Valerio, Luca, De centro gravitatis solidorum, 1604

Table of figures

< >
[Figure 21]
Page: 38
[Figure 22]
Page: 39
[Figure 23]
Page: 40
[Figure 24]
Page: 42
[Figure 25]
Page: 43
[Figure 26]
Page: 44
[Figure 27]
Page: 46
[Figure 28]
Page: 48
[Figure 29]
Page: 50
[Figure 30]
Page: 52
[Figure 31]
Page: 54
[Figure 32]
Page: 55
[Figure 33]
Page: 56
[Figure 34]
Page: 58
[Figure 35]
Page: 59
[Figure 36]
Page: 60
[Figure 37]
Page: 61
[Figure 38]
Page: 62
[Figure 39]
Page: 63
[Figure 40]
Page: 64
[Figure 41]
Page: 65
[Figure 42]
Page: 66
[Figure 43]
Page: 67
[Figure 44]
Page: 68
[Figure 45]
Page: 69
[Figure 46]
Page: 70
[Figure 47]
Page: 73
[Figure 48]
Page: 74
[Figure 49]
Page: 76
[Figure 50]
Page: 78
< >
page |< < of 283 > >|
    <archimedes>
      <text>
        <body>
          <chap>
            <p type="main">
              <s>
                <pb xlink:href="043/01/023.jpg" pagenum="15"/>
              tes A deficiens, cuius baſis BC. </s>
              <s>Dico fieri poſse quod
                <lb/>
              proponitur: ducta enim per verticem figuræ A, baſi BC,
                <lb/>
              parallela, atque ideo figuram ipſam contingente, abſol­
                <lb/>
              uatur parallelogrammum BL, ſectaque diametro AD,
                <lb/>
              bifariam, & ſingulis eius partibus ſemper bifariam, du­
                <lb/>
              cantur per puncta ſectionum rectæ lineæ baſi BC, & in­
                <lb/>
              ter ſe parallelæ, atque ita multiplicatæ ſint ſectiones,
                <lb/>
              vt ſecti parallelogrammi in parallelogramma æqua­
                <lb/>
              lia, & eiuſdem altitudinis quælibet pars, vt paralle­
                <lb/>
              logrammum BF, ſit minus ſuperficie propoſita, cu­
                <lb/>
              ius parallelogram­
                <lb/>
              mi latus EF, ſe­
                <lb/>
              cet figuræ termi­
                <lb/>
              num BAC, in
                <lb/>
              punctis GH, &
                <lb/>
              diametrum AD, in
                <lb/>
              puncto K. erit igi­
                <lb/>
              tur GK, æqualis
                <lb/>
              KH: per omnia
                <lb/>
              igitur puncta ſe­
                <lb/>
              ctionum termini
                <lb/>
                <figure id="id.043.01.023.1.jpg" xlink:href="043/01/023/1.jpg" number="12"/>
                <lb/>
              BAC, quæ à prædictis fiunt lineis parallelis, ſi ducan­
                <lb/>
              tur diametro AD parallelæ, figura quædam ipſi ABC,
                <lb/>
              inſcribetur, & altera circumſcribetur ex parallelogram­
                <lb/>
              mis æqualium altitudinum. </s>
              <s>Dico harum figurarum
                <lb/>
              inſcriptam ſuperari à circumſcripta minori ſpacio ſuper­
                <lb/>
              ficie propoſita. </s>
              <s>Quoniam enim omnia parallelogramma,
                <lb/>
              quibus figura circumſcripta ſuperat inſcriptam ſimul ſum­
                <lb/>
              pta ſunt æqualia BF parallelogrammo: ſed parallelo­
                <lb/>
              grammum BF, eſt minus ſuperficie propoſita: exceſſus
                <lb/>
              igitur quo figura circumſcripta inſcriptam ſuperat, minor
                <lb/>
              erit ſuperficie propoſita. </s>
              <s>Fieri igitur poteſt, quod propo­
                <lb/>
              nebatur. </s>
            </p>
          </chap>
        </body>
      </text>
    </archimedes>
Impressum