DelMonte, Guidubaldo
,
In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata
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rum BD centrum grauitatis. </
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<
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">pari què ratione C erit centrum
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grauitatis magnitudinum AE ę〈que〉grauium. </
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<
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">cum ſint AC
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CE ęquales, & idem C eſt grauitatis centrum magnitudinis
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C. ergo punctum C magnitudinis ex omnibus magnitudini
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bus ABCDE compoſitę centrum grauitatis exiſtit. </
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*</
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<
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">COROLLARIVM. II.</
s
>
</
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<
s
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">Si verò magnitudines fuerint numero pares;
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& ipſarum centra grauitatis in recta linea extite
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rint, magnitudineſquè æqualem habuerint
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tatem, rectæ què lineæ inter centra fuerint æqua
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les: magnitudinis ex omnibus magnitudinibus
<
expan
abbr
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cõ
">com</
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>
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poſitæ centrum grauitatis erit medium rectæ li
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neæ, quæ magnitudinum centra grauitatis
<
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abbr
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coniũ-git
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git</
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>
. vt in ſubiecta figura. </
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*</
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type
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<
s
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id
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type
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<
s
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">Colligit præterea Archimedes ſi magnitudines ABCDEF
<
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fuerint numero pares, quarum centra grauitatis ABCDEF in
<
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recta linea AF ſint conſtituta; magnitudineſquè ſint æquales
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/>
in grauitate; ſintquè inter centra lineę AB BC CD DE EF
<
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æ quales. </
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>
<
s
id
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">diuidatur autem AF bifariam in G. erit punctum
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G centrum grauitatis magnitudinis ex omnibus compoſi
<
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/>
tæ quod quidem, figura tantùm inſpecta, perſpicuum eſt.
<
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/>
Cùm enim magnitudines AF ſint æ〈que〉graues, & AG GF </
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</
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