An extension of Lobachevsky formula

Abstract

In this paper we extend the Dirichlet integral formula of Lobachevsky. Let f(x) be a continuous function and satisfy in the π-periodic assumption f(x+π)=f(x), and f(π-x)=f(x), 0≤ x<∞ . If the integral ∫0∞ 4xx4f(x)dx defined in the sense of the improper Riemann integral, then we show the following equality ∫0∞ 4xx4f(x)dx=∫0π2 f(t)dt-23∫0π2 2tf(t)dt hence if we take f(x)=1, then we have ∫0∞ 4xx4dx=π3 Moreover, we give a method for computing ∫0∞ 2nxx2nf(x)dx for n∈ N