DelMonte, Guidubaldo
,
In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata
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læ ABC ęquale. </
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<
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ęquidiſtans, quę bifariam diuidat oppoſita latera GR
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KS. producanturquè RG SK. fiantquè GO KX ę
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quales ipſis GN KP. iungaturquè OX; erit nimi-
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rum parallelogram mum OP ipſi GS ęquale. </
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<
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re parallelogram mum OP parabolę ABC exiſtit ę
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quale. </
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<
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">Applicatum eſt igitur ad GK parallelogram
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mum expoſitę parabolę ęquale. </
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<
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id
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">lineaquè GK paralle
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logrammi OP bifariam diuidit oppoſita latera ON
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XP. quod fieri oportebat. </
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44.
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conicorum
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Apoll.
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17. 24.
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Ar
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ch. </
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patab.
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1.
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ſexti.
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ex
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44.
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pri
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mi.
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<
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">Si in portione recta linea rectanguliquè coni
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ſectione contenta triangulum inſcribatur,
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eandẽ
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baſim cum portione habens, & altitudinem æqua
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lem: & rurſus in reliquis portionibus triangula in
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ſcribantur, quæ eaſdem baſes cum portionibus
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habeant, & altitudinem æqualem; ſemper què in
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reſiduis portionibus triangula eodem modo
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inſcribantur: figura, quæ in portione oritur,
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planè inſcribi dicatur. </
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<
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