Fabri, Honoré
,
Tractatus physicus de motu locali
,
1646
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57
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Theorema
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102.
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Impetus in ipſo vecte ſine pondere addito ita propagatur, vt ſit imperfectior
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verſus centrum vectis
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; </
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<
s
id
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">probatur, quia pondus verſus centrum mouetur
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minore motu, vt conſtat; igitur ab imperfectiore impetu; </
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<
s
id
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N14AE3
">ſed non eſt
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imperfectior tantùm ratione numeri, id eſt, pauciorum partium impe
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tus; </
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<
s
id
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">quia ſi hoc eſſet, ſit vectis AC, motus B, eſt ſubduplus motus
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A; </
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<
s
id
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">igitur ſi eſt impetus eiuſdem perfectionis entitatiuæ, vt ſic loquar; </
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<
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">
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ita ſe habet numerus partium impetus in B, ad numerum partium in A,
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vt motus B, ad motum A; </
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<
s
id
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">& hic vt arcus BD, ad arcum AE; </
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<
s
id
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">& hic vt
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BC, ad AC; </
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<
s
id
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N14B06
">igitur eſt ſubduplus; </
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>
<
s
id
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N14B0A
">igitur æqualis omninò producitur
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impetus ab eadem potentia in vecte AC, ſiue applicetur centro C, ſiue
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circumferentiæ A; </
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>
<
s
id
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">igitur æquè facilè; quod eſt contra experientiam; </
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<
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">
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probatur ſecundò, quia ſi hoc eſſet, pondus idem tàm facilè attolleretur
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in A, quàm in B; quia idem impetus produceretur, quod eſt contra ex
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perientiam. </
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Theorema
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103.
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Ex hoc facilè intelligitur, cur impetus propagetur faciliùs à circumferen
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tia ad centrum, quàm à centro ad circumferentiam, & cur longior vectis ab
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eadem potentia moueri poſſit primo modo, non ſecundo, quod clarum est.
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Theorema
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104.
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<
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Decreſcit impetus verſus centrum iuxta rationem distantiarum
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emph.end
type
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; </
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<
s
id
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">probatur
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quia decreſcit iuxta rationem motuum; & hæc iuxta rationem diſtan
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tiarum. </
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Theorema
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105.
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Non decreſcit numerus partium impetus à circumferentia ad centrum
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; </
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<
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probatur, quia cum à circumferentia ad centrum ita propagetur impe
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tus, vt vnicum tantùm punctum producatur in ipſa extremitate mobilis; </
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>
<
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id
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">
<
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certè non poteſt minùs impetus produci verſus centrum ratione nume
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ri; </
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>
<
s
id
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N14B82
">igitur non decreſcit numerus; hinc producitur neceſſariò imperfe
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ctior verſus centrum. </
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Theorema
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106.
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<
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Non producuntur plures partes impetus in vecte verſus centrum, id est, non
<
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ſunt plures in puncto vectis propiùs ad centrum accedente, quàm in co; quod
<
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longiùs distat:
<
emph.end
type
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Probatur primò, quia fruſtrà eſſent plures. </
s
>
<
s
id
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">Secundò, cur
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potiùs in vna proportione, quàm in alia? </
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<
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<
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Theorema
<
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107.
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<
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Ex his constat produci impetum æqualem numero in omnibus punctis vectis
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a circumferentia ad centrum, cum ſcilicet applicatur potentia circumferentiæ
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; </
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<
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id
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<
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probatur, quia non producitur numerus minor per Th.105. neque maior
<
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per Th. 106. igitur æqualis; </
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>
<
s
id
="
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">adde quod res explicari non poteſt per ma
<
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iorem, neque per minorem; ita vt ſcilicet pondera, quæ à data potentia
<
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/>
leuantur, ſint vt diſtantiæ, de quo ſuprà. </
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>
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