Cavalieri, Buonaventura
,
Geometria indivisibilibvs continvorvm : noua quadam ratione promota
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vel vtrectangulum, FMN, ad, {1/6}, quadratorum, RM, MV,.</
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ad, {1/3}, quadrati, RM, .</
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MN, ad, {1/3}, MH, vel vt tripla, MN, ad, MH. </
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<
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rectangula ſub, Δ V, VT, ad rectangula ſub portione, RFV, & </
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ſub, RY, ſunt vt parallelogrammum,
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Δ V, ad portionem, RFV, ergo ſi
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fiat, vt, Δ V, ad portionem, RFV,
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26. l. 2.</
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ita tripla, MN, ad, H ω; </
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ſub, Δ V, VT, ad reliquum, demptis
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rectangulis ſub portione, RFV, & </
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ſub, RY; </
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tione, & </
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.</
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<
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& </
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<
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drata portionis, RFV, erunt vetripla,
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MN, ad, M ω, omnia autem quadra-
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ta, Δ V, ad rectangula ſub, Δ V, VT,
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ſunt vt quadratum, FM, ad rectangu-
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lum, FMI, .</
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vt ſexquialtera, FM, ad ſexquialte-
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ram, MI, .</
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gula autem ſub, Δ V, VT, ad omnia
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quadrata portionis, RFV, ſunt vt
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tripla, MN, ad, M ω, ergo ex æqua-
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li omnia quadrata, Δ V, ad omnia
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quadrata portionis, RFV, erunt vt ſexquialtera ipſius, FM, ad,
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M ω, quæ eſt reſiduumipſius, MH, dempta, H ω, ad quam tri-
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pla, MN, eſt vt, Δ V, ad portionem, RFV, quod oſtendere
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opus erat.</
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omnia quadrata portionis minoris, RFV, vtcunque
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ſumptæ regula diametro. </
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dem regula baſi. </
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baſi, RV, ad tria quadrata lineæ, RM, cum quad. </
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quadrata, Δ V, regula eadem, ſunt vt, ω M, ad ſexquialteram, F
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M, .</
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