A kite's tessellation looks like this: In general, polygons tessellate because sums of integer multiples of their angles can be formed adding to 360 degrees. read more
A kite’s tessellation looks like this: In general, polygons tessellate because sums of integer multiples of their angles can be formed adding to 360 degrees. These patterns can be repeated across the Euclidean plane to make interesting and beautiful artwork, such as that seen in Persian carpets or other Middle Eastern art. read more
Which tessellate by side to side rotation and what would a mixed glide reflection/rotation tessellation look like. The question of which kites tessellate by double rotation boils down to what happens at the joint vertices between the two (possibly) different edges. read more