Two asymptotic expansions for gamma function developed by Windschitl's formula

Abstract

In this paper, we develop Windschitl's approximation formula for the gamma function to two asymptotic expansions by using a little known power series. In particular, for n∈ N with n≥ 4, we have equation* ( x+1) =2π x( xe) x( x 1x) x/2 ( Σk=3n-1( 2k( 2k-2) !-22k-1) B2k2k( 2k) !x2k-1 +Rn( x) ) equation* with equation* | Rn( x) | ≤ | B2n| 2n( 2n-1) 1x2n-1 equation* for all x>0, where B2n is the Bernoulli number. Moreover, we present some approximation formulas for gamma function related to Windschitl's approximation one, which have higher accuracy.