Generalization of Bullen-Simpson's 3/8 inequality

In this work, a weighted generalization of Rado's inequality and Popoviciu's inequality is given, from which some valuable inequalities of Rado-Popoviciu type are derived. Moreover, the result is used to obtain refinements of weighted mean value inequalities.

In this paper we are concerned with the following conjecture. Conjecture: Let L be a collection of k positive integers and In particular, we show this conjecture is true when L consists of k consecutive positive integers. This generalizes a well-known inequality of Fisher's. Our proof simplifies an

Using the mathematical induction and Cauchy's mean-value theorem, for any , where n and m are natural numbers, k is a nonnegative integer. The lower bound is best w possible. This inequality generalizes the Alzer's inequality J. Math. Anal. Appl. 179 Ž . x 1993 , 396᎐402 . An open problem is prop