Gravesande, Willem Jacob 's
,
Physices elementa mathematica, experimentis confirmata sive introductio ad philosophiam Newtonianam; Tom. 1
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PHYSICES ELEMENTA
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mus, ita ut filum longitudinis BC æquale ſit curvæ
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CA; </
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<
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quadrupla axis FB.</
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<
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<
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xml:space
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xml:space
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">285.</
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in puncto, ut P, parallelam eſſe chordæ EB, in circulo
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FBE ductæ ad punctum infimum B ex puncto E, in quo cir-
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culus ſecatur à lineâ PE parrallela ad baſim AD & </
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<
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P tranſeunti: </
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<
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">Ut & </
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<
s
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xml:space
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">portionem PB curvæ æqualem eſſe
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<
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">286.</
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duplæ chordæ EB.</
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<
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</
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<
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<
s
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xml:space
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">Cum autem in ſingulis curvæ punctis corpus in curva de-
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ſcendat juxta directionem tangentis ad curvam, ſequi-
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tur corpus in puncto quocunque curvæ conari deſcendere
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<
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cumvi, quæ proportionalis portioni curvæ inter hoccepun-
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ctum & </
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<
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<
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xml:space
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286.</
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pendula ut CP ab altitudinibus diverſis, eodem momento,
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dimittantur, celeritates, quibus cadere incipiunt, eſſe in-
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ter ſe, ut ſpatia percurrenda, antequam ad B perveniant:
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<
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rentur, eodem temporis momento ad B pervenirent ; </
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">94.</
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dem modo velocitatibus ſecundo momento acquiſitis, et-
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iam ad B eodem momento pertingunt; </
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<
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xml:space
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nium pro momentis ſequentibus procedit; </
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xml:space
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<
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tiones ex omnibus celeritatibus junctis utcunque inæquales,
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ut & </
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<
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</
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<
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<
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<
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">288.</
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cujuſque vibrationis eſſe ad tempus caſus verticalis, per ſe-
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milongitudinem penduli, ut peripheria circuli, ad diame-
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trum. </
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<
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ſenſum coincidit; </
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<
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">hæc eſt vera ratio, quare in circulo
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tempora vibrationum exiguarum, utcunque inæqualium,
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ſint æqualia; </
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<
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rationem vibrationis per chordas, id eſt ad tempus caſus
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verticalis per longitudinem octuplam longitudinis penduli
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aut ſedecuplam ſemi longitudinis penduli, illam habet ra-
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tionem, quæ datur inter peripheriam circuli & </
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tros , id eſt circiter ut 785 ad 1000: </
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<
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289.</
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