Gassendi, Pierre
,
De proportione qua gravia decidentia accelerantur
,
1646
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spatium AC ad spatium AB, neceſſe eſt, vt spatium
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totum AC eodem, aut æquali tempore decurratur,
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quo spatium AB abſoluitur. </
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<
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id
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">Jmpoßibile est au
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tem, vt corpus graue deſcendens per AC eodem,
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aut æquali tempore percurrat totam AC, quo per
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currit partem eius AB, niſi motus fiat in instanti.
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</
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<
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id
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">Tam impoßibile eſt igitur, vt velocitates in deſcenſu
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grauium inter ſe ſint, vt emenſa ſpatia (ac proinde,
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vt etiam æqualibus ſpatiis creſcant æqualiter) quàm
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impoßibile eſt motum illum fieri in instanti.
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<
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inde,
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Proh tuam, mi
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G
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aſſende, Philoſophorumque omnium,
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ac Mathematicorum fidem! istudne demonſtrare eſt? </
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<
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">Et
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tamen mirum quantum Galileus de hac, vt putat, ſubtili,
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clara, euidenti, ac Mathematica demonſtratione ſibi applau
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dat, quam integra pagina mirificis laudibus exaggerat. </
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illud multò adhûc mirabiùus, quod Lynceus Philoſophus, ac
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Mathematicus, Lynceorumque princeps in tam aperta
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luce cæcutiat, & vir eius nominis tam facilè deludatur.
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<
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<
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">Ego verò, ô optime, ac religioſſime Vir, quo
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me cenſu putem iri habitum, qui non ſim ex viris
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non ineruditis, & eandem tamen cum Galileo opi
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nionem perſuaſus ſim, ac perinde cæcutiam, perinde
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deludar? </
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<
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">Etenim cùm meam quæſis fidem, fatcor
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ingenüè me non videre quem in eo notas Paralogiſ
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mum; ac videri mihi neceſſariò deduci, fore, vt ſi ve
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locitas per totam AC acquiratur dupla illius, quæ
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acquiritur per totam AB, ipſa AC eodem, aut æqua
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li tempore, quo AB percurratur. </
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<
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">Rem certe in
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hunc modum concipio. </
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<
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">Intelligatur AC diuiſa in
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duodecim parteis æqualcis, ac proinde eius dimidium </
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