Philosophiae naturalis principia mathematica . £ 120 tis velocitas in C sequalis eft ve-locitati qua circulus intervallo iS Cuniformiter defcribi poffit. Q perTheor. X.)Et hsec velocitas ad ve-locitatem qua circulus radio SKdefcribi poffit, hoc eft, lineola C cad arcum if ^.eft in dimidiata ra-tione SK ad i Sc, id eft, in rationeS K ad i C£>, per Corol. 6. The-orem. IV. Quare cftiSKxKI^xquAciCD xCf, adeoq; aequalei SY x £W, hoceft, area KSkjz-qualis Arese SDd, utfupra. Quoderat demonflrandwn. 3. A Prop. XXXVI. Prob. XXV. Corporis de Ioco dato A cadentis detcrminarc tempora defcenfus. Super
Philosophiae naturalis principia mathematica . £ 120 tis velocitas in C sequalis eft ve-locitati qua circulus intervallo iS Cuniformiter defcribi poffit. Q perTheor. X.)Et hsec velocitas ad ve-locitatem qua circulus radio SKdefcribi poffit, hoc eft, lineola C cad arcum if ^.eft in dimidiata ra-tione SK ad i Sc, id eft, in rationeS K ad i C£>, per Corol. 6. The-orem. IV. Quare cftiSKxKI^xquAciCD xCf, adeoq; aequalei SY x £W, hoceft, area KSkjz-qualis Arese SDd, utfupra. Quoderat demonflrandwn. 3. A Prop. XXXVI. Prob. XXV. Corporis de Ioco dato A cadentis detcrminarc tempora defcenfus. Super diametro ASQ diftantia corporis acen-tro fub initio) defcribe femicirculum A D S0 ut &huic sequalem femicirculum 0 K H circa centrumS. De corporis loco quovis C erige ordinatim C D. Junge SD^ & areae ASD a:qua-lem conftitue iedtionem OSK. Patetper , quod corpus cadendo defcribet fpatium ACeodem tempore quo corpus aliud uniformiter cir-ca centrum S gyrando, defcribere poteft arcum0 K. Oupd erat faciendum. Prop. XXXVII. Prob. XXVI. (Jorporis de loco dato firfnm vel decrfum proje&i defnirc tcmporaafcenfm <vd dcfcenfws. Ex-
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