In the paper, by the Cauchy integral formula in the theory of complex functions, an integral representation for the reciprocal of the weighted geometric mean of many positive numbers is established. As a result, the reciprocal of the weighted geometric mean of many positive numbers is verified to be a Stieltjes function and, consequently, a (logarithmically) completely monotonic function. Finally, as applications of the integral representation, in the form of remarks, several integral formulas for a kind of improper integrals are derived, an alternative proof of the
famous inequality between the weighted arithmetic and geometric means is supplied, and two explicit formulas for the large Schröder numbers are discovered.

Mathematics Subject Classification (2010): Primary 30E20; Secondary 11Y55, 26E60, 44A15, 44A20.

Keywords: Integral representation, reciprocal, weighted geometric mean, Stieltjes function, completely monotonic function, logarithmically completely monotonic function, weighted arithmetic-geometric mean, Schröder number, explicit formula, improper integral, Cauchy integral formula