Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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nauigij celeritate moueretur, vltra k progrederetur, cum B perue
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niret ad D: ſed retrahitur interim, propter eum motum, qui fit cir
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ca B. </
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<
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id
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">Sic igitur palmulæ celeritate, quæ à motu nauigij prouenit, re
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tardata, decurſum interuallum erit C K. </
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<
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id
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">Videtur autem ſolo remo
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rum impulſu hoc fieri non poſſe: ſed alia inſuper virtute impellente
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opus eſſe: vt vento, vel impetu eò fluentis aquæ.
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Atque ex his theorematis concludit Nonius Ariſtotelem con
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fusè propoſuiſſe hoc problema, cum non diſtinxerit inter motum re
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mi proprium, & motum à naui tranſlata ei aduenientem. </
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<
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id
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">Concludit
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etiam hac diſtinctione poſita Ariſtotelem inſcitè, & falsò proble
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mati ſatisfeciſſe. </
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<
s
id
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">Quandoquidem non continuò ſi nauis in anteriora
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moueatur, remi palmula retrocedet: neque ſi retrocedat, minus inter
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uallum in contrarium tranſmittet: quam nauis progrediatur, vt ex
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ſecunda & tertia propoſitionibus liquet: præterea cum caput remi
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motu proprio, qui circa ſcalmum fit, vnâ cum nauis motu, maius in
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teruallum conficiat: quam nauis, ſolo autem proprio motu, ſi contin
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gat tantum interuallum conficere: quantum nauis, fieri non poßit, vt
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palmula moueatur: fruſtrà Ariſtoteles conatus eſt in vniuerſum
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oſtendere remi caput maius ſpatium decurrere: quam palmulam in
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contrarium. </
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>
<
s
id
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id.001436
">Poſtremo cum nauis longius progreditur: quam palmula
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regreditur: minus quo que interuallum decurrit: quam caput remi, &
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ſic non æquale. </
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<
s
id
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">Atque hæc cum ſint ſuis veris demonſtrationibus
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ſtabilita Ariſtotelem in hoc problemate dormitaſſe, quod aliquando
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bono Homero contingit, conuincunt.
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<
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lang
="
el
">to\ d'
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au)to\ kai\ to\ phda/lion poiei=.</
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<
foreign
lang
="
el
"> plh\n o(/ti ei)s to\ pro/sqen ou)de\n
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sumba/lletai tw=| ploi/w|, w(/sper e)le/xqh e)pi\ a)/nw, a)lla\
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mo/non th\n pru/mnan ei)s to\ pla/gion a)pwqei= e)/nqa h)\ e)/nqa.</
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>
</
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<
s
id
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g0130515b
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<
foreign
lang
="
el
">ei)s
<
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tou)nanti/on ga\r h( prw=|ra ou(/tw neu/ei.</
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id
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<
foreign
lang
="
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">h(=| me\n dh\ to\ phda/lion
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prose/zeuktai, dei= oi(=o/n ti tou= kinoume/nou me/son noei=n, kai\ w(/sper
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o( skalmo\s th=| kw/ph|: to\ de\ me/son u(poxwrei=, h(=| o( oi)/as metakinei=tai.</
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lang
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">
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e)a\n me\n ei)/sw a)/gh|, kai\ h( pru/mna deu=ro meqe/sthken:
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h( de\ prw=|ra ei)s tou)nanti/on neu/ei.</
foreign
>
</
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<
foreign
lang
="
el
">e)n ga\r tw=| au)tw=|
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ou)/shs th=s prw/|ras, to\ ploi=on meqe/sthken o(/lon.</
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>
</
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type
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<
s
id
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id.001439
">Id etiam ipſum facit gu
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bernaculum, niſi quod an
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terius non mouet nauim:
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vt antea dictum eſt: ſed
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hinc vel hinc puppim ſo
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lum in tranſuerſum pellit.
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</
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<
s
id
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id.001440
">Sic enim in
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expan
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cõtrariũ
">contrarium</
expan
>
prora
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vergit. </
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>
<
s
id
="
id.001441
">Vbi igitur
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expan
abbr
="
gubernaculũ
">guberna
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culum</
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>
<
expan
abbr
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adiũctũ
">adiunctum</
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eſt, ibi opor
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tet aliquod eius, quod mo
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uetur
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abbr
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mediũ
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intelligere, & </
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