I want to implement a modification to merge sort, where n/k sublists of length k are sorted using insertion sort and then merged using the standard merging mechanism of merg sort. I'm wondering what the value k has to equal for the modified version of merge sort to equal the original version of merge sort in terms of rum time complexity. This is a conceptual exercise by myself for myself. Code and or an explanation is appreciated.
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Your n/kway merge is O(n^2/k) (explanation here). Each of your individual insertion sorts are O(k^2). Observe that for any value of k, your overall running complexity will remain O(n^2); therefore, no value of k will allow your modified merge sort to be O(nlogn) 

