!set gl_type=dynamic
!set gl_title=Hauteur d'un triangle (exemple 3)
!set ggbBase64=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

!readproc slib/geo2D/geogebra ggbBase64=$ggbBase64\
  width=900\
  height=400\
  enableRightClick=false\
  showAlgebraInput=false\
  borderColor=#FFFFFF\
  number=3;

<div class="wimscenter">
  $slib_out
</div>