Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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in ſitu fuerit A B vt
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in G H manebit, tum
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quia brachia manent
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æqualia, tum quia cen
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trum grauitatis C ſem
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per erit in perpendicu
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lari horizontis, ſecun
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dum quam & ad quam
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magnitudo compoſita
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ex brachijs C A, C B & lancibus & ponderibus æquiponderan
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tibus, ſi impoſita ſint, fertur, ſed ſuſtinetur linea C D vel C E
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fixa. </
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<
s
id
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prætermiſſæ. </
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<
s
id
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id.000898
">Rarò tamen huic demonſtrationi licet veræ, experien
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tia reſpondet, propter inſtrumentorum materiam Phyſicam, in qua
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exacte medium conſtituere non datur in puncto geometrico, vtcum
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que tamen alias reſpondet.
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id
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<
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lang
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el
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<
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id
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<
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lang
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">*dia\ ti/ kinou=si mega/la ba/rh mikrai\ duna/meis tw=| moxlw=|:
<
lb
/>
w(/sper e)le/xqh kai\ kat' a)rxh/n: proslabo/nti ba/ros
<
lb
/>
e)/ti to\ tou= moxlou=; r(a=|dion de\ to\ e)/latto/n e)sti kinh=sai ba/ros.</
foreign
>
</
s
>
<
s
id
="
g0130301
">
<
foreign
lang
="
el
">
<
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/>
e)/latton de/ e)stin a)/neu tou= moxlou=.</
foreign
>
</
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<
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id
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g0130302
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<
foreign
lang
="
el
">h)\ o(/ti ai)/tio/n e)stin o( moxlo/s
<
lb
/>
zugo\n ka/twqen, e)/xon to\ sparti/on, kai\ ei)s a)/nisa dih|rhme/non,
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to\ ga\r u(pomo/xlio/n e)sti to\ sparti/on.</
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>
</
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<
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id
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<
foreign
lang
="
el
">me/nei
<
lb
/>
ga\r a)/mfw tau=ta, w(/sper to\ ke/ntron, e)pei\ de\ qa=tton u(po\
<
lb
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tou= i)/sou ba/rous kinei=tai h( mei/zwn tw=n e)k tou= ke/ntrou.</
foreign
>
</
s
>
<
s
id
="
g0130302b
">
<
foreign
lang
="
el
">e)/sti de\
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lb
/>
tri/a ta\ peri\ to\n moxlo/n.</
foreign
>
</
s
>
<
s
id
="
g0130302c
">
<
foreign
lang
="
el
">to\ me\n u(pomo/xlion, spa/rton,
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lb
/>
kai\ ke/ntron.</
foreign
>
</
s
>
<
s
id
="
g0130302d
">
<
foreign
lang
="
el
">du/o de\ ba/rh, o(/, te kinw=n, kai\ to\ kinou/menon.</
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>
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arrow.to.target
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="
marg18
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id
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Videtur hic
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aliquid de
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eſſe & fortè.
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<
emph
type
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italics
"/>
Radius au
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tem minor
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tardius.
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type
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<
s
id
="
id.000903
">Cur vires exiguæ vecte
<
lb
/>
magna
<
expan
abbr
="
mouẽt
">mouent</
expan
>
onera, vt eſt
<
lb
/>
in principio
<
expan
abbr
="
dictũ
">dictum</
expan
>
inſuper
<
lb
/>
<
expan
abbr
="
adiiciẽdo
">adiiciendo</
expan
>
vectis ipſius onus.
<
lb
/>
</
s
>
<
s
id
="
id.000904
">Facilius enim eſt minus mo
<
lb
/>
uere onus: minus vero eſt
<
lb
/>
abſque vecte. </
s
>
<
s
id
="
id.000905
">An quia ve
<
lb
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ctis cauſa eſt, qui & inſtar
<
lb
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libræ deorſum habet
<
expan
abbr
="
aginã
">agi
<
lb
/>
nam</
expan
>
, & in inæqualia diuiſus
<
lb
/>
eſt? </
s
>
<
s
id
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id.000906
">Eſt enim preſſio pro
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agina. </
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>
<
s
id
="
id.000907
">ambæ enim ſtant vt
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/>
centrum. </
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>
<
s
id
="
id.000908
">Quoniam vero
<
lb
/>
celerius ab æquali ponde
<
lb
/>
re mouetur radius maior. </
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>
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