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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que, ut ex ante demonſtratis deducitur; </
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<
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xml:space
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ſtinentur puncta A & </
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<
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<
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<
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<
s
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<
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xml:space
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C, etiam rectâ inflexili, ponderis experti; </
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<
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xml:space
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terminatum, ut EC ſe habeat ad ED, ut pondus puncti D ad ſummam pon-
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derum punctorum A & </
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<
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<
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<
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neâ CD in ſitu quocunque : </
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<
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<
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xml:space
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">B, ut demonſtravimus, in ſitu
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cunque lineæ AB, agunt quaſi in C juncta eſſent; </
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<
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xml:space
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">ergo tria pondera A,B,D,
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lineis inflexilibus conjuncta, in ſitu quocunque, in æquilibrio ſunt circa
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punctum E; </
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<
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<
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hæc etiam nullum aliud habere centrum gravitatis, præter punctum E, ex eâ-
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dem demonſtratione conſtat.</
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<
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</
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<
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<
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foret cum E, & </
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<
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habere gravitatis centrum, & </
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<
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<
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<
s
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xml:space
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">Cum vero eadem demonſtratio ad numerum quemcunque punctorum re-
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ferri poſſit, applicari poterit omnibus punctis gravibus, ex quibus corpus quod-
<
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<
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">157.</
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cunque conſtat: </
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<
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">habet ideò corpus centrum gravitatis, & </
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<
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trum.</
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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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">Dentur corpora, numero quocunque, quorum commune gravitatis cen-
<
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<
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">158.</
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trum ſit C; </
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<
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xml:space
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">per hoc concipiamus planum horizontale, quod ſit planum ipſi-
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<
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">TAB. VIII.
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fig. 2.</
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us figuræ. </
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<
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">Sint centra gravitatis ipſorum corporum A, B, D, E, F; </
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<
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centra hæc ipſo plano horizontali memorato non dentur, ad hoc referenda
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ſunt lineis verticalibus & </
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<
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pſorum centra gravitatis darentur in punctis, in quibus lineæ hæ verticales
<
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<
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planum ſecant .</
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<
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<
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<
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xml:space
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">habentur actiones ponderum ad movendum
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planum circa lineam GH, multiplicando pondus unumquodque per ſuam diſtanti-
<
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<
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am a linea GH , & </
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<
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">ſumma productorum dat integram actionem, qua
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pondera ſimul planum premunt ad hoc circa GH movendum.</
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</
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<
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<
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">Omnia autem pondera agunt, quaſi eſſent in C ; </
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<
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">idcirco habetur etiam
<
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pſorum actio, multiplicando ſummam ponderum per diſtantiam puncti C a
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linea GH: </
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<
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">Si ergo ſumma memorata productorum, quæ, ut patet, huic ul-
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timo producto æqualis eſt, dividatur per ſummam ponderum, datur in quotiente
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diſtantia centri gravitatis a linea GH.</
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</
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<
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<
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">Quando agitur de ponderibus, quæ lineis verticalibus ad planum horizon-
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tale referuntur, diſtantiæ punctorum, ad quæ pondera referuntur, à lineâ
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GH, ſunt æquales diſtantiis centrorum gravitatis ipſorum corporum à pla-
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no verticali, per GH tranſeunti.</
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<
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<
s
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xml:space
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">Cum verò hæc demonſtratio locum habeat in quocunque ſitu corpora den-
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tur, ſi lineis inflexilibus, & </
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<
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">ſine pondere, corpora inter ſe coh@reant, nul-
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lum poteſt concipi planum, quod non, ſervato ipſius ſitu reſpectu corporum,
<
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<
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poſſit fieri verticale; </
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<
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<
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">plano quocunque, diſtan-
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tiam centri gravitatis a plano detegi, multiplicando corpus unumquodque per ſui
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centri gravitatis diſtantiam a plano, & </
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<
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rum corporum ſummam.</
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<
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">Si ſimilem demonſtrationem applicemus plano, quod inter corpora tranſit,
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<
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differentia inter ſummas productorum ab utraque parte per corporum ſum-</
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