DelMonte, Guidubaldo
,
Mechanicorvm Liber
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hoc ſitu, putá in ECF. </
s
>
<
s
id
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id.2.1.51.8.1.3.0.a
">Dico li
<
lb
/>
bram ECF in ACB redire. </
s
>
<
s
id
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id.2.1.51.8.1.4.0
">to
<
lb
/>
tius magnitudinis centrum grauita
<
lb
/>
tis inueniatur D. </
s
>
<
s
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N12120
">& CD iunga
<
lb
/>
tur. </
s
>
<
s
id
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id.2.1.51.8.1.5.0
">Quoniam enim pondera AB
<
lb
/>
<
arrow.to.target
n
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note81
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manent, linea CD horizonti per
<
lb
/>
pendicularis erit. </
s
>
<
s
id
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id.2.1.51.8.1.6.0
">quando igitur
<
lb
/>
libra erit in ECF, linea CD erit
<
lb
/>
putá in CG; quæ cùm non ſit ho
<
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<
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rizonti perpendicularis; libra ECF in ACB redibit. </
s
>
<
s
id
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">quod idem
<
lb
/>
eueniet, ſi centrum C ſupra libram conſtituatur, vt in H. </
s
>
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type
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<
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Per def.
<
expan
abbr
="
cẽtri
">centri</
expan
>
grauitatis.
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1
<
emph
type
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italics
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Huius.
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1.
<
emph
type
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italics
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Huius.
<
emph.end
type
="
italics
"/>
</
s
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<
s
id
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id.2.1.52.1.1.4.0
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1
<
emph
type
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italics
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Huius.
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type
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italics
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</
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</
p
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<
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type
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<
s
id
="
id.2.1.53.1.1.1.0
">Si verò arcus, ſiue angulus
<
lb
/>
ACB, ſit infra lineam AB; eo
<
lb
/>
dem modo libram ECF, cuius
<
lb
/>
centrum, ſiue ſit in C, ſiue in H,
<
lb
/>
deorſum ex parte F moueri o
<
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/>
ſtendemus.
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<
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id
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">Sit autem angulus ACB ſupra lineam AB; ac libræ centrum
<
lb
/>
ſit H; lineaq; CH libram ſuſtineat; & moueatur libra in EKF:
<
lb
/>
libra EkF in ACB redibit. </
s
>
</
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</
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