Chapter 20 10 Comparison of Examination Contents and Examination Requirements of Mathematics Examination Outline 20 1 1 Mathematics Examination Outline
Higher Mathematics I, Function, Limit, Continuous Examination Contents
The concept and expression of function: boundedness, monotonicity, periodicity and parity of function, properties of composite function, inverse function, piecewise function and implicit function, and the establishment of functional relationship of graphic elementary function. The definitions of sequence limit and function limit, the definition of left limit and right limit of property function, the concepts of infinitesimal and infinitesimal and their relationship, and the four operational limits of infinitesimal comparison limit. There are two important limits: 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, master the representation of function, and 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. Examination content
The concept and expression of function: boundedness, monotonicity, periodicity and parity of function, properties of composite function, inverse function, piecewise function and implicit function, and the establishment of functional relationship of graphic elementary function. The definitions of sequence limit and function limit, the definition of left limit and right limit of property function, the concepts of infinitesimal and infinitesimal and their relationship, and the four operational limits of infinitesimal comparison limit. There are two important limits: 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, master the representation of function, and 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, intermediate value theorem), and apply these properties. Contrast: No change.
One of the key contents of this chapter is limit. Candidates should not only accurately understand the concept of limit and the necessary and sufficient conditions for its existence, but also be able to correctly calculate various limits. Due to the limitation of space, the methods of finding the test sites such as limit in this chapter can be found in the second part, Chapter 1, Chapter 1, Function and Strengthening Guidance of the Mathematics Examination Outline of the National Unified Entrance Examination for Postgraduates (20 1 1) published by Higher Education Press.
Second, the examination content of differential calculus of unary function
The relationship between the geometric meaning of derivative and differential concept and the derivability and continuity of physical meaning function; Four operations of tangent and normal derivative and differential of plane curve derivative; Differential method of compound function, inverse function, implicit function and function determined by parameter equation; Invariant differential mean value theorem of first-order differential form of higher derivative of L'H?pital's law function; Monotonicity of discriminant function; graph concavity, inflection point and asymptote function; graph description function; maximum and minimum arc differential curvature; concept curvature circle and curvature radius.
Examination requirements
1. Understand the concepts of derivative and differential, understand the relationship between derivative and differential, understand the geometric meaning of derivative, find the tangent equation and normal equation of plane curve, understand the physical meaning of derivative, describe some physical quantities with derivative, and understand the relationship between function derivability and continuity.
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 concavity and convexity of the function graph can be judged by the derivative (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. Examination content
The relationship between the geometric meaning of derivative and differential concept and the derivability and continuity of physical meaning function; Four operations of tangent and normal derivative and differential of plane curve derivative; Differential method of compound function, inverse function, implicit function and function determined by parameter equation; Invariant differential mean value theorem of first-order differential form of higher derivative of L'H?pital's law function; Monotonicity of discriminant function; graph concavity, inflection point and asymptote function; graph description function; maximum and minimum arc differential curvature; concept curvature circle and curvature radius.
Examination requirements
1. Understand the concepts of derivative and differential, understand the relationship between derivative and differential, understand the geometric meaning of derivative, find the tangent equation and normal equation of plane curve, understand the physical meaning of derivative, describe some physical quantities with derivative, and understand the relationship between function derivability and continuity.
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 concavity and convexity of the function graph can be judged by the derivative (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.
Contrast: No change.
The differential calculus of unary function occupies an extremely important position in calculus. This chapter has many contents and far-reaching characteristics, which will be involved in most of the following chapters. Therefore, candidates should pay enough attention. For the in-depth analysis and proposition angle of difficult test sites in this chapter, please refer to the second part, the first part and the second chapter of "201KLOC-0/National Entrance Examination for Postgraduates" published by Higher Education Press.
Third, the content of the unary function integral test
The concept of original function and indefinite integral, the basic properties of indefinite integral, the concept of basic integral formula and the basic properties of the mean value theorem of definite integral, the upper limit of integral and the function of its derivative Newton-Leibniz formula, the substitution integration method of indefinite integral and definite integral, and the rational formula of partial integral, rational function and trigonometric function and the application of integral.
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 some geometric 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 is known solid volume, work, gravity, pressure, center of mass, center of mass, etc.). ) and definite integral to find the average value of the function. Examination content.
The concept of original function and indefinite integral, the basic properties of indefinite integral, the concept of basic integral formula and the basic properties of the mean value theorem of definite integral, the upper limit of integral and the function of its derivative Newton-Leibniz formula, the substitution integration method of indefinite integral and definite integral, and the rational formula of partial integral, rational function and trigonometric function and the application of integral.
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 some geometric physical quantities (the area of a plane figure, the arc length of a plane curve, the volume and lateral area of a rotating body, the area of a parallel section, the volume, work, gravity, pressure, center of mass, centroid, etc. of a known solid. ) and definite integral to find the average value of the function.
Contrast: No change.
The core content of unary function integral can be divided into concept part, operation part, theoretical proof part and application part. For the in-depth analysis and proposition angle of each part, please refer to the second part, the first part and the third chapter of the Comprehensive Guide to the Mathematics Examination Outline of the 201year National Entrance Examination for Postgraduates published by Higher Education Press.
Four, multivariate function calculus exam content
Concept of multivariate function, geometric meaning of bivariate function, concept of limit and continuity of bivariate function, properties of bivariate continuous function in bounded closed region, derivative method of partial derivative of multivariate function and fully differential multivariate composite function and implicit function, concepts, basic properties and calculation of extreme value and conditional extreme value of second-order partial derivative multivariate function.
Examination requirements
1. Understand the concept of multivariate function and the geometric meaning of bivariate function.
2. Understand the concepts of limit and continuity of binary function and the properties of binary continuous function in bounded closed region.
3. Knowing the concepts of partial derivative and total differential of multivariate function, we can find the first and second partial derivatives of multivariate composite function, total differential, existence theorem of implicit function and partial derivative of multivariate implicit function.
4. Understand the concepts of extreme value and conditional extreme value of multivariate function, master the necessary conditions of extreme value of multivariate function, understand the sufficient conditions of extreme value of binary function, find the extreme value of binary function, find the conditional extreme value by Lagrange multiplier method, find the maximum value and minimum value of simple multivariate function, and solve some simple application problems.
5. Understand the concept and basic properties of double integral, and master the calculation method of double integral (rectangular coordinates, polar coordinates). Test content
Concept of multivariate function, geometric meaning of bivariate function, concept of limit and continuity of bivariate function, properties of bivariate continuous function in bounded closed region, derivative method of partial derivative of multivariate function and fully differential multivariate composite function and implicit function, concepts, basic properties and calculation of extreme value and conditional extreme value of second-order partial derivative multivariate function.
Examination requirements
1. Understand the concept of multivariate function and the geometric meaning of bivariate function.
2. Understand the concepts of limit and continuity of binary function and the properties of binary continuous function in bounded closed region.
3. Knowing the concepts of partial derivative and total differential of multivariate function, we can find the first and second partial derivatives of multivariate composite function, total differential, existence theorem of implicit function and partial derivative of multivariate implicit function.
4. Understand the concepts of extreme value and conditional extreme value of multivariate function, master the necessary conditions of extreme value of multivariate function, understand the sufficient conditions of extreme value of binary function, find the extreme value of binary function, find the conditional extreme value by Lagrange multiplier method, find the maximum value and minimum value of simple multivariate function, and solve some simple application problems.
5. Understand the concept and basic properties of double integral, and master the calculation methods of double integral (rectangular coordinates and polar coordinates). Contrast: No change.
For the in-depth analysis and proposition angle of difficult test sites in this chapter, please refer to the second part and the first part of "Support and Strengthening Guidance for Mathematics Examination Syllabus of the 201year National Entrance Examination for Postgraduates".
Five, ordinary differential equation test content
Basic concepts of ordinary differential equations separable variable differential equations homogeneous differential equations The properties and structure theorems of solutions of first-order linear differential equations reducible higher-order differential equations The second-order homogeneous linear differential equations with constant coefficients are higher than some homogeneous linear differential equations with constant coefficients. Simple application of simple second-order non-homogeneous linear differential equation with constant coefficients.
Examination requirements
1. Understand differential equations and their concepts such as order, solution, general solution, initial condition and special solution.
2. Mastering the solutions of differential equations with separable variables and first-order linear differential equations can solve homogeneous differential equations.
3. The following differential equations will be solved by order reduction method:
And ...
4. Understand the properties of the solution of the second-order linear differential equation and the structure theorem of the solution.
5. Master the solution of second-order homogeneous linear differential equations with constant coefficients, and be able to solve some homogeneous linear differential equations with constant coefficients higher than the second order.
6. Polynomials, exponential functions, sine functions, cosine functions and their sum and product can be used to solve second-order non-homogeneous linear differential equations with constant coefficients.
7. Can use differential equations to solve some simple application problems. Examination content
Basic concepts of ordinary differential equations separable variable differential equations homogeneous differential equations The properties and structure theorems of solutions of first-order linear differential equations reducible higher-order differential equations The second-order homogeneous linear differential equations with constant coefficients are higher than some homogeneous linear differential equations with constant coefficients. Simple application of simple second-order non-homogeneous linear differential equation with constant coefficients.
Examination requirements
1. Understand differential equations and their concepts such as order, solution, general solution, initial condition and special solution.
2. Mastering the solutions of differential equations with separable variables and first-order linear differential equations can solve homogeneous differential equations.
3. The following differential equations will be solved by order reduction method:
And ...
4. Understand the properties of the solution of the second-order linear differential equation and the structure theorem of the solution.
5. Master the solution of second-order homogeneous linear differential equations with constant coefficients, and be able to solve some homogeneous linear differential equations with constant coefficients higher than the second order.
6. Polynomials, exponential functions, sine functions, cosine functions and their sum and product can be used to solve second-order non-homogeneous linear differential equations with constant coefficients.
7. Some simple application problems can be solved by differential equations. Contrast: No change.
For the in-depth analysis and proposition angle of difficult test sites in this chapter, please refer to the second part and the first part of "Support and Strengthening Guidance for Mathematics Examination Syllabus of the 201year National Entrance Examination for Postgraduates".
Linear algebra i. Determinant test content
The concept and basic properties of determinant The expansion theorem of determinant by row (column)
Examination requirements
1. Understand the concept of determinant and master its properties.
2. The properties of determinant and determinant expansion theorem will be applied to calculate determinant. Test content
The concept and basic properties of determinant The expansion theorem of determinant by row (column)
Examination requirements
1. Understand the concept of determinant and master its properties.
2. The properties of determinant and determinant expansion theorem will be applied to calculate determinant. Contrast: No change.
Second, the matrix test content
Concept of matrix, linear operation of matrix, multiplication of matrix, concept and properties of transposed inverse matrix of determinant matrix, necessary and sufficient conditions for matrix reversibility, equivalent block matrix of elementary transformation of matrix and rank matrix of elementary matrix and its operation.
Examination requirements
1. Understand the concepts and properties of matrix, identity matrix, quantization matrix, diagonal matrix, triangular matrix, symmetric matrix, antisymmetric matrix and orthogonal matrix.
2. Master the linear operation, multiplication, transposition and its operation rules of matrix, and understand the determinant properties of square matrix power and square matrix product.
3. Understand the concept of inverse matrix, master the properties of inverse matrix and the necessary and sufficient conditions for matrix reversibility. Understand the concept of adjoint matrix and use adjoint matrix to find the inverse matrix.
4. Understand the concept of elementary transformation of matrix, understand the properties of elementary matrix and the concept of matrix equivalence, understand the concept of matrix rank, and master the method of finding matrix rank and inverse matrix by elementary transformation.
5. Understand the block matrix and its operation. Test content.
Concept of matrix, linear operation of matrix, multiplication of matrix, concept and properties of transposed inverse matrix of determinant matrix, necessary and sufficient conditions for matrix reversibility, equivalent block matrix of elementary transformation of matrix and rank matrix of elementary matrix and its operation.
Examination requirements
1. Understand the concepts and properties of matrix, identity matrix, quantization matrix, diagonal matrix, triangular matrix, symmetric matrix, antisymmetric matrix and orthogonal matrix.
2. Master the linear operation, multiplication, transposition and its operation rules of matrix, and understand the determinant properties of square matrix power and square matrix product.
3. Understand the concept of inverse matrix, master the properties of inverse matrix and the necessary and sufficient conditions for matrix reversibility. Understand the concept of adjoint matrix and use adjoint matrix to find the inverse matrix.
4. Understand the concept of elementary transformation of matrix, understand the properties of elementary matrix and the concept of matrix equivalence, understand the concept of matrix rank, and master the method of finding matrix rank and inverse matrix by elementary transformation.
5. Understand the block matrix and its operation. Contrast: No change.
Matrix is one of the important basic concepts in mathematics. This chapter requires mastering matrix operations on the basis of understanding related concepts of matrices. Due to the limitation of space, the in-depth analysis and proposition angle of this chapter can be found in Article 2, Part II of "201KLOC-0/Support and Strengthening Guidance for Mathematics Examination Outline of National Postgraduates' Unified Entrance Examination".
Third, the content of vector test
The linear combination of concept vectors of vectors and the linear representation of linear correlation of vector groups and the maximum linear independence of linear independent vector groups are equivalent to the orthogonal normalization method of inner product linear independent vector groups between the rank of rank vector groups and the rank of matrix.
Examination requirements
1. Understand the concepts of dimension vector, linear combination of vectors and linear representation.
2. Understand the concepts of linear correlation and linear independence of vector groups, and master the related properties and discrimination methods of linear correlation and linear independence of vector groups.
3. Understand the concepts of maximal linearly independent group and rank of vector group, and find the maximal linearly independent group and rank of vector group.
4. Understand the concept of vector group equivalence and the relationship between the rank of matrix and the rank of its row (column) vector group.
5. Understand the concept of inner product and master the Schmidt method of orthogonal normalization of linear independent vector groups. Test content
The linear combination of concept vectors of vectors and the linear representation of linear correlation of vector groups and the maximum linear independence of linear independent vector groups are equivalent to the orthogonal normalization method of inner product linear independent vector groups between the rank of rank vector groups and the rank of matrix.
Examination requirements
1. Understand the concepts of dimension vector, linear combination of vectors and linear representation.
2. Understand the concepts of linear correlation and linear independence of vector groups, and master the related properties and discrimination methods of linear correlation and linear independence of vector groups.
3. Understand the concepts of maximal linearly independent group and rank of vector group, and find the maximal linearly independent group and rank of vector group.
4. Understand the concept of vector group equivalence and the relationship between the rank of matrix and the rank of its row (column) vector group.
5. Understand the concept of inner product and master the Schmidt method of orthogonal normalization of linear independent vector groups.
Contrast: No change.
Vector is one of the core contents of linear algebra. This chapter requires mastering the method of judging vector linear correlation on the basis of understanding linear correlation. At the same time, for the in-depth analysis and proposition angle of other difficult test sites in this chapter, please refer to the second part of "Support and Strengthening Guidance for Mathematics Examination Outline of National Unified Entrance Examination for Postgraduates in 201/".
Four, linear equations test content
Cramer's Law of Linear Equations Necessary and Sufficient Conditions for Homogeneous Linear Equations to Have Non-zero Solutions Necessary and Sufficient Conditions for Non-homogeneous Linear Equations to Have Solutions Properties and Structures of Solutions of Linear Equations Basic System of Solutions and General Solutions of Non-homogeneous Linear Equations
Examination requirements
1. Cramer's law can be used.
2. Understand the necessary and sufficient conditions for homogeneous linear equations to have nonzero solutions and nonhomogeneous linear equations to have solutions.
3. Understand the concepts of basic solution system and general solution of homogeneous linear equations, and master the solution of basic solution system and general solution of homogeneous linear equations.
4. Understand the structure of solutions of nonhomogeneous linear equations and the concept of general solutions.
5. We can use elementary line transformation to solve linear equations. Test content
Cramer's Law of Linear Equations Necessary and Sufficient Conditions for Homogeneous Linear Equations to Have Non-zero Solutions Necessary and Sufficient Conditions for Non-homogeneous Linear Equations to Have Solutions Properties and Structures of Solutions of Linear Equations Basic System of Solutions and General Solutions of Non-homogeneous Linear Equations
Examination requirements
1. Cramer's law can be used.
2. Understand the necessary and sufficient conditions for homogeneous linear equations to have nonzero solutions and nonhomogeneous linear equations to have solutions.
3. Understand the concepts of basic solution system and general solution of homogeneous linear equations, and master the solution of basic solution system and general solution of homogeneous linear equations.
4. Understand the structure of solutions of nonhomogeneous linear equations and the concept of general solutions.
5. We can use elementary line transformation to solve linear equations. Contrast: No change.
Eigenvalues and eigenvectors of matrices.
Concepts of eigenvalues and eigenvectors of matrices, concepts of similar matrices and necessary and sufficient conditions for similar diagonalization of property matrices, eigenvalues and eigenvectors of similar diagonal matrices and their real symmetric matrices.
Examination requirements
1. Understand the concepts and properties of eigenvalues and eigenvectors of a matrix, and you will find the eigenvalues and eigenvectors of the matrix.
2. Understand the concept, properties and necessary and sufficient conditions of similar diagonalization of matrix, and transform the matrix into similar diagonal matrix.
3. Understand the properties of eigenvalues and eigenvectors of real symmetric matrices. Test content
Concepts of eigenvalues and eigenvectors of matrices, concepts of similar matrices and necessary and sufficient conditions for similar diagonalization of property matrices, eigenvalues and eigenvectors of similar diagonal matrices and their real symmetric matrices.
Examination requirements
1. Understand the concepts and properties of eigenvalues and eigenvectors of a matrix, and you will find the eigenvalues and eigenvectors of the matrix.
2. Understand the concept, properties and necessary and sufficient conditions of similar diagonalization of matrix, and transform the matrix into similar diagonal matrix.
3. Understand the properties of eigenvalues and eigenvectors of real symmetric matrices. Contrast: No change.
Sixth, the content of the second interview
Quadratic form and its matrix represent contract transformation and rank inertia theorem of quadratic form of contract matrix. The canonical form and canonical form of quadratic form are transformed into canonical quadratic form and the positive definiteness of its matrix by orthogonal transformation and matching method.
Examination requirements
1. Understand the concept of quadratic form, express quadratic form in matrix form, and understand the concepts of contract transformation and contract matrix.
2. Understand the concept of rank of quadratic form, the concepts of standard form and standard form of quadratic form, and inertia theorem, and transform quadratic form into standard form by orthogonal transformation and collocation method.
3. Understand the concepts of positive definite quadratic form and positive definite matrix, and master their discrimination methods. Test content.
Quadratic form and its matrix represent contract transformation and rank inertia theorem of quadratic form of contract matrix. The canonical form and canonical form of quadratic form are transformed into canonical quadratic form and the positive definiteness of its matrix by orthogonal transformation and matching method.
Examination requirements
1. Understand the concept of quadratic form, express quadratic form in matrix form, and understand the concepts of contract transformation and contract matrix.
2. Understand the concept of rank of quadratic form, the concepts of standard form and standard form of quadratic form, and inertia theorem, and transform quadratic form into standard form by orthogonal transformation and collocation method.
3. Understand the concepts of positive definite quadratic form and positive definite matrix, and master their discrimination methods. Contrast: No change.