Huygens, Christiaan
,
Christiani Hugenii opera varia; Bd. 1: Opera mechanica
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CHRISTIANI HUGENII
"/>
quanta acquiritur deſcendendo per arcum Cycloi-
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<
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.</
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dis B G, fore ad tempus quo percurretur recta
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O P, celeritate æquabili dimidia ejus quæ acqui-
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ritur deſcendendo per totam tangentem B I, ſicut
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eſt tangens S T ad partem axis Q R.</
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<
s
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xml:space
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">Deſcribatur enim ſuper axe A D ſemicirculus D V A ſe-
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cans rectam B F in V, & </
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<
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cans rectas O Q, P R, G Σ in E K & </
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H F, H A, H X & </
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<
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xml:space
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">quæ poſtrema ſecet rectas O Q,
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P R in punctis Δ & </
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<
s
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rationem eam quæ componitur ex ratione ipſarum linearum
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M N ad O P, & </
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curruntur, contrarie ſumpta , hoc eſt, & </
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<
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xml:space
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xml:space
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">Prop. 5.
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Galil. de
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motu æ-
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quab.</
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diæ celeritatis ex B I ſive ex F A, ad celeritatem ex B G, ſive
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ex F Σ . </
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<
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xml:space
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">Atqui tota celeritas ex F A ad celeritatem ex F
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xml:space
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">Prop. 8.
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huj.</
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eſt in ſubduplicata ratione longitudinum F A ad F Σ ,
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xml:space
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">Prop. 3.
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huj.</
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proinde eadem quæ F A ad F H Ergo dimidia celeritas ex
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F A ad celeritatem ex F Σ erit ut F X ad F H. </
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xml:space
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">Itaque tem-
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pus dictum per M N ad tempus per O P habebit rationem
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compoſitam ex rationibus M N ad O P, & </
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</
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<
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">Harum vero prior ratio, nempe M N ad O P, eadem oſten-
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detur quæ F H ad H Σ.</
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</
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<
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xml:space
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">Eſt enim tangens Cycloidis B I parallela rectæ V A, ſi-
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militerque tangens M G N parallela rectæ Φ A; </
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">ac proinde
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recta M N æqualis Δ Π, & </
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<
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xml:space
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">Ergo dicta
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ratio rectæ M N ad O P eadem eſt quæ Δ Π ad E K; </
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eſt, Δ A ad E A; </
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<
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<
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xml:space
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Φ A . </
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@ræced,</
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quia quadratum V A æquale eſt rectangulo D A F, & </
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dratum A Φ æquale rectangulo D A Σ, quæ rectangula ſunt
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inter ſe ut F A ad Σ A, hoc eſt ut quadratum F A ad qua-
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dratum A H, erit proinde & </
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tum Φ A ut quadratum F A ad quadratum A H; </
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