The first thing you want to do after the input is to make another 2D table, with the same size as the input table, and build it using dynamic programming (I'll explain in a second).

From now we'll define a rectangle as: (r1,c1)(r2,c2), which means a rectangle with upper-left corner at row "r1" and column "c1" (a rectangle in a 2D array), and with bottom-right corner at row "r2" and column "c2".

Now, the idea in the table built using DP (we'll call the table DP) is that at the cell in row "i", and column "j", we'll have a value indicating the amount of 1's that appear in the input at the rectangle (0,0)(i,j).

The way of building the table is as follows: (The input table will be named T and the dp table will be named DP): DP[0][0] = T[0][0].

DP[0][i] = DP[0][i — 1] + T[0][i].

DP[i][0] = DP[i — 1][0] + T[i][0].

The above are the basic cases, from there: DP[i][j] = DP[i — 1][j] + DP[i][j — 1] — DP[i — 1][j — 1] + T[i][j]

Explanation of the dp: - the case of DP[0][0] is pretty obvious; 1 if the cell T[0][0] is 1, 0 otherwise.

• Both cases of DP[0][i] and DP[i][0] are the same: notice how it is identical to building a Prefix Sum array.

• The last case which builds the whole table: We need to find the amount of 1's at rectangle (0,0)(i,j). We take the amount of 1's in rectangle (0,0)(i-1,j) (one row less) and add the amount of 1's in rectangle (0,0)(i,j-1) (one column less), but notice that we counted twice the rectangle (0,0)(i-1,j-1) (it's being summed in both the previous rectangles), so we decrease its value, and lastly we add the single value, T[i][j], to check whether there is a 1 in the bottom-right corner.

Now how do we find the amount of 1's in a given rectangle (a,b)(c,d)? We first take DP[c][d], so now we have rectangle (0,0)(c,d), then we decrease DP[a — 1][d], so now we have rectangle (a,0)(c,d), then we decrease DP[c][b — 1], so now we have just rectangle (a,b)(c,d), HOWEVER notice that we subtracted twice the rectangle (0,0)(a-1,b-1), so we must add back DP[a — 1][b — 1]. Therefor we come up with:

Amount of 1's in rectangle (a,b)(c,d) = DP[c][d] — DP[a — 1][d] — DP[c][b — 1] + DP[a — 1][b — 1].

Now, let's recall what we're asked in the task. We need to find such K, so that in all squares of size K*K, we'll need to turn them either completely to 1's, or completely to 0's, and then we need to find the K for which the amount of total operations on all squares is minimal.

Important note: suppose we picked some random K. The squares must be: (0,0)(K-1,K-1) (0,K)(K-1,2*K-1) (0,2*K)(K-1,3*K-1) ....

(K,0)(2*K-1,K-1) (K,K)(2*K-1,2*K-1) (K,2*K)(2*K-1,3*K-1) ....

. . . And so on. For each of these squares we can find in O(1) the amount of 1's they contain, using the rule we found earlier. Suppose we look at a K*K square, and we found it has X amount of 1's inside of it. If we want to turn this square into completely 0's, we need to change every 1 to 0, so the amount of operations is X. If we want to turn this square into completely 1's, we need to change every 0 to 1. Note that a square can contain only 0's and 1's, so if we know its size and we know exactly how many 1's it contains, we also know how many 0's it contains: K * K — X. This is amount of operations we need to do to turn the square into completely 1's. Now, we need to minimize the amount of operations. That means we need to pick the minimal value of the above 2: min(X, K * K — X). We find this value for each square of size K * K, add up all the values, and this is the minimal amount of operations we need to do if we take squares of size K * K.

Now all you need to do is go over all possible K sizes (from 2 to 2500), and maintain the minimal result you found.

That is the answer to the problem, I hope I was crystal clear this time because I don't think I can do any better.

It was funny but I'm very sad at the same time because of looong explanation :(