Borelli, Giovanni Alfonso, De motionibus naturalibus a gravitate pendentibus, 1670

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            <p type="main">
              <s id="s.000082">
                <pb pagenum="15" xlink:href="010/01/023.jpg"/>
                <arrow.to.target n="marg15"/>
                <lb/>
              Y in ſecundo & ſubleuata vſque ad V; tunc quidem̨
                <lb/>
              centrum grauitatis prædictæ aquæ horizontaliter
                <expan abbr="cõ-ſtitutæ">con­
                  <lb/>
                ſtitutæ</expan>
              præcisè incidet in
                <expan abbr="cẽtro">centro</expan>
              ſuſpenſionis M, prop­
                <lb/>
              terea quòd vt baſis V ad baſim A ſeù vt cylindrus a­
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              queus GLV ad equè altum cy­
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                <figure id="id.010.01.023.1.jpg" xlink:href="010/01/023/1.jpg" number="8"/>
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              lindrum AEF in primo caſu vel
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              ad CEF in ſecundo, ita fuit reci­
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              procè diſtantia EM ad ML. o­
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              ſtendendum modò eſt punctą
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              A, Q, R, S, M in eadèm linea pa­
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              rabolica eſſe. </s>
              <s id="s.000083">quia moles aquæ
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              TX æqualis eſt æquæ moli GH
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              I, ergo, XBF vnà cum GHI æ­
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              qualis eſt moli aqueæ TAF; e­
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              rat verò moles aquæ XBF vnà
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              cum GHI ad GHI vt linea HB
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              ad BQ ſeu (ducta QN parallel­
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              là AE) vt LE ad EN, ergo FAT
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              ad TX atque ſemiſſis illius FA
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              ad huius ſemiſſem AB eamdem
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              proportionem habebit quam̨
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              LE ad EN, eſt verò EA ad AF vt MA ad AG, ſeù vt
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              ME ad EL, ergo ex æqualitate ordinata EA ad AB
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              eamdem proportionem habebit quam ME ad EN, &
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              per conuerſionem rationis EA ad EB erit vt EM ad
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              MN, ſeù vt EB ad NQ, erunt igitur tres continuæ pro
                <lb/>
              portionales EA, EB, & NQ in eadem ratione quam̨
                <lb/>
              habet EM ad MN, quare quadratum ex EM ad qua­
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              dratum ex MN eam proportionem habebit, quam̨ </s>
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