Valerio, Luca
,
De centro gravitatis solidorum
,
1604
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dam in primis quàm primæ ad ſecundam in ſecun
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dis: & ſecundæ ad tertiam in primis, maior quàm
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ſecundæ ad tertiam in ſe cundis, & ſic deinceps vſ
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que ad vltimas; erit omnium primarum ſimul cen
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trum grauitatis propinquius prædictæ lineæ ter
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mino à quo ſumitur ordo omnium ſecundarum
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centrum grauitatis. </
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<
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>Sit quotcumque magnitudines GHI, & totidem LMN
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primarum autem ſint centra grauitatis CDE cum ſecun
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darum centris OPQ in eadem recta AB diſpoſita alter
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natim, vt O cadat inter puncta CD, & P inter puncta
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DE, & E inter puncta
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ſitque maior proportio G
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ad H, quàm L ad M, & H ad I maior quàm M ad N.
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omnium autem primarum GHI ſimul ſit centrum gra
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uitatis T; at omnium ſecundarum LMN, ſimul, cen
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trum grauitatis V. </
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>Dico punctum T eſſe termino A
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propinquius quàm punctum V. </
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<
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>Eſto enim F æqualis
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L, & K æqualis M, & X æqualis N, ſit autem cen
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trum grauitatis ipſius F in puncto C, & ipſius K in pun
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cto D, & ipſius X in puncto E. </
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<
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>In recta igitur AB om
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nium FKX, ſimul centrum grauitatis erit termino A, pro
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pinquius quàm omnium LMN ſimul centrum grauitatis.
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<
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>Sed & omnium GHI, ſimul centrum grauitatis in eadem
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recta AB propinquius eſt termino A quàm omnium
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FKX, ſimul centrum grauitatis; multo igitur termino A
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propinquius erit omnium GHI ſimul quàm omnium </
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