Commandino, Federico
,
Liber de centro gravitatis solidorum
,
1565
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tur, centrum grauitatis eſt idem, quod circuli cen
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trum.</
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">Sit primo triangulum æquilaterum abc in circulo de
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ſcriptum: & diuiſa ac bifariam in d, ducatur bd. </
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<
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nea bd centrum grauitatis
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abbr
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triãguli
">trianguli</
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abc, ex tertia decima
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primi libri Archimedis de centro grauitatis planorum. </
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quoniam linea ab eſt æqualis
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lineæ bc; & ad ipſi dc;
<
expan
abbr
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eſtq́
">eſtque</
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;
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bd utrique communis: trian
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gulum abd æquale erit trian
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gulo cbd: & anguli angulis æ
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quales, qui æqualibus lateri
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bus ſubtenduntur. </
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<
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id
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s.000071
">ergo angu
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li ad d
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abbr
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utriq;
">utrique</
expan
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recti ſunt. </
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<
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id
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s.000072
">quòd
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cum linea bd ſecet ae bifa
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riam, & ad angulos rectos; in
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ipſa bd eſt centrum circuli. </
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quare in eadem bd linea erit
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centrum grauitatis trianguli, & circuli centrum. </
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<
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id
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s.000074
">Similiter
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diuiſa ab bifariam in e, & ducta ce, oſtendetur in ipſa
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expan
abbr
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utrũ
">utrum</
expan
>
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que centrum contineri. </
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<
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id
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s.000075
">ergo ea erunt in puncto, in quo li
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neæ bd, ce conueniunt. </
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<
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id
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s.000076
">trianguli igitur abc centrum gra
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uitatis eſt idem, quod circuli centrum.</
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8. primi.</
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13. primi.</
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corol. pri
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mæ tertii</
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number
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type
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<
s
id
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s.000080
">Sit quadratum abcd in cir
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culo deſcriptum: & ducantur
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ac, bd, quæ conueniant in e. </
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>
<
s
id
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">er
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go punctum e eſt centrum gra
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uitatis quadrati, ex decima eiuſ
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dem libri Archimedis. </
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omnes anguli ad abcd recti
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ſint; erit abc ſemicirculus:
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; bcd: & propterea li
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neæ ac, bd diametri circuli: </
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