DelMonte, Guidubaldo
,
Mechanicorvm Liber
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perpendicularis exiſtat) vecti æqueponderabit; hoc eſt vectem
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AB deorſum premendo ſuſtinebit. </
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13
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Huius.
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<
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">Si verò potentia in puncto B ponenda eſſet. </
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<
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">fiat vt CF ad CM
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ita pondus AB ad potentiam. </
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<
s
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">ſimili modo oſtendetur poten
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tiam in B vectem AB ſuſtinere. </
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">ſimiliterq; demonſtrabitur in quo
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cunq; alio ſitu (præterquàm in e) ponenda fuerit potentia, vt in
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N. </
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N13EEF
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tur in N, vectem AB ſuſtinebit. </
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<
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">Adiiciatur autem pondus in vecte appenſum,
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ſiue poſitum; vt iisdem poſitis ſit pondus P in
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A appenſum; potentiaq; ſit ponenda in B, ita
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vt vectem AB vnà cum pondere P ſuſtineat.
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<
s
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">Diuidatur AM in Q, ita vt AQ ad QM ſit, ut grauitas ue
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ctis AB ad grauitatem ponderis P; deinde ut CF ad CQ, ita fat
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grauitas AB, & P ſimul ad potentiam, quæ ponatur in B: patet
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potentiam in B uectem AB unà cum pondere P ſuſtinere. </
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<
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id.2.1.135.3.1.2.0
">Si ue
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rò eſſet CA ad CM, vt AB ad P; eſſet punctum C eorum centrum
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grauitatis, & ideo vectis AB vná cum pondere P abſq; potentia in
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B manebit. </
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<
s
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">ſed ſi ponderum grauitatis centrum eſſet inter CF, vt
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in O; fiat vt CF ad CO, ita AB&P ſimul ad potentiam, quæ
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in B, & vectem AB, & pondus P ſuſtinebit. </
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