Introduction to postgraduate mathematics:
Mathematics postgraduate refers to the mathematics subject of postgraduate examination. According to the different requirements of different disciplines and majors for graduate students' mathematical knowledge and ability, the unified entrance examination papers for graduate students are divided into engineering mathematics ⅰ, mathematics ⅱ and economic management mathematics ⅲ, and the types of papers used in specific majors are specified.
Postgraduate entrance examination mathematics exam content:
Mathematics 1 includes advanced mathematics, linear algebra, probability theory and mathematical statistics; Mathematics II includes advanced mathematics and linear algebra; Mathematics III includes calculus, linear algebra, probability theory and mathematical statistics.
Math test skills for postgraduate entrance examination:
Mathematics problem-solving for postgraduate entrance examination mainly examines the comprehensive application ability, logical reasoning ability, spatial imagination ability and the ability to analyze and solve practical problems, including calculation problems, proof problems and application problems. The content is comprehensive, but some questions can be answered by elementary solution.
Teacher Li, the teaching and research section of cross-examination education mathematics, said that the thinking of solving problems is flexible and diverse, and sometimes the answer is not unique, which requires students not only to do the questions, but also to find out the test intention of the proposer and choose the most appropriate method to answer them.
Mathematics review skills for postgraduate entrance examination;
Attach importance to teaching materials:
The first step in math review is to read the textbook. When reviewing, I also saw that some students started from the tutorial book, but persisted for more than a month and had to return to the textbook, which not only wasted time, but also made them impetuous. Textbooks are the foundation and knowledge that must be paid attention to in mathematics review, so we must master and use them well.
When you have mastered the basic theorems, principles and formulas through the textbook, you should do the questions at the back of the textbook carefully, which is to test your mastery of the basics. When you encounter problems that you can't do or do wrong, you must really analyze and summarize them. It is better to prepare a wrong question book, which is far more important for later review than I thought.
Problem-solving training:
When the textbooks are reviewed to a certain extent, candidates should choose counseling books according to their own situation. And do the problem, and it's fierce. At this time, it is easier to handle. I will do 70% of the questions at the beginning. If not, don't just read the answer once. You must know yourself. Don't say, "I read about it in XXX's book, but I can't do it."