Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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<
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">COMMENTARIVS. </
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<
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Altera eſt eiuſdem
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pro
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blematis demonſtratio. </
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Innatantia in vortice latio vorticoſa aquæ vincit, vel non
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vincit. </
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circuli, non ferentur in eo, in quo ſunt circulo. </
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ticoſæ aquæ vinceret. </
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gò, vt in minori id eſt interiori, vt qui tardior ſit, ferantur,
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& ſimili ratione ab hoc quouſque ad medium veniant.
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Si verò vincat, vt primum quidem vincat, tandem tamen
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non vincit. </
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<
s
id
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">Oportet enim vt modò hæc latio grauitatem
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innatantium celeritate ſua vincat: modò ipſa innatantia
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ſua grauitate celeritatem lationis vorticoſæ aquæ vin
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cant. </
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<
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">Vnumquodque enim nititur ſemper, ne vincatur.
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Et ſic idem fiet, quod ante: vt innatantia ad interiorem feran
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tur, & ad eum denique terminum, in quo violentia vorticis
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non amplius voluantur. </
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<
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id
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">Hic autem terminus medium eſt vor
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ticis ad quod omnia congregantur.
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Innatantia igitur in aqua vorticoſa ad medium deuoluuntur. </
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fuit demonſtrandum.
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Hactenus fuerunt duæ demonſtrationes Ariſtotelis, quæ vt dixi
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præſupponunt gurgitis vortices eſſe circulos concentricos, quod fal
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ſum eſt, quia ſunt linea ſpiralis vnius aut plurium reuolutionum.
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<
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id
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">Præterea nullam mentionem facit decliuitatis ſuperficiei aquæ vor
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ticoſæ verſus medium, quæ res maximè confert ad deſcenſum rei in
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natantis, & eiuſdem deuolutionis ad medium. </
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<
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id
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">Ibi enim ſpecus quæ
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dam ſub aquis in terra latet, quæ
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quaſi
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ſine
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fundo dicta eſt. </
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>Et in quam tanquam ex alto confluunt magna ce
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leritate aquæ. </
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<
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id
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">Indicium huius eſt, quod pluma innatans ad hoc exa
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ctè medium cum delata eſt, ſtatim abſorbetur, tracta ſcilicet deſcen
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ſu aquæ: alioqui natura leuior infra aquam non deſcendet, tan
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tum abeſt, vt quæ grauia ſunt non ibi ſubitò ſummergantur. </
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<
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id
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">His
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ita poſitis demonſtratio problematis Aristotelici eſt facilis &
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breuis.
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