DelMonte, Guidubaldo, In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata

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    <archimedes>
      <text>
        <body>
          <chap id="N10019">
            <pb xlink:href="077/01/055.jpg" pagenum="51"/>
            <p id="N11CE6" type="margin">
              <s id="N11CE8">
                <margin.target id="marg37"/>
              4
                <emph type="italics"/>
              huius.
                <emph.end type="italics"/>
              </s>
            </p>
            <p id="N11CF1" type="head">
              <s id="N11CF3">COROLLARIVM. I.</s>
            </p>
            <p id="N11CF5" type="main">
              <s id="N11CF7">Ex hoc autem manifeſtum eſt, ſi quotcunquè
                <lb/>
              magnitudinum, & numero imparium,
                <arrow.to.target n="marg38"/>
              gra­
                <lb/>
              uitatis in recta linea conſtituta fuerint; & magni­
                <lb/>
              tudines æqualem habuerint grauitatem; rectæquè
                <lb/>
              lineæ inter ipſarum centra fuerint æquales, ma­
                <lb/>
              gnitudinis ex omnibus magnitudinibus compoſi
                <lb/>
              tæ centrum grauitatis eſſe punctum, quod & ipſa­
                <lb/>
              rum mediæ centrum grauitatis exiſtit. </s>
            </p>
            <p id="N11D0B" type="margin">
              <s id="N11D0D">
                <margin.target id="marg38"/>
              *</s>
            </p>
            <p id="N11D11" type="head">
              <s id="N11D13">SCHOLIVM.</s>
            </p>
            <figure id="id.077.01.055.1.jpg" xlink:href="077/01/055/1.jpg" number="31"/>
            <p id="N11D18" type="main">
              <s id="N11D1A">Ex demonſtratione colligit Archimedes ſi plures fuerint
                <lb/>
              magnitudines,
                <expan abbr="quã">quam</expan>
              tres; dummodo ſint numero impares, vt
                <lb/>
              ABCDE; quarum centra grauitatis ABCDE reperiantur in li
                <lb/>
              nea recta AE. fuerint autem hę magnitudines æquales in gra
                <lb/>
              uitate. </s>
              <s id="N11D28">inſuper rectę lineę AB BC CD DE, quę ſunt inter
                <expan abbr="cẽ-tra">cen­
                  <lb/>
                tra</expan>
              grauitatis, fuerint æquales: magnitudinis ex omnibus ma
                <lb/>
              gnitudinibus ABCDE compoſitæ centrum grauitatis eſſe
                <lb/>
              punctum C. quod eſt centrum grauitatis magnitudinis
                <lb/>
              mediæ. </s>
            </p>
            <p id="N11D36" type="main">
              <s id="N11D38">Eodem enim modo, ac primùm quidem ex demonſtratio
                <lb/>
              ne patet
                <expan abbr="punctũ">punctum</expan>
              C centrum eſſe grauitatis
                <expan abbr="triũ">trium</expan>
                <expan abbr="magnitudinũ">magnitudinum</expan>
                <lb/>
              BCD, & quoniam AB BC ſunt æquales ipſis CD DE, </s>
            </p>
          </chap>
        </body>
      </text>
    </archimedes>
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