Supplement: Hello, I suggest you take Li Yongle's review book and do his basic 660 questions, as well as simulation questions and some real questions. At that time, I got the first place in the exam. I think Li Yongle did well in the exam. His is better and more complete. Then review according to the standard of ranking first. Of course, probability theory does not need to be reviewed. Just to be safe!

The high number A of NTU is an independent proposition, and the difficulty is probably between the number one and the number two. Some of the real questions have passed the line generation for several years, but the line generation is 20 10. I suggest reviewing some by the way. Fan Yingchuan's "Advanced Mathematics Lecture Notes" specified in the admissions brochure need not be read. They are all textbooks from the 1980 s, which are hard to find. I just read Tongji's advanced mathematics. The chapter of vector and analytic geometry of space has not been asked, and you can also take it as the content that is not tested. The other range is close to the high number part of the number one. Therefore, I suggest that at the beginning of the review, you can review according to one of the best high numbers and use one of the best review guides in Li Yongle. I once bought the review guide No.2 for the sake of cheapness, and later I have to go back and review a few missing chapters. Read this book at least twice, carefully summarize and take notes, and thoroughly understand the examples in it. Given enough time, this process can be completed within two months. If time is tight, it is ok to speed up the progress for about 40 days. After that, you should be able to store thick books in your notes. Good methods and good problem-solving routines can be reflected in your notes. Then I began to do the real problem. If there is no answer to the real question, I will do it again and again by myself. If there is a problem, I will discuss it with my classmates. I will learn from others and classify the real questions according to the knowledge points. This order is conducive to eliminating knowledge blind spots.

It is not difficult to get a high A, but it is more difficult to get a high score, because all the questions are subjective, and a fill-in-the-blank question is 8 points. As long as the answer is correct, no matter how good the foundation is, it can't be sloppy. Therefore, we must have enough accuracy at ordinary times. In addition, the amount of real questions is not very large, and it should be finished in two hours. Still have to leave an hour to recalculate, and grasp the problem is not very big. Generally speaking, math and specialized courses are the key to scoring. If you can get more than 138 in mathematics, this advantage cannot be shaken, but you must be steady and steady.