Valerio, Luca
,
De centro gravitatis solidorum
,
1604
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COROLLARIVM.
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<
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>Ex huius theorematis demonſtratione conſtat,
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omnis figuræ planæ, ſiue ſolidæ, cuius termini
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omnis cauitas ſit interior, atque ideo intra ter
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minum centrum grauitatis; & cuius pars aliqua
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eſse poſsit, quæ à tota figura deficiens minori
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defectu quacumque magnitudine propoſita habe
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at centrum grauitatis in aliqua certa linea recta
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intra terminum figuræ conſtituta, eſſe in ea recta
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linea totius figuræ centrum grauitatis. </
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<
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de, cum per vndecimam huius, omni ſolido circa
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axim in alteram partem deficienti, & baſim ha
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benti circulum, vel ellypſim figura inſcribi poſſit
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ex cylindris, vel cylindri portionibus, à prædicto
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ſolido deficiens minori ſpacio quacumque ma
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gnitudine propoſita: talis autem figuræ inſcriptæ,
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quemadmodum & circumſcriptæ centrum gra
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uitatis ſit in axe, vt ex ſequentibus patebit, &
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nunc cogitanti facilè patere poteſt; manifeſtum
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eſt omnis ſolidi circa axim in alteram partem de
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ficientis centrum grauitatis eſſe in axe. </
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