DelMonte, Guidubaldo
,
In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata
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<
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<
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">Si autem magnitudines fuerint incommenſura
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biles, ſimiliter æ〈que〉ponderabunt ex diſtantijs per
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mutatim eandem, at〈que〉 magnitudines, propor
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tionem habentibus. </
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Sint incommenſurabiles magnitudines AB C. Distantiæ verò
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DE EF. Habeat autem AB ad C proportionem eandem, quam di
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stantia ED ad ipſam EF. Dico,
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ſi ponatur AB ad F, C ve
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rò ad D,
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magnitudinis ex vtriſ〈que〉 AB C compoſitæ centrum gra
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uitatis eſſe punctum E. ſi enim non æ〈que〉ponderabit
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(ſi fieri poteſt)
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<
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AB poſita ad F ipſi C poſitæ ad D; velmaior est AB, quàm C, ita
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vt
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emph.end
type
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AB ad F
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æ〈que〉ponderet ipſi C
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ad D;
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vel non. </
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<
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; ſitquè
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exceſſus HL; ita vt KH ad F, & C ad D ę〈que〉ponderent.
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auferaturquè ab ipſa AB
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magnitudo NL, quæ ſit
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minor exceſſu
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HL,
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quo maior est
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tota
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AB, quàm C, ita vt æ〈que〉ponderent
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; vt
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eſt.
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& ſit quidem reſiduum A,
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hoc eſt KN,
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commenſurabile ipſi C.
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Et quoniam minor eſt kN quàm KM, minorem quo〈que〉 </
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