The Second Outline of Mathematics for Postgraduate Entrance Examination is a book published by Higher Education Press on 20 13. The author is the editorial board of the national unified postgraduate counseling book. This book is an analysis of the second national unified postgraduate entrance examination outline for mathematics. It is applicable to all the secondary mathematics entrance exams after 20 13, and the outline will not be changed.
Form and structure:
(1) Full marks of test papers and test time
1. The full mark of the test paper is 150.
2. Examination time 180 minutes.
(2) the way to answer questions
1. The answer is closed.
2. written test
(C) the content structure of the test paper
1. Advanced Mathematics 80%
2. Linear Algebra 20%
(D) the structure of the test questions
The question structure of the test paper is:
1. Multiple choice questions 10 small questions, with 5 points for each question and 50 points for * * *.
2.6 fill in the blanks with small questions, with 5 points for each question and * * 30 points.
3. Answer 6 small questions (including proof questions), with 70 points.
Examination content
The concepts and representations of boundedness, monotonicity, periodicity and parity of functions, the properties of composite functions, inverse functions, piecewise functions and implicit functions, the establishment of functional relationships of graphic elementary functions, the definitions of sequence limits and function limits, left limits and right limits of property functions, the concepts and relationships between infinitesimal and infinitesimal, and the four operations of infinitesimal comparison limits?
Two criteria for the existence of limit: monotone bounded criterion and pinch criterion;
Concept of Function Continuity Types of Discontinuous Points of Functions Continuity of Elementary Functions Properties of Continuous Functions on Closed Interval
Examination requirements
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.