Evaluation of some non-elementary integrals involving sine, cosine, exponential and logarithmic integrals: Part I

Abstract

The non-elementary integrals Siβ,α=∫ [(λ xβ)/(λ xα)] dx,β1,αβ+1 and Ciβ,α=∫ [(λ xβ)/(λ xα)] dx, β1, α2β+1, where \β,α\∈R, are evaluated in terms of the hypergeometric functions 1F2 and 2F3, and their asymptotic expressions for |x|1 are also derived. The integrals of the form ∫ [n(λ xβ)/(λ xα)] dx and ∫ [n(λ xβ)/(λ xα)] dx, where n is a positive integer, are expressed in terms Siβ,α and Ciβ,α, and then evaluated. Siβ,α and Ciβ,α are also evaluated in terms of the hypergeometric function 2F2. And so, the hypergeometric functions, 1F2 and 2F3, are expressed in terms of 2F2.The exponential integral Eiβ,α=∫ (eλ xβ/xα) dx where β1 and αβ+1 and the logarithmic integral Li=∫μx dt/t, μ>1 are also expressed in terms of 2F2, and their asymptotic expressions are investigated. It is found that for xμ, Li x/x+(xμ)-2-μ.075cm 2F2(1,1;2,2;μ), where the term (xμ)-2-μ.075cm 2F2(1,1;2,2;μ) is added to the known expression in mathematical literature Li x/x.