Question 2: What are the mathematics courses for graduate students? Engineering mathematics course:
Matrix theory and matrix analysis
Applied mathematical statistics
numerical analysis
Question 3: What are the postgraduate courses for mathematics majors? Postgraduates majoring in mathematics generally do not take advanced mathematics (generally one, two or three), but are specialized basic courses. Usually it is mathematical analysis and high arc mathematics.
Advanced algebra and mathematical analysis in Zhejiang University. The difficulty of the topic is simpler than that of Zhejiang University. However, there are many applicants every year, so the score is still very high, with an average of 340 points before entering the second interview.
Compared with Zhejiang University, the number of applicants is relatively small, and the annual score is not too high. An average of 365,438+00 points can enter the second interview. In some years, the first choice is not satisfied, and you have to transfer to other schools. But interestingly, every year, transfer students prefer engineering transfer students who have won the top prize, rather than mathematics majors.
There are also some special professional courses to hand in: there is an algebra volume: the basic knowledge of advanced algebra and abstract algebra is tested; Analysis volume: test the basic knowledge of mathematical analysis and real variable function. The so-called basic knowledge means that the topic is very basic and not too difficult (for mathematics students).
I add that it is not suitable for studying theory, but the employment is quite good.
Whether graduate students are divided into directions. This different school is different.
After the general re-examination, the school began to divide the direction and determine the tutor.
However, some schools are in different directions in the second year of research. I know there are Fudan University and Beijing Normal University. The first study is the basic category. That is, basic mathematics, computational mathematics, applied mathematics, probability theory and mathematical statistics, operational research and cybernetics, etc. The second research is to determine the specific direction: for example, basic mathematics includes topology, algebra, differential geometry, algebraic topology, functional analysis and so on.
Question 4: What should engineering graduate students learn in mathematics? Matrix analysis, numerical analysis and applied mathematical statistics.
The content of numerical analysis includes numerical approximation of functions, numerical differentiation and integration, numerical solutions of nonlinear equations, numerical solutions of linear equations, numerical solutions of ordinary differential and partial differential, etc. , are based on mathematical problems.
Applied mathematical statistics: a mathematical discipline that studies the regularity of random phenomena. It uses the theory of probability to observe or test the random phenomena to be studied many times, and studies how to obtain data reasonably, how to sort out and analyze the obtained data, and how to estimate or judge related problems.
Question 5: What does "Mathematics One" mean? I'm an engineering student, and I have to take math one in my postgraduate entrance examination. Mathematics 1 includes three parts: linear algebraic probability theory and mathematical statistics of advanced mathematics, in which advanced algebra is the core part, with the largest score and the greatest difficulty. Similar to Math I, there are Math II, Math III and Math IV, among which Math IV is also called Math Agriculture, and the difficulty decreases in turn.
Question 6: What is the content of Math One for Postgraduate Entrance Examination?
1, advanced mathematics 56%
2, linear algebra 22%
3, probability theory and mathematical statistics 22%
Question 7: Which major in postgraduate entrance examination has higher requirements for mathematics, such as applied mathematics, and related majors such as network and computer have higher requirements for mathematics. Under normal circumstances, majors with high requirements for mathematics are generally one of the best. If you like math, you can take a math major. If you are majoring in other majors, you just use mathematics as a tool, and then you are not interested. Personally, I think it is a bit difficult for English majors to take math exams.
Question 8: What is the content of the postgraduate entrance examination for mathematics? Count an outline.
subject of examination
Advanced mathematics, linear algebra, probability theory and mathematical statistics
Examination form and examination paper structure
First, the perfect score of the test paper and the examination time
The full mark of the test paper is 150, and the test time is 180 minutes.
Second, the way to answer questions
The answer methods are closed book and written test.
Third, the content structure of the test paper
Advanced mathematics 56%
Linear algebra 22%
Probability theory and mathematical statistics [5]22%
Fourth, the question structure of the test paper
The question structure of the test paper is:
8 multiple-choice questions, each with 4 points and ***32 points.
Fill in the blanks with 6 small questions, with 4 points for each question and 24 points for * *.
Answer 9 small questions (including proof questions), ***94 points.
Exam content advanced mathematics
Function, limit, continuity
Examination requirements
1. Understand the concept of function
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 concept of left and right limit of function and the relationship between the existence of function limit and left 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.
Differential calculus of univariate function
Examination requirements
1. Understand the concepts of derivative and differential, the relationship between derivative and differential, and the relationship between differentiability and continuity of functions.
2. Master the four algorithms of derivative and the derivative rule of compound function, and master the derivative formula of basic elementary function. Knowing the four algorithms of differential and the invariance of first-order differential form, we can find the differential of function.
3. If you understand the concept of higher derivative, you will find the higher derivative of simple function.
4. We can find the derivative of piecewise function, implicit function, function determined by parametric equation and inverse function.
5. Understand and apply Rolle theorem, Lagrange mean value theorem, Taylor theorem, and Cauchy mean value theorem.
6. Master the method of finding the limit of infinitive with L'H?pital's law.
7. Understand the concept of extreme value of function, master the method of judging monotonicity of function and finding extreme value of function with derivative, and master the method of finding maximum and minimum value of function and its application.
8. The derivative will be used to judge the concavity and convexity of the function graph (Note: in the interval, let the function have the second derivative. When, the figure is concave; When the graph is convex, the inflection point and horizontal, vertical and oblique asymptotes of the function graph will be found, and the function graph will be portrayed.
9. Understand the concepts of curvature, circle of curvature and radius of curvature, and calculate curvature and radius of curvature.
Integral calculus of unary function
Examination requirements
1. Understand the concepts of original function and indefinite integral and definite integral.
2. Master the basic formula of indefinite integral, the properties of indefinite integral and definite integral and the mean value theorem of definite integral, and master the integration methods of method of substitution and integration by parts.
3. Know the integral of rational function, rational trigonometric function and simple unreasonable function.
4. Understand the function of the upper limit of integral, find its derivative and master Newton-Leibniz formula.
5. Understand the concept of generalized integral and calculate generalized integral.
6. Master the expression and calculation of the average value of some geometric and physical quantities (the area of plane figure, the arc length of plane curve, the volume and lateral area of rotating body, and the area of parallel section are known solid volume, work, gravity, pressure, centroid, centroid, etc.). ) and definite integral function.
Vector Algebra and Spatial Analytic Geometry
Examination requirements
1. Understand the spatial rectangular coordinate system and the concept and representation of vectors.
2. Master the operation of vectors (linear operation, quantitative product, cross product, mixed product) and understand the conditions for two vectors to be vertically parallel.
3. Understand the coordinate expressions of unit vector, direction number, direction cosine and vector, and master the method of vector operation with coordinate expressions.
4. Principal plane equation and straight line equation and their solutions.
5. Find the plane, the angle between the plane and the straight line, and use the relationship between the plane and the straight line (parallel, vertical, intersecting ... >); & gt
Question 9: What is the number of the postgraduate entrance examination? 1: advanced mathematics, linear algebra, probability theory (science and engineering)
Number two: advanced mathematics, linear algebra (some science and engineering majors and professional masters)
Third: advanced mathematics, linear algebra, probability theory (economics, management)
Question 10: Postgraduate entrance examination: What are the contents of Mathematics I? The mathematics requirements of specific majors are different, and each university may have its own relevant adjustments. It is best to consult the university directly. The following is the classification of mathematics in the national unified examination:
Mathematics 1:
1, advanced mathematics (calculus of functions, limit, continuity, unary functions, vector algebra and spatial analytic geometry, calculus of multivariate functions, infinite series, ordinary differential equations);
2. Linear algebra;
3. Probability theory and mathematical statistics.
Math 2:
1, advanced mathematics (function, limit, continuity, one-variable function calculus, differential equation);
2. Linear algebra.
Math 3:
1, advanced mathematics (function, limit, continuity, unary function calculus, multivariate function calculus, infinite series, ordinary differential equations and difference equations);
2. Linear algebra;
3. Probability theory and mathematical statistics.
Math 4:
1, advanced mathematics (function, limit, continuity, one-variable function calculus, multivariate function calculus, ordinary differential equations);
2. Linear algebra;
3. Probability theory
Reference: China Graduate Admissions Information Network.