Mathematics outline for postgraduate entrance examination refers to the form of introducing the requirements, time, scores, subjects to be tested and key contents of the examination. Suitable for engineering and other categories.
Formal structure
1, full marks in the test paper, and the test time.
The full mark of the test paper is 150, and the test time is 180 minutes.
Step 2 Answer method
The answer methods are closed book and written test.
3. Test paper content structure
Advanced mathematics 56%
Linear algebra 22%
Probability theory and mathematical statistics 22%
4. The structure of the test paper.
The question structure of the test paper is:
Multiple choice questions 10 small questions, with 5 points for each question and 50 points for * * *.
Fill in the blanks with 6 small questions, with 5 points for each question and * * 30 points.
Answer (including proof questions) 6 small questions, ***70 points.
Advanced mathematics
Function limit continuity
1. Understand the concept of function and master the expression of function, and you will establish the functional relationship of application problems.
2. Understand the boundedness, monotonicity, periodicity and parity of functions.
3. Understand the concepts of compound function and piecewise function, inverse function and implicit function.
4. Grasp the nature and graphics of basic elementary functions and understand the concept of elementary functions.
5. Understand the concept of limit, the concepts of left limit and right limit of function and the relationship between the existence of function limit and left limit and right limit.
6. Master the nature of limit and four algorithms.
7. Master two criteria for the existence of limit, and use them to find the limit, and master the method of using two important limits to find the limit.
8. Understand the concepts of infinitesimal and infinitesimal, master the comparison method of infinitesimal, and find the limit with equivalent infinitesimal.
9. Understanding the concept of function continuity (including left continuity and right continuity) will distinguish the types of function discontinuity points.
10. Understand the properties of continuous function and continuity of elementary function, understand the properties of continuous function on closed interval (boundedness, maximum theorem, mean value theorem), and apply these properties.