!set gl_type=dynamic
!set gl_title=Volume d'une pyramide (exemple)
!set ggbBase64=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

!readproc slib/geo2D/geogebra ggbBase64=$ggbBase64\
  width=800\
  height=600\
  enableRightClick=false\
  showAlgebraInput=false\
  borderColor=#FFFFFF\
  enable3d=true\
  number=1;

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