Philosophiae naturalis principia mathematica . aequalium. Fiat ACad AK vel ABHC adABhJi, ut vis gravitatisad refiftentiam in princi-pio temporis fecundi, deq;vi gravitatis fubducanturrefiftentia, & manebuntABHC, KkHC, LIHC, Nn HC, &c. ut vircs abfoluts quibus corpus in principio fingu-lornni temporum urgetur, atq; adeo ( per motus Legem II. )ut incrementa velocitatum, id eft, ut re&angula^i^, ^h EmyMn &c; & propterea ( per Lem. I. Lib. II. ) in progreflloneGeometrka. Quare fi reclse itZ^, L/, Mra, N/z&c. produ&ae oc-currant Hyperbolx in f,r, syt &c. erunt arese ABqK, KqrL,LrsM, MstN &c. arqual
Philosophiae naturalis principia mathematica . aequalium. Fiat ACad AK vel ABHC adABhJi, ut vis gravitatisad refiftentiam in princi-pio temporis fecundi, deq;vi gravitatis fubducanturrefiftentia, & manebuntABHC, KkHC, LIHC, Nn HC, &c. ut vircs abfoluts quibus corpus in principio fingu-lornni temporum urgetur, atq; adeo ( per motus Legem II. )ut incrementa velocitatum, id eft, ut re&angula^i^, ^h EmyMn &c; & propterea ( per Lem. I. Lib. II. ) in progreflloneGeometrka. Quare fi reclse itZ^, L/, Mra, N/z&c. produ&ae oc-currant Hyperbolx in f,r, syt &c. erunt arese ABqK, KqrL,LrsM, MstN &c. arquales, adeoq; tum tcmporibus tum viri-bus gravitatis femper aequalibus analogar. Efrautemarea ABqK( per Corol. 3 Lem. VII. & Lem. VIII. Lib. I.)ad aream Bl^qut Kq ad \ J^q feu AC ad \ AK, hoc eft ut vis gravitatis ad re-fifcentiam in medio temporis primi. Et fimili argumento areasqKLry rLMs^ sMNt, &c. funt ad areas qkjr, rlm/, smnt-&c. ut vires gravitatis ad refiftentias in medio temporis fecundi,. a. klmn:
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