Philosophiae naturalis principia mathematica . Hyperbolifmus HyperbolcB tres habec Afymptotos, quarum unaeft Ordinata prima & principalis Ad, altera^ dufB funt parallela? Ab-fcidae AB, ab eadem hinc inde squaliter diitant. In Ordinara prin-cipali Ad, cape Ad, Ai^ hinc inde sequales quantirati Vc; & perpun(^a d ac <5~age dg, J^y Afymptotos Abiciirai AB parallelas. Ubi terminus ey non deeft figura nullam habet diametrum. In hoccafu, fi aequationis hujus cx^ + dx + ieezzo radices duae AP, Ap{Fig. 6i.) luni reales & inaequales (nam cequales effe nequeunt nifi fi-gura fit Conica fedio) figura co
Philosophiae naturalis principia mathematica . Hyperbolifmus HyperbolcB tres habec Afymptotos, quarum unaeft Ordinata prima & principalis Ad, altera^ dufB funt parallela? Ab-fcidae AB, ab eadem hinc inde squaliter diitant. In Ordinara prin-cipali Ad, cape Ad, Ai^ hinc inde sequales quantirati Vc; & perpun(^a d ac <5~age dg, J^y Afymptotos Abiciirai AB parallelas. Ubi terminus ey non deeft figura nullam habet diametrum. In hoccafu, fi aequationis hujus cx^ + dx + ieezzo radices duae AP, Ap{Fig. 6i.) luni reales & inaequales (nam cequales effe nequeunt nifi fi-gura fit Conica fedio) figura conltabif ex tribus Hyperbolis fibi op-pofitis quarum una jacer inter Afymptotos parallelas & alterae duaejacent extra. \Lx hcec eit Sfecies qumquagejirna/eptima. Si radices illffi duae funt impofTibiles, habentur Hyperbolajduaeop-poHtffi extra. Afymptotos parallelas & Anguinea Hyperbolica intraeafdem. Haec figura duarum ell fpecierum. Nam centrum non ha-bet ubi terminus d non deeft iFig. fed fi tetminus ille deeftpunft
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