# For inputs of size n, for which values of n does insertion-sort beat merge-sort? [closed]

In the book Introduction to Algorithms (Corman), exercise 1.2-2 asks a the following question about comparing implementations of insertion sort and merge sort. For inputs of size n, insertion sort runs in 8n^2 steps while merge sort runs in 64n lg n steps; for which values of n does insertion sort beat merge sort?

Although I am interested in the answer, I am more interested in how to find the answer step by step (so that I can repeat the process to compare any two given algorithms if at all possible).

At first glance, this problem seems similar to something like finding the break even point in business-calculus, a class which I took more than 5 years ago, but I am not sure so any help would be appreciated.

Thank you

P/S If my tags are incorrect, this question is incorrectly categorized, or some other convention is being abused here please limit the chastising to a minimum, as this is my first time posting a question.

• The solution for `8n^2=64nlgn` is `n=44`. So for 43 or less elements use insertion sort, else use merge sort Commented Oct 16, 2014 at 6:12
• @arunmoezhi do the figures 8n^2 and 64nlogn actually hold? Or are they just hypothetical values for the problem statement? Commented Oct 16, 2014 at 6:24
• @zack problem stated those values. Commented Oct 16, 2014 at 6:25

Since you are to find when insertion sort beats merge sort

``````8n^2<=64nlogn
n^2<=8nlogn
n<=8logn
``````

On solving `n-8logn = 0` you get

``````n = 43.411
``````

So for `n<=43` insertion sort works better than merge sort.

• Thanks for the help, I couldn't up-vote you because I do not a rep of +15. Up votes anyone? ;) Commented Oct 17, 2014 at 7:37
• You can accept my answer by clicking on the green tick mark below the up votes. Commented Oct 17, 2014 at 7:54
• Thank you sir, by the way can you tell me what the base of the log is? Super new to the material, which I am studying on my free time all alone. Commented Oct 17, 2014 at 7:57
• To be honest I didn't get the ending completely, though I figured that was due to my forgetting nearly all of calculus (lol), so instead asking further about the math I reposted that portion of the question here and was told the answer is incorrect, and I quote "It is not true : 43.11 > 8*log(43.11) = 30.11." Any ideas here? Commented Oct 17, 2014 at 8:02
• It depends on the problem but in general The time complexity of merge sort is O(nlogn) and log base is 2. You can read about merge sort to understand why the base is 2. Commented Oct 17, 2014 at 8:02