Rogers-Ramanujan continued fraction and approximations to 2π

Abstract

We observe that certain famous evaluations of the Rogers-Ramanujan continued fraction R(q) are close to 2π-6 and (2π-6)/2π, and that 2π-6 can be expressed by a Rogers-Ramanujan continued fraction in which q is very nearly equal to R5(e-2π). The value of -5 α R(e-2α π) converges to 2π as α increases. For α=5n, a modular equation by Ramanujan provides recursive closed-form expressions that approximate the value of 2π, the number of correct digits increasing by a factor of five each time n increases by one. If we forgo closed-form expressions, a modular equation by Rogers allows numerical iterations that converge still faster to 2π, each iteration increasing the number of correct digits by a multiple of eleven.