On sums of powers of natural numbers

Abstract

The problem of finding the sum of a polynomial's values is considered. In particular, for any n≥ 3, the explicit formula for the sum of the nth powers of natural numbers Sn=Σx=1mxn is proved: Σx=1mxn=(-1)nm(m+1)(-12+Σi=2nai(m+2)(m+3)...(m+i)), here ai=1i+1Σk=1i(-1)kknk!(i-k)!, (i=2,3,...,n-1), an=(-1)nn+1. Note that this formula does not contain Bernoulli numbers.

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