Just need a confirmation on something real quick. If an algorithm takes n(n-1)/2 tests to run, is the big oh O(n^2)?


n(n-1)/2 expands to (n^2 -n) / 2, that is (n^2/2) - (n/2)

(n^2/2) and (n/2) are the two functions components, of which n^2/2 dominates. Therefore, we can ignore the - (n/2) part.

From n^2/2 you can safely remove the /2 part in asymptotic notation analysis.

This simplifies to n^2

Therefore yes, it is in O(n^2)


Yes, that is correct.

n(n-1)/2 expands to n^2/2 - n/2:

The linear term n/2 drops off because it's of lower order. This leaves n^2/2. The constant gets absorbed into the big-O, leaving n^2.

  • 1
    @Jay, you should accept the answer if you believe that is satisfies your question
    – user237076
    Nov 24 '11 at 20:21


n(n-1)/2 = (n2-n)/2 = O(n^2)

Yes, it is. n(n-1)/2 is (n^2 - n)/2, which is clearly smaller than c*n^2 for all n>=1 if you pick a c that's at least 1.

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