If you are fascinated by the work of the late Dutch artist M. C. Escher, the 
recognized master of the two dimensional planar tessellation or regular 
division of the plane, then you should also enjoy Seattle graphic artist K. 
E. Landry's work. Landry's inventory of 2D tessellation images include both 
natural creatures and geometric art demonstrate congruent objects arranged 
with symmetry that often challenge the eyes ability to pick out the "members 
of the cast." Landry has gone "Beyond Escher" to design his tessellation 
images with internal geometry that allows a dissection of the planar 
components, which after folding and pasting, allows an onlay, inlay, or 
overlay of many of the convex 3D spatial shapes including the, Platonic, 
Prism and Antiprism, and Archimedian polyhedra. These 'enhanced' polyhedra 
are called the "Decorated Polyhedra."

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