Reasons for the simplicity of mathematics in college entrance examination:

1, teaching reform

In recent years, the education department has carried out a series of teaching reforms to solve the difficult problem of mathematics in college entrance examination. The teaching contents, teaching methods, topic design and other aspects have been adjusted, which makes the college entrance examination mathematics more suitable for the teaching materials and more targeted, and reduces the troubles of students facing too difficult problems.

2. The topic pool has expanded.

In order to ensure the fairness and comprehensiveness of the college entrance examination, the mathematics question bank of the college entrance examination has been expanded to cover a wider range of mathematics knowledge. Therefore, when designing test questions, the difficulty is relatively easier to balance, which enables candidates to show their mathematics level more comprehensively.

3. Emphasize basic knowledge

The focus of college entrance examination mathematics is the application of basic knowledge and methods. Compared with some in-depth mathematical theory derivation and proof, college entrance examination mathematics pays more attention to mastering basic concepts and basic calculation methods. This also enables candidates to concentrate on strengthening the basic knowledge in the preparation process, which is helpful to improve the overall examination level.

The college entrance examination mathematics examination scope:

1, elementary mathematics

In the dictionary of mathematics, elementary algebra is divided into seven parts: number system, algebra, exponential logarithm of radical, inequality, equation, function and sequence, permutation and combination, binomial theorem, which covers most of the contents of high school mathematics.

2. Analytic geometry

Including the plane rectangular coordinate system, the operation of plane vector, the basic concepts and properties of straight line, circle, parabola, ellipse and hyperbola, and the method of solving problems.

3. Probability theory and mathematical statistics

Including random events, probability calculation, conditional probability, random variables and statistical methods, such as statistical charts, mean and variance.

4. Geometry of number and space

Including sequence and mathematical induction, number and set, spatial analytic geometry, mathematical logic and so on.

5. Derivative and calculus

Including function, limit, continuity, derivative, differential, rate of change, differential mean value theorem, indefinite integral and so on.