Philosophiae naturalis principia mathematica . TERTII ORDINIS. 7l. C A S, II. At fi redailk CBc non poteft utrinque ad Curvam terminari, fedCurvae in unico tantum pundo occurrit: agequamvis pofitione datam redam AB Afymp-toto AS occurrentem in A, ut & aliam quam-vis BC Afymptoto illi parallelam Curva^que oc-currentem in punfto C, & aequatio qua rela-tio inter Ordinatam BC & AblbifTam AB de-finitur, femper induet hanc formam, C A S, III. Quod fi crura illa oppofita Parabolici fint generis, reda CBcad Curvam utrinque, fifieripotefl, termina-ta in plagam crurum ducaiur & bifecetur inB, & locus pu
Philosophiae naturalis principia mathematica . TERTII ORDINIS. 7l. C A S, II. At fi redailk CBc non poteft utrinque ad Curvam terminari, fedCurvae in unico tantum pundo occurrit: agequamvis pofitione datam redam AB Afymp-toto AS occurrentem in A, ut & aliam quam-vis BC Afymptoto illi parallelam Curva^que oc-currentem in punfto C, & aequatio qua rela-tio inter Ordinatam BC & AblbifTam AB de-finitur, femper induet hanc formam, C A S, III. Quod fi crura illa oppofita Parabolici fint generis, reda CBcad Curvam utrinque, fifieripotefl, termina-ta in plagam crurum ducaiur & bifecetur inB, & locus punfti B erit Linea reda. Sit illaAB , terminata ad datum quodvis punftumA, & aequatio qua relatio inter OrdinatamBC & AbfciiTam AB definitur, femper in-duet hanc formam,.
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