Ceva, Giovanni
,
Geometria motus
,
1692
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PROP. IX. THEOR. IX.
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<
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">REctangulum ſub altitudine, & baſi vnius auuerſarum
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ad ipſam auuerſam figuram, eandem habet
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rationẽ
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,
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ac altera auuerſa figura ad rectangulum ex baſi in altitudi
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nem eiuſdem huius figuræ. </
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Tab.
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.
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fig.
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7.</
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">Sint auuerſæ figuræ ACB, GFDEG. </
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lum DF in DE ad figuram GFDEG, eandem habere ratio
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nem ac figura ACBA ad rectangulum AB in BC. </
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mùm ABC, FDE anguli recti, & ducta qualibet HI paral
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lela BC, ſit BAC ad HIA vt DF ad KF, erit ob naturam
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auuerſarum KL ad DE vt BC ad HI; itaque ſi ponatur eſſe
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quidam motus ab F in D iuxta imaginem
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velocitatũ
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BAC,
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erit GFDEG imago temporis eiuſdem motus; nam imago
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BAC ad imaginem HIA eſt vt ſpatium DF ad ſpatium FK
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& velocitas BC ad
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HI vt reciprocè KL ad DE.
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<
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">Sit etiam alius motus, ſed æquabilis, cuius imago velocita
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tum æqualis ſit, & homogenea ipſi BAC, rectangulum
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nẽ-pe
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pe</
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AB in BM, & ideo ſi fiat BM ad BC ſicut DE ad DN,
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concipiaturque rectangulum FD in DN, erit hoc imago
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temporis dicti motus æquabilis, homogenea, & æqualis
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imagini GFDEG; nam
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, ſcilicet imagines GFDEG,
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FD in DN rectangulum componuntur ex rationibus ſpa
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tiorum, hoc eſt imaginum velocitatum interſe æqualium,
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ABM, ACB, & reciproca æquatricum pariter æqualium
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BM, BM. </
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<
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">Cum igitur rectangulum FD in DN æquale ſit
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imagini, ſeu figuræ GFDEG, habebit eadem figurą
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GFDEG ad rectangulum FD in DE eandem rationem,
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quam DN ad DE, hoc eſt quam BC ad BM, ſeu quam re
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ctangulum AB in BC ad rectangulum AB in BM, aut ad ei
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æqualem figuram ABC; & conuertendo, manifeſtum eſt
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quod propoſuimus, nempe rectangulum FD in DE ad fi
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guram GFDEG habere eandem
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, ac figura ACBA </
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