Snub square tiling

The snub square tiling, or snasquat, is one of the eleven convex uniform tilings of the Euclidean plane. 3 triangles and 2 squares join at each vertex of this tiling. It can be formed by alternating the truncated square tiling and adjusting to make all edge lengths equal.

Representations
A snub square tiling has the following Coxeter diagrams:


 * s4s4o (full symmetry)
 * s4s4s (as alternated omnitruncated square tiling)