1. Let's talk about the review process first (I only used the whole series of Li Yongle, 4 books)?
I spent the whole summer reading 1.5 times textbooks+review books (really inefficient ~ ~). After school started in September, I spent the whole morning reviewing math. While reading the review book, I wrote down all the questions that I thought I could get into the exam but couldn't do, and I will read them soon. ?
5438+ 10 read the review book three times in the middle of October, and then began to read the real problem analysis. What I want to say is that the most classic book in Li Yongle series is the classification and analysis of real questions, and the comments behind each real question are really classic. Remember to look at the Gauss formula part of multivariate function integral calculus. Lao Li said in his comments that this type of problem has not been tested so far. This sentence caught my attention, so I seriously thought about how to solve this problem. As a result, this year's high number finale is such a problem ... _?
Let's talk about "classic 400 questions" first, which is actually 10 set of simulation questions. It took me about a month to do it twice, and I will feel strategically placed after finishing it carefully, but students who have no time can not watch it. The key to mathematics is to pay close attention to the basic problems, and I am afraid that the difficult problems will not be done correctly. ?
Finally, it is "beyond 135". Don't be frightened by its name. In fact, there are still some basic topics in it, which are divided into 70 or 80 topics. The difficulty is close to the real question, and some of the questions in it are highly recommended, especially the hot topic every year (such as curve and surface integral). ?
2. Tell me more about my review experience?
Mathematics must lay a good foundation (by what? Read the review book at least twice! Really understand and understand the core chapters in the book! Form the knowledge framework of each chapter! Namely: What is this chapter? What kind of questions will be given? )?
Mathematics must be good at summarizing (how to summarize? What is the method of solving each question type and which method to use under what conditions must be summarized and memorized. For example: when to use cylindrical coordinate transformation? When to use polar coordinate transformation? Under what circumstances do you use spherical coordinate transformation? )?
Mathematics must repeatedly study familiar but wrong questions (because these questions are the key to your score, if you have really experienced the tense atmosphere in the postgraduate entrance examination room, you will fully understand why I emphasize this point so much. )?
Mathematics must practice the speed and accuracy of doing problems under high pressure (because time is tight and pressure is high in the examination room, and you must trust the level of proposition experts in the Ministry of Education, who will definitely get you stuck in a certain problem. If a problem takes 5 minutes to work out, do you want to keep thinking or do the next one directly? Under what circumstances do you continue to think? When to skip this question? What if this happens in two or three consecutive lanes? If you don't practice at ordinary times, you will become more and more anxious when you arrive at the examination room, and then you will have a mental breakdown. The lessons of the students around us have fully proved this point. I suggest you start to do "400 questions", do it strictly every morning, don't go to the toilet in the middle, and try to create an atmosphere in the examination room. ?
Mathematics must be practiced every day, and it's easy to get rusty if you don't practice for a day, even if the last time is tight (I suffered a lot this year, in fact, I reviewed well before last month. When you are lucky, you can get a score of 1 10 on the "400 questions", which is generally around 95 ~ 100, while the professional courses were progressing at that time. As a result, in the examination room, I found myself unfamiliar, and several questions stuck me several times. There was not enough time, and then my brain was short-circuited ... and I lost 15 points in vain. Comrades, you must learn my lesson! ! ! ?
Math must predict the test questions before the exam (I spent a night sorting out the test sites of each question in the 12 real question, and then compared it, hehe, is it very regular? Believe it or not, I have predicted at least six test sites for the nine major math problems this year.
3. The highest realm of mathematics for postgraduate entrance examination: (Comrades admitted to famous schools must not be too far away from this realm, otherwise ...)?
When you see a problem when doing a problem, you can quickly lock in the solution method, determine the correct solution idea, and quickly calculate the correct result!