In your opinion, how should you review for the graduate school entrance examination mathematics 3

Do more questions, do more questions, do more questions, Math 3 is a process where practice makes perfect.

First of all, you need to have a general understanding of your mathematical foundation in order to determine what level of textbook you are starting to use. As far as I'm concerned, college math hovers around 70 points, and everyone knows that college math is relatively simple, as long as there are no big mistakes, you can still get by with your hard work at the end of the semester. But I still hovered at 70 points despite my hard work, which was enough in college.

Hello classmates, according to their own situation. Make a plan. Most of the students in the training course are suitable for the four-round review method, and the self-study method generally adopts the three-round or two-round review method. A good round of revision is more effective.

As a mathematics teacher with ten years of experience, I hope that I will be helpful to you.

Personal test,The effect of watching the **class is not as effective as reading the textbook and reviewing the whole book carefully,I think**class can only be used as an auxiliary,It is impossible to have an effect if you don't read the textbook and don't review the whole book。 You can look at the corresponding lesson time for what you don't understand, and it is extremely unwise to see ** from beginning to end.

There is no good way to do mathematics, just do more problems, don't deviate from the textbook, focus on the basics, understand the basic concepts, and that's it.

12 years of postgraduate mathematics 145 points, there is no special trick, in addition to the knowledge points in the textbook are clear, it is to gnaw Li Yongle 3 times, the first time to gnaw word by word, the second time to pick the key points, the third time to gnaw on his previous mistakes and problems.

To be honest, you can't listen to other people's opinions in the review of mathematics and other subjects, because the foundation of those high scores in the exam is not bad, and you can only know whether you can apply it in your own situation. However, there are still some general experiences, for example, according to the outline to know the knowledge points in your heart, Li Yongle basic review, and then the past questions are done thoroughly, as for other reference books, it can only be said that according to your needs, just a reference, and there is only one purpose from beginning to end - to understand the basic knowledge points thoroughly.

Don't buy too many mock questions, it's generally enough to do two copies, you can do Zhang Yu's, the questions are novel and the difficulty is not small; Li Yongle's 6+2 is relatively easy, and Tang Jiafeng's last 8 sets of volumes are decent, suitable for finding confidence; "400 Questions" can't be said to be just about difficulty, I finished it last year, and I think some of the questions are very good, of course, some questions are very biased, just grasp it yourself. I can't do Chen Wendeng's mock test papers after I do a few sets, I don't particularly like it, and I can't say it's bad, it feels weird, mainly because it's not the way to count three. In short, don't do too much mock questions, do them strictly, and do them completely and then answer them.

Take notes frequently, return to textbooks and whole books, and check and fill in gaps in a timely manner. ‍‍

I've finished reading the high math textbook so far, of course, I've done the after-class exercises before, so I didn't do the after-class exercises this time, but I think that if your foundation is not solid and your calculation skills are not strong, it's best to do the after-class exercises, especially the integral part, the after-class exercises are quite good. After all, in chapters like points, a large number of calculations are not achieved overnight, and you must do the questions in a down-to-earth manner, do the questions well, and do enough to reach the ideal level, the so-called ideal level is to go to the examination room and can be calculated quickly and accurately. Fast, accurate, easy to say, not easy to do.

14 years of the number three of the double integral calculation problem, many people did not make it or miscalculated, this is the reason for the poor calculation skills, I hope the younger students pay attention. ‍‍

The most important thing is the textbook of the three subjects. The high number of the 6th edition of Tongji, the thin book of linear algebra in the Tongji edition and the probability theory and mathematical statistics edited by the sheng of Zhejiang University. Generally, many schools are willing to use the probability theory textbooks compiled by their own schools, but this kind of textbooks generally do not have answers to analyze, which is more difficult.

Therefore, with the use of general textbooks, there are many common topics among researchers, and it is easy to discuss problems even if they have problems.

If the foundation is average, it will be a little difficult to read the textbooks, first read the seventh edition of advanced mathematics of Tongji University, the sixth edition of linear algebra of Tongji University, and the probability theory of Zhejiang University, these are very classic books, you can buy matching after-class exercises, of course, you can buy second-hand books.

The content of the Mathematics III Postgraduate Examination is as follows:

Calculus: Functions, Limits, Continuous, Unary Calculus, Calculus of Multivariate Functions, Infinite Series, Ordinary Differential Equations, and Difference Equations.

Linear algebra: determinants, matrices, vectors, systems of linear equations, eigenvalues and eigenvectors of matrices, quadratic forms.

Probability Theory and Mathematical Statistics: Random Events and Probability, Random Variables and Their Probability Distributions, Joint Probability Distributions of Random Variables, Numerical Characteristics of Random Variables, Law of Large Numbers and the Central Limit Theorem, Basic Concepts of Mathematical Statistics, Parameter Estimation, Hypothesis Testing.

You need to take the major of Mathematics III

All the second-level disciplines and majors in the first-level discipline of theoretical economics in the category of economics.

The second-level disciplines and majors in the first-level disciplines of applied economics in the economic category: statistics, quantitative economics, national economics, regional economics, public finance (including taxation), finance (including insurance), industrial economics, international science, labor economics, and national defense economy.

The second-level disciplines and majors in the first-level disciplines of business administration in the category of management: business management (including financial management, marketing, human resource management), technical economics and management, accounting, and tourism management.

All the second-level disciplines and majors in the first-level discipline of agriculture and forestry economic management in the category of management.

The main content of the Mathematics 3 postgraduate examination includes probability theory, statistics, linear algebra and other knowledge points.

1.Probability theory.

Probability theory is an important branch of mathematical excitation, which solves the problem of the probability of random events, while the probability theory in Mathematics 3 mainly examines the basic concepts of discrete and continuous random variables and their functions, such as distribution, independence, and random processes.

2.Statistics.

Statistics is a discipline that emphasizes both theory and practice, which uses mathematical methods to study patterns and relationships between random data, and guides people to make decisions by repeating the analysis and inference of these data. In the Mathematics 3 postgraduate examination, statistics mainly examines basic statistics, common distributions, hypothesis testing, analysis of variance, etc.

3.Linear algebra.

Linear algebra is an important branch of modern mathematics, which mainly studies vector spaces and the linear mappings on them, and it is a key tool and language in mathematics and its applications. In Mathematics 3, linear algebra mainly examines the basic theory of linear equations, the basic properties of matrices, the operation of matrices, eigenvalues and eigenvectors, and other basic knowledge.

In short, the Mathematics 3 postgraduate entrance examination mainly examines the basic mathematical theories such as probability theory, statistics and linear algebra.