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Preface: This is not a homework question. I'm going through an algos book in python.

If I have the following code to solve an anagram.

 Public bool anagram (string a, string b) {
     return sort(a) == sort(b);
}

Let's say the sorting Algo is merge sort which is O(n log n). Since I have to do it twice does the time complexity become O(n^2 log n) ?

Thanks!

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2 Answers 2

up vote 2 down vote accepted

No, since you need to do it a constant number of times, the complexity remains O(n log n).

Note that there is one more operation that you need to perform - namely, comparing strings. However, it's O(n), and O(n + n log n) remains O(n log n).

Also note that your n is "underdefined": you should say that n is max(a.length, b.length)

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no, it becomes O(2*[n log n]), but it's the same as O(n log n)

still, you have to compare the two sorted strings, which is linear in the length, so it becomes O(n + n log n), which is again in nlogn

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