DelMonte, Guidubaldo
,
Mechanicorvm Liber
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ſuſtinendo requiri potentiam. </
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6
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Huius.
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8
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Quinti.
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5
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Huius.
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10
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Quinti.
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id.2.1.100.1.1.5.0
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6
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Huius.
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<
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id
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id.2.1.101.1.1.1.0
">Hinc quoq; vt ſupra patet pontentiam in A ad potentiam in E eſ
<
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ſe, vt BL ad BM; potentiamq; in A ad potentiam in O, vt BL
<
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ad BS. </
s
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<
s
id
="
id.2.1.101.1.1.1.0.a
">atque potentiam in E ad potentiam in O, vt BM
<
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ad BS. </
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</
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<
p
id
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id.2.1.101.2.0.0.0
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type
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<
s
id
="
id.2.1.101.2.1.1.0
">Præterea ſi in B alia intelligatur potentia, ita vt duæ ſint poten
<
lb
/>
tiæ pondus ſuſtinentes; minor erit potentia in B ſuſtinens pon
<
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/>
dus PQ vecte BO, quàm pondus CD vecte BA aduerſo au
<
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tem maior requiritur potentia in B ad ſuſtinendum pondus FG ve
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cte BE, quàm pondus CD vecte AB. </
s
>
<
s
id
="
N1352F
">ducta enim kN ipſi EB
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perpendicularis, erit EN ipſi AL æqualis: quare EM ipſa LA
<
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maior erit. </
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>
<
s
id
="
id.2.1.101.2.1.2.0
">ergo maiorem habebit proportionem EM ad E
<
emph
type
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italics
"/>
B
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emph.end
type
="
italics
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,
<
arrow.to.target
n
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note167
"/>
<
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/>
quàm LA ad A
<
emph
type
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italics
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B
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emph.end
type
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italics
"/>
; & LA ad A
<
emph
type
="
italics
"/>
B
<
emph.end
type
="
italics
"/>
maiorem, quàm SO ad O
<
emph
type
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italics
"/>
B
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emph.end
type
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;
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note168
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<
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quæ ſunt proportiones potentiæ ad pondus. </
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id.2.1.102.1.0.0.0
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8
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Quinti.
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<
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id.2.1.102.1.1.2.0
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5
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Huius.
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</
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<
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id
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id.2.1.103.1.0.0.0
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type
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<
s
id
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id.2.1.103.1.1.1.0
">Similiter oſtendetur potentiam in
<
emph
type
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italics
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B
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emph.end
type
="
italics
"/>
pondus vecte A
<
emph
type
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italics
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B
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emph.end
type
="
italics
"/>
ſuſti
<
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nentem ad potentiam in eodem puncto
<
emph
type
="
italics
"/>
B
<
emph.end
type
="
italics
"/>
vecte E
<
emph
type
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italics
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B
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emph.end
type
="
italics
"/>
ſuſtinentem
<
lb
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eſſe, vt LA ad EM; ad potentiam autem in B pondus vecte O
<
emph
type
="
italics
"/>
B
<
emph.end
type
="
italics
"/>
<
lb
/>
ſuſtinentem ita eſſe, vt AL ad OS. </
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>
<
s
id
="
N1359A
">quæ verò vectibus E
<
emph
type
="
italics
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B
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emph.end
type
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OB
<
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ſuſtinent inter ſe ſe eſſe, vt EM ad OS. </
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>
</
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<
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type
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<
s
id
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id.2.1.103.2.1.1.0
">Deinde vt in iis, quæ ſuperius dicta ſunt, demonſtrabimus po
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lb
/>
tentiam in
<
emph
type
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italics
"/>
B
<
emph.end
type
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italics
"/>
ad potentiam in E eam habere proportionem, quam
<
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EM ad M
<
emph
type
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B
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; & potentiam in
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B
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type
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"/>
ad potentiam in A ita eſſe, vt AL ad
<
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<
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L
<
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type
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B
<
emph.end
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, potentiamq; in
<
emph
type
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B
<
emph.end
type
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ad potentiam in O, vt OS ad S
<
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type
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B.
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</
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3
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Cor.
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<
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2
<
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Huius.
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</
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<
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id
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id.2.1.105.1.0.0.0
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<
s
id
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">Sit autem vectis A
<
emph
type
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italics
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B
<
emph.end
type
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italics
"/>
<
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horizonti æquidiſtans,
<
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cuius fulcimentum
<
emph
type
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B
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,
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grauitatiſq; centrum H
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ponderis AC ſit ſupra
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vectem: moueaturq; ve
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ctis in
<
emph
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B
<
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E, ac pondus
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in EF, potentiaq; in G.
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</
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<
s
id
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N13616
">ſimiliter vt ſupra oſten
<
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detur potentiam in G
<
lb
/>
pondus EF
<
expan
abbr
="
ſuiſtinen
">sustinen</
expan
>
<
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<
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106
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<
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tem minorem eſſe potentia in D pondus AC ſuſtinente. </
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<
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id
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id.2.1.105.1.1.2.0
">cùm </
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