Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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rectos angulos ef
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ficit ex def. 3. lib.
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11. vt A B dia
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meter ad B O, B D,
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B E, B F. </
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<
s
id
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">Et A B
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quia diameter eſt
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circulum ſuum bi
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fariam diuidit ex
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def. 17. lib. 1. </
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<
s
id
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id.001681
">Sic
<
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que tanta pars eſt
<
lb
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ad G, quanta ad H. </
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<
s
id
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id.001682
">Similiter maximus in ſphæra circulus recta
<
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inſiſtens ſphæram bifariam diſpeſcit.
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type
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<
foreign
lang
="
el
">e)/ti le/gousi/
<
lb
/>
tines o(/ti kai\ h( grammh\ h( tou= ku/klou, e)n fora=| e)sti\n
<
lb
/>
a)ei/, w(/sper ta\ me/nonta, dia\ to\ a)nterei/dein, oi(=on kai\ toi=s
<
lb
/>
mei/zosi ku/klois u(pa/rxei pro\s tou\s e)la/ttonas. </
foreign
>
</
s
>
<
s
id
="
g0130808a
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<
foreign
lang
="
el
">qa=tton ga\r
<
lb
/>
u(po\ th=s i)/shs i)sxu/os kinou=ntai oi( mei/zous kai\ ta\ ba/rh kinou=si,
<
lb
/>
dia\ to\ r(oph/n tina e)/xein th\n gwni/an th\n tou= mei/zonos
<
lb
/>
ku/klou pro\s th\n tou= e)la/ttonos, kai\ ei)=nai o(/per h( dia/metros
<
lb
/>
pro\s th\n dia/metron. </
foreign
>
</
s
>
<
s
id
="
g0130808b
">
<
foreign
lang
="
el
">a)lla\ mh\n pa=s ku/klos mei/zwn pro\s
<
lb
/>
e)la/ttona.</
foreign
>
</
s
>
<
s
id
="
g0130808c
">
<
foreign
lang
="
el
"> a)/peiroi ga\r oi( e)la/ttones.</
foreign
>
</
s
>
<
s
id
="
g0130809
">
<
foreign
lang
="
el
">ei) de\ kai\ pro\s e(/teron
<
lb
/>
e)/xei r(oph\n o( ku/klos, o(moi/ws de\ eu)ki/nhtos, kai\ a)/llhn a)\n
<
lb
/>
e)/xoi r(oph\n o( ku/klos kai\ ta\ u(po\ ku/klou kinou/mena, ka)\n mh\
<
lb
/>
th=| a(yi/di a(/pthtai tou= e)pipe/dou, a)ll' h)\ para\ to\ e)pi/pedon,
<
lb
/>
h)\ w(s ai( troxile/ai. </
foreign
>
</
s
>
<
s
id
="
g0130809a
">
<
foreign
lang
="
el
">kai\ ga\r ou(/tws e)/xonta, r(a=|sta kinou=ntai
<
lb
/>
kai\ kinou=si to\ ba/ros, h)\ ou) tw=| kata\ mikro\n a(/ptesqai kai\
<
lb
/>
proskrou/ein, a)lla\ di' a)/llhn ai)ti/an.</
foreign
>
</
s
>
<
s
id
="
g0130812
">
<
foreign
lang
="
el
">au(/th de/ e)stin h( ei)rhme/nh
<
lb
/>
pro/teron, o(/ti e)k du/o forw=n gege/nhtai o( ku/klos, w(/ste
<
lb
/>
mi/an au)tw=n ai)ei\ e)/xein r(oph/n, kai\ oi(=on fero/menon au)to\n
<
lb
/>
ai)ei\, kinou=sin oi( kinou=ntes, o(/tan kinw=sin kata\ th\n perife/reian
<
lb
/>
o(pwsou=n. </
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>
</
s
>
<
s
id
="
g0130813
">
<
foreign
lang
="
el
">ferome/nhn ga\r au)th\n kinou=sin: th\n me\n ga\r ei)s
<
lb
/>
to\ pla/gion au)tou= ki/nhsin, w)qei= to\ kinou=n, th\n de\ e)pi\ th=s
<
lb
/>
diame/trou, au)to\s kinei=tai.</
foreign
>
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id
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id
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*
<
foreign
lang
="
el
">e)/xh</
foreign
>
</
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</
p
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<
p
type
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main
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<
s
id
="
id.001685
">Præterea nonnulli di
<
lb
/>
cunt lineam circuli in per
<
lb
/>
petuo motu eſſe, vt quæ
<
lb
/>
manent, propter renixum.
<
lb
/>
</
s
>
<
s
id
="
id.001686
">Vt maioribus circulis eue
<
lb
/>
nit reſpectu minorum. </
s
>
<
s
id
="
id.001687
">Ce
<
lb
/>
lerius enim ab æquali vi
<
lb
/>
maiores
<
expan
abbr
="
mouẽtur
">mouentur</
expan
>
, & pon
<
lb
/>
dera mouent. </
s
>
<
s
id
="
id.001688
">quia maioris
<
lb
/>
circuli angulus
<
expan
abbr
="
nutũ
">nutum</
expan
>
quen
<
lb
/>
dam habet ad minoris an
<
lb
/>
gulum. </
s
>
<
s
id
="
id.001689
">Et eſt vt diameter
<
lb
/>
ad
<
expan
abbr
="
diametrũ
">diametrum</
expan
>
: ſic omnis ma
<
lb
/>
ior circulus ad minorem.
<
lb
/>
</
s
>
<
s
id
="
id.001690
">Infiniti autem ſunt mino
<
lb
/>
res. </
s
>
<
s
id
="
id.001691
">Si verò etiam circulus
<
lb
/>
nutum habet ad alterum.
<
lb
/>
</
s
>
<
s
id
="
id.001692
">Similiter verò facile mobi
<
lb
/>
lis
<
expan
abbr
="
aliũ
">alium</
expan
>
<
expan
abbr
="
nutũ
">nutum</
expan
>
habet circulus,
<
lb
/>
& quæ à circulo
<
expan
abbr
="
mouẽtur
">mouentur</
expan
>
,
<
lb
/>
<
expan
abbr
="
etiãſi
">etiamſi</
expan
>
ſua curuatura
<
expan
abbr
="
planũ
">planum</
expan
>
<
lb
/>
<
expan
abbr
="
nõ
">non</
expan
>
<
expan
abbr
="
cõtingat
">contingat</
expan
>
: ſed vel propè
<
lb
/>
planitiem, vel vt trochleæ. </
s
>
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