Another elementary proof of \: Σn 11/n2 = π2/6\, and a recurrence formula for \,ζ(2k)

Abstract

In this shortnote, a series expansion technique introduced recently by Dancs and He for generating Euler-type formulae for odd zeta values \:ζ(2 k +1), ζ(s) being the Riemann zeta function and k a positive integer, is modified in a manner to furnish the even zeta values ζ(2k). As a result, I find an elementary proof of Σn=1∞1/n2 = π2/6, as well as a recurrence formula for ζ(2k) from which it follows that the ratio ζ(2k) / π2k is a rational number, without making use of Euler's formula and Bernoulli numbers.