Mathematics outline for postgraduate entrance examination is an important basis for postgraduate entrance examination proposition. Referring to the mathematics syllabus of the postgraduate entrance examination over the years, there is basically no change, so the test paper structure and test paper type are basically unchanged. Combined with the mathematical proposition law of postgraduate entrance examination in recent years, the teacher analyzed the mathematical proposition law of postgraduate entrance examination in 20 17 subjects: 1. Advanced mathematics.

Advanced mathematics is the highlight of postgraduate mathematics, accounting for a large number of scores, up to 56%. It can be said that "those who get high scores get postgraduate entrance examination". Higher mathematics is more flexible. Candidates should be very proficient in knowledge points and important questions, but also improve their computing ability, so as to win steadily. The common questions in the exam include finding the limit of a function, finding the extreme value and maximum value of a function (unitary and binary), finding the derivative of a function, finding indefinite and definite integrals, double integrals (number two, number three), triple integrals (number one), sum functions of infinite series (number two, number three), solving ordinary differential equations, and proving differential mean value theorems and inequalities. At the same time, the distinction of advanced mathematics is relatively large, and some difficult topics are often tested. For most candidates, the proof question is the weakest. When reviewing, we must pay attention to proof questions, be good at summarizing proof methods and strengthen training.

Second, linear algebra.

Compared with advanced mathematics, linear algebra is relatively simple. If you want to get high marks in the postgraduate entrance examination, the online generation must not lose points. Linear algebra often examines comprehensive topics. Combined with the propositional laws in recent years, linear algebra examines two major topics, one is about the correlation between vector groups and linear equations, and the other is about eigenvalues, eigenvectors and quadratic forms. Therefore, candidates must be familiar with these knowledge points and be able to achieve mastery.

Third, probability theory.

Probability theory, similar to linear algebra, is a relatively easy topic to score in postgraduate mathematics. The topic of probability theory has become stable, so it is not difficult to pay attention to the examination methods. In the exam, you can't lose points on big questions. Combined with the propositional law in recent 10 years, probability theory also investigates two big problems, one is about random variables, and the other is about numerical characteristics and parameter estimation. Candidates should be very familiar with these knowledge points, master the methods of solving these problems, and work hard to do it. When they see these problems, they feel relaxed and relaxed, which is regarded as a sub-problem.