Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
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<
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">Demonſt. </
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Quia grauitas ponderis D eſt æqualis grauitati ponderis E ex F
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dependentis, & grauitas ponderis G eſt æqualis grauitati ponderis
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E ex B, erit grauitas ponderis D ad grauitatem E ex F: vt gra
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uitas ponderis G ad grauitatem ponderis E ex B, & permutatim
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prop. 16. lib. 5. </
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<
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>vt grauitas ponderis D ad grauitatem ponderis G:
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ita grauitas ipſius E ex F ad ipſum E ex B. </
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<
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id
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">Grauitas autem pon
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deris E ex F dependentis ad grauitatem ponderis E ex B eſt: vt
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C F ad C B, vt demonſtrat Vbaldus prop. 6. tract. delib. </
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<
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>vt igitur
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grauitas ponderis D ad pondus G: ita eſt C F ad C B. </
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<
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id
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">Si ergo
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pars ſcapi C B diuidatur in partes æquales ſolo pondere E, & pro
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pius & longius à puncto C poſito, ponderum grauitates ex puncto
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H appenſæ notæ erunt. </
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<
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id
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">Exempli gratia ſit diſtantia C B tripla ad
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C F, erit pondus G triplum ponderis D. </
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<
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>quod demonſtrare oportebat.
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<
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<
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<
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lang
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">*dia\ ti/ oi( i)atroi\ r(a=|on e)cairou=si tou\s o)do/ntas proslamba/nontes
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ba/ros th\n o)donta/gran, h)\ th=| xeiri\ mo/nh| yilh=|; </
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po/teron dia\ to\ ma=llon e)colisqai/nein dia\ th=s xeiro\s to\n
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o)do/nta, h)\ e)k th=s o)donta/gras; </
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</
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id
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<
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lang
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el
">h)\ ma=llon o)lisqai/nei th=s
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xeiro\s o( si/dhros, kai\ ou) perilamba/nei au)to\n ku/klw|: malqakh\
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ga\r ou)=sa h( sa\rc tw=n daktu/lwn, kai\ prosme/nei ma=llon
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kai\ periarmo/ttei.</
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>
</
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<
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<
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lang
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el
">a)ll' o(/ti h( o)donta/gra du/o moxloi/
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ei)sin a)ntikei/menoi, e(\n to\ u(pomo/xlion e)/xontes th\n su/nayin
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th=s qermastri/dos.</
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</
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<
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<
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lang
="
el
">tou= r(a=|on ou)=n kinh=sai xrw=ntai tw=| o)rga/nw|
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pro\s th\n e)cai/resin.</
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</
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<
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id
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<
foreign
lang
="
el
">e)/stw ga\r th=s o)donta/gras to\ me\n e(/teron
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a)/kron e)f' w(=| to\ *a, to\ de\ e(/teron to\ *b, o(\ e)cairei=.</
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</
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<
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id
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<
foreign
lang
="
el
">o(
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de\ moxlo\s e)f' w(=| *a*q*z, o( de\ a)/llos moxlo\s e)f' w(=| *b
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*g*e.</
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</
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<
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id
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<
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lang
="
el
">u(pomo/xlion de\ to\ *q, e)f' ou(= h( su/nayis, o( de\ o)dou\s,
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to\ ba/ros.</
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>
</
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<
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id
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">
<
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lang
="
el
">e(kate/rw| ou)=n tw=n *b, *z, kai\ a(/ma labw\n
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kinei=: o(/tan de\ kinh/sh|, o)cei=le r(a=|on th=| xeiri\, h)\ tw=|
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o)rga/nw|.</
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>
</
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<
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id
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">Cur medici facilius den
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tes
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abbr
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eximũt
">eximunt</
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>
<
expan
abbr
="
accipiẽtes
">accipientes</
expan
>
pon
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dus,
<
expan
abbr
="
dẽtiducum
">dentiducum</
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:
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abbr
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quã
">quam</
expan
>
ſi ſola
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vtantur manu. </
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<
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id
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id.002352
">Vtrum quia
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dens magis manum præ
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terlabitur, quam dentidu
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cum? </
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>
<
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id
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id.002353
">vel ferrum quidem
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magis labitur manu, neque
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ipſum vndique
<
expan
abbr
="
comprehẽdit
">comprehen
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dit</
expan
>
. </
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>
<
s
id
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id.002354
">Eſt enim digitorum
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caro mollis, & adhæret ma
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gis, atque vndique con
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gruit. </
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<
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id
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id.002355
">Verum quia denti
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ducus eſt duo vectes aduer
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ſi, vnum
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abbr
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hypomochliũ
">hypomochlium</
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>
ha
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bentes in concurſu com
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miſſuræ. </
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<
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id
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">Igitur ad
<
expan
abbr
="
exẽptionẽ
">exemptio
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nem</
expan
>
, vt facilius
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expan
abbr
="
dimoueãt
">dimoueant</
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>
, hoc
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/>
vtuntur organo. </
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>
<
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id
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id.002357
">Sit enim </
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>
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