Archimedes
,
Archimedis De iis qvae vehvntvr in aqva libri dvo
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linea x cum ſit minor circulo, uel ellipſi, eſt etiam minor fi-
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gura rectilinea y. </
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<
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">ergo pyramis x pyramide y minor erit.
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<
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">At ſi conus, uel coni por
<
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tio x ponatur minor pyramide y: </
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<
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tus, uel altera coni portio χ ipſi pyramidi y æqualis. </
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<
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eius baſis circulus, uel ellipſis maior circulo, uel ellipſi x,
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quorum exceſſus ſit ſpacium ω. </
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<
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">Siigitur in circulo, uel elli-
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pſi χ figura rectilinea deſcribatur, ita ut portiones relictæ
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ſint ω ſpacio minores, eiuſinodi figura adhuc maior erit cir
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culo, uel ellipſi x, hoc eſt figura rectilinea _y_. </
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<
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">& </
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<
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">p_y_ramis in
<
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ea conſtituta minor cono, uel coni portione χ, hoc eſt mi-
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nor p_y_ramide_y_. </
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<
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">eſt ergo ut χ figura rectilinea ad figuram
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rectilineam _y_, ita pyramis χ ad pyramidem _y_. </
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<
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">quare cum
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figura rectilinea χ ſit maior figura_y_: </
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">p_y_ramis χ p_y_-
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ramide_y_ maior. </
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teſt. </
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<
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">non eſt igitur conus, uel coni portio x neque maior,
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neque minor p_y_ramide_y_. </
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<
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Itaque quoniam ut conus ad conum, uel coni portio ad </
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