Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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nutum ad motum ineſſe: quam in minoribus. </
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lus habeat intra ſe infinitos concentricos, omnis peripheria nutum
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habebit infinitum, & ideò perpetuum ad motum.
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">Infiniti autem.]
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Quod infiniti circuli minores concentrici in
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ſint in quouis dato circulo ſic demonſtrabimus. </
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cuius ſemidiameter D B bifariam
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ſecetur, vt in puncto E prop. 10.
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lib. 1. </
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>Et centro D interuallo D E
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deſcriptus circulus poſt. 3. </
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erit concentricus & minor ipſo
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C B def. 1. lib. 3. </
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E bifariam ſecetur, vt in puncto
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F, & centro D eodem interuallo
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D F deſcriptus circulus erit con
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centricus & minor. </
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tione deinceps ad infinitum, cum rectam lineam ſemper biſſecare li
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ceat prop. 10. lib. 1. </
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>Et ſic infiniti erunt circuli concentrici minores
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in quouis circulo. </
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">Etiamſi curuatura.]
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Repetit cauſam perpetui motus, aut nu
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tus ad motum, quæ in circulo eſt, cum ſua abſide id eſt curuatura at
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tingit planum, ineſſe, etiamſi non attingat, vt fit in rotis figulorum,
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& in trochleis. </
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<
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>de quibus poſtea.
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">Sed ob aliam cauſam.]
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Quinta cauſa de naturali motu ſe
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cundum peripheriam hîc leuiter attingitur, vel potius ex anteceden
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tibus breuiter repetitur. </
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dum fit circulus à rectæ manente altero extremo, & moto altero,
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quod ſuo motu deſcribit peripheriam. </
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">In facto enim circulo, vel glo
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bo naturali quatenus particeps eſſet grauitatis reuera motus natura
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lis eſt is, quò rectà deorſum fertur. </
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cumbit non cedens, per vim aliquam impulſus globus ad motum cir
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cularem ſe recipit.
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ſunt mouentiores. </
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<
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">*dia\ ti/ ta\ dia\ tw=n meizo/nwn ku/klwn ai)ro/mena kai\
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e(lko/mena, r(a=|on kai\ qa=tton kinou=men, oi(=on kai\ ai( troxilai=ai
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ai( mei/zous tw=n e)latto/nwn, kai\ ai( skuta/lai o(moi/ws;</
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<
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">h)\
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dio/ti o(/sw| a)\n mei/zwn h( e)k tou= ke/ntrou h)=| e)n tw=| i)/sw| xro/nw|,
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ple/on kinei=tai xwri/on. </
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<
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">w(/ste kai\ tou= i)/sou ba/rous e)po/ntos,
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poih/sei to\ au)to/, w(/sper ei)/pomen, kai\ ta\ mei/zw zuga\ tw=n
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e)latto/nwn a)kribe/stera ei)=nai.</
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">to\ me\n ga\r sparti/on e)sti\
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ke/ntron.</
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<
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">tou= de\ zugou= ai( e)pi\ ta/de tou= sparti/ou ai( e)k tou=
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ke/ntrou.</
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