DelMonte, Guidubaldo
,
Mechanicorvm Liber
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">Et ſi vectes BA
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BL BM habeant
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fulcimenta in B, &
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pondus ſupra
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vectẽ
">vectem</
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ſit NO; & ab eius
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centro grauitatis F
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ducatur ipſi AB, &
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horizonti perpendi
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cularis FDEG; ſint
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〈qué〉 potentiæ in L
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AM; ſimiliter o
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ſtendetur ita eſſe po
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tentiam in L pon
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dus ſuſtinentem ad ipſum pondus, vt BD ad BL; & potentiam
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in A ad pondus, vt BE ad BA, atq; potentiam in M, vt BG
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ad BM. </
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<
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">Sit deniq;
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vectis AB ho
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rizonti æqui
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diſtans, cuius
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fulcimentum
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C, & pondus
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DE habeat
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expan
abbr
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cẽ
">cen</
expan
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trum grauita
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tis F in ipſo
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vecte AB;
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ſintq; deniq;
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alii vectes G
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H kL, quo
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rum fulcimenta ſint MN; pondusq; in vecte GH ſuſtineatur à
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punctis GO; in vecte autem AB à punctis AP; & in uecte KL
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à punctis KQ; & centrum grauitatis F ſit quoq; in utroq; uecte
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GH kL; ſintq; potentiæ in HBL. </
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<
s
id
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id.2.1.93.3.1.1.0.a
">Dico potentiam in H ad
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pondus ita eſſe, ut NF ad NH; & potentiam in B ad pondus, ut
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CF ad CB; ac potentiam in L ad pondus, ut MF ad ML. </
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<
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id
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id.2.1.93.3.1.1.0.b
">Quo
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niam enim F centrum eſt grauitatis ponderis DE, ſi igitur in F </
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