Valerio, Luca
,
De centro gravitatis solidorvm libri tres
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guli ABC quod ſit F, ſit ducta recta AFE. </
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<
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eſſe ipſius FE triplam: at BE ipſius EC ſeſquialteram.
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>Completo enim triangulo rectilineo ABC, ſectis que re
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ctis lineis bifariam AB in puncto H, & AC in puncto K
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ducatur HDK, quæ parallela erit baſi BC: parabolæ igi
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tur ſegmenti BDA dia meter erit DH; in qua parabolæ
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ADB, cuius vertex D ſit centrum grauitatis M: trian
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guli autem rectilinei ABC centrum grauitatis N, & iun
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gatur MN: producta igitur MN occurret trianguli ABC
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mixti centro grauitatis F. ſint igitur centra M, N, F, in
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eadem recta linea:
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& ducta recta AN
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G ſecet baſim BC
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bifariam in G pun
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cto, neceſſe eſt e
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nim: & ex puncto
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F ad rectam AG,
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ducatur recta FO
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ipſis BC, KH pa
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rallela, & BD, DA
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iungantur. </
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Quoniã
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igitur AG ſecat
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BC, KH paral
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lelas in rectolineo
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triangulo ABC,
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in eaſdem rationes; ſecta erit HK bifariam à linea AG:
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cumque HD diameter parabolæ ADC, cuius vertex D,
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ſit parallela diametro parabolæ, cuius vertex A, atque
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ideo etiam BC incidenti parallela, erit DH pars ipſius
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KH: quoniam igitur in triangulo mixto ABC recta KD
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applicata parallela eſt ipſi BC, quæ itidem eſt parallela
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diametro parabolæ, cuius vertex A; erit vt AC ad AK
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potentia, ita BC ad DK longitudine, quod ſupra demon
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ſtrauimus: ſed AC quadrupla eſt potentia ipſius AK; </
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