Archimedes, Archimedis De iis qvae vehvntvr in aqva libri dvo

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DE CENTRO GRAVIT. SOLID.
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              <pb o="44" file="0199" n="199" rhead="DE CENTRO GRAVIT. SOLID."/>
            relinquetur p e ipſi n χ æqualis. </s>
            <s xml:space="preserve">cum autem b e ſit dupla
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            e d, & </s>
            <s xml:space="preserve">o p dupla p n, hoc eſt ipſius e χ, & </s>
            <s xml:space="preserve">reliquum, uideli-
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            cet b o unà cum p e ipſius reliqui χ d duplnm erit. </s>
            <s xml:space="preserve">eſtque
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              <anchor type="note" xlink:label="note-0199-01a" xlink:href="note-0199-01"/>
            b o dupla ζ d. </s>
            <s xml:space="preserve">ergo p e, hoc eſt n χ ipſius χ ρ dupla. </s>
            <s xml:space="preserve">ſed d n
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            dupla eſt n ζ. </s>
            <s xml:space="preserve">reliqua igitur d χ dupla reliquæ χ n. </s>
            <s xml:space="preserve">ſunt au-
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            tem d χ, p n inter ſe æquales: </s>
            <s xml:space="preserve">itemq; </s>
            <s xml:space="preserve">æquales χ n, p e. </s>
            <s xml:space="preserve">qua-
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            re conſtat n p ipſius p e duplam eſſe. </s>
            <s xml:space="preserve">& </s>
            <s xml:space="preserve">idcirco p e ipſi e n
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            æqualem. </s>
            <s xml:space="preserve">Rurſus cum ſit μ ν dupla o ν, & </s>
            <s xml:space="preserve">μ σ dupla σ ν; </s>
            <s xml:space="preserve">erit
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            etiam reliqua ν σ o dupla. </s>
            <s xml:space="preserve">Eadem quoque ratione
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            cõcludetur π υ dupla υ m. </s>
            <s xml:space="preserve">ergo ut ν σ ad σ O, ita π υ ad υ m:
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            </s>
            <s xml:space="preserve">componendoq;</s>
            <s xml:space="preserve">, & </s>
            <s xml:space="preserve">permutando, ut υ o ad π m, ita o σ ad
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            m υ & </s>
            <s xml:space="preserve">ſunt æquales ν o, π m. </s>
            <s xml:space="preserve">quare & </s>
            <s xml:space="preserve">o σ, m υ æquales. </s>
            <s xml:space="preserve">præ
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            terea σ π dupla eſt π τ, & </s>
            <s xml:space="preserve">ν π ipſius π m. </s>
            <s xml:space="preserve">reliqua igitur σ ν re
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            liquæ m τ dupla. </s>
            <s xml:space="preserve">atque erat ν σ dupla σ o. </s>
            <s xml:space="preserve">ergo m τ, σ o æ-
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            quales ſunt: </s>
            <s xml:space="preserve">& </s>
            <s xml:space="preserve">ita æquales m υ, n φ. </s>
            <s xml:space="preserve">at o σ, eſt æqualis
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            m υ. </s>
            <s xml:space="preserve">Sequitur igitur, ut omnes o σ, m τ, m υ, n φ in-
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            ter ſe ſint æquales. </s>
            <s xml:space="preserve">Sed ut ρ π ad π τ, hoc eſt ut 3 ad 2, ita n d
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            ad d χ: </s>
            <s xml:space="preserve">permutãdoq; </s>
            <s xml:space="preserve">ut ρ π ad n d, ita π τ ad d χ. </s>
            <s xml:space="preserve">& </s>
            <s xml:space="preserve">ſũt æqua
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            les ζ π, n d. </s>
            <s xml:space="preserve">ergo d χ, hoc eſt n p, & </s>
            <s xml:space="preserve">π τ æquales. </s>
            <s xml:space="preserve">Sed etiam æ-
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            quales n π, π m. </s>
            <s xml:space="preserve">reliqua igitur π p reliquæ m τ, hoc eſt ipſi
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            n φ æqualis erit. </s>
            <s xml:space="preserve">quare dempta p π ex p e, & </s>
            <s xml:space="preserve">φ n dempta ex
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            n e, relinquitur p e æqualis e φ. </s>
            <s xml:space="preserve">Itaque π, ρ centra figurarũ
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            ſecundo loco deſcriptarum a primis centris p n æquali in-
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            teruallo recedunt. </s>
            <s xml:space="preserve">quòd ſi rurſus aliæ figuræ deſcribantur,
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            eodem modo demonſtrabimus earum centra æqualiter ab
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            his recedere, & </s>
            <s xml:space="preserve">ad portionis conoidis centrum propius ad
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            moueri. </s>
            <s xml:space="preserve">Ex quibus conſtat lineam π φ à centro grauitatis
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            portionis diuidi in partes æquales. </s>
            <s xml:space="preserve">Si enim fieri poteſt, non
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            ſit centrum in puncto e, quod eſt lineæ π φ medium: </s>
            <s xml:space="preserve">ſed in
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            ψ: </s>
            <s xml:space="preserve">& </s>
            <s xml:space="preserve">ipſi π ψ æqualis fiat φ ω. </s>
            <s xml:space="preserve">Cum igitur in portione ſolida
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            quædam figura inſcribi posſit, ita ut linea, quæ inter cen-
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            trum grauitatis portionis, & </s>
            <s xml:space="preserve">inſcriptæ figuræ interiicitur,
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            qualibet linea propoſita ſit minor, quod proxime demon-
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            ſtrauimus: </s>
            <s xml:space="preserve">perueniet tandem φ centrum inſcriptæ figuræ</s>
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