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How to review the high score of mathematics in junior postgraduate entrance examination
From February to April, read the textbook again to make sure that there is no problem in basic application, and understand the types of questions in each chapter and their relationship.

From May to July, read the review books and the real questions in previous years' exams again, first chapter by chapter, and summarize the easy questions and solving methods in each chapter. You have to do real questions over the years, so be careful! ! It's best to do all the review guides well (in fact, you can see from the real questions over the years that mathematics has rules to follow, and I will introduce you to basic reference books later, all of which are very good and are the essence I have selected from many books)

65438+ 10 From August to June, be sure to read the wrong questions twice before, so that you can know where you are wrong, make sure you won't be wrong when you read them again, and then do targeted exercises according to your own weaknesses. Don't do the whole exercise, just pick some chapters that you are not good at.

1 1 ~ 65438+ February, just make sure you can do a set of simulation questions every two days, not much, just do a few sets. These stages can be arranged appropriately according to their own situation. In fact, time is very relaxed, not very crowded. Just read math every morning and English in the afternoon.

The last two months are the simulation stage of mathematics and English. In fact, there is no need to do a lot of simulation, because there is no simulation paper on the market that is particularly close to the difficulty of the real question. I just adapt myself to the examination procedure and mentality. Just look at the political and professional classes in the last two months. And there is a lot of knowledge in the examination of professional courses. Hehe, if you want to do well in the exam, you can ask me and I'll tell you something ~ ~ Here are some basic reference books for you: Math was bought from Li Yongle and Chen Wendeng, but it's better than Li Yongle's. He has a thick review book with all the contents to review. I think this book is very good and comprehensive, summarizing the skills and types of problems, and mathematics must be true. There is a real question from China Renmin University, and this one is also better. It classifies the real questions over the years according to chapters and questions, which is easier to explain. There are also chapters to practice putting one of the best related questions in, because sometimes the real questions are the previous questions. For example, if you take the top spot in the exam, you may encounter the questions you have taken before. At the back of this book are the real questions of the past years arranged by year. Linearity is Li Yongle's lecture on linear algebra. This book is well written, but I suggest that you'd better go to his lecture, so the combination effect will be better. It's just that reading will be time-consuming and not easy to understand. I just signed up for class, but I just feel that the linearity is good, and everything else is average. You can search online and you should find his video courseware. If you have studied literature before, I suggest you read the books for school lectures first, and then Tongji. You may not understand them at once, but it won't take too long, so the foundation is good and thorough. Actually, mathematics is more basic. Although some problems may use simple algorithms, they will be solved on a solid foundation. There are 660 questions in the exercise book, which are recommended by my classmates, but I didn't do it, because there are many questions in the above two books, and there are two simulation questions, namely, the simulation examination room in Chen Wendeng 15 set and the 400 questions in the full-truth simulation classic in Li Yongle. Li Yongle's is more difficult than the real question, and Chen Wendeng's is similar to the real question. This can be compared by yourself. In fact, I only reviewed the whole math book and real questions, but my foundation is very good, so I think this year's math exam is very simple. Mathematics is not just doing more, it is better to watch it again and again, but it is not necessary to do more. You'd better know one thing when you can do it, especially when you have done real questions over the years. There is no set of questions closer to the difficulty of the exam than the real questions over the years. You can summarize the rules by completing them in chapters. I wish you success in the exam.

Calculus is difficult, as long as you look at it from the basics. My situation is similar to yours. This is the way to review. Basically, calculus answers more than 90%, and all the answers are linear, and the probability will be half. The most difficult to compare the three should be probability. This can't be helped, it's really difficult to solve. I only read the first two chapters of probability, because the first two chapters will account for a small part of probability, and then I understand the basis of the following chapters, and I can write some big questions. Although linearity is tedious, it is easy to find skills and learn. In advanced mathematics, I read all my textbooks first. Then I picked out the problems in the book and did some familiar work first. Then read review books and real questions over the years. It is impossible not to read a thick book. After all, there are three books together with exercises. The reviewed books are very good, and the previous knowledge is particularly comprehensive and organized. There are also the real questions I said about exams over the years, which are divided into chapters. Read the book again, you can read a review book and do a real chapter. This is more solid, and it is easier to sum up the rules of doing problems. Many questions in the review book are also true questions over the years, so although they are thick, they can also be omitted. Moreover, if you do the real questions chapter by chapter, you will find that some chapters of calculus and probability are particularly difficult. In fact, there are not many exams involved, some of them are in the exam syllabus, but they have not passed the exam ~ ~ Don't worry, maybe you are confused now. Learn first and get into the state slowly, and you will find it less difficult. When you wait for the exam, you will know that you have actually encountered many problems ~ ~

In the postgraduate mathematics, line generation is the simplest, and this part of the score must be taken to death. The textbook recommends that you use Tongji's.

Probability is more difficult. In this part, the requirements of number three are higher than those of number one, so pay attention to it. The textbook is from Zhejiang University.

There is no doubt that high numbers are the most difficult, and we must work hard in this part. If you can review the high numbers well, it's still no problem to count to three to one two three.

Specific counseling materials recommend that you use Erli's, do it two or three times, and then make good use of the real questions, and there will be no problem.

Also, remind you that calculation is also very important. I calculated a lot of questions in the exam, so I usually strengthen my calculation.