DelMonte, Guidubaldo
,
In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata
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erit punctum C ſecundùm diuiſionem proportione reſpondentem prædi
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etæ.
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vt ſcilicet ſit HC ad CE, vt AD ad DG. etenim ut AD
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ad DG; ita
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fuit FC ad CE. ſi igitur ſecetur linea EH ſe
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cundùm proportionem ipſius AD ad DG; non terminabit
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diuiſio ad punctum C. cùm ſit impoſſibile eandem habere
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proportionem FC ad CE, quam. </
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uiſio igitur ad aliud terminabitur punctum, vt K; ita vt
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ad KE ſit, vt AD ad DG. vnde ſequitur punctum K cen
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trum eſſe grauitatis magnitudinis ex AD DG compoſitæ.
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Non eſt igitur punctum C centrum magnitudinis ex AD DG compo
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ſitæ; hoc est ipſius AB. eſt autem; ſuppoſitum eſt enim
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ipſum eſſe.
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er
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go ne〈que〉 punctum H centrum est grauitatis magnitudinis DG.
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eſt
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igitur punctum F; quod quidem eſt terminus productę lineę
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CF; quæ eandam habet proportionem ad lineam CE inter
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centra exiſtentem; quam habet grauitas magnitudinis AD
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ad grauitatem ipſius DG. quod demonſtrare oportebat. </
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ex præce
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dentibus.
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ex præce
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dentibus.
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<
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<
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">In hac demonſtratione intelligendum eſt etiam punctum
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H eſſe poſſe extra lineam EF, ita vt EFH non ſitirecta linea.
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quòd ſi H non eſſet in linea EF, idem ſequi abſurdum adeò
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perſpicuum eſt; vt nec demonſtratione egeat. </
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<
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">Quoniam ſi in
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telligatur H extra lineam EF; iuncta EH, & ita diuiſa intel
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ligatur, vt ipſius partes permutatim grauitatibus magnitudi
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num AD DG reſpondeant; eſſet vti〈que〉 hoc punctum
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tum</
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, quod extra lineam EF reperiretur, centrum grauitatis to </
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