DelMonte, Guidubaldo
,
In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata
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HK exiſtere. </
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">Rurilus trianguli ADE centrum inueniatur F
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quadrilateri verò ADCB punctum G. iungaturquè GF. e
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eodem modo centrum grauitatis totius ABCDE in linea F
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ſed eſt quo〈que〉 in linea HK, ergo vbrſe inuicem ſecant, vt
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L, centrum erit grauitatis pentagoni ABCDE. </
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<
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">In hexagonis ſimiliter.
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vt ABCDEF iungantur
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AC AE, deinceps inuenia
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tur trianguli ABC
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expan
abbr
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cẽtrum
">centrum</
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grauitatis G, pentagoni
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verò ACDEF ex dictis cen
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trum ſit H. ductaquè GH
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centrum grauitatis totius
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ABCDEF erit in linea GH
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ſimiliter centrum grauita
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tis trianguli AFE ſit K,
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expan
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pẽ
">pem</
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tagoni verò AEDCB ſit L, iunctaquè KL, erit centrum gr
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uitatis totius hexagoni in linea KL. verùm eſt etiam in lin
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GH. ergo errt in M. in quo GH
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K
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L ſe inuicem ſecant. </
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">Nequè aliter in heptago
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fig56
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no ABCDEFG, in quo du
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cantur BG CE. trianguli
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verò ABG centrum graui
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tatis ſit H. hexagoni
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expan
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autẽ
">autem</
expan
>
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GBCDEF, ſit K. deinde
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trianguli CDE
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expan
abbr
="
centrũ
">centrum</
expan
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gra
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uitatis ſit L, hexagoni ve
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rò CEFGAB ſit M. iun
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ctiſquè HK ML, eadem ra
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tione centrum grauitatis
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totius heptagoni erit in vtraquè linea Hk LM. ergo erit in </
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*</
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<
s
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">Eodemquè prorſus modo in octagono, & in alijs demc
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figuris centrum graui tatis inuenietur. </
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<
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portebat. </
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</
archimedes
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