Valerio, Luca
,
De centro gravitatis solidorum
,
1604
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AD parabolam AE: baſes autem æquales BC, DE pa
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rallelas parabolarum diametres per A, & in vna recta li
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nea CE ſegmento BD interiecto: vtriuſque autem ſe
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ctionis AC, AE concauitas ſpectet extra figuram ACE:
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ſecta autem CE bifariam in F, iunctaque AF, ponatur
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AG tripla ipſius GF. </
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<
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>Dico compoſiti ex triangulis A
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BC, ADE centrum grauitatis eſſe G. </
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que ſeſquialtera, CH ipſius HB, & EK ipſius KD,
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iunctisque AH, AK, ducatur per punctum G ipſi CE
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parallela ſecans AH, AK in punctis L, M. </
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<
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igitur LM ipſi CE parallela ſecat eas quæ ex puncto A
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ad rectam CD du
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cuntur rectas lineas
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in eaſdem rationes, &
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eſt AG tripla ipſius
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GF; tripla erit vtra
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que AL ipſius LH,
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& AM ipſius MK:
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ſeſquialtera autem eſt
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CH ipſius HB, &
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EK ipſius KD; erit
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igitur L centrum gra
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uitatis trianguli AB
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C, & M trianguli A
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DE per præceden
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tem. </
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>Rurſus quoniam abſoluantur triangula rectilineæ
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ACB, AEK, & æqualia erunt propter æquales baſes,
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poſita inter eaſdem parallelas, & vtrumque ſeſquialterum
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eius trianguli mixti, quod comprehendit, ex demonſtra
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tione antecedentis; æqualia igitur erunt triangula mixta
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ABC, ADE, ſiquidem ſunt æqualium ſubſeſquialtera.
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>Et quoniam componendo, & permutando eſt vt CB ad
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DE ita BH ad DK, æqualis erit BH ipſi DK: ſed ſi ab
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æqualibus poſitis CF, FE ipſas CB, DE æquales au-</
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