Ask a New Question

the gamma function r(x) is defined by r(x)= integral from 0 to infinity of x^n-1(e^-1)dx where n>0. Use integration by parts to show that r(n+1)=nr(n).

Ask a New Question or answer this question.

Similar Questions

the gamma function r(x) is defined by r(x)= integral from 0 to infinity of x^n-1(e^-1)dx. find r(1), r(2), r(3)
1. 1 answer
The Gamma distribution Gamma(𝛼,𝛽) with paramters 𝛼>0 , and 𝛽>0 is defined by the density𝑓𝛼,𝛽(𝑥)=𝛽𝛼
1. 6 answers
Find a function f(x), perhaps a piecewise function that is defined but not continuous on (-infinity, infinity) for which the
1. 5 answers
how do you determine the convergence of :definite integral from 1--> infinity of lnx/(x^3)? i set the problem as lim
1. 6 answers

more similar questions