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Hyperbola, by what law of centrifugal force tending from the centre of the figure it is described by a revolving body, 116
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β by what law of centrifugal force tending from the focus of the figure it is described by a revolving body, 117
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β by what law of centripetal force tending to the focus of the figure it is described by a revolving body, 118
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Hypotheses of what kind soever rejected from this philosophy, 508
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Jupiter, its periodic time, 388
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β its distance from the sun, 388
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β its apparent diameter, 386
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β its true diameter, 399
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β its attractive force, how great, 398
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β the weights of b dies on its surface, 399
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β its density, 399
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β its quantity of matter, 399
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β its perturbation by Saturn, how much, 403
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β the proportion of its diameters exhibited by computation, 409
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β and compared with observations, 409
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β its rotation about its axis, in what time performed, 409
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β the cause of its belts hinted at, 445
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Light, its propagation not instantaneous, 246
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β its velocity different in different mediums, 245
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β a certain reflection it sometimes suffers explained, 245
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β its refraction explained, 243
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β refraction is not made in the single point of incidence, 247
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β an incurvation of light about the extremities of bodies observed by experiments, 246
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β not caused by the agitation of any ethereal medium, 368
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Magnetic force, 94, 304, 397, 454
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Mars, its periodic time, 388
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β its distance from the sun, 389
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β the motion of its aphelion, 405
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Matter, its quantity of matter defined, 73
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β its vis insita defined, 74
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β its impressed force defined, 74
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β its extension, hardness, impenetrability, mobility, vis inertiΓ¦, gravity, how discovered, 385
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β subtle matter of Descartes inquired into, 320
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Mechanical Powers explained and demonstrated, 94
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Mercury, its periodic time, 388
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β its distance from the sun, 389
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β the motion of its aphelion, 405
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Method of first and last ratios, 95
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β of transforming figures into others of the same analytical order, 141
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β of fluxions, 261
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β differential, 447
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β of finding the quadratures of all curves very nearly true, 448
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β of converging series applied to the solution of difficult problems, 271, 436
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Moon, the inclination of its orbit to the ecliptic greatest in the syzygies of the node with the sun, and least in the quadratures, 208
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β the figure of its body collected by calculation, 454
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β its librations explained, 405
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β its mean apparent diameter, 453
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β its true diameter, 453
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β weight of bodies on its surface, 453
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β its density, 453
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β its quantity of matter, 453
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β its mean distance from the earth, how many greatest semi-diameters of the earth contained therein, 453
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β how many mean semi-diameters, 454
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β its force to move the sea how great, 449
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β not perceptible in experiments of pendulums, or any statical or hydrostatical observations, 452
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β its periodic time, 454
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β the time of its synodical revolution, 422
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β its motions, and the inequalities of the same derived from their causes, 413, 144
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β revolves more slowly, in a dilated orbit, when the earth is in its perihelion; and more swiftly in the aphelion the same, its orbit being contracted, 413, 444, 445
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β revolves more slowly, in a dilated orbit, when the apogΓ¦on is in the syzygies with the sun; and more swiftly, in a contracted orbit, when the apogΓ¦on is in the quadratures, 445
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β revolves more slowly, in a dilated orbit, when the node is in the syzygies with the sun; and more swiftly, in a contracted orbit, when the node is in the quadratures, 446
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β moves slower in its quadratures with the sun, swifter in the syzygies; and by a radius drawn to the earth describes an area, in the first case less in proportion to the time, in the last case greater, 413
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β the inequality of those areas computed, 420
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β its orbit is more curve, and goes farther from the earth in the first case; in the last case its orbit is less curve, and comes nearer to the earth, 415
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β the figure of this orbit, and the proportion of its diameters collected by computation, 423
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β a method of finding the moon s distance from the earth by its horary motion, 423
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β its apogΓ¦on moves more slowly when the earth is in its aphelion, more swiftly in the perihelion, 414, 445
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β its apogΓ¦on goes forward most swiftly when in the syzygies with the sun; and goes backward in the quadratures, 414, 446
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β its eccentricity greatest when the apogΓ¦on is in the syzygies with the sun; least when the same is in the quadratures, 414, 446
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β its nodes move more slowly when the earth is in its aphelion, and more swiftly in the perihelion, 414, 445
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β its nodes are at rest in their syzygies with the sun, and go back most swiftly in the quadratures 414
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Moon the motions of the nodes and the inequalities of its motions computed from the theory of gravity, 427, 430, 434, 436
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β the same from a different principle, 437
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β the variations of the inclination computed from the theory of gravity, 441, 443
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β the equations of the moon s motions for astronomical uses, 445
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β the annual equation of the moon s mean motion, 445
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β the first semi-annual equation of the same, 443
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β the second semi-annual equation of the same, 447
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β the first equation of the moon s centre, 447
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β the second equation of the moon s centre, 448
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Moon's first variation, 425
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β the annual equation of the mean motion of its apogee, 445
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β the semi-annual equation of the same, 447
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β the semi-annual equation of its eccentricity, 447
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β the annual equation of the mean motion of its nodes, 445
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β the semi-annual equation of the same, 437
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β the semi-annual equation of the inclination of the orbit to the ecliptic, 444
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β the method of fixing the theory of the lunar motions from observations, 464
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Motion, its quantity defined, 73
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β absolute and relative, 78
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β absolute and relative, the separation of one from the other possible, demonstrated by an example 82
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β laws thereof, 83
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β of concurring bodies after their reflection, by what experiments collected, 91
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β of bodies in eccentric sections, 116
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β in moveable orbits, 172
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β in given superficies, and of the reciprocal motion of pendulums, 183
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β of bodies tending to each other with centripetal forces, 194
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β of very small bodies agitated by centripetal forces tending to each part of some very great body, 233
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β of bodies resisted in the ratio of the velocities, 251
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β in the duplicate ratio of the velocity, 258
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