Evaluation of the non-elementary integral ∫ eλ xα dx, α2, and other related integrals

Abstract

A formula for the non-elementary integral ∫ eλ xα dx where α is real and greater or equal two, is obtained in terms of the confluent hypergeometric function 1F1. This result is verified by directly evaluating the area under the Gaussian Bell curve, corresponding to α = 2, using the asymptotic expression for the confluent hypergeometric function and the Fundamental Theorem of Calculus (FTC). Two different but equivalent expressions, one in terms of the confluent hypergeometric function 1F1 and another one in terms of the hypergeometric function 1F2, are obtained for each of these integrals, ∫ (λ xα)dx, ∫ (λ xα)dx, ∫ (λ xα)dx and ∫ (λ xα)dx, λ∈ C, α2. And the hypergeometric function 1F2 is expressed in terms of the confluent hypergeometric function 1F1. Some of the applications of the non-elementary integral ∫ eλ xαdx,α2 such as the Gaussian distribution and the Maxwell-Bortsman distribution are given.