DelMonte, Guidubaldo
,
In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata
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Sit in rectanguli coni portione
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ABC
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duæ rectæ lineæ AC DE
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æquidiſtantes.
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diameter verò portionis ABC ſit BF.
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Intelli
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gaturquè fruſtum ADEC à portione ABC abſciſſum. </
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nes vti〈que〉 lineæ ipſis AC DE æquidiſtantes in fruſto AD
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EC ductæ, erunt à linea GF bifartam diuiſæ, ex quo
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pa
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tet quidem & ipſius ADEC diametrum eſſe GF, lineasquè AC
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DE lineæ portionem in B contingenti æquidistantes eſſe. </
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<
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verò linea FG in quin〈que〉 partes æquales diuiſa, quinta pars me
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dia ſit HK. at〈que〉
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diuidatur HK in I, ita vt
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HI ad
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IK eandem habeat proportionem, quam habet ſolidum baſim habens
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quadratum ex AF, altitudinem verò lineam æqualem vtriſ〈que〉
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ſimul duplæ ipſius DG, & ipſi AF, ad ſolidum, quod
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baſim habeat quadratum ex DG, altitudinem autem lineam æqua-
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