Schott, Gaspar
,
Mechanica hydraulico-pneumatica. Pars I. Mechanicae Hydraulico-pnevmaticae Theoriam continet.
,
1657
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Corollarium I.
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Aquæ flux'
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è foramine
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vaſis non eſt
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celerior pro
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pter vaſis
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capacitẽ
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.
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<
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>COlligitur hinc, ad aquæ effluxum maiorem, aut celeriorem
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è foramine eodem, aut æquali, nihil facere capacitatem
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vaſis aut tubi; adeo ut ſi totus Oceanus eſſet incluſus in uno tubo,
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aut vaſe, & in altero modica aqua, vterque tamen tubus eſſet
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æquè altus, & haberet æqualia foramina; æqualis aquæ copia
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ex vtroque efflueret eodem, vel æquali tempore. </
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Corollarium II.
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<
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>COlligitur præterea, per foramina æqualia in eadem baſi eius
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dem tubi, æqualem aquam effluere eodem tempore. </
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<
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de hoc agemus infrà cap. 5. Propoſ. 1. </
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Propoſitio III. Phænomenon III.
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Per tubos tam ſemper, quàm non ſemper plenos æqua
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lium luminum, ſed inæqualium altitudinum, effluit eodem,
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vel æquali tempore, inæqualis aquæ copia.
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<
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>NEmpe per tubum magis altum maior, & per tubum minùs
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altum, minor. </
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>Ratio eſt, quia ſupra lumen altioris tubi
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maior aquæ copia, & maiori vi ac celeritate; & ſupra lumen mi
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noris minor, & minori vi ac celeritate premit, nempe aquea co
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lumna magis aut minùs alta. </
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Propoſitio IV. Phænomenon IV.
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Per tubos ſemper, & non ſemper plenos inæqualium
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luminum, ſed æqualium altitudinum, effluit eodem, vel æ
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quali tempore, inæqualis aquæ copia.
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<
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<
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>NEmpe per maius lumen maior, & per minus minor. </
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<
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>Ratio
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eſt eadem, quia ſcilicet ſupra maius lumen premit maior a
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quæ copia, & maiori vi; & ſupra minus minor, & minori vi, ſci
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licet columna aquea æquè alta, ſed non æquè craſſa. </
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Poriſma.
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<
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>PEr tubos vtroſque, hoc eſt, tam ſemper plenos, quàm non
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ſemper plenos, inæqualium luminum, & inæqualium </
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