Commandino, Federico
,
Liber de centro gravitatis solidorum
,
1565
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& per o ducatur op ad km ipſi hg æquidiſtans. </
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<
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">Itaque li
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nea hm
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abbr
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bifariã
">bifariam</
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uſque eò diuidatur, quoad reliqua ſit pars
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quædam qm, minor op. </
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<
s
id
="
s.000273
">deinde hm, mg diuidantur in
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partes æquales ipſi mq: & per diuiſiones lineæ ipſi mK
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æquidiſtantes ducantur. </
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>
<
s
id
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s.000274
">puncta uero, in quibus hæ trian
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gulorum latera ſecant, coniungantur ductis lineis rs, tu,
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id
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xy; quæ baſi gh æquidiſtabunt. </
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>
<
s
id
="
s.000275
">Quoniam enim lineæ gz,
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/>
h
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lang
="
grc
">α</
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ſunt æquales:
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itemq;
">itemque</
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æquales gm, mh: ut mg ad gz,
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ita erit mh, ad h
<
foreign
lang
="
grc
">α·</
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>
& diuidendo, ut mz ad zg, ita m
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">α</
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>
ad
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arrow.to.target
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marg36
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<
foreign
lang
="
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">α</
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>
h. </
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>
<
s
id
="
s.000276
">Sed ut mz ad zg, ita kr ad rg: & ut m
<
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lang
="
grc
">α</
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>
ad
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foreign
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="
grc
">α</
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>
h, ita ks
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ad sh. </
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>
<
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id
="
s.000277
">quare ut kr ad rg, ita ks ad sh. </
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<
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id
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s.000278
">æquidiſtant igitur
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marg37
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inter ſe ſe rs, gh. </
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<
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id
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s.000279
">eadem quoque ratione demonſtrabimus </
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