DelMonte, Guidubaldo
,
Mechanicorvm Liber
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ligata, altero autem à mouente potentia deten
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to: erit decurſum trahentis potentiæ ſpatium, mo
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ti ponderis ſpatii triplum. </
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<
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">Sit pondus A; ſit BCD orbiculus tro
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chleæ ponderi A ex EQ ſuſpenſo alligatæ;
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ſitq; orbiculi centrum E; ſit deinde FGH
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orbiculus trochleæ ſurſum appenſæ, cuius
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centrum k; ſitq; funis LFGHDCBM
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circa omnes reuolutus orbiculos, tro
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chleæq; inferiori in L religatus: ſitq; in
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M potentia mouens. </
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<
s
id
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">dico ſpatium de
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curſum à potentia in M, dum mouet pon
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dus, triplum eſſe ſpatii moti ponderis A. </
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Moueatur potentia in M vſq; ad N; &
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centrum E ſit motum vſq; ad O; & L vſ
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que ad P; atq; pondus A, hoc eſt pun
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ctum Q vſq; ad R; orbiculuſq; motus, ſit
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TSV. </
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<
s
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N14EED
">ducantur per EO lineæ ST BD
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horizonti æquidiſtantes, quæ inter ſe ſe
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quoq; æquidiſtantes erunt. </
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<
s
id
="
id.2.1.165.8.1.3.0
">quoniam au
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tem dum E eſt in O, punctum Q eſt in
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R; erit EQ æqualis OR, & EO ipſi QR
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æqualis; ſimiliter LQ æqualis erit PR,
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& L P ipſi QR æqualis. </
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>
<
s
id
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id.2.1.165.8.1.4.0
">tres igitur QR
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EO LP inter ſe ſe æquales erunt; quibus
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etiam ſunt æquales BS DT. </
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<
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id
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id.2.1.165.8.1.4.0.a
">& quoniam fu
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nis LFGHDCBM æqualis eſt funi PF
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GHTVSN, cùm ſit idem funis, & qui
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circa ſemicirculum TVS eſt æqualis funi
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circa ſemicirculum BCD; demptis igi
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tur communibus PFGHT' & SM; erit
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reliquus MN tribus BS LP DT ſimul
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ſumptis æqualis. </
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>
<
s
id
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id.2.1.165.8.1.5.0
">BS verò LP DT ſimul
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tripli ſunt EO, & ex conſequenti QR.
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