# efficiency of the closest pair algorithm

In T(n) = 2T(n/2) + M(n), where does the 2 in front of T come from. n/2 because it is dividing, and M(n) is linear, but I can't figure out what the 2 is for?

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2, because you are performing the operation on the two subsets. See the master theorem.

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+1 for the master theorem –  Andrew Apr 25 '11 at 16:17

The recurrence relation is similar to what you get in Merge Sort. The time complexity would be O(n log n)

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So is the two because you are working with two arrays? –  Aaron Apr 25 '11 at 16:12
The 2 is because you are working on two subproblems of equal size i.e `n/2` –  Prasoon Saurav Apr 25 '11 at 16:14

This says that the time cost of the problem of size n comes from dividing the problem in half (i.e., T(n/2)) and solving it for both halves (2 T(n/2)) plus some fix-up cost (i.e., M(n)).

So, the 2 is because you divide the problem in half and solve both halves.

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The 2 represents how many times you're going to call the recurring function.

For example, if you had a tree that had 4 children, you would expect a 4 for that value. In this case, you're recurring twice.

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