# Algorithm - Find the center index

Given an array of ints with size `t`, one needs to find the center index. The center index `x` is the index where the sum of ints (0 to x-1) is equal to sum (x+1 to t-1).

The best algorithm I could come up with is O(n).

I would have a temp array with the sums of all ints before (not including the one at index x) : so at index 1 it would be 1, at 2 it would be a sum of 2 and 1 and so on.

Another int would be the sum of all ints.

I would loop twice through the array, the first make the temp array, and the other to find if both parts are equal.

Is there a better algorithm O(logn)?

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reason for downvote? –  Bartlomiej Lewandowski Oct 19 '12 at 14:48
What is `x`? Is the size you mention at the end of your first paragraph `t`? Review the paragraph and see if you can make it clearer. –  ohaal Oct 19 '12 at 14:53
X is the index i am looking for, t is the size of the array –  Bartlomiej Lewandowski Oct 19 '12 at 14:58
I don't think, I can do better than O(n), but space required can be made O(1). Two accumulators for storing sum from top and sum from bottom. Start with two pointers pointing at index 0 and last. Increment top pointer or decrement bottom pointer based on `sum_from_top > sum_from_bottom`. –  Vikas Oct 19 '12 at 14:58
@Vikas, sorry, I didn't get it. the array is unsorted and it could have negative elements. how can you find the x using two pointers? can you explain it in more detail in an answer? –  Kent Oct 19 '12 at 15:07

Since you have to calculate the sum of both the half of the array, this can't be solved in less than `O(n)`. Because you have to inspect each element at least once (to calculate the sum). Any algorithm can be `logn` only if we can skip inspecting certain elements of the array based on some condition which is not possible here.