DelMonte, Guidubaldo
,
Mechanicorvm Liber
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<
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<
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">Ex hoc manifeſtum eſt, quò pondus à centro
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libræ magis diſtat, eò grauius eſſe; & per conſe
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quens velocius moueri. </
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Hinc præterea ſtateræ quoq; ratio facilè oſten
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detur. </
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Stateræ ratio.
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">Sit enim ſtate
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ræ ſcapus AB, cu
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ius trutina ſit in
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C; ſitq; ſtateræ
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appendiculum E.
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</
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<
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pondus D, quod
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æqueponderet ap
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pendiculo E in F
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appenſo. </
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<
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">aliud quoq; appendatur pondus G in A, quod etiam
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appendiculo E in B appenſo æqueponderet. </
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>
<
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">Dico grauitatem
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ponderis D ad grauitatem ponderis G ita eſſe, vt CF ad CB. </
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>
<
s
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lb
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Quoniam enim grauitas ponderis D eſt æqualis grauitati ponde
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ris E in F appenſi, & grauitas ponderis G eſt æqualis grauitati pon
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deris E in B; erit grauitas ponderis D ad grauitatem ponderis E in
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F, vt grauitas ponderis G ad grauitatem ponderis E in B: & permu
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arrow.to.target
n
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tando, vt grauitas ponderis D ad grauitatem ponderis G, ita graui
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tas ipſius E in F, ad grauitatem ipſius E in B; grauitas autem pon
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/>
<
arrow.to.target
n
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note117
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deris E in F ad grauitatem ponderis E in B eſt, vt CF ad CB; vt
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lb
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igitur grauitas ponderis D ad grauitatem ponderis G, ita eſt CF
<
lb
/>
ad CB. </
s
>
<
s
id
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">ſi ergo pars ſcapi CB in partes diuidatur æquales, ſolo
<
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/>
pondere E, & propius, & longius à puncto C poſito; ponderum
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grauitates, quæ ex puncto A ſuſpenduntur inter ſe ſe notæ erunt. </
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