Relation (3) yields Vieta’s product (1) as the limiting case as p goes to infinity, and the Wallis’s product (2) as the case p=0. For each intermediate value of p = 1, 2, 3, ... we obtain “united Vieta-Wallis-like products”:
Relation (3) yields Vieta’s product (1) as the limiting case as p goes to infinity,and the Wallis’s product (2) as the case p=0. For each intermediate value of p = 1, 2, 3,... we obtain “united Vieta-Wallis-like products”: