen.</p>
-
-<p><span class="pagenum"><a name="Page_398" id="Page_398">[398]</a></span></p>
-
-<p>6. <span class="smcap gesperrt">Suppose</span> A (in fig. 162.) to be the eye, B, C, D, E, F, drops
-of rain, M&nbsp;<i>n</i>, O&nbsp;<i>p</i>, Q&nbsp;<i>r</i>, S&nbsp;<i>t</i>, V&nbsp;<i>w</i> parcels of rays of the sun,
-which entring the drops B, C, D, E, F after one reflection
-pass out to the eye in A. Now let M&nbsp;<i>n</i> be produced to η
-till it meets with the emergent ray likewise produced, let
-O&nbsp;<i>p</i> produced meet its emergent ray produced in ϰ, let
-Q&nbsp;<i>r</i> meet its emergent ray in λ, let S&nbsp;<i>t</i> meet its emergent
-ray in μ, and let V&nbsp;<i>w</i> meet its emergent ray produced in ν. If
-the angle under M&nbsp;η&nbsp;A be that, which is derived from the
-refraction of the violet-making rays by the method we have
-here spoken of, it follows that the violet light will only
-enter the eye from the drop B, all the other coloured rays
-passing below it, that is, all those rays which are not
-scattered, but go out parallel so as to cause a sensation. For
-the angle, which these parallel emergent rays makes with
-the incident in the most refrangible or violet-making rays,
-being less than this angle in any other sort of rays, none of
-the rays which emerge parallel, except the violet-making,
-will enter the eye under the angle M&nbsp;η&nbsp;A, but the rest making
-with the incident ray M&nbsp;η a greater angle than this will
-pass below the eye. In like manner if the angle under O&nbsp;ϰ&nbsp;A
-agrees to the blue-making rays, the blue rays only shall enter
-the eye from the drop C, and all the other coloured rays
-will pass by the eye, the violet-coloured rays passing above,
-the other colours below. Farther, the angle Q&nbsp;λ&nbsp;A corresponding
-to the green-making rays, those only shall enter
-the eye from the drop D, the violet and blue-making rays
-passing above, and the other colours, that is the yellow and<span class="pagenum"><a name="Page_399" id="Page_399">[399]</a></span>
-red, below. And if the angle S&nbsp;μ&nbsp;A answers to the refraction
-of the yellow-making rays, they only shall come to
-the eye from the drop E. And in the last place, if the angle
-V&nbsp;ν&nbsp;A belongs to the red-making and least refrangible
-rays, they only shall enter the eye from the drop F, all the
-other coloured rays passing above.</p>
-
-<p>7. <span class="smcap gesperrt">But</span> now it is evident, that all the drops of water
-found in any of the lines A&nbsp;ϰ, A&nbsp;λ, A&nbsp;μ, A&nbsp;ν, whether farther
-from the eye, or nearer than the drops B, C, D, E, F, will
-give the same colours as these do, all the drops upon each
-line giving the same colour; so that the light reflected from
-a number of these drops will become copious enough to be
-visible; whereas the reflection from one minute drop alone
-could not be perceived. But besides, it is farther manifest,
-that if the line A&nbsp;Ξ be drawn from the sun through the eye,
-that is, parallel to the lines M&nbsp;<i>n</i>, O&nbsp;<i>p</i>, Q&nbsp;<i>r</i>, S&nbsp;<i>t</i>, V&nbsp;<i>w</i>, and
-if drops of water are placed all round this line, the same
-colour will be exhibited by all the drops at the same distance
-from this line. Hence it follows, that when the sun is
-moderately elevated above the horizon, if it rains opposite
-to it, and the sun shines upon the drops as they fall, a
-spectator with his back turned to the sun must observe a coloured
-circular arch reaching to the horizon, being red without,
-next to that yellow, then green, blue, and on the inner
-edge violet; only this last colour appears faint by being
-diluted with the white light of the clouds, and from another
-cause to be mentioned hereafter<a name="FNanchor_332_332" id="FNanchor_332_332"></a><a href="#Footnote_332_332" class="fnanchor">[332]</a>.</p>
-
-<p><span class="pagenum"><a name="Page_400" id="Page_400">[400]</a></span></p>
-
-<p>8. <span class="smcap gesperrt">Thus</span> is caused the interior or primary bow. The
-drops of rain at some distance without this bow will cause
-the exterior or secondary bow by two reflections of the sun’s
-light. Let these drops be G, H, I, K, L; X&nbsp;<i>y</i>, Z&nbsp;α, Γ&nbsp;β,
-Δ&nbsp;ι, Θ&nbsp;ζ denoting parcels of rays which enter each drop.
-Now it has been remarked, that these rays make with the
-visible refracted rays the greatest angle in those rays, which
-are most refrangible. Suppose therefore the visible refracted
-rays, which pass out from each drop after two reflections, and
-enter the eye in A, to intersect the incident rays in π, ρ, σ, τ,
-φ respectively. It is manifest, that the angle under Θ&nbsp;φ&nbsp;A is
-the greatest of all, next to that the angle under Δ&nbsp;τ&nbsp;A,
-the next in bigness will be the angle under Γ&nbsp;σ&nbsp;A, the next
-to this the angle under Z&nbsp;ρ&nbsp;A, and the least of all the angle
-under X&nbsp;π&nbsp;A. From the drop L therefore will come to
-the eye the violet-making, or most refrangible rays, from
-K the blue, from I the green, from H the yellow, and
-from G the red-making rays; and the like will happen to
-all the drops in the lines A&nbsp;π, A&nbsp;ρ, A&nbsp;τ, A&nbsp;φ, and also to all
-the drops at the same distances from the line A&nbsp;Ξ all round
-that line. Whence appears the reason of the secondary
-bow, which is seen without the other, having its colours
-in a contrary order, violet without and red within;
-though the colours are fainter than in the other bow, as being
-made by two reflections, and two refractions; whereas
-the other bow is made by two refractions, and one reflection
-only.</p>
-
-<p><span class="pagenum"><a name="Page_401" id="Page_401">[401]</a></span></p>
-
-<p><a name="c401" id="c401">9.</a> <span class="smcap gesperrt">There</span> is a farther appearance in the rainbow particularly
-described about five years ago<a name="FNanchor_333_333" id="FNanchor_333_333"></a><a href="#Footnote_333_333" class="fnanchor">[333]</a>, which is, that under the
-upper part or the inner bow there appears often two or
-three orders of very faint colours, making alternate arches
-of green, and a reddish purple. At the time this appearance
-was taken notice of, I gave my thoughts concerning the
-cause of it<a name="FNanchor_334_334" id="FNanchor_334_334"></a><a href="#Footnote_334_334" class="fnanchor">[334]</a>, which I shall here repeat. Sir <em class="gesperrt"><span class="smcap">Isaac Newton</span></em>
-has observed, that in glass, which is polished and quick-silvered,
-there is an irregular refraction made, whereby some
-small quantity of light is scattered from the principal reflected
-beam<a name="FNanchor_335_335" id="FNanchor_335_335"></a><a href="#Footnote_335_335" class="fnanchor">[335]</a>. If we allow the same thing to happen in the
-reflection whereby the rainbow is caused, it seems sufficient
-to produce the appearance now mentioned.</p>
-
-<p>10. <span class="smcap gesperrt">Let</span> A&nbsp;B (in fig. 162.) represent a globule of water,
-B the point from whence the rays of any determinate species
-being reflected to C, and afterwards emerging in the
-line C&nbsp;D, would proceed to the eye, and cause the appearance
-of that colour in the rainbow, which appertains to
-this species. Here suppose, that besides what is reflected regularly,
-some small part of the light is irregularly scattered
-every way; so that from the point B, besides the rays
-that are regularly reflected from B to C, some scattered rays
-will return in other lines, as in B&nbsp;E, B&nbsp;F, B&nbsp;G, B&nbsp;H, on
-each side the line B&nbsp;C. Now it has been observed above<a name="FNanchor_336_336" id="FNanchor_336_336"></a><a href="#Footnote_336_336" class="fnanchor">[336]</a>,
-that the rays of light in their passage from one superficies
-of a refracting body to the other undergo alternate fits of<span class="pagenum"><a name="Page_402" id="Page_402">[402]</a></span>
-easy transmission and reflection, succeeding each other at
-equal intervals; insomuch that if they reach the farther superficies
-in one sort of those fits, they shall be transmitted;
-if in the other kind of them, they shall rather be reflected
-back. Whence the rays that proceed from B to C, and
-emerge in the line C&nbsp;D, being in a fit of easy transmission,
-the scattered rays, that fall at a small distance without these
-on either side (suppose the rays that pass in the lines B&nbsp;E,
-B&nbsp;G) shall fall on the surface in a fit of easy reflection, and
-shall not emerge; but the scattered rays, that pass at some
-distance without these last, shall arrive at the surface of the
-globule in a fit of easy transmission, and break through that
-surface. Suppose these rays to pass in the lines B&nbsp;F, B&nbsp;H;
-the former of which rays shall have had one fit more of easy
-transmission, and the latter one fit less, than the rays that
-pass from B to C. Now both these rays, when they go out
-of the globule, will proceed by the refraction of the water
-In the lines F&nbsp;I, H&nbsp;K, that will be inclined almost equally to
-the rays incident on the globule, which come from the sun; but
-the angles of their inclination will be less than the angle, in
-which the rays emerging in the line C&nbsp;D are inclined to
-those incident rays. And after the same manner rays scattered
-from the point B at a certain distance without these
-will emerge out of the globule, while the intermediate rays
-are intercepted; and these emergent rays will be inclined
-to the rays incident on the globule in angles still less than
-the angles, in which the rays F&nbsp;I and H&nbsp;K are inclined to
-them; and without these rays will emerge other rays, that
-shall be inclined to the incident rays in angles yet less.</p>
-
-<div class="figcenter">
-     <img src="images/ill-475.jpg" width="400" height="515"
-         alt=""
-         title="" />
-</div>
-
-<p><span class="pagenum"><a name="Page_403" id="Page_403">[403]</a></span></p>
-
-<p>Now by this means may be formed of every kind of rays, besides
-the principal arch, which goes to the formation of the rainbow,
-other arches within every one of the principal of the
-same colour, though much more faint; and this for divers
-successions, as long as these weak lights, which in every
-arch grow more and more obscure, shall continue visible.
-Now as the arches produced by each colour will be variously
-mixed together, the diversity of colours observ’d in
-these secondary arches may very possibly arise from them.</p>
-
-<p>11. <span class="smcap gesperrt">In</span> the darker colours these arches may reach below
-the bow, and be seen distinct. In the brighter colours these
-arches are lost in the inferior part of the principal light of the
-rainbow; but in all probability they contribute to the red tincture,
-which the purple of the rainbow usually has, and is most
-remarkable when these secondary colours appear strongest.
-However these secondary arches in the brightest colours may
-possibly extend with a very faint light below the bow, and
-tinge the purple of these secondary arches with a reddish hue.</p>
-
-<p>12. <span class="smcap gesperrt">The</span> precise distances between the principal arch
-and these fainter arches depend on the magnitude of the
-drops, wherein they are formed. To make them any degree
-separate it is necessary the drop be exceeding small. It is
-most likely, that they are formed in the vapour of the cloud,
-which the air being put in motion by the fall of the rain
-may carry down along with the larger drops; and this may
-be the reason, why these colours appear under the upper<span class="pagenum"><a name="Page_404" id="Page_404">[404]</a></span>
-part of the bow only, this vapour not descending very low.
-As a farther confirmation of this, these colours are seen
-strongest, when the rain falls from very black clouds, which
-cause the fiercest rains, by the fall whereof the air will be
-most agitated.</p>
-
-<p>13. <span class="smcap gesperrt">To</span> the like alternate return of the fits of easy transmission
-and reflection in the passage of light through the
-globules of water, which compose the clouds, Sir <span class="smcap">Isaac
-Newton</span> ascribes some of those coloured circles, which
-at times appear about the sun and moon<a name="FNanchor_337_337" id="FNanchor_337_337"></a><a href="#Footnote_337_337" class="fnanchor">[337]</a>.</p>
-
-<div class="figcenter">
-     <img src="images/ill-478.jpg" width="300" height="176"
-         alt=""
-         title="" />
-</div>
-
-</div>
-
-<p><span class="pagenum"><a name="Page_405" id="Page_405">[405]</a></span></p>
-
-<div class="chapter">
-
-<div class="figcenter">
-     <img src="images/ill-479.jpg" width="400" height="204"
-         alt=""
-         title="" />
-</div>
-
-<h2 class="p4"><a name="c405" id="c405">CONCLUSION.</a></h2>
-
-<div>
-  <img class="dcap1" src="images/ds1.jpg" width="80" height="81" alt=""/>
-</div>
-<p class="cap13">SIR <em class="gesperrt"><span class="smcap">Isaac Newton</span></em> having concluded
-each of his philosophical treatises with
-some general reflections, I shall now
-take leave of my readers with a short
-account of what he has there delivered.
-At the end of his mathematical principles
-of natural philosophy he has
-given us his thoughts concerning the Deity. Wherein he
-first observes, that the similitude found in all parts of the
-universe makes it undoubted, that the whole is governed by
-one supreme being, to whom the original is owing of the
-frame of nature, which evidently is the effect of choice
-and design. He then proceeds briefly to state the best metaphysical
-notions concerning God. In short, we cannot
-conceive either of space or time otherwise than as necessarily<span class="pagenum"><a name="Page_406" id="Page_406">[406]</a></span>
-existing; this Being therefore, on whom all others depend,
-must certainly exist by the same necessity of nature.
-Consequently wherever space and time is found, there God
-must also be. And as it appears impossible to us, that space
-should be limited, or that time should have had a beginning,
-the Deity must be both immense and eternal.</p>
-
-<p>2. <span class="smcap gesperrt">At</span> the end of his treatise of optics he has proposed
-some thoughts concerning other parts of nature, which he
-had not distinctly searched into. He begins with some
-farther reflections concerning light, which he had not fully
-examined. In particular he declares his sentiments at large
-concerning the power, whereby bodies and light act on each
-other. In some parts of his book he had given short hints
-at his opinion concerning this<a name="FNanchor_338_338" id="FNanchor_338_338"></a><a href="#Footnote_338_338" class="fnanchor">[338]</a>, but here he expressly declares
-his conjecture, which we have already mentioned<a name="FNanchor_339_339" id="FNanchor_339_339"></a><a href="#Footnote_339_339" class="fnanchor">[339]</a>,
-that this power is lodged in a very subtle spirit of a great elastic
-force diffused thro’ the universe, producing not only this, but
-many other natural operations. He thinks it not impossible,
-that the power of gravity itself should be owing to it. On
-this occasion he enumerates many natural appearances, the
-chief of which are produced by chymical experiments. From
-numerous observations of this kind he makes no doubt, that
-the smallest parts of matter, when near contact, act strongly
-on each other, sometimes being mutually attracted, at other
-times repelled.</p>
-
-<p>3. <span class="smcap gesperrt">The</span> attractive power is more manifest than the other,
-for the parts of all bodies adhere by this principle. And the<span class="pagenum"><a name="Page_407" id="Page_407">[407]</a></span>
-name of attraction, which our author has given to it, has
-been very freely made use of by many writers, and as much
-objected to by others. He has often complained to
-me of having been misunderstood in this matter. What
-he lays upon this head was not intended by him as a philosophical
-explanation of any appearances, but only to point
-out a power in nature not hitherto distinctly observed, the
-cause of which, and the manner of its acting, he thought
-was worthy of a diligent enquiry. To acquiesce in the
-explanation of any appearance by asserting it to be a general
-power of attraction, is not to improve our knowledge in
-philosophy, but rather to put a stop to our farther search.</p>
-
-<p>FINIS.</p>
-
-<div class="figcenter">
-     <img src="images/ill-481.jpg" width="300" height="206"
-         alt=""
-         title="" />
-</div>
-
-<hr class="chap" />
-
-</div>
-
-<div class="chapter">
-
-<h2 class="p4">FOOTNOTES:</h2>
-
-<div class="footnotes">
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_1_1" id="Footnote_1_1"></a><a href="#FNanchor_1_1"><span class="label">[1]</span></a></span>
-Philosoph. Nat. princ. math. L. iii. introduct.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_2_2" id="Footnote_2_2"></a><a href="#FNanchor_2_2"><span class="label">[2]</span></a></span>
-Nov. Org. Scient. L. i. Aphorism. 9.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_3_3" id="Footnote_3_3"></a><a href="#FNanchor_3_3"><span class="label">[3]</span></a></span>
-Nov. Org. L. i. Aph. 19.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_4_4" id="Footnote_4_4"></a><a href="#FNanchor_4_4"><span class="label">[4]</span></a></span>
-Ibid. Aph. 25.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_5_5" id="Footnote_5_5"></a><a href="#FNanchor_5_5"><span class="label">[5]</span></a></span>
-Aph. 30. Errores radicales &amp; in prima digestione
-mentis ab excellentia functionum &amp; remediorum
-sequentium non curantur.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_6_6" id="Footnote_6_6"></a><a href="#FNanchor_6_6"><span class="label">[6]</span></a></span>
-Aph. 38.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_7_7" id="Footnote_7_7"></a><a href="#FNanchor_7_7"><span class="label">[7]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_8_8" id="Footnote_8_8"></a><a href="#FNanchor_8_8"><span class="label">[8]</span></a></span>
-Aph. 39.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_9_9" id="Footnote_9_9"></a><a href="#FNanchor_9_9"><span class="label">[9]</span></a></span>
-Aph. 41.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_10_10" id="Footnote_10_10"></a><a href="#FNanchor_10_10"><span class="label">[10]</span></a></span>
-Aph. 10, 24.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_11_11" id="Footnote_11_11"></a><a href="#FNanchor_11_11"><span class="label">[11]</span></a></span>
-Aph. 45.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_12_12" id="Footnote_12_12"></a><a href="#FNanchor_12_12"><span class="label">[12]</span></a></span>
-De Cartes Princ. Phil. Part. 3. §. 52.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_13_13" id="Footnote_13_13"></a><a href="#FNanchor_13_13"><span class="label">[13]</span></a></span>
-Fermat, in Oper. pag. 156, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_14_14" id="Footnote_14_14"></a><a href="#FNanchor_14_14"><span class="label">[14]</span></a></span>
-Nov. Org. Aph. 46.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_15_15" id="Footnote_15_15"></a><a href="#FNanchor_15_15"><span class="label">[15]</span></a></span>
-Aph. 50.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_16_16" id="Footnote_16_16"></a><a href="#FNanchor_16_16"><span class="label">[16]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_17_17" id="Footnote_17_17"></a><a href="#FNanchor_17_17"><span class="label">[17]</span></a></span>
-Aph 53.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_18_18" id="Footnote_18_18"></a><a href="#FNanchor_18_18"><span class="label">[18]</span></a></span>
-Aph. 54.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_19_19" id="Footnote_19_19"></a><a href="#FNanchor_19_19"><span class="label">[19]</span></a></span>
-Aph. 56.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_20_20" id="Footnote_20_20"></a><a href="#FNanchor_20_20"><span class="label">[20]</span></a></span>
-Aph. 55.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_21_21" id="Footnote_21_21"></a><a href="#FNanchor_21_21"><span class="label">[21]</span></a></span>
-Locke, On human understanding, B. iii.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_22_22" id="Footnote_22_22"></a><a href="#FNanchor_22_22"><span class="label">[22]</span></a></span>
-Nov. Org. Aph. 59.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_23_23" id="Footnote_23_23"></a><a href="#FNanchor_23_23"><span class="label">[23]</span></a></span>
-In the conclusion.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_24_24" id="Footnote_24_24"></a><a href="#FNanchor_24_24"><span class="label">[24]</span></a></span>
-Nov. Org. L. i. Aph. 59.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_25_25" id="Footnote_25_25"></a><a href="#FNanchor_25_25"><span class="label">[25]</span></a></span>
-Ibid. Aph. 60.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_26_26" id="Footnote_26_26"></a><a href="#FNanchor_26_26"><span class="label">[26]</span></a></span>
-Ibid. Aph. 62.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_27_27" id="Footnote_27_27"></a><a href="#FNanchor_27_27"><span class="label">[27]</span></a></span>
-Aph. 63.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_28_28" id="Footnote_28_28"></a><a href="#FNanchor_28_28"><span class="label">[28]</span></a></span>
-Aph. 64.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_29_29" id="Footnote_29_29"></a><a href="#FNanchor_29_29"><span class="label">[29]</span></a></span>
-Aph. 65.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_30_30" id="Footnote_30_30"></a><a href="#FNanchor_30_30"><span class="label">[30]</span></a></span>
-See above, § 4, 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_31_31" id="Footnote_31_31"></a><a href="#FNanchor_31_31"><span class="label">[31]</span></a></span>
-Nov. Org. L. i. Aph. 69.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_32_32" id="Footnote_32_32"></a><a href="#FNanchor_32_32"><span class="label">[32]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_33_33" id="Footnote_33_33"></a><a href="#FNanchor_33_33"><span class="label">[33]</span></a></span>
-Ibid. Aph. 109.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_34_34" id="Footnote_34_34"></a><a href="#FNanchor_34_34"><span class="label">[34]</span></a></span>
-Book III. Chap. iv.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_35_35" id="Footnote_35_35"></a><a href="#FNanchor_35_35"><span class="label">[35]</span></a></span>
-Book I. Chap. 2. § 14.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_36_36" id="Footnote_36_36"></a><a href="#FNanchor_36_36"><span class="label">[36]</span></a></span>
-Ibid. § 85, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_37_37" id="Footnote_37_37"></a><a href="#FNanchor_37_37"><span class="label">[37]</span></a></span>
-See Book II. Ch. 3. § 3, 4. of this treatise.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_38_38" id="Footnote_38_38"></a><a href="#FNanchor_38_38"><span class="label">[38]</span></a></span>
-See Book II. Ch. 3. of this treatise.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_39_39" id="Footnote_39_39"></a><a href="#FNanchor_39_39"><span class="label">[39]</span></a></span>
-See Chap. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_40_40" id="Footnote_40_40"></a><a href="#FNanchor_40_40"><span class="label">[40]</span></a></span>
-At the end of his Optics. in Qu. 21.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_41_41" id="Footnote_41_41"></a><a href="#FNanchor_41_41"><span class="label">[41]</span></a></span>
-See the same treatise, in Advertisement 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_42_42" id="Footnote_42_42"></a><a href="#FNanchor_42_42"><span class="label">[42]</span></a></span>
-Nov. Org. Lib. i. Ax. 105.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_43_43" id="Footnote_43_43"></a><a href="#FNanchor_43_43"><span class="label">[43]</span></a></span>
-Princip. philos. pag. 13, 14.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_44_44" id="Footnote_44_44"></a><a href="#FNanchor_44_44"><span class="label">[44]</span></a></span>
-Princ. Philos. L. II. prop. 24. corol. 7.  See also B. II. Ch. 5. § 3. of this treatise.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_45_45" id="Footnote_45_45"></a><a href="#FNanchor_45_45"><span class="label">[45]</span></a></span>
-How this degree of elasticity is to be found by experiment, will be shewn below in § 74.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_46_46" id="Footnote_46_46"></a><a href="#FNanchor_46_46"><span class="label">[46]</span></a></span>
- In oper. posthum de Motu corpor. ex percussion. prop. 9.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_47_47" id="Footnote_47_47"></a><a href="#FNanchor_47_47"><span class="label">[47]</span></a></span>
- In the above-cited place.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_48_48" id="Footnote_48_48"></a><a href="#FNanchor_48_48"><span class="label">[48]</span></a></span>
-In the place above-cited.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_49_49" id="Footnote_49_49"></a><a href="#FNanchor_49_49"><span class="label">[49]</span></a></span>
-These experiments are described in § 73.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_50_50" id="Footnote_50_50"></a><a href="#FNanchor_50_50"><span class="label">[50]</span></a></span>
-Book II. Chap. 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_51_51" id="Footnote_51_51"></a><a href="#FNanchor_51_51"><span class="label">[51]</span></a></span>
-Chap. 1. § 25, 26, 27, compared with § 15, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_52_52" id="Footnote_52_52"></a><a href="#FNanchor_52_52"><span class="label">[52]</span></a></span>
-Book II. Chap. 5. § 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_53_53" id="Footnote_53_53"></a><a href="#FNanchor_53_53"><span class="label">[53]</span></a></span>
-See Euclid’s Elements, Book XII. prop. 13.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_54_54" id="Footnote_54_54"></a><a href="#FNanchor_54_54"><span class="label">[54]</span></a></span>
-Archimed. de æquipond. prop. 11.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_55_55" id="Footnote_55_55"></a><a href="#FNanchor_55_55"><span class="label">[55]</span></a></span>
-Ibid. prop. 12.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_56_56" id="Footnote_56_56"></a><a href="#FNanchor_56_56"><span class="label">[56]</span></a></span>
-Lucas Valerius De centr. gravit. solid. L. I.
-prop. 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_57_57" id="Footnote_57_57"></a><a href="#FNanchor_57_57"><span class="label">[57]</span></a></span>
-Idem L. II. prop. 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_58_58" id="Footnote_58_58"></a><a href="#FNanchor_58_58"><span class="label">[58]</span></a></span>
-§ 25.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_59_59" id="Footnote_59_59"></a><a href="#FNanchor_59_59"><span class="label">[59]</span></a></span>
-§ 27.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_60_60" id="Footnote_60_60"></a><a href="#FNanchor_60_60"><span class="label">[60]</span></a></span>
-Pag. 65, 68.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_61_61" id="Footnote_61_61"></a><a href="#FNanchor_61_61"><span class="label">[61]</span></a></span>
-§ 23.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_62_62" id="Footnote_62_62"></a><a href="#FNanchor_62_62"><span class="label">[62]</span></a></span>
-§ 20</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_63_63" id="Footnote_63_63"></a><a href="#FNanchor_63_63"><span class="label">[63]</span></a></span>
-§ 17.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_64_64" id="Footnote_64_64"></a><a href="#FNanchor_64_64"><span class="label">[64]</span></a></span>
-§ 27.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_65_65" id="Footnote_65_65"></a><a href="#FNanchor_65_65"><span class="label">[65]</span></a></span>
-Hugen. Horolog. oscillat. pag. 141, 142.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_66_66" id="Footnote_66_66"></a><a href="#FNanchor_66_66"><span class="label">[66]</span></a></span>
-See Hugen. Horolog. Oscillat. p. 142.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_67_67" id="Footnote_67_67"></a><a href="#FNanchor_67_67"><span class="label">[67]</span></a></span>
-Princip. Philos. pag. 22.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_68_68" id="Footnote_68_68"></a><a href="#FNanchor_68_68"><span class="label">[68]</span></a></span>
-Chap. 1. § 29.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_69_69" id="Footnote_69_69"></a><a href="#FNanchor_69_69"><span class="label">[69]</span></a></span>
-Princip. Philos. pag. 25.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_70_70" id="Footnote_70_70"></a><a href="#FNanchor_70_70"><span class="label">[70]</span></a></span>
-§ 71.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_71_71" id="Footnote_71_71"></a><a href="#FNanchor_71_71"><span class="label">[71]</span></a></span>
-See Method. Increment. prop. 25.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_72_72" id="Footnote_72_72"></a><a href="#FNanchor_72_72"><span class="label">[72]</span></a></span>
-Lib. XI. Def.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_73_73" id="Footnote_73_73"></a><a href="#FNanchor_73_73"><span class="label">[73]</span></a></span>
-Chap. 2. § 17.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_74_74" id="Footnote_74_74"></a><a href="#FNanchor_74_74"><span class="label">[74]</span></a></span>
-See above Ch. 2. § 17.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_75_75" id="Footnote_75_75"></a><a href="#FNanchor_75_75"><span class="label">[75]</span></a></span>
-From B II. Ch. 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_76_76" id="Footnote_76_76"></a><a href="#FNanchor_76_76"><span class="label">[76]</span></a></span>
-Prin. Philos. pag. 7, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_77_77" id="Footnote_77_77"></a><a href="#FNanchor_77_77"><span class="label">[77]</span></a></span>
-See Newton, princip. philos. pag. 9. lin. 30.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_78_78" id="Footnote_78_78"></a><a href="#FNanchor_78_78"><span class="label">[78]</span></a></span>
-Princip. Philos. pag. 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_79_79" id="Footnote_79_79"></a><a href="#FNanchor_79_79"><span class="label">[79]</span></a></span>
-Renat. Des Cart. Princ. Philos. Part. II. § 25.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_80_80" id="Footnote_80_80"></a><a href="#FNanchor_80_80"><span class="label">[80]</span></a></span>
-Ibid. § 30.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_81_81" id="Footnote_81_81"></a><a href="#FNanchor_81_81"><span class="label">[81]</span></a></span>
-§ 85, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_82_82" id="Footnote_82_82"></a><a href="#FNanchor_82_82"><span class="label">[82]</span></a></span>
-Princip. Philos. Lib. I. prop. 9.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_83_83" id="Footnote_83_83"></a><a href="#FNanchor_83_83"><span class="label">[83]</span></a></span>
-§ 92.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_84_84" id="Footnote_84_84"></a><a href="#FNanchor_84_84"><span class="label">[84]</span></a></span>
-Ch. II. § 22.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_85_85" id="Footnote_85_85"></a><a href="#FNanchor_85_85"><span class="label">[85]</span></a></span>
-Viz. L. I. prop. 30, 29, &amp; 26.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_86_86" id="Footnote_86_86"></a><a href="#FNanchor_86_86"><span class="label">[86]</span></a></span>
- Ch. II. § 21, 22.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_87_87" id="Footnote_87_87"></a><a href="#FNanchor_87_87"><span class="label">[87]</span></a></span>
-viz. His doctrine of prime and ultimate ratios.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_88_88" id="Footnote_88_88"></a><a href="#FNanchor_88_88"><span class="label">[88]</span></a></span>
-§ 57</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_89_89" id="Footnote_89_89"></a><a href="#FNanchor_89_89"><span class="label">[89]</span></a></span>
-§ 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_90_90" id="Footnote_90_90"></a><a href="#FNanchor_90_90"><span class="label">[90]</span></a></span>
-Ch. 2. § 22.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_91_91" id="Footnote_91_91"></a><a href="#FNanchor_91_91"><span class="label">[91]</span></a></span>
-§ 12.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_92_92" id="Footnote_92_92"></a><a href="#FNanchor_92_92"><span class="label">[92]</span></a></span>
-Ch. 1. sect. 21, 22.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_93_93" id="Footnote_93_93"></a><a href="#FNanchor_93_93"><span class="label">[93]</span></a></span>
-Elem. Book I. p. 37.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_94_94" id="Footnote_94_94"></a><a href="#FNanchor_94_94"><span class="label">[94]</span></a></span>
-§ 12.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_95_95" id="Footnote_95_95"></a><a href="#FNanchor_95_95"><span class="label">[95]</span></a></span>
-Ch 1 § 24.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_96_96" id="Footnote_96_96"></a><a href="#FNanchor_96_96"><span class="label">[96]</span></a></span>
-Ch 2 select. 17.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_97_97" id="Footnote_97_97"></a><a href="#FNanchor_97_97"><span class="label">[97]</span></a></span>
-Newt. Princ. L. II. prop. 2; 5, 6, 7; 11, 12.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_98_98" id="Footnote_98_98"></a><a href="#FNanchor_98_98"><span class="label">[98]</span></a></span>
-Prop. 3; 8, 9; 13, 14.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_99_99" id="Footnote_99_99"></a><a href="#FNanchor_99_99"><span class="label">[99]</span></a></span>
-Prop. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_100_100" id="Footnote_100_100"></a><a href="#FNanchor_100_100"><span class="label">[100]</span></a></span>
-Prælect. Geometr. pag. 123.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_101_101" id="Footnote_101_101"></a><a href="#FNanchor_101_101"><span class="label">[101]</span></a></span>
-Newton. Princ. Lib. II. prop. 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_102_102" id="Footnote_102_102"></a><a href="#FNanchor_102_102"><span class="label">[102]</span></a></span>
-Newton. Princ. Lib II. prop 10. in schol.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_103_103" id="Footnote_103_103"></a><a href="#FNanchor_103_103"><span class="label">[103]</span></a></span>
-Torricelli de motu gravium.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_104_104" id="Footnote_104_104"></a><a href="#FNanchor_104_104"><span class="label">[104]</span></a></span>
-Ch. 2 § 85, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_105_105" id="Footnote_105_105"></a><a href="#FNanchor_105_105"><span class="label">[105]</span></a></span>
-Newt. Princ L. II. sect 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_106_106" id="Footnote_106_106"></a><a href="#FNanchor_106_106"><span class="label">[106]</span></a></span>
-L. II. sect. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_107_107" id="Footnote_107_107"></a><a href="#FNanchor_107_107"><span class="label">[107]</span></a></span>
-See B. II. Ch 6. § 7. of this treatise.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_108_108" id="Footnote_108_108"></a><a href="#FNanchor_108_108"><span class="label">[108]</span></a></span>
-Lib. I. sect. 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_109_109" id="Footnote_109_109"></a><a href="#FNanchor_109_109"><span class="label">[109]</span></a></span>
-De la Pesanteur, pag. 169, and the following.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_110_110" id="Footnote_110_110"></a><a href="#FNanchor_110_110"><span class="label">[110]</span></a></span>
-Newton. Princ. L. II. prop 4. schol.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_111_111" id="Footnote_111_111"></a><a href="#FNanchor_111_111"><span class="label">[111]</span></a></span>
-See his Tract on the admirable rarifaction of
-the air.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_112_112" id="Footnote_112_112"></a><a href="#FNanchor_112_112"><span class="label">[112]</span></a></span>
-Book II. Ch. 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_113_113" id="Footnote_113_113"></a><a href="#FNanchor_113_113"><span class="label">[113]</span></a></span>
-Princ. philos. Lib. II. prop. 23.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_114_114" id="Footnote_114_114"></a><a href="#FNanchor_114_114"><span class="label">[114]</span></a></span>
-Book I. Ch. 2. § 30.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_115_115" id="Footnote_115_115"></a><a href="#FNanchor_115_115"><span class="label">[115]</span></a></span>
-Princ. philos. Lib. II. prop. 23, in schol.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_116_116" id="Footnote_116_116"></a><a href="#FNanchor_116_116"><span class="label">[116]</span></a></span>
-Princ. philos. Lib. II. prop. 33. coroll.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_117_117" id="Footnote_117_117"></a><a href="#FNanchor_117_117"><span class="label">[117]</span></a></span>
-Lib. II. Ch. 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_118_118" id="Footnote_118_118"></a><a href="#FNanchor_118_118"><span class="label">[118]</span></a></span>
-Ibid. Prop. 35. coroll. 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_119_119" id="Footnote_119_119"></a><a href="#FNanchor_119_119"><span class="label">[119]</span></a></span>
-Ibid. coroll. 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_120_120" id="Footnote_120_120"></a><a href="#FNanchor_120_120"><span class="label">[120]</span></a></span>
-Vid. ibid. coroll. 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_121_121" id="Footnote_121_121"></a><a href="#FNanchor_121_121"><span class="label">[121]</span></a></span>
-In § 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_122_122" id="Footnote_122_122"></a><a href="#FNanchor_122_122"><span class="label">[122]</span></a></span>
-Princ. philos. Lib. II. Prop. 35.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_123_123" id="Footnote_123_123"></a><a href="#FNanchor_123_123"><span class="label">[123]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_124_124" id="Footnote_124_124"></a><a href="#FNanchor_124_124"><span class="label">[124]</span></a></span>
-Id.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_125_125" id="Footnote_125_125"></a><a href="#FNanchor_125_125"><span class="label">[125]</span></a></span>
-h. 1. § 29.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_126_126" id="Footnote_126_126"></a><a href="#FNanchor_126_126"><span class="label">[126]</span></a></span>
-Princ. philos. Lib. II. Prop. 38, compared with
-coroll. 1 of prop. 35.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_127_127" id="Footnote_127_127"></a><a href="#FNanchor_127_127"><span class="label">[127]</span></a></span>
-L. II. Lem. 7. schol. pag. 341.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_128_128" id="Footnote_128_128"></a><a href="#FNanchor_128_128"><span class="label">[128]</span></a></span>
-Lib. II. Prop. 34.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_129_129" id="Footnote_129_129"></a><a href="#FNanchor_129_129"><span class="label">[129]</span></a></span>
-Lib. II. Lem. 7. p. 341.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_130_130" id="Footnote_130_130"></a><a href="#FNanchor_130_130"><span class="label">[130]</span></a></span>
-Schol. to Lem. 7.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_131_131" id="Footnote_131_131"></a><a href="#FNanchor_131_131"><span class="label">[131]</span></a></span>
-Prop. 34. schol.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_132_132" id="Footnote_132_132"></a><a href="#FNanchor_132_132"><span class="label">[132]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_133_133" id="Footnote_133_133"></a><a href="#FNanchor_133_133"><span class="label">[133]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_134_134" id="Footnote_134_134"></a><a href="#FNanchor_134_134"><span class="label">[134]</span></a></span>
-Book II. Ch. I. § 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_135_135" id="Footnote_135_135"></a><a href="#FNanchor_135_135"><span class="label">[135]</span></a></span>
-Vid. Newt. princ. in schol. to Lem. 7, of
-Lib. II. pag. 341.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_136_136" id="Footnote_136_136"></a><a href="#FNanchor_136_136"><span class="label">[136]</span></a></span>
-Sect. 17. of this chapter.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_137_137" id="Footnote_137_137"></a><a href="#FNanchor_137_137"><span class="label">[137]</span></a></span>
-See Princ. philos. Lib. II. prop. 34.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_138_138" id="Footnote_138_138"></a><a href="#FNanchor_138_138"><span class="label">[138]</span></a></span>
-Vid. Princ. philos. Lib. II. Lem. 5. p. 314.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_139_139" id="Footnote_139_139"></a><a href="#FNanchor_139_139"><span class="label">[139]</span></a></span>
-Lemm. 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_140_140" id="Footnote_140_140"></a><a href="#FNanchor_140_140"><span class="label">[140]</span></a></span>
-Ibid. 7.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_141_141" id="Footnote_141_141"></a><a href="#FNanchor_141_141"><span class="label">[141]</span></a></span>
- Newt. Princ. Lib. II. prop. 40, in schol.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_142_142" id="Footnote_142_142"></a><a href="#FNanchor_142_142"><span class="label">[142]</span></a></span>
- Lib. II. in schol. post prop. 31.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_143_143" id="Footnote_143_143"></a><a href="#FNanchor_143_143"><span class="label">[143]</span></a></span>
-Book I. ch. 2 § 82.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_144_144" id="Footnote_144_144"></a><a href="#FNanchor_144_144"><span class="label">[144]</span></a></span>
-Book I. Ch. 3 § 29.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_145_145" id="Footnote_145_145"></a><a href="#FNanchor_145_145"><span class="label">[145]</span></a></span>
-Ch. 3. of this present book.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_146_146" id="Footnote_146_146"></a><a href="#FNanchor_146_146"><span class="label">[146]</span></a></span>
-Ch. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_147_147" id="Footnote_147_147"></a><a href="#FNanchor_147_147"><span class="label">[147]</span></a></span>
-In Princ. philos. part. 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_148_148" id="Footnote_148_148"></a><a href="#FNanchor_148_148"><span class="label">[148]</span></a></span>
-Philos. princ. mathem.  Lib. II. prop. 2. &amp; schol.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_149_149" id="Footnote_149_149"></a><a href="#FNanchor_149_149"><span class="label">[149]</span></a></span>
-Ibid. prop 53.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_150_150" id="Footnote_150_150"></a><a href="#FNanchor_150_150"><span class="label">[150]</span></a></span>
-Philos. princ. prop. 52. coroll. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_151_151" id="Footnote_151_151"></a><a href="#FNanchor_151_151"><span class="label">[151]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_152_152" id="Footnote_152_152"></a><a href="#FNanchor_152_152"><span class="label">[152]</span></a></span>
-Coroll. 11.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_153_153" id="Footnote_153_153"></a><a href="#FNanchor_153_153"><span class="label">[153]</span></a></span>
-See ibid. schol. post prop. 53.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_154_154" id="Footnote_154_154"></a><a href="#FNanchor_154_154"><span class="label">[154]</span></a></span>
-Princ. philos. pag. 316, 317.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_155_155" id="Footnote_155_155"></a><a href="#FNanchor_155_155"><span class="label">[155]</span></a></span>
-Ch. I. § 7.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_156_156" id="Footnote_156_156"></a><a href="#FNanchor_156_156"><span class="label">[156]</span></a></span>
-Book I. Ch. 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_157_157" id="Footnote_157_157"></a><a href="#FNanchor_157_157"><span class="label">[157]</span></a></span>
-Book I. Ch. 3. § 29.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_158_158" id="Footnote_158_158"></a><a href="#FNanchor_158_158"><span class="label">[158]</span></a></span>
-Ibid. Ch. 2. § 30, 17.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_159_159" id="Footnote_159_159"></a><a href="#FNanchor_159_159"><span class="label">[159]</span></a></span>
-Book I. Ch. 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_160_160" id="Footnote_160_160"></a><a href="#FNanchor_160_160"><span class="label">[160]</span></a></span>
-Ch. 1. § 7.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_161_161" id="Footnote_161_161"></a><a href="#FNanchor_161_161"><span class="label">[161]</span></a></span>
-Chap. 5. § 8.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_162_162" id="Footnote_162_162"></a><a href="#FNanchor_162_162"><span class="label">[162]</span></a></span>
-Princ. pag. 60.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_163_163" id="Footnote_163_163"></a><a href="#FNanchor_163_163"><span class="label">[163]</span></a></span>
-Street, in Astron. Carolin.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_164_164" id="Footnote_164_164"></a><a href="#FNanchor_164_164"><span class="label">[164]</span></a></span>
-See Chap. 5. §9, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_165_165" id="Footnote_165_165"></a><a href="#FNanchor_165_165"><span class="label">[165]</span></a></span>
-In the foregoing page.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_166_166" id="Footnote_166_166"></a><a href="#FNanchor_166_166"><span class="label">[166]</span></a></span>
-See Newton. Princ. Lib. III. prop. 13.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_167_167" id="Footnote_167_167"></a><a href="#FNanchor_167_167"><span class="label">[167]</span></a></span>
-Chap. 5. § 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_168_168" id="Footnote_168_168"></a><a href="#FNanchor_168_168"><span class="label">[168]</span></a></span>
-Princ. Lib. I. prop. 60.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_169_169" id="Footnote_169_169"></a><a href="#FNanchor_169_169"><span class="label">[169]</span></a></span>
-Book I, Chap. 2. § 80.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_170_170" id="Footnote_170_170"></a><a href="#FNanchor_170_170"><span class="label">[170]</span></a></span>
-Princ. philos. Lib. I. prop. 58. coroll. 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_171_171" id="Footnote_171_171"></a><a href="#FNanchor_171_171"><span class="label">[171]</span></a></span>
-Newt. Optics. pag. 378.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_172_172" id="Footnote_172_172"></a><a href="#FNanchor_172_172"><span class="label">[172]</span></a></span>
-Newton. Princ. Lib. III. prop. 1.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_173_173" id="Footnote_173_173"></a><a href="#FNanchor_173_173"><span class="label">[173]</span></a></span>
-Newton, Princ. Lib. III. pag. 390,391. compared
-with pag. 393.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_174_174" id="Footnote_174_174"></a><a href="#FNanchor_174_174"><span class="label">[174]</span></a></span>
-Book I. Ch. 3. § 29.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_175_175" id="Footnote_175_175"></a><a href="#FNanchor_175_175"><span class="label">[175]</span></a></span>
-Princ. philos. Lib. I. prop. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_176_176" id="Footnote_176_176"></a><a href="#FNanchor_176_176"><span class="label">[176]</span></a></span>
-Ibid. coroll.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_177_177" id="Footnote_177_177"></a><a href="#FNanchor_177_177"><span class="label">[177]</span></a></span>
- Newt. Princ. philos. Lib. III. pag. 390.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_178_178" id="Footnote_178_178"></a><a href="#FNanchor_178_178"><span class="label">[178]</span></a></span>
-Newt. Princ. philos. Lib. III. pag. 391, 392.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_179_179" id="Footnote_179_179"></a><a href="#FNanchor_179_179"><span class="label">[179]</span></a></span>
-Book III. Ch. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_180_180" id="Footnote_180_180"></a><a href="#FNanchor_180_180"><span class="label">[180]</span></a></span>
-Newt. Princ. philos. Lib. III. pag. 391.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_181_181" id="Footnote_181_181"></a><a href="#FNanchor_181_181"><span class="label">[181]</span></a></span>
-Ibid. pag. 392.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_182_182" id="Footnote_182_182"></a><a href="#FNanchor_182_182"><span class="label">[182]</span></a></span>
-See Book I. Ch. 2. § 60, 64.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_183_183" id="Footnote_183_183"></a><a href="#FNanchor_183_183"><span class="label">[183]</span></a></span>
-Book I. Ch. 2. § 17.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_184_184" id="Footnote_184_184"></a><a href="#FNanchor_184_184"><span class="label">[184]</span></a></span>
-See Ch. II. § 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_185_185" id="Footnote_185_185"></a><a href="#FNanchor_185_185"><span class="label">[185]</span></a></span>
-The second of the laws of motion laid down in Book I. Ch. 1.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_186_186" id="Footnote_186_186"></a><a href="#FNanchor_186_186"><span class="label">[186]</span></a></span>
-Newton. Princ. philos. Lib. III. prop. 6. pag. 401.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_187_187" id="Footnote_187_187"></a><a href="#FNanchor_187_187"><span class="label">[187]</span></a></span>
-Newton’s Princ. philos. Lib. III. prop. 22, 23.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_188_188" id="Footnote_188_188"></a><a href="#FNanchor_188_188"><span class="label">[188]</span></a></span>
-Newton. Princ. Lib. I. prop. 66. coroll. 7.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_189_189" id="Footnote_189_189"></a><a href="#FNanchor_189_189"><span class="label">[189]</span></a></span>
-Menelai Sphaeric. Lib. I. prop. 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_190_190" id="Footnote_190_190"></a><a href="#FNanchor_190_190"><span class="label">[190]</span></a></span>
-Vid. Newt. Princ. Lib. I. prop. 66. coroll. 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_191_191" id="Footnote_191_191"></a><a href="#FNanchor_191_191"><span class="label">[191]</span></a></span>
-Vid. Newt. Princ. Lib. III prop. 30. p. 440.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_192_192" id="Footnote_192_192"></a><a href="#FNanchor_192_192"><span class="label">[192]</span></a></span>
-Ibid. Lib. I. prop. 66. coroll. 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_193_193" id="Footnote_193_193"></a><a href="#FNanchor_193_193"><span class="label">[193]</span></a></span>
-What this proportion is, may be known from Coroll. 2 prop. 44. Lib. I. Princ. philos. Newton.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_194_194" id="Footnote_194_194"></a><a href="#FNanchor_194_194"><span class="label">[194]</span></a></span>
-Princ. Phil. Newt. Lib. I. prop. 45. Coroll. 1.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_195_195" id="Footnote_195_195"></a><a href="#FNanchor_195_195"><span class="label">[195]</span></a></span>
-Pr. Phil. Newt. Lib. I. prop. 66. Coroll. 7.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_196_196" id="Footnote_196_196"></a><a href="#FNanchor_196_196"><span class="label">[196]</span></a></span>
-See § 19 of this chapter.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_197_197" id="Footnote_197_197"></a><a href="#FNanchor_197_197"><span class="label">[197]</span></a></span>
-Phil. Nat. Pr. Math Lib. I. prop. 66. cor. 8.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_198_198" id="Footnote_198_198"></a><a href="#FNanchor_198_198"><span class="label">[198]</span></a></span>
-Ibid. Coroll. 8.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_199_199" id="Footnote_199_199"></a><a href="#FNanchor_199_199"><span class="label">[199]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_200_200" id="Footnote_200_200"></a><a href="#FNanchor_200_200"><span class="label">[200]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_201_201" id="Footnote_201_201"></a><a href="#FNanchor_201_201"><span class="label">[201]</span></a></span>
-Newt. Princ. Lib. III. prop. 29.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_202_202" id="Footnote_202_202"></a><a href="#FNanchor_202_202"><span class="label">[202]</span></a></span>
-Ibid. prop. 28.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_203_203" id="Footnote_203_203"></a><a href="#FNanchor_203_203"><span class="label">[203]</span></a></span>
-Ibid. prop. 31.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_204_204" id="Footnote_204_204"></a><a href="#FNanchor_204_204"><span class="label">[204]</span></a></span>
-Newt. Princ. pag. 459.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_205_205" id="Footnote_205_205"></a><a href="#FNanchor_205_205"><span class="label">[205]</span></a></span>
-In Princ. philos. part. 3. § 41.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_206_206" id="Footnote_206_206"></a><a href="#FNanchor_206_206"><span class="label">[206]</span></a></span>
-Chap. 1. § 11.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_207_207" id="Footnote_207_207"></a><a href="#FNanchor_207_207"><span class="label">[207]</span></a></span>
-Newton. Princ. philos. Lib. III. Lemm. 4.
-pag. 478.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_208_208" id="Footnote_208_208"></a><a href="#FNanchor_208_208"><span class="label">[208]</span></a></span>
-Princ. philos. Lib. III. prop. 40.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_209_209" id="Footnote_209_209"></a><a href="#FNanchor_209_209"><span class="label">[209]</span></a></span>
-Book I. chap. 2. § 82.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_210_210" id="Footnote_210_210"></a><a href="#FNanchor_210_210"><span class="label">[210]</span></a></span>
-Princ. philos. Lib. III. pag. 499, 500.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_211_211" id="Footnote_211_211"></a><a href="#FNanchor_211_211"><span class="label">[211]</span></a></span>
-Ibid. pag. 500, and 520, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_212_212" id="Footnote_212_212"></a><a href="#FNanchor_212_212"><span class="label">[212]</span></a></span>
-Princ. Philos. Lib. III. prop. 40.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_213_213" id="Footnote_213_213"></a><a href="#FNanchor_213_213"><span class="label">[213]</span></a></span>
-Ibid. prop. 41.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_214_214" id="Footnote_214_214"></a><a href="#FNanchor_214_214"><span class="label">[214]</span></a></span>
-Ibid. pag. 522.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_215_215" id="Footnote_215_215"></a><a href="#FNanchor_215_215"><span class="label">[215]</span></a></span>
-Ibid. prop. 42.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_216_216" id="Footnote_216_216"></a><a href="#FNanchor_216_216"><span class="label">[216]</span></a></span>
-Newt. Princ. philos. edit. 2. p. 464, 465.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_217_217" id="Footnote_217_217"></a><a href="#FNanchor_217_217"><span class="label">[217]</span></a></span>
-Ibid. edit. 3. p 501, 502.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_218_218" id="Footnote_218_218"></a><a href="#FNanchor_218_218"><span class="label">[218]</span></a></span>
-Ibid. pag. 519.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_219_219" id="Footnote_219_219"></a><a href="#FNanchor_219_219"><span class="label">[219]</span></a></span>
-Ibid. pag. 524.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_220_220" id="Footnote_220_220"></a><a href="#FNanchor_220_220"><span class="label">[220]</span></a></span>
-Newt. Princ. philos. p. 525.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_221_221" id="Footnote_221_221"></a><a href="#FNanchor_221_221"><span class="label">[221]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_222_222" id="Footnote_222_222"></a><a href="#FNanchor_222_222"><span class="label">[222]</span></a></span>
-Ibid. pag. 508.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_223_223" id="Footnote_223_223"></a><a href="#FNanchor_223_223"><span class="label">[223]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_224_224" id="Footnote_224_224"></a><a href="#FNanchor_224_224"><span class="label">[224]</span></a></span>
-Ibid. pag. 484.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_225_225" id="Footnote_225_225"></a><a href="#FNanchor_225_225"><span class="label">[225]</span></a></span>
-Ibid. pag. 482, 483.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_226_226" id="Footnote_226_226"></a><a href="#FNanchor_226_226"><span class="label">[226]</span></a></span>
-Ibid. pag. 481.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_227_227" id="Footnote_227_227"></a><a href="#FNanchor_227_227"><span class="label">[227]</span></a></span>
-Ibid. pag. 509.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_228_228" id="Footnote_228_228"></a><a href="#FNanchor_228_228"><span class="label">[228]</span></a></span>
-See the fore-cited place.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_229_229" id="Footnote_229_229"></a><a href="#FNanchor_229_229"><span class="label">[229]</span></a></span>
-Ibid. and Cartes. Princ. Phil. part. 3. § 134, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_230_230" id="Footnote_230_230"></a><a href="#FNanchor_230_230"><span class="label">[230]</span></a></span>
-Vid. Phil. Nat. princ. Math. p. 511.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_231_231" id="Footnote_231_231"></a><a href="#FNanchor_231_231"><span class="label">[231]</span></a></span>
-Book I. Ch. 4. § 11.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_232_232" id="Footnote_232_232"></a><a href="#FNanchor_232_232"><span class="label">[232]</span></a></span>
-Ch. 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_233_233" id="Footnote_233_233"></a><a href="#FNanchor_233_233"><span class="label">[233]</span></a></span>
-All these arguments are laid down in Philos. Nat. Princ. Lib. III. from p. 509, to 517.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_234_234" id="Footnote_234_234"></a><a href="#FNanchor_234_234"><span class="label">[234]</span></a></span>
-Philos. Nat. Princ. Lib. III. p. 515.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_235_235" id="Footnote_235_235"></a><a href="#FNanchor_235_235"><span class="label">[235]</span></a></span>
-Ch. 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_236_236" id="Footnote_236_236"></a><a href="#FNanchor_236_236"><span class="label">[236]</span></a></span>
-See Ch. 1. § 11.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_237_237" id="Footnote_237_237"></a><a href="#FNanchor_237_237"><span class="label">[237]</span></a></span>
-Newt. Princ. Philos. pag. 525, 526. An account
-of all the stars of both these kinds, which
-have appeared within the last 150 years may be
-seen in the Philosophical transactions, vol. 29.
-numb. 346.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_238_238" id="Footnote_238_238"></a><a href="#FNanchor_238_238"><span class="label">[238]</span></a></span>
-Newt. Princ. Philos. Nat. Lib. III. prop. 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_239_239" id="Footnote_239_239"></a><a href="#FNanchor_239_239"><span class="label">[239]</span></a></span>
-Ch. 3. § 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_240_240" id="Footnote_240_240"></a><a href="#FNanchor_240_240"><span class="label">[240]</span></a></span>
-Book I. Ch. 2. § 24.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_241_241" id="Footnote_241_241"></a><a href="#FNanchor_241_241"><span class="label">[241]</span></a></span>
-Newt. Princ. Lib. III. prop. 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_242_242" id="Footnote_242_242"></a><a href="#FNanchor_242_242"><span class="label">[242]</span></a></span>
-Ch. 3. § 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_243_243" id="Footnote_243_243"></a><a href="#FNanchor_243_243"><span class="label">[243]</span></a></span>
-Newt. Princ. philos. Lib. III. prop. 7. cor. 1.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_244_244" id="Footnote_244_244"></a><a href="#FNanchor_244_244"><span class="label">[244]</span></a></span>
-See Book I. Ch. 1. § 15.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_245_245" id="Footnote_245_245"></a><a href="#FNanchor_245_245"><span class="label">[245]</span></a></span>
-Ibid. § 5, 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_246_246" id="Footnote_246_246"></a><a href="#FNanchor_246_246"><span class="label">[246]</span></a></span>
-Chap. 2. § 8.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_247_247" id="Footnote_247_247"></a><a href="#FNanchor_247_247"><span class="label">[247]</span></a></span>
-Newt. Princ. Lib. I. prop. 63.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_248_248" id="Footnote_248_248"></a><a href="#FNanchor_248_248"><span class="label">[248]</span></a></span>
-§ 8.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_249_249" id="Footnote_249_249"></a><a href="#FNanchor_249_249"><span class="label">[249]</span></a></span>
-See Introd. § 23.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_250_250" id="Footnote_250_250"></a><a href="#FNanchor_250_250"><span class="label">[250]</span></a></span>
-§ 4, 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_251_251" id="Footnote_251_251"></a><a href="#FNanchor_251_251"><span class="label">[251]</span></a></span>
-Newt. Princ. philos. Lib. I. prop. 74.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_252_252" id="Footnote_252_252"></a><a href="#FNanchor_252_252"><span class="label">[252]</span></a></span>
-Ibid. coroll. 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_253_253" id="Footnote_253_253"></a><a href="#FNanchor_253_253"><span class="label">[253]</span></a></span>
-Lib. I. Prop. 75. and Lib. III. prop. 8.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_254_254" id="Footnote_254_254"></a><a href="#FNanchor_254_254"><span class="label">[254]</span></a></span>
-Lib. I. Prop. 76.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_255_255" id="Footnote_255_255"></a><a href="#FNanchor_255_255"><span class="label">[255]</span></a></span>
-Ibid. cor. 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_256_256" id="Footnote_256_256"></a><a href="#FNanchor_256_256"><span class="label">[256]</span></a></span>
-Vid. Lib. III. Prop. 7. coroll. 1</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_257_257" id="Footnote_257_257"></a><a href="#FNanchor_257_257"><span class="label">[257]</span></a></span>
-Newt. Princ. Lib. III. prop. 8. coroll. 1.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_258_258" id="Footnote_258_258"></a><a href="#FNanchor_258_258"><span class="label">[258]</span></a></span>
-Ibid. coroll. 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_259_259" id="Footnote_259_259"></a><a href="#FNanchor_259_259"><span class="label">[259]</span></a></span>
-Book I. Ch. 4. § 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_260_260" id="Footnote_260_260"></a><a href="#FNanchor_260_260"><span class="label">[260]</span></a></span>
-Newt. Princ. Lib. III. prop. 8. coroll. 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_261_261" id="Footnote_261_261"></a><a href="#FNanchor_261_261"><span class="label">[261]</span></a></span>
-Ibid. coroll. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_262_262" id="Footnote_262_262"></a><a href="#FNanchor_262_262"><span class="label">[262]</span></a></span>
-Book I. Ch. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_263_263" id="Footnote_263_263"></a><a href="#FNanchor_263_263"><span class="label">[263]</span></a></span>
-Lib. II. prop. 20. cor. 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_264_264" id="Footnote_264_264"></a><a href="#FNanchor_264_264"><span class="label">[264]</span></a></span>
-Chap. 4. § 17.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_265_265" id="Footnote_265_265"></a><a href="#FNanchor_265_265"><span class="label">[265]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_266_266" id="Footnote_266_266"></a><a href="#FNanchor_266_266"><span class="label">[266]</span></a></span>
-Vid. Newt. Princ. Lib. II. prop. 46.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_267_267" id="Footnote_267_267"></a><a href="#FNanchor_267_267"><span class="label">[267]</span></a></span>
-Princ. philos. Lib. II. prop. 49.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_268_268" id="Footnote_268_268"></a><a href="#FNanchor_268_268"><span class="label">[268]</span></a></span>
-Chap. 3. § 18.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_269_269" id="Footnote_269_269"></a><a href="#FNanchor_269_269"><span class="label">[269]</span></a></span>
-Newt. Princ. philos. Lib. I. prop. 66. coroll. 18.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_270_270" id="Footnote_270_270"></a><a href="#FNanchor_270_270"><span class="label">[270]</span></a></span>
-§ 8.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_271_271" id="Footnote_271_271"></a><a href="#FNanchor_271_271"><span class="label">[271]</span></a></span>
-Ch. 3. § 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_272_272" id="Footnote_272_272"></a><a href="#FNanchor_272_272"><span class="label">[272]</span></a></span>
-Ch. 3 § 17.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_273_273" id="Footnote_273_273"></a><a href="#FNanchor_273_273"><span class="label">[273]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_274_274" id="Footnote_274_274"></a><a href="#FNanchor_274_274"><span class="label">[274]</span></a></span>
- See below § 44.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_275_275" id="Footnote_275_275"></a><a href="#FNanchor_275_275"><span class="label">[275]</span></a></span>
-Newton Princ. Lib. III. prop. 19.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_276_276" id="Footnote_276_276"></a><a href="#FNanchor_276_276"><span class="label">[276]</span></a></span>
-Lib. III. prop. 19.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_277_277" id="Footnote_277_277"></a><a href="#FNanchor_277_277"><span class="label">[277]</span></a></span>
-Lib. I. prop. 73.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_278_278" id="Footnote_278_278"></a><a href="#FNanchor_278_278"><span class="label">[278]</span></a></span>
-Lib. III. prop. 20.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_279_279" id="Footnote_279_279"></a><a href="#FNanchor_279_279"><span class="label">[279]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_280_280" id="Footnote_280_280"></a><a href="#FNanchor_280_280"><span class="label">[280]</span></a></span>
-Opt. B. I. part. 2. prop. 1.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_281_281" id="Footnote_281_281"></a><a href="#FNanchor_281_281"><span class="label">[281]</span></a></span>
-Newt. Opt. B. 1. part 1. experim. 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_282_282" id="Footnote_282_282"></a><a href="#FNanchor_282_282"><span class="label">[282]</span></a></span>
-Ibid. prop. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_283_283" id="Footnote_283_283"></a><a href="#FNanchor_283_283"><span class="label">[283]</span></a></span>
-Newt. Opt. B. 1. part 2. exper. 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_284_284" id="Footnote_284_284"></a><a href="#FNanchor_284_284"><span class="label">[284]</span></a></span>
-Ibid exper. 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_285_285" id="Footnote_285_285"></a><a href="#FNanchor_285_285"><span class="label">[285]</span></a></span>
-Newton Opt. B. I. prop. 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_286_286" id="Footnote_286_286"></a><a href="#FNanchor_286_286"><span class="label">[286]</span></a></span>
-Ibid exp. 9.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_287_287" id="Footnote_287_287"></a><a href="#FNanchor_287_287"><span class="label">[287]</span></a></span>
-Newt. Opt. B. I. part 1. exp 15.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_288_288" id="Footnote_288_288"></a><a href="#FNanchor_288_288"><span class="label">[288]</span></a></span>
-Philos. Transact. N. 88, p. 5099.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_289_289" id="Footnote_289_289"></a><a href="#FNanchor_289_289"><span class="label">[289]</span></a></span>
-Opt B. I. par. 2. exp. 14.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_290_290" id="Footnote_290_290"></a><a href="#FNanchor_290_290"><span class="label">[290]</span></a></span>
-Ibid. exp. 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_291_291" id="Footnote_291_291"></a><a href="#FNanchor_291_291"><span class="label">[291]</span></a></span>
-Opt. pag. 122.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_292_292" id="Footnote_292_292"></a><a href="#FNanchor_292_292"><span class="label">[292]</span></a></span>
-Opt. B. I. part 2. exp. 11.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_293_293" id="Footnote_293_293"></a><a href="#FNanchor_293_293"><span class="label">[293]</span></a></span>
-Ibid prop. 4, 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_294_294" id="Footnote_294_294"></a><a href="#FNanchor_294_294"><span class="label">[294]</span></a></span>
-Opt. pag. 51.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_295_295" id="Footnote_295_295"></a><a href="#FNanchor_295_295"><span class="label">[295]</span></a></span>
-Opt. Book II. prop. 8.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_296_296" id="Footnote_296_296"></a><a href="#FNanchor_296_296"><span class="label">[296]</span></a></span>
-Opt. Book II. par. 3. prop. 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_297_297" id="Footnote_297_297"></a><a href="#FNanchor_297_297"><span class="label">[297]</span></a></span>
-§ 17.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_298_298" id="Footnote_298_298"></a><a href="#FNanchor_298_298"><span class="label">[298]</span></a></span>
-Opt. Book II. par. 3. prop. 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_299_299" id="Footnote_299_299"></a><a href="#FNanchor_299_299"><span class="label">[299]</span></a></span>
-Opt. Book II. pag. 241.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_300_300" id="Footnote_300_300"></a><a href="#FNanchor_300_300"><span class="label">[300]</span></a></span>
-Ibid. pag. 224.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_301_301" id="Footnote_301_301"></a><a href="#FNanchor_301_301"><span class="label">[301]</span></a></span>
-Ibid. Obs. 17. &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_302_302" id="Footnote_302_302"></a><a href="#FNanchor_302_302"><span class="label">[302]</span></a></span>
-Ibid. Obs. 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_303_303" id="Footnote_303_303"></a><a href="#FNanchor_303_303"><span class="label">[303]</span></a></span>
-Ibid. pag. 206.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_304_304" id="Footnote_304_304"></a><a href="#FNanchor_304_304"><span class="label">[304]</span></a></span>
-Obser. 21.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_305_305" id="Footnote_305_305"></a><a href="#FNanchor_305_305"><span class="label">[305]</span></a></span>
-Observ. 5. compared with Observ. 10</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_306_306" id="Footnote_306_306"></a><a href="#FNanchor_306_306"><span class="label">[306]</span></a></span>
-Ibid. prop. 5.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_307_307" id="Footnote_307_307"></a><a href="#FNanchor_307_307"><span class="label">[307]</span></a></span>
-Observ. 7.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_308_308" id="Footnote_308_308"></a><a href="#FNanchor_308_308"><span class="label">[308]</span></a></span>
-Observ. 9.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_309_309" id="Footnote_309_309"></a><a href="#FNanchor_309_309"><span class="label">[309]</span></a></span>
-Ibid prop. 7.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_310_310" id="Footnote_310_310"></a><a href="#FNanchor_310_310"><span class="label">[310]</span></a></span>
-Opt. pag. 243.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_311_311" id="Footnote_311_311"></a><a href="#FNanchor_311_311"><span class="label">[311]</span></a></span>
-Newt. Opt. B. I. part. 1. prop. I.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_312_312" id="Footnote_312_312"></a><a href="#FNanchor_312_312"><span class="label">[312]</span></a></span>
-Opt. B. I. part. 1. prop. 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_313_313" id="Footnote_313_313"></a><a href="#FNanchor_313_313"><span class="label">[313]</span></a></span>
-Opt. B. I. part 1. Expec. 6.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_314_314" id="Footnote_314_314"></a><a href="#FNanchor_314_314"><span class="label">[314]</span></a></span>
-Opt. pag. 67, 68, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_315_315" id="Footnote_315_315"></a><a href="#FNanchor_315_315"><span class="label">[315]</span></a></span>
-Ibid. B. 1. par. 2. prop. 3.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_316_316" id="Footnote_316_316"></a><a href="#FNanchor_316_316"><span class="label">[316]</span></a></span>
-Opt. B. II. par. 3. prop. 10.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_317_317" id="Footnote_317_317"></a><a href="#FNanchor_317_317"><span class="label">[317]</span></a></span>
-Opt. B. II. par. 3. prop. 15.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_318_318" id="Footnote_318_318"></a><a href="#FNanchor_318_318"><span class="label">[318]</span></a></span>
-Ibid. par. 1. observ. 7.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_319_319" id="Footnote_319_319"></a><a href="#FNanchor_319_319"><span class="label">[319]</span></a></span>
-Ibid. Observ. 19.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_320_320" id="Footnote_320_320"></a><a href="#FNanchor_320_320"><span class="label">[320]</span></a></span>
-Opt. B. II. par. 2. pag. 199. &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_321_321" id="Footnote_321_321"></a><a href="#FNanchor_321_321"><span class="label">[321]</span></a></span>
-Ibid. par. 4</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_322_322" id="Footnote_322_322"></a><a href="#FNanchor_322_322"><span class="label">[322]</span></a></span>
-Ibid. part. 3. prop. 13.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_323_323" id="Footnote_323_323"></a><a href="#FNanchor_323_323"><span class="label">[323]</span></a></span>
-Ibid. prop. 17.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_324_324" id="Footnote_324_324"></a><a href="#FNanchor_324_324"><span class="label">[324]</span></a></span>
-Ibid. prop. 13.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_325_325" id="Footnote_325_325"></a><a href="#FNanchor_325_325"><span class="label">[325]</span></a></span>
-Opt. Qu. 18, &amp;c.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_326_326" id="Footnote_326_326"></a><a href="#FNanchor_326_326"><span class="label">[326]</span></a></span>
-See Concl. S. 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_327_327" id="Footnote_327_327"></a><a href="#FNanchor_327_327"><span class="label">[327]</span></a></span>
-B. II. Ch. 1.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_328_328" id="Footnote_328_328"></a><a href="#FNanchor_328_328"><span class="label">[328]</span></a></span>
-Opt. B. III. Obs. 1.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_329_329" id="Footnote_329_329"></a><a href="#FNanchor_329_329"><span class="label">[329]</span></a></span>
-Ibid. Obs. 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_330_330" id="Footnote_330_330"></a><a href="#FNanchor_330_330"><span class="label">[330]</span></a></span>
-§ 2.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_331_331" id="Footnote_331_331"></a><a href="#FNanchor_331_331"><span class="label">[331]</span></a></span>
-Philos. Trans. No. 378.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_332_332" id="Footnote_332_332"></a><a href="#FNanchor_332_332"><span class="label">[332]</span></a></span>
-§ 11.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_333_333" id="Footnote_333_333"></a><a href="#FNanchor_333_333"><span class="label">[333]</span></a></span>
-Philos. Transact No. 375.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_334_334" id="Footnote_334_334"></a><a href="#FNanchor_334_334"><span class="label">[334]</span></a></span>
-Ibid.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_335_335" id="Footnote_335_335"></a><a href="#FNanchor_335_335"><span class="label">[335]</span></a></span>
-Opt. B. II. part 4.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_336_336" id="Footnote_336_336"></a><a href="#FNanchor_336_336"><span class="label">[336]</span></a></span>
-Ch. 3. § 14.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_337_337" id="Footnote_337_337"></a><a href="#FNanchor_337_337"><span class="label">[337]</span></a></span>
-Opt. B. II. part 4. obs. 13.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_338_338" id="Footnote_338_338"></a><a href="#FNanchor_338_338"><span class="label">[338]</span></a></span>
-Opt. pag. 255.</p>
-
-<p class="pfn4"><span class="ln1"><a name="Footnote_339_339" id="Footnote_339_339"></a><a href="#FNanchor_339_339"><span class="label">[339]</span></a></span>
-Ch. 3. § 18.</p></div>
-
-</div>
-
-</div>
-
-
-
-
-
-
-
-<pre>
-
-
-
-
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