Friend, does it feel good to study advanced mathematics at university?

Feeling particularly mentally retarded. Advanced math is to let your mathematical knowledge begin to gradually form a system, and give you a powerful mathematical idea, so that you can solve mathematical problems that you previously felt that you could not deal with at all.

To be honest, it is better to study by yourself than to listen to the teacher in class (of course, it may be that our teacher is too bad and follows the script, haha). In this way, you have a good high school foundation, and there is no problem in seeking guidance. Advanced mathematics is certainly fine.

Read more books, practice more questions, and think more is the same learning method through the ages.

After learning high math, I feel that the problems in high school are like guys with very fancy moves, but not high internal skills. After learning advanced mathematics, I feel that I have learned a profound internal skill, but there are no moves, but with advanced internal skills, I can learn more powerful moves.

I took a course in mathematical analysis. High school math and advanced math exercise have different angles. From the point of view of the difficulty of learning, it is not necessarily that the higher mathematics in the university is more difficult, but he studied in the university and happened to take a name called advanced mathematics.

If you want to learn advanced mathematics well. Unless you're a genius. If you want to get high grades, then you have a lot of hope. Because the school exam questions are not very difficult, as long as you can solve the after-school exercises, basically everything is OK!

High mathematics tells you the way of thinking in mathematics through specific knowledge such as limit continuity and derivative integration, and the system of thinking structure produces the law of change between quantities. College high mathematics to remember the conclusion (definition theorem) is not to do the topic is to understand its essence, you think that the mystery, the mystery can not touch the mind, the difficult can not start.

For example, in the limit part, you understand that it is the study of the infinite proximity of a constant to a variable. To further understand how it expresses this infinitely close way of thinking, and it is not clear to express it in another way. Then you are familiar with it using a n or a δ, and this set of symbols is no stranger. , n or δ, each with its own responsibilities. So you're trained in mathematics, a kind of mental framework.

If you don't want to fail, then let me tell you, it's not too difficult. But if you want a first-class scholarship or even a national award, it's quite difficult. But if you have a pure love for mathematics, then you can study those chapters with an asterisk (not taking the exam) by yourself, which is really difficult, difficult, difficult.

Personally, I feel that higher mathematics really studies mathematics and teaches us how to think, explain and understand the world with mathematical thinking, while high school mathematics tells us more about mathematics and some of its characteristics.

I continued the undergraduate entrance exam, which was self-taught, so I bought two textbooks and did the exercises! Derivation, calculus, okay, but, now I have forgotten almost, solid geometry is difficult, I have always been bad, some people just the opposite, say that solid geometry is easy, calculus is difficult, the main thing is to look at example problems, do exercises, now the Internet is convenient, we at that time, there was no network, just two books!

It's good, high numbers are nothing more than limits, differentiation, integration, etc., sometimes the more you do it, the more interesting it is.

Reading comprehension is still helpful, today look at the integral and its application, try to read in a new way, and sweep away the previous puzzles. Read often, understand often

Let me tell you this, in our high math exam, I will directly copy the questions, and then write an answer casually, and pass it directly.

In fact, it is not difficult to learn high numbers, and it is still very interesting to learn by heart.

Mathematical Analysis, Advanced Algebra Papers, Unable to Look Directly, Need to Wait for the Teacher to Adjust the Score.

When I was in high school, I wanted to grow up to be a mathematician.

High math in college is not easy to learn, and you need to work hard.

So far I've studied calculus, linear algebra.

and probability statistics. Probability and statistics are easy to understand at first, but then you know that you are exposed to a lot of new concepts, and it will involve calculus, which is really difficult.

And linear algebra still has a bit of ideas, according to the teacher's explanation has a certain understanding, when doing the problem, the problem will appear, just like the eyes know, the hands can't, people can't laugh and cry.

I learned some of the calculus in high school, but that doesn't mean I can't learn it, haha. Those derivatives, differentials, and so on are really a headache.

During the final review, the teacher gave us some outlines, which I thought were quite useful.

After listing the outline and understanding the corresponding scores, I probably have a little bottom in my heart. Finally, it is highly recommended to learn college mathematics in a shallow manner, and you can watch some recorded related courses on the Internet to combine understanding and learning.

Look at the individual.,I'm studying science and engineering.,I like to learn more science.,I'm more interested in higher mathematics.,You have to listen to it in class.,Mainly to do various types of questions.,Especially the exercises assigned by the teacher.,You have to figure it out.。 There are also various formulas, and it is recommended to start serious review and systematic review two weeks before the final exam. The key exam examples in each chapter (the types of questions in university exams are generally done), as well as various formulas, especially the integral formula, including double integrals and triple integrals.

This is very important, and the formula for which situation to solve is very clear. It is recommended to use a notebook to record the formula and the range of its use, or you can put an example next to it for understanding. Review one chapter a day, start doing previous year's papers three days before the exam, look at the question types, practice and memorize each formula.

It's okay to do these things and get a very good score.

First of all, I want to say that your proposition is too broad. College math is a very broad concept. In general majors (non-mathematics, non-liberal arts, non-arts, non-architecture), college mathematics generally includes advanced mathematics, linear algebra, probability theory, and mathematical statistics.

For advanced mathematics, it is actually a very important basic subject, and the introduction is relatively simple, because advanced mathematics is a continuation of the derivative after high school elementary mathematics, and advanced mathematics is the study of the relationship between continuous variables. However, just because it's easy to get started doesn't mean he's easy to learn. In fact, it is difficult to learn advanced mathematics well.

In particular, the median value theorem is only one piece of the content, and it can be very simple when it is difficult.

Linear algebra and algebra are said to be difficult. Truth be told, algebra is the relationship between discrete quantities. At first, everyone will find it boring and difficult to understand, especially the determinant in the first chapter, and I really don't know what this thing is for.

But when you learn the theory of matrices and systems of linear equations, you may suddenly understand it. It turns out that all the solution steps in algebra are deterministic. And, if you're good at advanced mathematics, you feel that the theory of systems of linear equations is strikingly similar to differential equations.

However, in later chapters, there are several concepts such as "positive definite" and "real symmetric matrix", among others. It still takes some effort to understand.

Probability and mathematical statistics" are the same as "algebra". But as long as the problem is relatively easy to solve, the first chapter is important, because although most of the content covered in the first chapter has already been learned in high school, it will be interspersed with deep concepts such as "conditional probability". Later chapters in the game are mainly normally distributed, but have higher requirements for "advanced mathematics".

Another piece of probability and mathematical statistics is the knowledge of statistics, which will lay the foundation for you to study statistics in the future.

That's all. I'm tired of typing. In fact, college mathematics is much more than just these three subjects. If you want to study economic management, you have to study statistics, operations research, and so on, all of which are college mathematics.

Advanced Mathematics is a subject that every college student should master, whether it is a science student or a liberal arts student. Because mathematics is an ancient and very important natural subject. Advanced Mathematics is based on elementary mathematics, with a rigorous structure, high requirements for students' logical thinking and computing ability, and is the foundation of all science and engineering disciplines.

If you learn mathematics well, you will also lay a solid foundation for the study of other subjects. Advanced mathematics is a good tool for solving other related problems, and functional limits and calculus are important parts of it and are at the heart of learning. Peculiarity.

Advanced Mathematics is an important basic subject in colleges and universities. As a science, higher mathematics has its own inherent characteristics. This is a high degree of abstraction, strict logic, and wide application.

Abstraction is the most basic and significant feature of mathematics, and only with a high degree of abstraction and unity can we deeply reveal its essential laws. in order to make it more widely used. Strict logic means that in the induction and arrangement of mathematical theories, whether it is concepts and expressions, or judgments and reasoning, the rules of logic must be applied and the laws of thinking must be followed.

It's not easy to learn, of course, it's hard to learn high math in college, and many people will fail in high math, because he is indeed more esoteric and difficult to understand than junior high school and high school mathematics.

Easy to learn, the advanced mathematics in college is only a little more difficult than high school, as long as you do the questions and attend classes well, you can still get a better score, but it still takes more time to take the graduate school entrance examination.

College mathematics is a rare subject for most ordinary students. It's hard to learn, and it takes a lot of effort to learn it well. But for the subject of such a talented little genius, it must be at your fingertips, like an arm.

If you have a good foundation in mathematics, high math in college is not a problem for you, you can only do more questions, and it is still good to do accumulation, and you should be easy to learn.

The main thing is to divide people, some people are good at learning this kind of brain-testing subject, and some people can't understand it no matter how they learn it. But if you're interested in advanced numbers, you can also try it.

There is a hierarchy of high mathematics in the university course, and when I was in college, I took a high mathematics A, which is more difficult, but it is good to find a study for the other party, and it is not a big problem to have a high school mathematics foundation.

Generally speaking, follow the teacher and practice more questions, it's not very difficult.

The content of mathematics study at the university belongs to advanced mathematics, and the main content is:

1. Limit. The idea of limits is the basic idea of calculus, and it is a series of important concepts in mathematical analysis, such as the continuity of functions, derivatives (0 to obtain the maximum), and definite integrals, which are defined with the help of limits. Limits are fundamental to solving higher mathematical problems.

2. Calculus.

Calculus is the branch of mathematics in advanced mathematics that studies the differentiation and integration of functions, as well as related concepts and applications. It is a fundamental subject of mathematics and has important applications in many fields.

3. Spatial analytic geometry.

The concept of vectors can be used to make geometry more convenient to apply to some fields of natural science and technology, so the introduction of spatial coordinate systems in spatial analytic geometry is followed by the introduction of the concept of vectors and their algebraic operations.

Is math hard in college?

It's really hard

It's a good idea to preview before class to see what you don't understand. You must be very attentive in your lectures and take some notes. Focus on what you don't understand.

After listening to the professor's class, it is generally necessary to review it again, first recall the professor's lecture, and then focus on understanding or even imitating the problems solved by the professor (for example, when advanced algebra is not introduced, you can do this, and repeatedly imitate the solution many times to help you understand), and complete the homework. Also, in generally difficult courses, the professor will force what to test, and you must not take the professor's words as the wind in your ears, you must carefully memorize and focus on restudying. If you do the above things well, although you don't want to get a high score, generally speaking, passing is a high probability event.

If you fail a few times, you can only review and retake the exam according to the key points emphasized by the professor.

The main students are the limits of functions, calculus, series, vectors, and indefinite integrals. Here's the table of contents:

1. Volume I: 1 Functions and Limits.

2 Derivatives and Differentials.

Applications of 3 derivatives,.

4. Indefinite integrals.

5 definite integrals. 6 Differential equations.

7. Multivariate function differentiation.

8 double integrals.

2. Volume II: 1 determinant.

2 matrix. 3 vectors.

4 systems of linear equations.

5. Similarity matrix and quadratic type.

6 probabilities. 7. Random variables and distributions.

8 Numerical characteristics of random variables.

9 large number theorem and central limit theorem.

Advanced Mathematics is one of the compulsory courses in college, which is divided into two volumes, and is generally studied in each semester of the freshman year. Edited by Tian Yufang and published in 2014, this book can be used as a textbook or teaching reference for undergraduates of science and engineering majors in colleges and universities, especially for undergraduates majoring in engineering electronic information, and can also be used by students for self-study.

High math is difficult, I think it's difficult, college virtual shirt high math, calculus, linear algebra are terrible.

1.There is a lot of content in high mathematics, a large amount of knowledge, a lot of teaching materials, and the calculation of calculus requires proficiency in the use of exponential functions, power functions, logarithmic functions, trigonometric functions and other knowledge in high school, which undoubtedly makes the test points of high mathematics more and the difficulty of the exam greater.

2.High mathematics has higher requirements for the comprehensive application of knowledge, that is to say, it is far from enough to simply master a single knowledge point, a question usually examines two or more knowledge points, and some of the knowledge points examined are still different chapters, if you can't integrate the knowledge, it is rare to have a clear idea of solving the problem. It is not only necessary to be proficient in each knowledge point, but also to improve the ability to comprehensively use knowledge, otherwise it is difficult to gnaw on the complete knowledge points.

3.The amount of questions in high mathematics is relatively large, and the requirements for problem solving speed and calculation ability are higher when taking the poor He cavity test, and it is difficult to solve the problem, it is difficult to think of ideas, and it is not easy to calculate the next step after thinking of ideas, once which step is wrong and start all over again. Therefore, in the process of review, not only to read books and study, but also to constantly calculate, do problems, do not stay in the stage of understanding knowledge, must do the questions yourself.