Guevara, Giovanni di
,
In Aristotelis mechanicas commentarii
,
1627
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[Figure 81]
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[Figure 83]
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deprimit in E, neceſſe eſt deorſum ferri partem vbi H.
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<
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Siquidẽ
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pars illa ma
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ior eſt quàm hæc vbi
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E, quæ per
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conſequẽs
">conſequens</
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ſurſum aſcendet, & ſic
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rurſus libra conſtitue
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tur in æquilibrio quod
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erat probandum. </
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<
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N126A7
">Se
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cunda verò pars huius
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quæſtionis facilius ab
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eodem Ariſtotele probatur. </
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<
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N126B0
">Quoniam ſi ſpartum, ſeu axis
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infra iugum locetur, maior pars librę eſſet illa, quę deor
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ſum ex impoſito pondere reperiretur depreſſa, quàm quę
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ſurſum eſſet elata. </
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<
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N126B9
">Porrò plus dimidio contineret,
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expan
abbr
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proin-deq.
">proin
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lb
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deque</
expan
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etiam ablato pondere adhuc magis grauitaret, ac pro
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pterea ad equilibrium redire minimè poſſet. </
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<
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id
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N126C4
">Id quod ſic
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oſtendit Ariſtoteles ſit libra in ęquilibrio conſtituta NG
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abbr
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perpendiculũ
">perpendiculum</
expan
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verò bi
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fariam libram ipſam
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ſecans, ac tendens ad
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centrum mundi, ſit ca
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dens KLM. </
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<
s
id
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N126DD
">Axis verò
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infra
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expan
abbr
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iugũ
">iugum</
expan
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locatus vbi
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lb
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L. </
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<
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id
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N126E9
">Impoſito poſt hęc
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lb
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onere in ipſo N, de
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lb
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ſcendet plane ipſum
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lb
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N,
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expan
abbr
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eritq.
">eritque</
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>
exempli gratia, vbi O. </
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<
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N126F6
">Et per conſequens ipſum
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G aſcendet ad R. </
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<
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">Linea verò KL, quę bifariam diuide
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bat libram in ſitu NG declinabit in PL.
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abbr
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Cumq.
">Cumque</
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maius ſit
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lb
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KO, quàm KR eo quod vltra dimidium contineat etiam
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lb
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triangulum PKL; ſequitur vt ablato onere, adhuc nequeat
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pars iſta librę ſurſum attolli. </
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<
s
id
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N1270B
">Quandoquidem exceſſus il
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lb
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le ſupra medietatem, tanquam onus quoddam ei ſemper in
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cumbit. </
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<
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">Huic autem Ariſtotelis demonſtrationi addi etiam po-</
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