Optimal bounds for the Neuman-Sandor means in terms of geometric and contra-harmonic means

Abstract

In this article, we prove that the double inequality α G(a,b)+(1-α)C(a,b)<M(a,b)<β G(a,b)+(1-β)C(a,b) holds true for all a,b>0 with a≠ b if and only if α≥ 5/9 and β≤ 1-1/[2(1+2)]=0.4327..., where G(a,b),C(a,b) and M(a,b) are respectively the geometric, contra-harmonic and Neuman-S\'andor means of a and b.