Three N*N matrices A,B,C are given. C is the same as the product of A and B except that exactly one element is wrong. The naive algorithm to find it out requires N^3 time. Can we do faster than that?

Take a vector `v = (1 1 1 1 ... 1)`

, and calculate: ^{T}`u = Cv - A(Bv)`

.

`u`

is equal to `(C-AB)v`

, and therefore it will have zeroes in all elements except one. The index of this element corresponds to the row index where C is different from AB. The value of the element (`a`

) is the value of the nonzero element in `C-AB`

.

To find the column index, you can repeat this with the vector `v`

. Now the value of the nonzero element is _{2} = (1 2 3 4 ... n)^{T}`ac`

, where `a`

is the value we calculated before and `c`

is the column index.

Since we only do a few matrix*vector multiplications, the running time is O(n^2).