Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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Semper enim B D æqualis eſt H E: tota vero C E quæ æqua
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lis eſt A E exſuis conſtabit partibus C H, H E.
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<
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Nauis longius progrediens: quam remi palmula retrocedat, inter
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uallum conficit maius dimidio eius, quod motu proprio remi caput
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decurrit: ſi minus: minus etiam dimidio.
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Huius demonſtratio ex prædictis facilis eſt.
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Naui celerius mota quam caput remi: palmula antrorſum moue
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bitur, nec quicquam retrocedet, idque ſpatij decurret quo nauis motus
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motum capitis remi ſuperat.
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Habeat remus inci
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piente motu poſitionem
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A C: deſinente vero
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rectitudinis F G.
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">Scalmus igitur B pro
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pter nauis motum tranſ
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latus erit in D. </
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que interuallum B D
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maius:
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quã
">quam</
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A H, quod
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eſt à capite remi motu
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proprio decurſum. </
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enim celerius dicetur
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ferri nauis quam caput
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remi. </
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<
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">Dico quod palmu
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la C in vlteriora mouebitur. </
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<
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id
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">Nam cum ſcalmus B prouectus fue
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rit in D, tranſlata erit ipſa palmula A C, vbi G in rectitudinis
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ſitu, interuallumque conficiet C G curuilineum, cui reſpondet C K.
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<
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">Mouebitur igitur palmula in anteriora. </
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<
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id
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">Nihil autem vnquam re
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trocedere oſtendetur in hunc modum. </
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<
s
id
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id.001426
">Eadem celeritate mouentur A
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in H, & C verſus
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circa ſcalmum. </
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<
s
id
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">Atqui per hypotheſim cele
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rius fertur nauis: quam C verſus
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. </
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<
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">Et mouetur idem C ipſa nauis
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celeritate verſus K. </
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<
s
>celerius igitur feretur C ad K: quam ad
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.
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<
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>quapropter nihil vnquam retrocedet ipſum C. </
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>
<
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id
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">Imo vero in vlte
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riora progredietur, interuallumque decurret C K, quod quidem re
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linquitur, detracto
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<
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C ex
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K. </
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<
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">Si enim remi palmula tota ipſa
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