First of all, if you want to get high marks in mathematics, you have to lay a good foundation. There are 23 topics in mathematics for postgraduate entrance examination, 70% of which are basic topics, including basic concepts, basic theories and basic methods. At this stage, Mr. Tang's 20 17 "Review of Mathematics for Postgraduate Entrance Examination-Mathematics I" is a comprehensive and systematic review. In addition, mathematics still needs to be done, and it should be strengthened and improved by using "relay problem of mathematics for postgraduate entrance examination-1800". Secondly, we should master methods and skills, pay attention to induction and summary, and not just do topics. After you finish the problem, you must understand the problem-solving ideas and summarize the methods and skills used in the problem-solving process. We can focus on the following methods: "Simplified Solution of Objective Problems in Postgraduate Mathematics" and "Summary of Methods and Skills of Solving Problems in Postgraduate Mathematics"; In addition, the real questions are naturally indispensable, and it is very important to understand the real questions thoroughly. I suggest that you do 20 17 "Mathematics for Postgraduate Entrance Examination 15 Real Question Analysis and Method Guidance" twice to summarize the examination rules and review experience. In the sprint stage, it is very good to maintain a good sense of questions and use Tang Shen 20 17 "The Last Eight Sets of Questions in the Absolute Examination Room for Postgraduate Mathematics" for sprint promotion.

These books are math, one, two and three.