Viviani, Vincenzo
,
De maximis et minimis, geometrica divinatio : in qvintvm Conicorvm Apollonii Pergaei
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xml:space
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">Sifuerit vt recta AD ad DC, ita quadratum AB ad BC, erunt
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AD, DB, DC in continua ratione geometrica.</
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<
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xml:space
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">SIenim DB non eſt media proportionalis inter AD, DC, eſto ſi fieri po-
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teſt media quæcunque DE; </
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<
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">erit igitur, in prima figura, tota AD ad to-
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tam DE, vt pars DE ad partem DC, ergo reliqua AE ad reliquam EC, erit
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uerſalius
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quàm à
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Caual. in
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3. prop.
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exerc. 6.</
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vt pars ED ad DC, vel vt tota AD ad totam DE: </
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<
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ſtructione) in ſecunda verò cum ſit AD ad DE vt DE ad
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http://echo.mpiwg-berlin.mpg.de/zogilib?fn=/permanent/library/QN4GHYBF/figures/0047-01
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DC, erit componendo AE ad ED, vt EC ad CD, & </
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mutando AE ad EC, vt ED ad DC, vel vt AD ad DE
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(ex conſtructione) cum ergo in vtraque figura ſit AE ad
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EC, vt AD ad DE, erit quadratum AE ad EC, vt qua-
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dratum AD ad DE, vel vt recta AD ad DC, vel vt qua-
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dratum AB ad BC (ex ſuppoſitione) vel recta AE ad
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EC, vt recta AB ad BC, & </
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<
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do, at in ſecunda diuidendo, AC ad CE, vt AC ad CB,
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quare CE, CB inter ſe ſunt &</
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<
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">quales, totum, & </
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quod eſt abſurdum: </
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">non eſt ergo media inter AD, & </
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DC, quæ ſit maior, vel minor DB; </
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<
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media proportionalis inter AD, & </
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ſtrare oportebat.</
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nales, tùm exceſſus quibus differunt, tùm earum aggregata, erunt in
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eadem ratione, in qua ſunt datæ magnitudines: </
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eſſe AD ad DE, vt DE ad DC oſtenſum quoque fuit AE ad EC eſſe vt AD
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ad DE, ſed in prima figura AE, EC ſunt exceſſus datarum magnitudinum,
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in ſecunda verò ſunt aggregata primæ cum ſecunda, & </
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ſimul occurrant, ſintque earum diametri inter ſe æquidiſtantes, & </
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applicatæ ſint eædem, ac ipſarum vertices ſint in eadem recta, quæ
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ducitur ex occurſu; </
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omnes, quæ ex contactu in ipſis ducuntur in eadem ratione à ſe-
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ctionibus diuidentur.</
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ipſi BF æquidiſtans, & </
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