# Complexity of a code fragment

for(int i = 0; i < N; i++)
if(i < 2 || i > N - 3)
for(int j = 1; j <= 10N; j++)
a[i] = a[j - 1] / 2;

So the answer is N(1 + 10N(1)) = n + 10n^2 right? or is it n? Please explain.

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If you want an asymptotic upper bound... O(n^2). If you want to be pickier than that, we need to define computational weights for individual instructions.

Edit: Yeah, it's O(n). I read it wrong the first time.

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Really? Of the three answers, you chose the incorrect one to accept? I would have gone with Gumbo for being right and explaining why. –  PengOne Jul 19 '11 at 18:44
Oh well. Yeah, at first I completely read "2 < i < N - 3"... which isn't what the OP wanted at all. I agree that my original answer is incorrect and that your and gumbo's answers are correct. At least we have correct answers to the OP's question... hopefully, the OP will get the gist. –  Patrick87 Jul 19 '11 at 19:23

This looks O(N) to me.

The if statement is true for i = 0,1,N-1,N-2, which is a constant number of cases.

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^ correct answer –  tskuzzy Jul 19 '11 at 19:04

Your conclusion is wrong. Although the outer for loops N times, the if condition is only true in 4 cases (0, 1, N-2, N-1). So the total run time is rather N + 4·10·N that is in O(n).

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