S_David
May14-09, 07:31 PM
Hello,
During my derivation, I am faced with the following integral:
\int_0^{\infty}x^A\,(x^2+x)^{B/2}\,e^{-Cx}\,K_{(B)}\left(2\,\alpha\,\sqrt{x^2+x}\right)\, dx
where A, B, and C are positive integers, K_{(B)} is the B^{th} order modified bessel function of the second kind. I am intending to find an equivalent integral in the table of integrals. Can anyone help me, please?
During my derivation, I am faced with the following integral:
\int_0^{\infty}x^A\,(x^2+x)^{B/2}\,e^{-Cx}\,K_{(B)}\left(2\,\alpha\,\sqrt{x^2+x}\right)\, dx
where A, B, and C are positive integers, K_{(B)} is the B^{th} order modified bessel function of the second kind. I am intending to find an equivalent integral in the table of integrals. Can anyone help me, please?