Mike found a long tape in his home. He proceeded to write some sequence of integers. Now he'd like to cut the tape in such a place that the difference between the sum of the integers on one part and on the other is as close to zero as possible (on one part there has to be at least one number). You're to print the absolute value of this difference.

Input:

`n`

(2 ≤ n ≤ 10^{6}) meaning the amount of numbers written on the tape and then n integers`a`

_{i}(-10^{3}≤ a_{1}≤ 10^{3}) as the numbers written on the tape.Output: One integer being a minimal absolute value of difference between the two parts.

Example:

6

1 2 3 4 5 6

Should output:

1

I have a feeling I've read a problem like this somewhere before.. I don't know how to solve it, though. I mean, I have a clue but I don't know if it's right. Should I compute the sum of the whole tape first and then compute from left to right till I'm as close to the part being a half of the whole tape as possible? I mean: I sum the numbers from left to right constantly checking if I've exceeded the half of the whole set. If a sum of the subset is equal to the half - we print zero. If the exact half is not possible, we check the closest below and above and output the closest one. Is that OK?