Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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Eadem verò celeritate ſta
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tim per quantam lineam
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natus eſt conuolui maior. </
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Hæc inter
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poſita
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vidẽtur
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tur</
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">COMMENTARIVS. </
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">Præterea vnica.]
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Cum ſit oſtenſa problematis veritas rurſus
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oſtendit aliquid admirabile contineri. </
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">Ratio admirationis ſic erit
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apertior.
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Idem eadem celeritate latum æqualem
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lineã
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tranſire natum eſt.
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Ergo æqualem tranſire natum eſt.
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Attamen aliter fit. </
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">Nam eadem celeritate latum modò
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maiorẽ
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,
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modò minorem tranſit. </
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">Ergo problema admirationis plenum eſt. </
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">Syllogiſ
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mi huius propoſitio eſt euidens: aſſumptio poſtea diſtinguetur.
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">Cæterum principium.]
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Vt admiratio tollatur, duo aſſumun
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tur è Phyſicis, quæ ſi diligenter expendantur, ſunt vtraque euiden
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ter vera. </
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">Primum eſt. </
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">Si ab vna & eadem vi duo moueantur, quo
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rum alterum quidem à ſe moueri natum eſt ſecundum motum illum,
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ſecundum quem à vi
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abbr
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mouẽtis
">mouentis</
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mouetur: alterum verò non eſt natum
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eo moueri motu, vel natum quidem ſit, ſed tum motu non vtatur ſuo:
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moueantur autem iſta coniunctim, illud quod ex ſe illo motu moueri
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natum erat, tardius mouebitur: quam ſi per ſe moueretur. </
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<
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id
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">Exemplum
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ſit plumbum cum vtre aëre pleno annexum, quod euidenter tardius
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deſcendit per aquam: quam ſi liberum fuiſſet ab vtre, vt ſit in con
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iuncto eadem, atque in libero erat grauitas. </
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ab alio non plus moueri poteſt: quam quod ipſum mouet, vt quod non
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ſuo: ſed motu mouentis moueatur, tum mouens & motum ſunt ſi
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mul, vt demonſtratum eſt ab Ariſtotele in lib. de Phyſ. auditu. </
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<
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">Cauſa
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itaque problematis in hoc continetur, quod è duobus circulis eadem
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celeritate motis alter primo mouetur, & alter prior is moti raptum
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ſequitur. </
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<
s
id
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">Itaque ſi minoris raptum ſequatur maior, orbita maioris fiet
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æqualis orbitæ minoris, cum maior in motu non vi vtatur ſua, ſed ad
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motum minoris moueatur: ſi vero maioris raptum minor ſequatur,
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orbita minoris fiet æqualis orbitæ maioris, cum minor eò feratur quò
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etiam maior ipſum rapit. </
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>
<
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id
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id.002585
">Et ſic celerius per maiuſque ſpatium, quam
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