DelMonte, Guidubaldo, Mechanicorvm Liber

Table of figures

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[Figure 101]
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[Figure 102]
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[Figure 103]
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[Figure 104]
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[Figure 105]
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[Figure 106]
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[Figure 108]
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[Figure 109]
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[Figure 111]
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[Figure 112]
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[Figure 113]
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[Figure 114]
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[Figure 115]
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[Figure 116]
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[Figure 117]
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[Figure 118]
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[Figure 119]
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[Figure 120]
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      <text>
        <body>
          <chap id="N128CF">
            <p id="id.2.1.105.5.0.0.0" type="main">
              <s id="id.2.1.105.5.1.1.0">
                <pb n="52" xlink:href="036/01/117.jpg"/>
                <figure id="id.036.01.117.1.jpg" place="text" xlink:href="036/01/117/1.jpg" number="108"/>
              </s>
            </p>
            <p id="id.2.1.105.6.0.0.0" type="main">
              <s id="id.2.1.105.6.1.1.0">Ex iis etiam demonſtrabitur, ſi centrum grauitatis eiuſdem pon
                <lb/>
              deris, ſiue propinquius, ſiue remotius fuerit à vecte AB horizon­
                <lb/>
              ti æquidiſtante, eandem potentiam in A pondus nihilominus
                <lb/>
              ſuſtinere: vt ſi centrum grauitatis H ponderis BD longius abſit
                <lb/>
              à vecte BA, quàm centrum grauitatis N ponderis PV, dum­
                <lb/>
              modo ducta à puncto H perpendicularis HL horizonti, vectiq;
                <lb/>
              AB tranſeat per N; ſitq; pondus PV ponderi BD æquale;
                <lb/>
              erit tùm pondus BD, tùm pondus PV, ac ſi ambo in L eſ­
                <lb/>
              ſent appenſa; atque ſunt æqualia, cùm loco vnius ponderis ac­
                <lb/>
              cipiantur, eadem igitur potentia in A ſuſtinens pondus BD,
                <lb/>
              pondus quoq; PV ſuſtinebit. </s>
              <s id="id.2.1.105.6.1.2.0">Vecte autem EF, quò centrum
                <lb/>
              grauitatis longius fuerit à vecte, eò facilius potentia idem pon­
                <lb/>
              dus ſuſtinebit: vt ſi centrum grauitatis k ponderis FG longius
                <lb/>
              ſit à vecte EF, quàm centrum grauitatis X ponderis YZ; ita ta
                <lb/>
              men vt ducta à puncto k vecti FE perpendicularis tranſeat per
                <lb/>
              X; ſitq; pondus FG ponderi YZ æquale; & à punctis kX ip­
                <lb/>
              ſorum horizontibus perpendiculares ducantur KM X9; erit C9
                <lb/>
              maior CM; ac propterea pondus FG in vecte erit, ac ſi in M eſ
                <lb/>
              ſet appenſum, & pondus YZ, ac ſi in 9 eſſet appenſum. </s>
              <s id="id.2.1.105.6.1.3.0">quo</s>
            </p>
          </chap>
        </body>
      </text>
    </archimedes>
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