Gassendi, Pierre
,
De proportione qua gravia decidentia accelerantur
,
1646
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ſatus es in Galileo Paralogiſmum. </
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<
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AC ita DE ad IC; ergo vt DE tempus ad IC tempus,
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ita AE tempus ad AC tempus; atqui tempus DE per
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te eſt æquale tempori IC; ergo AE tempus tempori
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AC æquale erit; hoc eſt pars, & totum æquali tempo
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re percurrentur. </
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<
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">Sic quia totum quodlibet ita ſe habet
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ad ſui trientem, & velocitas in fine totius ad velocita
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tem in fine trientis, vt ſe habet magnitudo, & veloci
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tas AE comparata ad AC: ſequitur, vt etiam pari mo
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do ſe habeat, quo DE comparata ad IC; quare &
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quemadmodum DE triens ipſius AE eodem tempo
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re percurritur, quo IC: ita diametri mundi triens eo
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dem tempore percurratur. </
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<
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rem eſſe connexionem ipſius DE, quàm trientis dia
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metri mundi cum ipſa IC; nam vis ratiocinij eſt ſo
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lùm in comparatione totius ad trientem; & aliunde
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quot ſunt plures partes in triente diametri mundi,
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quàm in triente ſpatij DE: totidem ſunt etiam veloci
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tates plures, quibus tempore eodem ſuperetur, atque
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ita de cæteris. </
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De Ratione continuò dupla, qua ſpatia decurri temporibus
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æqualibus R. P. concludit.
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<
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brum, de Ratione continuò dupla, qua pertranſiri
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ſpatia temporibus continuò æqualibus infers. </
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<
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autem, vbi adnotaſti non poſſe quidem ex deductio
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ne à te mox facta,
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abſolutè colligi quantum præcisè tem
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poris graue ex aßignata altitudine deſcendens in toto deſ
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cenſu inſumat, niſi diſtinctè etiam cognoſeatur tempus deſ-
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