Philosophiae naturalis principia mathematica . C m ] B, & intervalhWM, B N defcribantur circuji duo fe mutuo fe-cantes in D: pun&um illud D tanget curvam qusefitam CDE^eandemq; ubivis ranjH-iido determinabir. Q^, JE. J. Corol. 1. Faciendo autem ut pundum A vel B nunc abeat inmfinitum, nuncmigretadalteras partes puncli £,habebuntur figurse illaeomnes quas Cj&tefm inOptica & Geometria adrefracYiones mventionem Cartefms maximi fecerit Sc ftudiofe celaverit, vifum fuithic propotitione exponere. Coroh i. Si corpus in fuperficiem quamvis CD, fecundumlineam re&am AD lege quavis d
Philosophiae naturalis principia mathematica . C m ] B, & intervalhWM, B N defcribantur circuji duo fe mutuo fe-cantes in D: pun&um illud D tanget curvam qusefitam CDE^eandemq; ubivis ranjH-iido determinabir. Q^, JE. J. Corol. 1. Faciendo autem ut pundum A vel B nunc abeat inmfinitum, nuncmigretadalteras partes puncli £,habebuntur figurse illaeomnes quas Cj&tefm inOptica & Geometria adrefracYiones mventionem Cartefms maximi fecerit Sc ftudiofe celaverit, vifum fuithic propotitione exponere. Coroh i. Si corpus in fuperficiem quamvis CD, fecundumlineam re&am AD lege quavis ductam incidens, emergat fecun-dum aliamquamvis re&amDK, & a pun£to C duciintellipjantur linese curvseCP, CO_\pCis AD, DKfemper incrementa linearumV D, QD, atcli ac^eo lineaeipfse P D, QJ?-> incremen-tis iftis genitse, ut (inus in-cidentia? & emergenciae ad invicem: & contra. Prop. XCVIII. Prob. XLVIII. .\H. ?>&. Iifdem pofith, & circa axem A B defcripta fnperfcie qnacnna-, attraSii-va C D, regulari vel irregulari, per qnam corpora de loco clato Aexenntia tranfre debent: invenire fnperfciem fecnndam attraSii-, 8c centro D intervallo DH defcribe circulum occurren- tem K B produclae in L, ipfiq^ D L parallelam age B F: & punc- tum F tanget lineam E F, quse circa axem A B revoluta defcri- bet fuperficiem quaefitam. (\E. F. Nam concipe lineas CF, Cgjpfis^F>,
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