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Line 13: == Tilings with non-congruent rectangles == The smallest square that can be cut into (m x n) rectangles, such that all m and n are different integers, is the 11 x 11 square, and the tiling uses five rectangles.<ref name="1x">[[Journal of Recreational Mathematics]], 28:1, p.64</ref> The smallest rectangle that can be cut into (m x n) rectangles, such that all m and n are different integers, is the 9 x 13 rectangle, and the tiling uses five rectangles.<ref name="1x" /> ==See also== Line 22: * [[tiling puzzle]] ==~~References~~Notes== {{reflist}}

Tiling with rectangles: Difference between revisions