DelMonte, Guidubaldo
,
Mechanicorvm Liber
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<
chap
id
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N1043F
">
<
p
id
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id.2.1.39.2.0.0.0
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type
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main
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<
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id.2.1.39.2.1.5.0
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<
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n
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23
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xlink:href
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036/01/059.jpg
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niſi in puncto C, & in partes diuidet æquales. </
s
>
<
s
id
="
id.2.1.39.2.1.6.0
">quare Ariſtotelis
<
lb
/>
ſententia ipſis non ſolum non fauet, verùm etiam maximè aduer
<
lb
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ſatur. </
s
>
<
s
id
="
id.2.1.39.2.1.7.0
">quòd non ſolum ex ſecunda, & tertia huius liquet; verùm
<
lb
/>
quia exiſtente centro ſupra libram pondus eleuatum maiorem
<
lb
/>
propter ſitum acquirit grauitatem. </
s
>
<
s
id
="
id.2.1.39.2.1.8.0
">ex quò contingit redditus li
<
lb
/>
bræ ad æqualem horizonti diſtantiam. </
s
>
<
s
id
="
id.2.1.39.2.1.9.0
">è contra verò, quando
<
lb
/>
centrum eſt infra libram. </
s
>
<
s
id
="
id.2.1.39.2.1.10.0
">Quæ omnia hoc modo oſtendentur;
<
lb
/>
ſupponendo ea, quæ ſupra declarata ſunt. </
s
>
<
s
id
="
id.2.1.39.2.1.11.0
">ſcilicet pondus ex quò
<
lb
/>
loco rectius deſcendit, grauius fieri. </
s
>
<
s
id
="
id.2.1.39.2.1.12.0
">& ex quo rectius aſcendit, gra
<
lb
/>
uius quoq; reddi. </
s
>
</
p
>
<
p
id
="
id.2.1.39.3.0.0.0
"
type
="
main
">
<
s
id
="
id.2.1.39.3.1.1.0
">Sit libra AB horizonti
<
lb
/>
æquidiſtans, cuius centrum
<
lb
/>
C ſit ſupra libram, perpen
<
lb
/>
diculumq; ſit CD. ſintq; in
<
lb
/>
AB ponderum æqualium
<
lb
/>
centra grauitatis poſita: mo
<
lb
/>
taq; ſit libra in EF. </
s
>
<
s
id
="
id.2.1.39.3.1.1.0.a
">Dico
<
lb
/>
pondus in E maiorem ha
<
lb
/>
bere grauitatem, quàm pon
<
lb
/>
dus in F. </
s
>
<
s
id
="
N11ACB
">& ob id libram
<
lb
/>
EF in AB redire. </
s
>
<
s
id
="
id.2.1.39.3.1.2.0
">Produ
<
lb
/>
catur primùm CD vſq; ad
<
lb
/>
mundi
<
expan
abbr
="
centrũ
">centrum</
expan
>
, quod ſit S. </
s
>
<
s
id
="
id.2.1.39.3.1.2.0.a
">de
<
lb
/>
inde AC CB EC CF HS
<
lb
/>
<
expan
abbr
="
cõnectantur
">connectantur</
expan
>
, à punctiſq; EF
<
lb
/>
ipſi HS æquidiſtantes du
<
lb
/>
cantur Ek GFL. </
s
>
<
s
id
="
id.2.1.39.3.1.2.0.b
">Quoniam
<
lb
/>
igitur naturalis deſcenſus re
<
lb
/>
ctus totius magnitudinis,
<
lb
/>
libræ ſcilicet EF ſic conſti
<
lb
/>
tutæ vná cum ponderibus,
<
lb
/>
eſt
<
expan
abbr
="
ſcundùm
">secundum</
expan
>
grauitatis cen
<
lb
/>
trum H per rectam HS; erit
<
lb
/>
<
figure
id
="
id.036.01.059.1.jpg
"
place
="
text
"
xlink:href
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036/01/059/1.jpg
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number
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43
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<
lb
/>
quoq; ponderum in EF ita poſsitorum deſcenſus ſecundùm re
<
lb
/>
ctas Ek FL ipſi HS parallelas; ſicuti ſupra demonſtrauimus. </
s
>
<
s
id
="
id.2.1.39.3.1.3.0
"/>
</
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>
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chap
>
</
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</
archimedes
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