Valerio, Luca, De centro gravitatis solidorum, 1604

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    <archimedes>
      <text>
        <body>
          <chap>
            <p type="main">
              <s>
                <pb xlink:href="043/01/166.jpg" pagenum="79"/>
              cumque multiplicatione; ſint duæ partes æquales proximæ
                <lb/>
              baſi DF, FQ: & per puncta FQ duo plana baſium pla­
                <lb/>
              no parallela tres prædictas figuras ſolidas ſecare intelli­
                <lb/>
              gantur: ſecabunt autem & tres figuras per axim, eruntque
                <lb/>
              ſectiones rectæ lineæ ad diametrum figurarum ordinatim
                <lb/>
              applicatæ propter
                <lb/>
              plana ſecantia pa
                <lb/>
              rallela: trium au­
                <lb/>
              tem ſolidorum ſe
                <lb/>
              ctiones & baſes
                <lb/>
              omnes circuli, ter
                <lb/>
              ni in ſingulis pla­
                <lb/>
              nis: ac primi qui­
                <lb/>
              dem ordinis ſint
                <lb/>
              ij, quorum diame­
                <lb/>
              tri ſunt baſes
                <expan abbr="triũ">trium</expan>
                <lb/>
                <expan abbr="figurarũ">figurarum</expan>
              per axim,
                <lb/>
              trianguli ſcilicet,
                <lb/>
              parabolæ, & hy­
                <lb/>
              perboles, quæ præ
                <lb/>
              dictas figuras ſoli
                <lb/>
              das deſcribunt, re
                <lb/>
              ctæ lineæ AC,
                <lb/>
              MN, KL. </s>
              <s>Se­
                <lb/>
              cundi verò reten­
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              to eodem ordine
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                <expan abbr="figurarũ">figurarum</expan>
              tres
                <foreign lang="grc">αζ,
                  <lb/>
                βε, γδ. </foreign>
              </s>
              <s>Tertij
                <lb/>
              denique ordinis
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              SZ, TY, VX.
                <lb/>
                <figure id="id.043.01.166.1.jpg" xlink:href="043/01/166/1.jpg" number="126"/>
                <lb/>
              Quoniam igitur eſt vt EB, ad BD, ità quadratum MD,
                <lb/>
              ad quadratum DK, ideſt conus MBN, ſi deſcribatur eo­
                <lb/>
              dem vertice B, ad conum KBL. </s>
              <s>Et vt IB, ad BE, ità eſt
                <lb/>
              conoides MBN, ad conum MBN, in proportione ſcili-</s>
            </p>
          </chap>
        </body>
      </text>
    </archimedes>
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