DelMonte, Guidubaldo
,
In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata
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ſphæram aliquam, putà ligneam, vel alterius (ſimilaris
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)
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naturæ intuenti; ſiquidem eius medium erit centrum magni
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tudinis, & centrum figuræ; idemquè punctum erit ipſius cen
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trum grauitatis; circa quod vndi〈que〉 partes æ〈que〉ponderant.
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& quoniam hæc ſphæra non eſt in centro mundi; propterea
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tria tantùm centra ſimul conuenient. </
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<
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laris, ſed diſſimilaris fuerit, veluti altera ipſius meditate plum
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bea, altera verò medietate lignea exiſtente, tunc eius medium
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erit quippe centrum magnitudinis, & figurę, grauitatis verò
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centrum nequaquam. </
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<
s
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">Nam partes vndi〈que〉 circa medium æ
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〈que〉ponderare non poſſent; ſed grauitatis centrum ad grauio
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rem partem, nimirum plumbeam declinabit. </
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<
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">& hoc modo
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duo tantùm centra inter ſe conuenient. </
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<
s
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">vt etiam (modo ta
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men diuerſo) accidit ellipſi; cuius centrum eſt centrum figu
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rę, ſiquidem per ipſum tranſeunt diametri; idemquè
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punctũ
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eſt ipſius centrum grauitatis. </
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<
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dium figuræ, non erit quo〈que〉 centrum magnitudinis.
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mediū
">medium</
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enim figuræ propriè circulo, ac ſphæræ tantùm competit.
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Quare duo centra hoc quo〈que〉 modo ſimul tantùm conue
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nient. </
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">In figura paraboles recta linea terminatę centrum gra
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uitatis intra figuram reperitur, quippè quod ne〈que〉 centrum
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figuræ, ne〈que〉 centrum magnitudinis eſſe poteſt. </
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<
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id
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">etenim in
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hac figura non poteſt dari medium, vnde ne〈que〉 centrum ma
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gnitudinis dabitur, & quoniam in parabole diametri ſunt in
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terſe ęquidiſtantes, vt ex primo libro conicorum Apollonij
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Pergei conſtat; ne〈que〉 etiam centrum figuræ dabitur. </
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tur centra nullo modo conuenient. </
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lib. </
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</
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lib. </
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<
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quę uehun
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tur in aqua
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16
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Federi
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ci
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abbr
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. de
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centro gra
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uitatis ſoli
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dorum.
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4.
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Fed. </
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man. </
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<
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tro graui
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tatis ſolido
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rum.
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type
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in ſecundo
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libro huius
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<
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eſſe, in pluribuſquè reperiri, quàm centra magnitudinis, & fi
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guræ: centrum verò figuræ communius eſſe centro magnitu
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dinis.
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abbr
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quodlibet corpus, & quęlibet figura neceſſe eſt, vt habeat
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<
expan
abbr
="
cẽtrũ
">centrum</
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grauitatis intrinſecùs, vel extrinſecùs. </
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<
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<
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abbr
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grauitatis alicuius corporis regularis, quod eſt in medio
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figuræ, vel alicuius figuræ vt A; cuius centrum grauitatis ſit
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in ambitu figuræ, vt in puncto B; extrinſecùs verò vt figura
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C, cuius centrum grauitatis extrinſecus ſit, vt in D; quod
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eſt intelligendum, ſi graue C in centrum mundi tenderet, </
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