Proof of a Conjecture of Z.-W. Sun on Trigonometric Series
Abstract
Recently, Z. W. Sun introduced a sequence (Sn)n≥ 0, where Sn=6n3n 3nn2(2n+1)2nn, and found one congruence and two convergent series on Sn by Mathematica. Furthermore, he proposed some related conjectures. In this paper, we first give analytic proofs of his two convergent series and then confirm one of his conjectures by invoking series expansions of (t(x)) and (t(x)).
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