DelMonte, Guidubaldo
,
In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata
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tunc centrum D cum centro mundi
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ueniret; figuraquè C quieſceret circa cen
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trum vniuerſi, veluti ſe habet circa
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abbr
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cẽtrum
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D. partes enim figuræ talem poſſunt ha
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bere ſitum, vt inter ſe ę〈que〉ponderare poſ
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ſint. </
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<
s
id
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& ad huc clariùs, ſi intelligatur figura, vt
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E circulo tum exteriori, tum interiori ter
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minata, cuius centrum grauitatis extra fi
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guram erit in F. quod quidem cum cir
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culorum centro conueniet. </
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<
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id
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(exiſtente centro F in centro mundi)
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partes vndi〈que〉 ę〈que〉ponderabunt: cùm
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omnes ęqualiter à centro grauitatis
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abbr
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diſtẽt
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.
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præterea in hac figura E centrum graui
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tatis (quamuis ſit extra figuram) cum cen
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tro figuræ,
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abbr
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cẽtroquè
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magnitudinis ipſius
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figuræ conuenire, fortaſſe non erit incon
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ueniens aſſerere. </
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<
s
id
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N1085F
">At verò figuræ AC nul
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lo pacto figuræ, magnitudinisquè
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abbr
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centrũ
">centrum</
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habebunt. </
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">& quamuis dictum ſit
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abbr
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centrũ
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grauitatis corporum regularium eſſe me
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dium ipſorum, non tamen propterea dicendum eſt, idem eſſe
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centrum magnitudinis, at〈que〉 figuræ, niſi impropriè;
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mediũ
">medium</
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enim his impropriè attribuitur, ſicuti etiam centrum figuræ;
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cùm lineæ ex ipſo prodeuntes non ſint ipſorum corporum
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(quatenus regularia ſunt) ſemidiametri. </
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<
s
id
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">quare centrum gra
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uitatis reperiri poteſt abſ〈que〉 alijs centris; at non è conuerſo.
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Rurſus commune magis eſt
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figuræ centro magnitu
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dinis; quia præter circulum, & ſphæram, quæ tam figuræ,
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abbr
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quã
">quam</
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magnitudinis centrum habent, nonnullæ figuræ ſuum ha
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bent figuræ centrum in ipſis, & extra ipſas; in ipſis, vt ellipſis,
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cuius centrum intùs habetur; ſemicirculus etiam, dimidia què
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ſphæra centrum habent in limbo. </
s
>
<
s
id
="
N10897
">extra figuram verò veluti
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hyperbolæ centrum, quod extra figuram exiſtit; vbi nempè
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diametri concurrunt. </
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<
s
id
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">Quæ quidem omnia ſunt figuræ cen
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tra; magnitudinis verò minimè. </
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<
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">verùm obijciet hoc loco for</
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