# Divide 9×3 rect into 8 equal size square [closed]

You whip up your favorite brownie recipe and pour into your new 9×3 inch baking dish. The brownies bake. The toothpick comes out clean. Now for the cutting.

A square is the most delicious shape for a brownie. You have eight people to serve. How can you cut your newly baked creation into exactly eight square pieces?

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8x 1in by 1in pieces, obviously. –  hkf May 4 '12 at 6:08
@hkf: Did you understood the question correctly? –  UPT May 4 '12 at 7:19
Into eight equal square pieces, 1x1 squares (when you actually mean cuboids) are equal, are they not? –  hkf May 4 '12 at 8:06
@UPT: I think you may have misunderstood your question. It is only required that you form 8 square pieces, not 8 equal sized square pieces (as the title of your question implies...). I assume the original question can be found here: wordplay.blogs.nytimes.com/2012/04/30/numberplay-square –  Darren Engwirda May 4 '12 at 10:51
@UPT While the question says that you want to cut the cake slice into 8 pieces, hkf's solution also solves the meta-problem of dealing with guests who are pissed off because of the size discrepancy of your servings. –  Peter M May 4 '12 at 12:08

## closed as off topic by Cody Gray, AakashM, Masi, Beta, woodchips May 4 '12 at 13:55

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So this is essentially a variation on a bin packing problem (which is well known to be `NP`-hard!).
One solution is to use 2 `3x3` squares, 1 `2x2` square and 5 `1x1` squares, as follows:
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...).