By means of majorized inequalities and mathematical induction, the well known Chebyshev s inequality is generalized to homogeneous and symmetric polynomials of degree m (e.

By introducing the weight function and multi-parameters and using the way and the technioue of real analysis,we give a Hilbert-type integral inequality with the homogeneous kernel of 0-order.

By using the way of real analysis and estimating the weight coefficient,this paper introduces a parameter α≥-3/4+(((21)~(1/2))/12) and gives a more accurate extension of a Hilbert-type inequality with the homogeneous kernel of positive-degree with a best constant factor.