Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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pagenum
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57
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<
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Facilius eſt mouere paruum pondus quam magnum.
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Moles ſine vecte eſt pondus minus: quam cum vecte.
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<
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id.000940
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<
emph
type
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Ergo facilius eſt mouere molem ſine vecte: quam cum vecte.
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Propoſitio eſt vera, quia vires cuiuſlibet citius æquabunt, aut etiam
<
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ſuperabunt pondus minus: quam maius. </
s
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<
s
id
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id.000942
">Aſſumptio verò fallaciam
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habet ex varia diſpoſitione vectis cum mole. </
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<
s
id
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id.000943
">Nam totus, aut dimi
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dia, aut pluſquam dimidia ſui parte ſuppoſitus, aut ſuperpoſitus moli,
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adijceret pondus ponderi, ſicque moles ponderoſior reuera euaderet.
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</
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<
s
id
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id.000944
">At diſponitur aliter, nempe libræ in morem, ita vt parte exigua ſup
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ponatur moli mouendæ, & ab illi ſuppoſito fulcimento radius, ſeu
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caput ad vim mouentem maius fit, ſicque diſpoſitus pondus non
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adijcit moli.
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emph.end
type
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italics
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<
s
id
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id.000945
">An quia vectis.]
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emph
type
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Solutio eſt problematis, quod vectis cum in
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vſum venit referat libram, quæ latitudine effatu digna prædita,
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& cuius agina deorſum ſita ſit, tum quæ in inæqualia brachia diui
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ſa eorum maius habeat ad partes mouentis, & ſic tum ob libræ agi
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nam inferius poſitam, tum ob radij mobilis magnitudinem vectis
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facile & velociter mouetur, & vna cum vecte pondus alteri parti
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incumbens aut annexum. </
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<
s
id
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id.000946
">Ratio hæc concluditur hoc ſyllogiſmo.
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Libra deorſum habens aginam & brachium vnum longius, per
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id facile deprimitur, & depreſſa manet: vt patuit ex præce
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dentibus.
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Vectis eſt libra deorſum habens
<
expan
abbr
="
aginã
">aginam</
expan
>
, & brachium vnum
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longius ( agina enim ſeu centrum fit hypomochlium, &
<
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quidem ita vt ipſam diuidat in partes inæquales, è quibus
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quæ ad caput longior ſit, alioqui aliter in vſum adhibitus
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vis mouens non magis mouere poteſt, quam ſine vecte.)
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Ergo vectis facile deprimetur, depreſſuſque manebit, & ad eius
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motum pondus incumbens mouebitur.
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<
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lang
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el
">o(\
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ou)=n to\ kinou/menon ba/ros pro\s to\ kinou=n, to\ mh=kos pro\s to\ mh=kos
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a)ntipe/ponqen.</
foreign
>
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<
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id
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<
foreign
lang
="
el
">ai)ei\ de\ o(/sw| a)\n mei=zon a)festh/koi, tou= u(pomoxli/ou,
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r(a=|on kinh/sei.</
foreign
>
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id
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<
foreign
lang
="
el
">ai)ti/a de/ e)stin h( prolexqei=sa, o(/ti h(
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plei=on a)pe/xousa e)k tou= ke/ntrou, mei/zona ku/klon gra/fei.</
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>
</
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>
<
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id
="
g0130306
">
<
foreign
lang
="
el
">w(/ste
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a)po\ th=s au)th=s i)sxu/os ple/on metasth/setai to\ kinou=n to\
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plei=on tou= u(pomoxli/ou a)pe/xon.</
foreign
>
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<
foreign
lang
="
el
">e)/stw moxlo\s e)f' ou(= *a*b.
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ba/ros de\ e)f' w(=| to\ *g.to\ de\ kinou=n, e)f' w(=| to\ *d. u(pomo/xlion
<
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e)f' w(=| to\ *e. </
foreign
>
</
s
>
<
s
id
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">
<
foreign
lang
="
el
">to\ de\ e)f' w(=| to\ *d kinh=san, e)f' w(=| to\ *h: kekinhme/non
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de\ to\ e)f' ou(= *g. ba/ros e)f' ou(= *k.</
foreign
>
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</
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<
p
type
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">
<
s
id
="
id.000951
">Quod autem eſt mobile
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ad mouens, id eſt longitu
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do ad longitudinem reci
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procè. </
s
>
<
s
id
="
id.000952
">Semper ſane quantò
<
lb
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longitudo magis diſtabit à
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preſſione, facilius mouebit. </
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