First of all, I think the math review for postgraduate entrance examination is divided into three steps, namely, textbooks, review books and real exercises.

Textbooks and books should be familiar with basic knowledge points, have a deep grasp of conceptual formulas, and have a certain foundation for doing problems. Therefore, when reading a book, you must have supporting teaching materials and counseling books, and be prepared to buy detailed explanations of after-school exercises and extended information books for postgraduate entrance examination. After-class exercises are necessary, because some test sites are in after-class exercises, for example, the oblique progressive line test site is in the last line of the first chapter of the sixth edition of advanced mathematics in Tongji University 14.

The tutorial handout you mentioned should be the second largest in the review encyclopedia. Generally, the second largest is selected from Li Yongle's review encyclopedia and Chen Wendeng's high score guide. It is necessary to match some other tutorial handouts. For example, Li Yongle's review notes on linear algebra are the best in linear algebra. Of course, Li Yongle's 160 and 65438 can go in the middle.

Third, before practicing a lot, I think you should do a real problem and analyze it carefully. The real question is the most authoritative exam outline, and it is also the standard for you to choose exercises and do simulation questions in the future.

There are three steps, that is, books, from books to review daquan, from review daquan to real questions and doing them. These three steps are not only the transformation of form, but also the transformation of ability, that is, at each step, you must achieve a certain ability, and finally you can do it, and then you can roughly guess his questions and make them.