!set gl_type=dynamic
!set gl_author=Euler, Acadmie de Versailles
!set gl_title=Thorme de Pythagore (Exemple 2)
!set gl_renew=1

!readproc data/glossary/mathematics/geometry/macro/pythagore_gen 2

<style>
/*<![CDATA[*/
#enonce$(gl_a){order:1;}\
#applet$(gl_a){order:2;}\
@media screen and (max-width: 40em) {\
#enonce$(gl_a){order:2;}\
#applet$(gl_a){order:1;}\
}\
div.applet{padding-left:1.5em;}\
details{box-shadow:none}\
/*]]>*/
</style>
<div>
  <p>Le triangle \(\mathrm{ABC}\) est rectangle en <span class="nowrap">\(\mathrm{A}\).</span><br> Une unit de longueur tant donne, on a&nbsp;: \($(gl_enonc[1])\) et <span class="nowrap">\($(gl_enonc[2])\).</span>
  </p>
  <p>Calculer <span class="nowrap">\($(gl_quest)\).</span>
  </p>
</div>
<div class="grid-container fluid">
  <div class="grid-x grid-padding-x">
    <div id="enonce$(gl_a)" class="cell2 small-12 medium-6 large-8">
      <details>
        <summary class="oef_indgood">lments de solution</summary>
        <p>Le triangle \(\mathrm{ABC}\) est rectangle en <span class="nowrap">\(\mathrm{A}\),</span> d'aprs le thorme de Pythagore&nbsp;:
        </p>
        <p>
        \($(gl_egal1)\)<br>
        \($(gl_egal2)\)<br>
        \($(gl_egal3)\)<br>
        \($(gl_egal4)\)
        </p>
        <p>
        Il y a deux nombres qui ont pour carr <span class="nowrap">\($(gl_data4[$gl_choix])\) : </span> \(-\sqrt{$(gl_data4[$gl_choix])}\) et <span class="nowrap">\(\sqrt{$(gl_data4[$gl_choix])}\).<span><br>
        \($(gl_quest)\) tant une longueur, \($(gl_quest)\) est un nombre positif donc&nbsp:
        </p>
        <p>
        \($(gl_egal5)\)<br>
        \($(gl_egal6)\)
        </p>
      </details>
    </div>
    <div id="applet$(gl_a)" class="cell2 small-12 medium-6 large-4">
      <div class="applet">
        !readproc slib/geo2D/jsxgraph id$(gl_a) brd$(gl_a),[$gl_xsize x $gl_ysize,min=200px max=200px scroll center],$(gl_script$(gl_a))
        $slib_out
      </div>
    </div>
  </div>
</div>
