For many students who are going to graduate school, mathematics is often a mountain on the road ahead. In particular, Mathematics 2 covers a wide range of contents, which is more difficult, and requires us to understand and master it in depth. So, what are the contents of the Graduate School Entrance Examination Mathematics 2?
Since I went ashore for the graduate school entrance examination, there have always been juniors and juniors who have consulted me about various aspects, such as what are the contents of the postgraduate mathematics 2 exam?Today, as a "person who has come over", I will officially share with you my experience on the road to graduate school.
1. Functions, limits and continuities
Function is a basic concept of mathematics and one of the important contents of postgraduate mathematics 2. Candidates need to understand the definition, properties, operations, and applications of functions. At the same time, limit and continuity are also two important properties of functions, and candidates need to have a deep understanding and grasp of their definitions, properties, and calculation methods.
To tell you about my postgraduate entrance examination experience, I signed up for the online full courseGaotu Postgraduate Entrance Examination, English + mathematics + politics, and selected a famous teacher (English Li Jing + mathematics Wang Zhe + political Mars sister), as well as Xi planning, one-on-one Q&A, assessment system, such a set down 1w+.
2. Differential calculus of unary functions
Unary function differential calculus is one of the core contents of Mathematics 2. Candidates need to master the definition, properties, calculations, and applications of derivatives, including finding tangents, extremums, maximums, convexity, and related optimization problems. In addition, candidates need to grasp the definition, properties, and calculation methods of differentiation.
3. Integral science of unary functions
The integral science of unary functions is also one of the important contents of the postgraduate mathematics 2. Candidates need to master the definition, properties, calculations, and applications of indefinite and definite integrals, including finding the original function, area, volume, and related physical problems of functions. At the same time, candidates also need to master important theorems such as the integral median value theorem and the fundamental theorem of calculus.
4. Calculus of Multivariate Functions
Multivariate function calculus is one of the difficulties in the graduate school entrance examination for mathematics 2. Candidates need to master the definition and properties of multivariate functions, as well as the calculation and application of concepts such as partial derivatives and full differentiation. At the same time, candidates also need to master the definition, properties and calculation methods of double and triple integrals, and understand their applications in physics and engineering.
5. Ordinary differential equations
Ordinary differential equations are another important part of the Mathematics 2 entrance examination. Candidates need to master the basic concepts of ordinary differential equations, the solutions of first- and second-order ordinary differential equations, and the basic properties of higher-order ordinary differential equations. In addition, candidates need to understand the application of ordinary differential equations in physics and engineering, and be able to apply what they have learned to solve practical problems.
6. Vector algebra and spatial analytic geometry
Vector algebra and spatial analytic geometry are also one of the important contents of Mathematics 2. Candidates need to master the definition, properties and operations of vectors, and understand the geometric meaning of vectors and their applications in physics and engineering. At the same time, candidates also need to master the concepts and methods of spatial Cartesian coordinate system, coordinate representation of vectors, and equations of spatial surfaces and spatial curves.
7. Infinite series
Infinite series is one of the difficulties in Mathematics 2. Candidates need to master the definition, properties and convergence discriminants of infinite series, and understand the application of infinite series in physics and engineering. At the same time, candidates also need to master the properties and calculation methods of special types of infinite series such as power series, Fourier series, etc.
What is the content of the Graduate School Entrance Mathematics 2 test?The above is a little experience and experience that I have summed up on the road to graduate school, and I hope it can be helpful to the younger students who are preparing for the graduate school entrance examination. I hope you all have a smooth disembarkation!