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The solution of the recurrence relation T(n) = 2T(n/2) + O(n^2) is given as Big theta of n^2.

How do we get this solution.

The way I solved it :- the height of the recurrence tree is logn. And we have at each step n^2 complexity. SO recurrence relation is O(n^2 logn).

How do we get answer in Big theta in this case?

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You can refer to "Master Theorem".

Your problem falls into Case 3 of the theorem, so according to its conclusion, the complexity is Θ(n^2).

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So is it also equal to O(n^2logn) ? – Ravindra Oct 29 '13 at 10:45
    
@user2753551 It is O(n^2logn), but not Θ(n^2logn). The big theta defines a more accurate complexity, while big o defines something like an upper bound. – yzn-pku Oct 29 '13 at 10:50

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