Valerio, Luca, De centro gravitatis solidorvm libri tres

Table of figures

< >
[Figure 71]
Page: 98
[Figure 72]
Page: 99
[Figure 73]
Page: 100
[Figure 74]
Page: 102
[Figure 75]
Page: 103
[Figure 76]
Page: 104
[Figure 77]
Page: 105
[Figure 78]
Page: 106
[Figure 79]
Page: 108
[Figure 80]
Page: 109
[Figure 81]
Page: 110
[Figure 82]
Page: 111
[Figure 83]
Page: 112
[Figure 84]
Page: 113
[Figure 85]
Page: 114
[Figure 86]
Page: 115
[Figure 87]
Page: 116
[Figure 88]
Page: 117
[Figure 89]
Page: 118
[Figure 90]
Page: 119
[Figure 91]
Page: 120
[Figure 92]
Page: 121
[Figure 93]
Page: 122
[Figure 94]
Page: 123
[Figure 95]
Page: 124
[Figure 96]
Page: 125
[Figure 97]
Page: 126
[Figure 98]
Page: 128
[Figure 99]
Page: 129
[Figure 100]
Page: 130
< >
page |< < of 283 > >|
    <archimedes>
      <text>
        <body>
          <chap>
            <p type="main">
              <s>
                <pb xlink:href="043/01/046.jpg" pagenum="38"/>
              dupla igitur RG, eſt ipſius GL. </s>
              <s>Et quoniam in triangu­
                <lb/>
              lo AGC, recta GD, ſecat AC, bifariam in puncto D;
                <lb/>
              ipſi AC, parallelam KH, bifariam ſecabit in puncto L,
                <lb/>
              duorum igitur æqualium parallelogrammorum AF, EG;
                <lb/>
              ſimul, quorum centra grauitatis ſunt K, H, centrum gra­
                <lb/>
              uitatis erit L. </s>
              <s>Sed duo parallelogramma AF, EC, ſi­
                <lb/>
              mul ſunt paralle­
                <lb/>
              logrammi BD, du
                <lb/>
              plum; trium igitur
                <lb/>
              parallelogrammo­
                <lb/>
              rum AF, EC,
                <lb/>
              BD, ſimul: hoc
                <lb/>
              eſt
                <expan abbr="triãguli">trianguli</expan>
              ABC,
                <lb/>
              vnà cum duobus
                <lb/>
              trium
                <expan abbr="triangulorũ">triangulorum</expan>
                <lb/>
              inter ſe congruen­
                <lb/>
              tium EDF, cen­
                <lb/>
              trum grauitatis e­
                <lb/>
              rit G. </s>
              <s>Sed triangu
                <lb/>
              li ABC, ponitur
                <lb/>
                <figure id="id.043.01.046.1.jpg" xlink:href="043/01/046/1.jpg" number="27"/>
                <lb/>
              centrum grauitatis N; producta igitur NG, occurret
                <lb/>
              centro M, reliquæ partis, ideſt duorum triangulorum DEF;
                <lb/>
              quare vt triangulum ABC, ad duo triangula DEF, ſi­
                <lb/>
              mul, ita erit MG, ad GN. </s>
              <s>Sed triangulum ABC, eſt
                <lb/>
              duplum duorum triangulorum EDF: igitur & MG, erit
                <lb/>
              ipſius GN, dupla. </s>
              <s>Rurſus quoniam vtriuslibet duorum
                <lb/>
              triangulorum EDF, centrum grauitatis erat M; erit ſi­
                <lb/>
              militer poſitum M, in triangulo EDF, ac centrum N, in
                <lb/>
              triangulo ABC, propter ſimilitudinem triangulorum:
                <lb/>
              Sed propter hæc ſimiliter poſita centra, quia homologo­
                <lb/>
              rum laterum eſt vt AB, ad DF, ita NG, ad GM: &
                <lb/>
              AB, eſt dupla ipſius EB, erit & NG, dupla ipſius GM.
                <lb/>
              </s>
              <s>Sed GM, erat dupla ipſius GN: igitur GN, erit ſui ipſius
                <lb/>
              quadrupla. </s>
              <s>Quod eſt abſurdum. </s>
              <s>Non igitur centrum </s>
            </p>
          </chap>
        </body>
      </text>
    </archimedes>
Impressum