So this is essentially a variation on a bin packing problem (which is well known to be
One solution is to use 2
3x3 squares, 1
2x2 square and 5
1x1 squares, as follows:
The solution is obviously non-unique, since the positions of the various squares can be permuted around.
Due to the
NP-hardness I imagine it would be difficult to come up with an efficient algorithm to divide a general
NxM rectangle into
k square pieces exactly. In fact there must be whole families of parameter values for which no solution is possible (for instance if you started with an
6x1 rectangle it would be impossible to divide into anything less than 6 squares...).