A new trigonometric identity with applications
Abstract
In this paper we obtain a new curious identity involving trigonometric functions. Namely, for any positive odd integer n we prove that Σk=1n(-1)k( kx) k(n-k)x=1-n2, which is equivalent to the identity Σk=1n(-1)kUn-k( kx)=-n+12, where Um(z) stands for the mth Chebyshev polynomial of the second kind. As a consequence, for any positive odd integer n and positive integer m we obtain Σk=1n(-1)kk2mB2m+1(n-k2)=0, where Bj(x) denotes the Bernoulli polynomial of degree j.
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