Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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<
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ducatur pa
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rallela ipſi
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quæ ſit
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& w n</
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perpendicularis ipſi
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tum &
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</
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<
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>Sunt vero
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<
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æquales. </
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<
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eſt minor: quam
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In
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circulis enim inæqualibus
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rectę ęquales ad rectos dia
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metro excitatæ, de diame
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tro circulorum maiorum
<
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/>
<
expan
abbr
="
ſegmentũ
">ſegmentum</
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minus auferunt.
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</
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<
s
id
="
id.000707
">Eſt autem
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lang
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">w n</
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æqualis ipſi
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<
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lang
="
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">q z. </
foreign
>
In quanto vero tempo
<
lb
/>
re
<
foreign
lang
="
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">a x</
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peragrauit
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foreign
lang
="
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">x q,</
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>
in
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lb
/>
<
expan
abbr
="
tãto
">tanto</
expan
>
in maiore circulo ex
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/>
tremum
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foreign
lang
="
el
">a b</
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non maiorem
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/>
<
foreign
lang
="
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">b w</
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>
peragrauit ( etenim
<
lb
/>
motus ſecundum naturam
<
lb
/>
æqualis eſſet ) præter na
<
lb
/>
turam vero minor erat, nempe
<
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lang
="
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quam
<
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lang
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">x z. </
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>
</
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<
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">COMMENTARIVS. </
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id
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">Qvod vero minor.]
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type
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Altera eſt confirmatio ſed
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<
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lang
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">grammikh\</
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>
<
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linearis aſſumptionis ſyllogiſmi præcedentis. </
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>
<
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id
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">Scilicet quod mi
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nor radius plus retrahatur ad centrum, quam maior. </
s
>
<
s
id
="
id.000711
">Vbi ab vtriſque
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ſecundum peripheriam æquale ſpatium confectum eſt. </
s
>
<
s
id
="
id.000712
">perpendiculis
<
lb
/>
enim æqualibus ipſum menſurantibus partes abſciſſæ de diametris,
<
lb
/>
quæ retractionem vtriuſque ad centrum menſurant, inæquales ſunt,
<
lb
/>
& in minore circulo, maior: in maiore vero minor. </
s
>
<
s
id
="
id.000713
">vt videre lice
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bit in diagrammate hic deſcripto & ſuis rationibus neceſſarijs con
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firmato.
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</
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Sint duo circuli concentrici maior
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<
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lang
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>
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type
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minor
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type
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<
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lang
="
el
">x m n c</
foreign
>
<
emph
type
="
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è cen
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tro a traiecti diametris
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type
="
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<
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lang
="
el
">x n & b e. </
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>
</
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>
</
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<
emph
type
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A puncto
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type
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<
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lang
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">a</
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>
<
emph
type
="
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ad punctum
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type
="
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<
foreign
lang
="
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">q</
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>
<
emph
type
="
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ducatur recta
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type
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<
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lang
="
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">a q,</
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>
<
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type
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& producatur in
<
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type
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<
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/>
<
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lang
="
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">h</
foreign
>
<
emph
type
="
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ſitque
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emph.end
type
="
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<
foreign
lang
="
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">a q h. </
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>
</
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</
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<
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type
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Tum à puncto
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<
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lang
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>
<
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type
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excitetur perpendicularis lineæ
<
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<
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lang
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">a x</
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>
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type
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prop. 12.
<
lb
/>
lib. 1. ſitque
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<
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lang
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">q z. </
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