DelMonte, Guidubaldo
,
In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata
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51
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4
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huius.
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<
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<
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">Ex hoc autem manifeſtum eſt, ſi quotcunquè
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magnitudinum, & numero imparium,
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gra
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uitatis in recta linea conſtituta fuerint; & magni
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tudines æqualem habuerint grauitatem; rectæquè
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lineæ inter ipſarum centra fuerint æquales, ma
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gnitudinis ex omnibus magnitudinibus compoſi
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tæ centrum grauitatis eſſe punctum, quod & ipſa
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rum mediæ centrum grauitatis exiſtit. </
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*</
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<
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<
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magnitudines,
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quã
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tres; dummodo ſint numero impares, vt
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ABCDE; quarum centra grauitatis ABCDE reperiantur in li
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nea recta AE. fuerint autem hę magnitudines æquales in gra
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uitate. </
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<
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">inſuper rectę lineę AB BC CD DE, quę ſunt inter
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cẽ-tra
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tra</
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grauitatis, fuerint æquales: magnitudinis ex omnibus ma
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gnitudinibus ABCDE compoſitæ centrum grauitatis eſſe
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punctum C. quod eſt centrum grauitatis magnitudinis
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mediæ. </
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<
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">Eodem enim modo, ac primùm quidem ex demonſtratio
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ne patet
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punctũ
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C centrum eſſe grauitatis
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triũ
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<
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magnitudinũ
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BCD, & quoniam AB BC ſunt æquales ipſis CD DE, </
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</
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