Fabri, Honoré
,
Tractatus physicus de motu locali
,
1646
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grauem eſſe, niſi tantùm de illo, quem ſpiramus, in quo ambulamus, qui
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nos ambit: </
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<
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">adde quod Ariſtoteles l.4.
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de Cœlo, c.
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5.
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t.
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36. tribuit aëri gra
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uitatem his verbis;
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quapropter
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inquit,
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aër, & aqua habent & leuitatem, &
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grauitatem.
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Theorema
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84.
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Medium eiuſdem grauitatis cum dato corpore graui detrahit totam eius
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grauitationem ſingularem; </
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<
s
id
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">hoc eſt corpus graue in medium æquè graue non
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grauitat
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; </
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<
s
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">quia ſi grauitaret deſcenderet; </
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<
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">ſic pars aquæ in aliam partem
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aquæ non grauitat, & ſi aqua ponderetur in aqua, nullius ponderis eſt; </
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cum enim nulla ſit ratio cur vna ſit infrà potiùs, quàm alia, vna certè al
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terius locum non ambit; igitur caret grauitatione ſingulari. </
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Theorema
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85.
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Medium graue detrahit aliquid de ſingulari grauitatione corporis grauio
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ris
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; </
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<
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">certa eſt hypotheſis; </
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<
s
id
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">nec enim plumbum eſt eius ponderis ſingula
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ris in aqua, cuius eſt in aëre; dixi ſingularis; </
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<
s
id
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">nam ſi plumbum & ipſa
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aqua ſimul appendantur, haud dubiè totum habebis pondus plumbi, &
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totum pondus aquæ; </
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<
s
id
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">ratio verò huius effectus non eſt huius loci; </
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<
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id
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">quid
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quid ſit, ſi æqualis grauitas medij tollit totam æqualem alterius corpo
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ris; certè maiorem alterius corporis totam non tollit per Th. 80. ſed
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tantùm aliquid illius, quod quomodo fiat, dicemus Tomo quinto cum de
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graui, & leui. </
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Theorema
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86.
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Medium graue detrahit eam partem grauitationis corporis grauioris, quæ
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eſt æqualis ſuæ grauitationi.
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v. g. ſi medij grauitas eſt ſubdupla, detrahit
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ſubduplum grauitationis; </
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<
s
id
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">ſi ſubdecupla, ſubdecuplum, atque ita dein
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ceps; hoc iam olim ſuppoſuit magnus Archim. </
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<
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id
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">ſupponunt etiam reliqui
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omnes, præſertim recentior Galileus; </
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<
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id
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">ſi enim æqualis ſuperat æqualem,
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ergo inæqualis pro rata; ſcilicet ſubdupla ſubduplum ſubtripla, &c. </
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<
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">Præ
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terea, cum detrahat aliquam partem grauitationis maioris per Th.85.nec
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detrahat inæqualem maiorem, per Th.80.nec inæqualem minorem; cur
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enim potius vnam minorem quam aliam? </
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<
s
id
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">certè æqualem tantùm
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detrahere poteſt, quod ſuo loco per Principium poſitiuum demonſtra
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bimus. </
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Theorema
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87.
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<
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Hinc ratio cur grauia deſcendant tardius in aqua, quàm in aëre, & in
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aëre, quàm in vacuo
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; </
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<
s
id
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">hinc etiam maioris ſunt ponderis in aëre quam in
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aqua; </
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<
s
id
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">hinc ſi grauitas alicuius corporis ſit ad grauitatem aëris vt 100.
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ad 1. haud dubiè decreſcet eius pondus in aëre (1/100); </
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<
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id
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">id eſt, ſi penderet 100.
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libras in vacuo, in aëre penderet 99. & eo tempore quo in vacuo decur
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reret 100. paſſus, in aëre decurreret 99. ſi nulla ſit aliunde reſiſtentia,
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qualis reuerâ eſt, vt dicam infrà; </
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<
s
id
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">ſimiliter ſi grauitas alicuius corporis
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ſit ad grauitatem aquæ, vt 10. ad 1. decreſcet eius pondus in aqua (1/10), &
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eo tempore quo decurreret in vacuo 10. palmos ſpatij, in aqua decurre </
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