Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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<
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>Cauſa vero ante dicta eſt:
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quoniam radius maior ma
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iorem deſcribit circulum.
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<
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">Itaque ab eadem vi plus
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mutabitur mouens illud,
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quod plus diſtat à preſſio
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ne. </
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<
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">Sit vectis
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pondus
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vero
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mouens autem
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preſſio
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Ipſum vero quod
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mouerit
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ſit vbi
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& pon
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dus
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motum vbi
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">COMMENTARIVS. </
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Locus hic breuißimè totam vectis rationem explicat, vt ſciatur
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vectis vſus, & quæ vires, ad quod onus mouendum ſufficiant,
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vel non ſufficiant. </
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<
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id
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">Quæres vt intelligatur proponemus hoc theore
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ma. </
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<
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id
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">Vteſt potentia ad pondus ſuſtentum: ita eſt pars vectis ab hypo
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mochlio verſus linguam, ad partem ab eodem hypomochlio verſus
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caput, quod vt demonſtretur. </
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<
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id
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id.000959
">Sit vectis A B, & huius hypo
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mochlium C:
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<
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abbr
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ſicq;
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vectis duæ
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partes C A ver
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ſus linguam, C
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B verſus caput:
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ſit quoque pon
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dus D ſuſpenſum ex perpendiculari A D: potentia autem ſuſtinens
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ſit in B. </
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<
s
id
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id.000960
">Dico potentiam in B eſſe ad pondus D: vt A C ad B
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C ( quod hic vocatur reciprocè ) fiat ergo vt B C ad A C: ita
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pondus D ad aliud, vt E. </
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>
<
s
>hoc igitur pondus E loco potentiæ ap
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penſum in B, ipſum D pondere æquabit. </
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>
<
s
id
="
id.000961
">Magnitudines enim in gra
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uitate commenſurabiles æquiponderant, ſi permutatim ſuſpendantur
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in diſtantijs ſecundum grauitatum rationem
<
expan
abbr
="
cõſtitutæ
">conſtitutæ</
expan
>
prop. 6. lib. 1.
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Archim. de æquipond. </
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<
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id
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">Et ſic potentia æqualis ipſi E ibidem conſti
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tuta pondere æquabit ipſum D, id eſt ne D deorſum vergat, quod fa
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