Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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">e)/ti h(=| e)pire/pei e)pi\ to\ ba/ros,
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tau/th| kinei= o( kinw=n. </
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<
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lang
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">o(/tan me\n ga\r pro\s o)/rqh\n h( dia/metros
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h)=| tou= ku/klou tw=| e)pipe/dw|, a(ptome/nou tou= ku/klou kata\ stigmh\n
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tou= e)pipe/dou, i)/son to\ ba/ros e)p' a)mfo/tera dialamba/nei
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h( dia/metros. </
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</
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<
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lang
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">o(/tan de\ kinh=tai eu)qu\s ple/on e)f' w(=|
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kinei=tai, w(/sper r(e/pon e)nteu=qen, eu)kinhto/teron tw=| w)qou=nti ei)s
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tou)/mprosqen: e)f' o(\ ga\r r(e/pei e(/kaston, eu)ki/nhto/n e)stin. </
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<
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ei)/per kai\ to\ e)pi\ to\ e)nanti/on th=s r(oph=s duski/nhton.</
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<
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id
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">Præterea quò pondus
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vergit, eò motor impellit.
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</
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<
s
id
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id.001667
">Quum igitur diameter cir
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culi rectà inſiſtit plano, cir
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culo in puncto planum at
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tingente, æqualiter vtrim
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que diameter pondus di
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ſterminat. </
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<
s
id
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id.001668
">Quando verò
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mouetur ſtatim plus ad id
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mouetur, veluti eò repens
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motu facilius impellente
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in anteriorem partem. </
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<
s
id
="
id.001669
">Eò
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enim, quò vergit vnum
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quodque, facilius moue
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/>
tur. </
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<
s
id
="
id.001670
">Quandoquidem ſi in
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contrarium: quam quò
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vergat, moueatur, difficulter mouebitur. </
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">COMMENTARIVS. </
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<
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">Præterea quò.]
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Tertia cauſa facilitatis eſt motus, quando mo
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bile in omni poſitu ſuper plano dimidia ſui parte quoquouerſum
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ad planum ipſum acclinat, vt fit in rotundo, quod ipſum tangit in
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puncto, vt ante docuimus, ſicque quoquouerſum vergit. </
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<
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id
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">Hinc dico
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ſphæricum ad latus moueri poſſe quacumque vi, quæ aërem impulſu
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vel tractu diuidere poßit. </
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>
<
s
id
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id.001674
">Vnus enim aër circunſtans impedit, quo
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minus voluatur. </
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>
<
s
id
="
id.001675
">Non enim nixus aſcendendi ſurſum, cum ob graui
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tatem eò non nitatur: neque rurſus deorſum deſcendendi, ob æqui
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librium enim innixus pondus non adfert, quin potius dimidia ſui
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parte quoquouerſum nutans nititur moueri, vt in circulo ad cen
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trum: à contactu quoque, quia minimo, non impeditur. </
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<
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id
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id.001676
">Relinqui
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tur ergò tantum impediri à medio circunstante. </
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<
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id
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id.001677
">Hoc à quacun
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que vi vt oris flatu ſi diuidatur, ſphæricum in locum diuiſionis pro
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mouebitur.
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<
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id
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">Rectà inſiſtit.]
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type
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Diameter circuli rectà inſiſtere in plano di
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citur cum ad omnes rectas lineas à quibus tangitur in ipſo plano
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