摘要
利用Holder不等式和算术———几何均值不等式,研究了第42届国际数学奥林匹克竞赛的第2题的一个新的隔离推广,并给出了推广结论的应用。
In this paper, with the application of Holder inequality and arithmetic-geometric average inequality, a new segregation and generalization of the second question of No.42 International Mathematics Olympic is studied, and the application of the generalized conclusion are shown.