Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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Sed perinde ac ſi ſuo motu
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alter non moueatur, nul
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lum que motum habeat. </
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<
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ſi habeat eo
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nõ
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vtatur, hoc
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accidit. </
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<
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id
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id.002597
">Quando igitur ma
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gnus paruum
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abbr
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alligatũ
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mo
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uerit, hic paruus
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abbr
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tãtundem
">tantundem</
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mouetur. </
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<
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">Quando verò
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paruus rurſus: tantundem
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magnus. </
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<
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">Separatim verò
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vterque ſeipſum mouet.
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">Quod verò
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abbr
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eodẽ
">eodem</
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exiſtente
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centro, & moto eadem ce
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leritate
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abbr
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cõtingit
">contingit</
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ipſos ma
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iorem
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abbr
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trãſilire
">tranſilire</
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lineam, pa
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ralogiſmus eſt à dubitante
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dolosè prolatus. </
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<
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id
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id.002601
">Idem qui
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dem eſt centrum vtriſque:
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ſed per accidens vt
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muſicũ
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& album eſſe. </
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<
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id
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id.002602
">Quod enim
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eſſet de eſſentia vtriuſque
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centri circulorum, non eo
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dem vtitur: ſed
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abbr
="
quãdo
">quando</
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>
par
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uus mouebit illius eſt, vt
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<
expan
abbr
="
centrũ
">centrum</
expan
>
&
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abbr
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principiũ
">principium</
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>
: quan
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do verò magnus, vt ipſius.
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">Non igitur idem mouet ſimpliciter: ſed quodammodo. </
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<
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">COMMENTARIVS. </
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">Qvod etiam dubit.]
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Antea de circulis ad vnum centrum
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connexis
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abbr
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demõſtratum
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eſt: perinde etiam in inæqualibus ad di
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uerſa puncta connexis ſe habere oſtenditur, niſi
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mendũ
">mendum</
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>
ſubſit aliquod
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in contextu è quo particulam
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<
foreign
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el
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expunximus. </
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<
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">Nam & eccentrici
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connexi raptum motoris primi ſequuntur, & ſemper orbitarum
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æqualitas reperietur ſeu centra ſint in eadem linea: ſiue in diuerſis,
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