Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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tam permittere volare: ita tamen vt digitis alterum extremum funi
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culi retineant. </
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<
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id
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">Hæc enim in altero extremo muſca, tanquam in ex
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tremo radij circulum deſcribentis volatu ſuo deſcribit circulum: hic
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volatus compoſitus eſt è duobus motibus: vno, quo hæc muſca pro
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prio fertur,
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abbr
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ſecũdum
">ſecundum</
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quem ſeſe è vinculo liberare conatur: altero, quo
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per vinculum retinetur, ne euagetur longius, quam longitudo
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funiculi permittit. </
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id
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">Ibi motus muſcæ violentus eſt, & non naturalis
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vt à quo etiam cum pes abrumpitur præ ſuo conatu, aut nodus for
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tuitò laxatur, ſi liberatur, ſtatim rectà aufugit.
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">Si enim ſecundum.]
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Hanc particulam parentheſi ſic [ ] in
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tercludendam curauimus, quod eam ſuperuacuam eſſe cum Leonico
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exiſtimemus.
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">Itaque circulare.]
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Proinde eſt ac ſi diceret, cum via ſeu linea
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per quam fertur radij extremum mobile ſit maxime vniformis, vt
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ex definitione circuli conſtat, nec tamen recta: reſtat, vt ſit circula
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ris ſeu rotunda, à medio ſcilicet comprehenſi ſpatij æqualiter ex omni
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parte diſtans. </
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id
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">quod nulli alij obliquarum linearum conuenire poreſt:
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non ellipſi quidem, quia licet vna ſit linea, & extremum in ea fiat
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primum, vt in peripheria: nullum tamen punctum in eius medio eſt,
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à quo omnes rectæ ad ellipſis peripheriam ſint æquales: non parabo
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læ, non hyperbolæ, non ſpirali ſeu volutæ. </
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id
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">Quia in nulla harum, quod
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eſt extremum fit primum, quod peripheriæ conuenit. </
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">Præterea nulla
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harum ſimplex eſt linea. </
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id
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">Agitur hîc autem de ſimplicibus tantum,
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quæ vno ſimplici motu, vel ſi duobus, ijs ſimilibus creantur, & ſi
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milares ſunt: quales cum duæ tantum ſint recta ſcilicet & circula
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ris, inde bene inferetur è poſita ſimplicè ſi recta non eſt, eſſe cir
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cularis.
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<
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lang
="
el
">o(/ti me\n toi/nun h( to\n ku/klon gra/fousa
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/>
fe/retai du/o fora\s a(/ma, fanero\n e)/k te tou/twn,
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kai\ o(/ti to\ fero/menon kat' eu)qei=an e)pi\ th\n ka/qeton a)fi
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knei=tai, w(/ste ei)=nai pa/lin au)th\n a)po\ tou= ke/ntrou ka/qeton.</
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>
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lang
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e)/stw ku/klos o( *a*b*g, to\ d' a)/kron to\ e)f' ou(= *b, fere/sqw
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e)pi\ to\ *d: a)fiknei=tai de/ pote e)pi\ to\ *g.</
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>
</
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<
foreign
lang
="
el
">ei) me\n ou)=n e)n tw=|
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lo/gw| e)fe/reto o(\n e)/xei h( *b*d, pro\s th\n *d*g, e)fe/reto a)\n
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th\n dia/metron th\n e)f' h(=| *b*g.</
foreign
>
</
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<
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id
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<
foreign
lang
="
el
">nu=n de/, e)pei/per e)n ou)deni\
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lo/gw|, e)pi\ th\n perife/reian fe/retai th\n e)f' h(=| *b e *g.</
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>
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<
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id
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">Quod vero recta
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abbr
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deſcribẽs
">deſcri
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bens</
expan
>
circulum duabus ſimul
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lationibus feratur,
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expan
abbr
="
cũ
">cum</
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>
ex his
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eſt
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expan
abbr
="
manifeſtũ
">manifeſtum</
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>
,
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abbr
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tũ
">tum</
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>
quod lata
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<
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ſecundũ
">ſecundum</
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<
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abbr
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rectã
">rectam</
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fieret num
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quam perpendicularis. </
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id
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">Et
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fieri à
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abbr
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cẽtro
">centro</
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>
<
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abbr
="
perpendicularẽ
">perpendicula
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rem</
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>
[
<
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demõſtrem
">demonſtrem</
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>
us]. </
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<
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