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I would just like to prove the following: Show that 1^k + 2^k+...+n^k is O(n^(k+1)) for every positive integer k

I am not sure how to go about it. Normally when I am proving a function is big O of another function I find constants c,k such that f(x)<=cg(x) for all x>k. I don't think that this approach would work in the above example.

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up vote 1 down vote accepted
 1^k + 2^k+...+n^k <= n^k + n^k + .... + n^k = n * n^k = n^(k+1) 
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