Archimedes
,
Archimedis De iis qvae vehvntvr in aqva libri dvo
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DE CENTRO GRAVIT. SOLID.
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æquidiſtant autem c g o, m n p. </
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">ergo parallelogrãma ſunt
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o n, g m, & </
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tur
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l m, a b c triãgulis, quæ æqualia & </
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<
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<
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in c o, & </
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<
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<
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uitatis trianguli a b c, & </
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l m grauitatis cen-
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trum erit id, quod demonſtrandum relinquebatur. </
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<
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">Simili
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ratione idem contingere demonſtrabimus in aliis priſma-
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tibus, ſiue quadrilatera, ſiue plurilatera habeant plana,
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quæ opponuntur.</
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">COROLLARIVM.</
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Iibet priſmatis axem, parallelogrammorum lat eri
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bus, quæ ab oppoſitis planis ducũtur æquidiſtare.</
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<
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">THEOREMA VI. PROPOSITIO VI.</
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">Cuiuslibet priſmatis centrum grauitatis eſt in
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plano, quod oppoſitis planis æquidiſtans, reli-
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quorum planorum latera bifariam diuidit.</
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<
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">Sit priſma, in quo plana, quæ opponuntur ſint trian-
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gula a c e, b d f: </
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<
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">parallelogrammorum latera a b, c d,
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e f bifariam diuidãtur in punctis g h _K_: </
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<
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tem planum ducatur; </
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<
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">cuius ſectio figura g h _K_. </
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">eritlinea
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">33. primi</
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g h æquidiſtans lineis a c, b d & </
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<
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<
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">quare ex
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decimaquinta undecimi elementorum, planum illud pla
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nis a c e, b d f æquidiſtabit, & </
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<
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ram ipſis æqualem, & </
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<
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uimus. </
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<
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">Dico centrum grauitatis priſmatis eſſe in plano
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g h
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. </
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<
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">Si enim fieri poteſt, ſit eius centrum l: </
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<
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l m uſque ad planum g h
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, quæ ipſi a b æquidiſtet.</
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