Snub trihexagonal tiling

The snub trihexagonal tiling, or snathat, also called the snub hexagonal tiling, is one of the eleven convex uniform tilings of the Euclidean plane. 4 triangles and 1 hexagon join at each vertex of this tiling. It can be formed by alternating the great rhombitrihexagonal tiling and adjusting to make all edge lengths equal. It is also a diminishing of the triangular tiling, removing $$\tfrac17$$ of its vertices.