高考不等式综合题涉及的知识点多,解题方法灵活多变,它与函数、复数、三角、几何等有着密切的联系,常以中档题或压轴题出现,用来考查学生综合运用知识方法解决问题的能力,许多考生解题时出现入手容易,做到最后困难的僵局。因此探索不等式综合题的类型及解法,对备考复习是十分必要的。类型1 不等式与集合的综合某些点集的交集的求解问题,可转化为解不等式的问题,将含参数的问题放缩成不等式,使问题获解。 College entrance examination inequality problems involved more knowledge, problem-solving methods are flexible, it is closely related to the function, complex number, triangle, geometry, etc., often with a mid-range or final axis problems, used to examine the students’ comprehensive use of knowledge methods to solve The ability of the problem, many candidates find it easy to solve problems and achieve the last difficult deadlock. Therefore, exploring the types of inequalities and their solutions are necessary for the review of the inequality. The problem of solving the intersection of Type 1 inequalities and the set synthesis of some point sets can be transformed into the problem of solving inequalities. The problems with parameters can be reduced to inequalities to solve the problem.