!set gl_type=dynamic
!set gl_title=Distance d'un point  un plan (exemple)
!set ggbBase64=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

!readproc slib/geo2D/geogebra ggbBase64=$ggbBase64\
  width=700\
  height=400\
  enableRightClick=false\
  showAlgebraInput=false\
  borderColor=#FFFFFF\
  enable3d=true\
  number=1;

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