Cavalieri, Buonaventura
,
Geometria indivisibilibvs continvorvm : noua quadam ratione promota
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LIBER VI.
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noides 63: </
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51. l. 4. ſec.
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poſterior.</
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bolicus 21. </
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<
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hæmiſphæroides ſexquitertium
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51. l. 4.</
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eſſe conoidis parabolici, quadru-
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gener. 34.
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l. 2.</
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plum apicis parabolici, & </
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ptuplum apicis ſphæralis. </
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noides verò parabolicum tri-
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51. l. 4. ſe-
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ctio 1.</
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plum eſſe apicis parabolici, & </
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quintuplum ſexquiquartum apicis ſphæralis, quæ ex ipſis nume-
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34. l. 3.</
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ris colliguntur, ſimiliter conum, FCE, duplum eſſe apicis para
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bolici, triplum ſexquialterum proximè apicis ſpæralis, quoad api-
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cem ſphæralem enim ſemper proximam dictam rationẽ intellige,
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& </
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<
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tiens quartas.</
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<
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miſphærium, vel hæmiſphæroides, conoides parabo-
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licum, hyperbolicum, & </
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ducatur planum per punctum ſectionis baſi æquidiſtans.
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<
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ad ſolida, à quibus abſcinduntur in ratione infraſcripta. </
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Similiter demptis dictis ſolidis ſingillatim à cylindro, ab-
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ſciſſæ per ductum planum portiones ad reſiduum cylindri,
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demptis ſolidis iam dictis, erunt in ratione infraſcripta.</
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quem in eadem baſi ſit hæmiſphærium, vel hæmiſphæroides, DV
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ATF, conoides parabolicum DOARF, hyperbolicum, DNASF,
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& </
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per, k, ducatur planũ, CG, baſi, DF, æquidiſtans. </
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34. l. 3.</
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riũ, vel hæmiſphæroides, DVATF, ad portionẽ, VAT, erit vt pa-
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ralle lepipedũ ſub dupla, AE, & </
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ſub compoſita ex dupla, AE, & </
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noides parabolicum, DOARF, ad conoides, OAR, erit vt qua-
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<
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51. l. 4.</
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dratum, EA, ad quadratum, AK. </
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ASF, ad conoides, NAS, vt parallelepipedum ſub compoſita ex
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30. l. 5.</
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ſexquialtera tranſuerſi eiuldem lateris, &</
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