Aristoteles
,
Physicorvm Aristotelis, sev, de natvrali auscultatione, libri octo
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PHYSICORVM ARIST.
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<
s
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xml:space
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">_CV_'m autem omne quod mouetur, in tẽpore moueatur,
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xml:space
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">Hîc detepmi-
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@at Ā
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riſt. de fi-
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nico & infinito
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in motu: ficut
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em̃ diuiſio per,
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cinet ad ratio-
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nem continui,
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ita finitũ & in,
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finitũ, ſicut aũt
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fuprà oſtẽdit {quis}
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diuiſio inueni-
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tur in motuma
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gnitudine, tem
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pore, & mobili
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ita idẽ de infi-
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@ito oſtendit.</
note
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in maioreq́; </
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<
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">maiorẽ magnitudinẽ tranſeat, fieri profe
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ctò nõ põt, ut magnitudinẽ infinito in tẽpore trãſeat quic-
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quã finitã modò nõ per ipſam eandẽ ſemper, nec per aliquã
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eius partẽ, ſed per totã toto in tẽpore moueatur. </
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<
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">Patet igi-
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tur, ſi quippiã æqua moueatur celeritate, neceſſe eſſe finitã
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magnicudinẽ illud finito in tẽpore pertrãſire: </
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<
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">ſumpta nanq;
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</
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<
s
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xml:space
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">parte, quæ menſurauerit to tam, in tot æqualibus tẽporibus,
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quot ſunt magnitudinis partes, totã illam profectò magni-
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tudinẽ pertranſibit. </
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<
s
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xml:space
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">Quare cùm harũ quæq; </
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<
s
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">finitæ ſit quan
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titatis: </
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<
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xml:space
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">& </
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<
s
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xml:space
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">oẽs numero ſint finitæ, tempus etiã ipſum profe-
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ctò finitum erit: </
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<
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xml:space
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">tantũ enim toties erit, quantũ eſt tẽpus par
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tis toties repetitũ, quot ſunt magnitudinis partes. </
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<
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">Nihil aũt
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interest, & </
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<
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">ſi nõ æqua celeritate mouetur. </
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<
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">Sit enim ſpaciũ
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quidem A B finitum, quod infinito in tempore pertrãſiuit,
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rempus autẽ in finitum C D. </
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<
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">Siigitur per privrem aliã alia
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partem motum eſſe neceſſe eſt, patet in priore tẽporis par-
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te, posterioriúe aliam, aliamúe pertranſiuiſſe: </
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<
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maiore in tempore per aliam motum erit. </
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">idq́; </
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<
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">non minus
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fiet, ſiue æqua, ſiue non æqua celeritate mutetur: </
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xml:space
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<
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tendatur motus, ſiue remittatur, ſiue in eodem perſistat. </
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cipiatur itaq; </
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<
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">pars aliqua ſpacij quæ metietur A B longitu
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dinem totã, atq; </
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<
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">A F literis deſignetur. </
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<
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">Hanc igitur aliqua
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in parte tranſiuit temporis infiniti, quippe cùm impoßibile
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ſit, eam in infinito tempore pertrãſiſſe, totũ enim ſpacium,
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in infinito pertranſit. </
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<
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">Etrurſus, ſi aliã ſumpſero tantam,
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quanta eſt ipſa A F, neceſſe eſt & </
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<
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">hanc eadem ratione fini
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to in tempore tranſijſſe: </
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<
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">ſic uſq; </
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">ad ultimã proficiſcar. </
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Cũ igitur infiniti ꝗdẽ nulla ſit pars, quæ metietur ut ipſum,
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ut patet (fieri enim non poteſt, ut infinitũ ex finitis </
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