Newton, Isaac
,
Philosophia naturalis principia mathematica
,
1713
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Quo facto, cape
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GK
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in ratione ad Rotæ perimetrum
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GEFG,
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ut
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eſt tempus quo corpus progrediendo ab
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A
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deſcripſit arcum
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AP,
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ad
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tempus revolutionis unius in Ellipſi. </
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<
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>Erigatur perpendiculum
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KL
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occurrens Trochoidi in
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L,
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& acta
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LP
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ipſi
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KG
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parallela occurret
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Ellipſi in corporis loco quæſito
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P.
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LIBER
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PRIMUS.</
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<
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>Nam centro
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O,
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intervallo
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OA
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deſcribatur ſemicirculus
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AQB,
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& arcui
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AQ
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occurrat
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LP
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producta in
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Q,
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junganturque
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SQ,
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Oq.
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Arcui
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EFG
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occurrat
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OQ
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in
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F,
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& in eandem
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OQ
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demittatur per
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pendiculum
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SR.
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Area
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APS
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eſt ut area
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AQS,
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id eſt, ut diffe
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rentia inter ſectorem
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OQA
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& triangulum
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OQS,
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ſive ut differen
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tia rectangulorum 1/2
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OQXAQ
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& 1/2
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OQXSR,
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hoc eſt, ob datam
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1/2
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OQ,
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ut differentia inter arcum
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AQ
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& rectam
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SR,
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adeoque (ob
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æqualitatem datarum rationum
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SR
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ad ſinum arcus
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AQ, OS
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ad
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OA,
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OA
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ad
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OG, AQ
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ad
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GF,
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& diviſim
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AQ-SR
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ad
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GF
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-ſin. </
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<
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>arc.
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AQ
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)
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ut
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GK
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differentia inter arcum
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GF
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& ſinum arcus
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Aq.
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<
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E. D.
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Scholium.
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<
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>Cæterum, cum difficilis ſit hujus Curvæ deſcriptio, præſtat ſolu
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tionem vero proximam adhibere. </
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<
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>Inveniatur tum angulus quidam
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B, qui ſit ad angulum graduum 57,29578, quem arcus radio æqualis
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ſubtendit, ut eſt umbilieorum diſtantia
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SH
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ad Ellipſeos diame
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trum
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AB
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; tum etiam longitudo quædam L, quæ ſit ad radium in
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eadem ratione inverſe. </
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<
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>Quibus ſemel inventis, Problema deinceps
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confit per ſequentem Analyſin. </
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<
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>Per conſtructionem quamvis (vel. </
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utcunque conjec
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turam faciendo)
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cognoſcatur cor
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poris locus
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P
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pro
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ximus vero ejus lo
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co
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p.
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Demiſſaque ad
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axem Ellipſeos or
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dinatim applicata
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PR,
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ex propor
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tione diametrorum
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Ellipſeos, dabitur
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Circuli circumſcri
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pti
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AQB
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ordinatim applicata
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RQ,
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quæ ſinus eſt anguli
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AOQ
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exi
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ſtente
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AO
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radio. </
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<
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>Sufficit angulum illum rudi calculo in numeris
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proximis invenire. </
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<
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>Cognoſcatur etiam angulus tempori propor-</
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