Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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los ſublata & tracta faci
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lius mouemus, vt ſi tro
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chleæ ſint maiores minori
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bus, & ſcytalæ ſimiliter. </
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quia quantò maior fuerit
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radius in tempore æquali,
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per maius mouetur
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ſpatiũ
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.
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<
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Itaq;
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æquali inſiſtente one
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re, idem faciet, vt diximus
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etiam libras maiores mi
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noribus eſſe exactiores. </
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enim agina
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cẽtrũ
">centrum</
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. </
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in librili, quæ ſunt ab agina
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vtrimque, ſunt radij. </
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">COMMENTARIVS. </
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">Cvr per maiores.]
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In hoc capite tractatur problema de ma
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ioribus circulis, & ſphæricis. </
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">cur ſcilicet facilius & celerius
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moueantur & moueant. </
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">Cui reſpondetur ex lineæ à centro longitu
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dine maiore. </
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">Ratio ſic diſponetur.
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Vbi lineæ à centro ſunt maiores: ibi per motum æquali tempore
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maius ſpatium conficitur, & facilis etiam motio fit, tum an
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nexa onera mouentur.
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In circularibus & ſphæricis maioribus lineæ à centro
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ſunt maiores: quam in minoribus.
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Ergo circuli & ſphæræ maiores æquali tempore maius ſpatium
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conficient, facilius mouebuntur, & annexa onera moue
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bunt: quam minores.
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Ex hoc colligimus maiores rotas in curribus vna volutatione tan
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tam lineam cum conficiant: quanta orbitæ reſpondet, nec maiori tra
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ctu egeant: quam minores, tantò commodiores eſſe ad celeritatem, &
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motus facilitatem: quantò maiores extiterint. </
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<
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id
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">Et cum in facili tractu
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biroti onerati ſarcina tendere debeat ad æquilibrium, vt neque tolla
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tur de collo iugum præ pondere poſteriore, neque ſic prematur, vt ſi
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mul iumentum trahat, & geſtet: ſed potius trahat: quam geſtet: in
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