A Simple Proof of the Quintuple Product Identity
A Simple Proof of the Quintuple Product Identity
We show here that the important Watson-Gordon five product combinatorial identity can, in fact, be deduced as a very simple and natural corollary to the classical Jacobi triple product identity.(2-1) _ y n(3n+l)/f3n _ (-3n-l\ n Let A(s, t) denote JJ (1-sin) times the left number of (2.1).Applying