!set gl_type=dynamic
!set gl_title=Symtrie axiale (exemple 1)
!set ggbBase64=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

!readproc slib/geo2D/geogebra ggbBase64=$ggbBase64\
  width=700\
  height=250\
  enableRightClick=false\
  showAlgebraInput=false\
  borderColor=#FFFFFF\
  number=1;

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