How to learn high math? How do you learn advanced math?

Learning is gradual, you should at least learn junior high school mathematics first, and then learn high mathematics, generally high mathematics in the first chapter of the content is a summary and review of high school knowledge, I hope you can make up for junior high school knowledge!! I'm a math major, I feel that the major is very difficult, but if you are not a math major, you generally calculate more, such as derivatives, these must be learned, like calculus, they are all based on the opposite process of derivatives, that is to say, derivatives are very important, you must remember most of the common derivatives, so that calculus is easy.

The most important thing is meditation, getting into the state, which can be difficult at first, but once this period is over, the efficiency will rise.

Recently, I have also been studying advanced mathematics at ease, and I have just experienced it a little. In fact, everyone's learning method is different, the key is to find the most suitable for yourself, and explore more. Good luck.

High math is very difficult, the important thing is to listen to the class and read the class, I personally feel that I listen carefully in class and understand the book after class; There is also a must be a preview before class, mark out what you don't understand, otherwise you will have a hard time in class, the example questions in the book are the most basic, you must understand, you can do, after class meticulously complete the homework assigned by the teacher, your high number will not be bad, at least above 85, come on.

Don't just listen to the teacher in high school, the most important thing is to study on your own.

1. Listen carefully to the class. Since it is a high math class, it is naturally a teacher's lecture, and the number of high math lessons in a week will definitely not be less. The teacher's class is the best medium for learning.

2. Take notes. Some of the proofs that are not in the book and the essence of the teacher's casual play in class are fleeting. Taking good notes is also good for serious concentration in class. If you read a book on your own, you also need to take notes.

3. Do your homework on time. There will be a lot of homework for advanced mathematics, and its importance for learning advanced mathematics is self-evident. Moreover, the homework is good and the usual score is still high, and the final overall evaluation is not high.

4. Learn open classes. If you are unclear about some proofs, reasoning, or concepts, and want to find a famous teacher, the online open class is actually a very good choice.

1.The basis of high numbers is the limit and the derivative, these two aspects should be mastered, in the final analysis, it is necessary to master the limit, because the definition of the derivative is based on the limit.

2.After the foundation of derivatives is solid, indefinite integrals and definite integrals are relatively easy to learn, which can be understood as inverse operations, and the derivatives are self-known functions, and then the derivatives are solved by operation; Indefinite and definite products are known derivatives and are found as primitive functions.

3.Double and triple integrals focus on their geometric significance, and the method step is to finally move on to the one-fold integral operation.

4.Universities need to master some simple differential equations, which are essentially original functions, and are treated differently depending on the situation.

Well, the postgraduate entrance examination book is much better than Tongji's advanced mathematics.

Zhang Yu gave 18 lectures on high mathematics.

It is recommended to listen to the mathematics for graduate school.

Although you may not be admitted to graduate school, the questions and solutions taught by the teacher will open you up to some jerky knowledge ideas.

It seems that this is the thirteenth time to answer such a topic, remember! Question sea tactics are not a wise choice! And digestion is the key Induction, summary The starting point of each simplest question and the college entrance examination question is the same, but the college entrance examination questions are connected by many simple knowledge points!

Therefore, I usually summarize and act more on simple questions! Find out what's behind it that only the questioner sees! Skill comes from practice.

High mathematics requires you to learn by heart, the theorems in the textbook must be understood, the process of solving example problems and the ideas of solving problems must be understood, and then it is necessary to ensure that there is enough time to do the questions

1. Learning mathematics is the same as learning other courses, pay attention to listening to lectures in class, preview and review in class or after class, and learn each knowledge point thoroughly. But each course has its differences: for example, if I didn't take a Chinese class today, I can make up for it tomorrow after the class, while mathematics is a ring after a link, such as:

If you don't learn decimal addition and subtraction first, you won't be able to, so you must learn each knowledge point thoroughly.

2. Students are most afraid of making mistakes in the exam, and if they make mistakes, they must analyze and summarize. I summarized the four situations in which points are lost: one is that you will do it, but you are careless and do it wrong.

The second is that you can't think of how to do it for a while, and you will do it afterwards. The third is that you don't have enough time, give a little more time to think, and maybe you will do it. The fourth is that you can't do it, you can't do it if you sit there for 10,000 years.

The solution is as follows: First, be careful in the future, and be careful. Second, in the future, we must do more practice, the so-called "familiar with 300 Tang poems, can not compose poems and chant".

Three, be able to use time! Be quick! But it's fast and error-prone!

How can it be fast? There is only one way: practice more!

The fourth is the most terrifying! There are two scenarios for this. One is that you can't do it because you haven't learned it well and can't do it; Another situation is that you have learned well, but you lack the ability to draw inferences and comprehensively, and you can't do it.

Most of the students have the second problem. It makes sense for the teacher to come up with such a question. The teacher will never come up with the questions that everyone will never do, and the teacher is testing everyone's comprehensive ability.

You have to make a few more detours in your brain, think about a few more whys, and you can make it.

You have to like him first, and 45 minutes of class is the most important. Even if you finish your homework after class. If you finish it earlier than others, you will have a sense of superiority, and you will gradually like him.

Roots are important!! Let's lay a good foundation!!

Listen carefully in class and practice more after class.

Mathematics: Theorems in textbooks, you can try to reason on your own. This will not only improve your proof ability, but also deepen your understanding of the formula.

There are also a lot of practice questions. Basically, after each class, you have to do the questions of the after-class exercises (excluding the teacher's homework). The improvement of mathematics scores and the mastery of mathematical methods are inseparable from the good study habits of students, so good mathematics learning habits include:

Listening, reading, **, homework Listening: should grasp the main contradictions and problems in the lecture, think synchronously with the teacher's explanation as much as possible when listening to the lecture, and take notes if necessary After each class, you should think deeply about it and summarize it, so that you can get one lesson and one lesson Reading: When reading, you should carefully scrutinize, understand and understand every concept, theorem and law, and learn together with similar reference books for example problems, learn from others, increase knowledge, and develop thinking **:

To learn to think, after the problem is solved, then explore some new methods, learn to think about the problem from different angles, and even change the conditions or conclusions to find new problems, after a period of study, you should sort out your own ideas to form your own thinking rules Homework: to review first and then homework, think first and then start writing, do a class of questions to understand a large piece, homework to be serious, writing to standardize, only in this way down-to-earth, step by step, in order to learn mathematics well In short, in the process of learning mathematics, It is necessary to realize the importance of mathematics, give full play to one's subjective initiative, pay attention to small details, develop good mathematics learning habits, and then cultivate the ability to think, analyze and solve problems, and finally learn mathematics well

In short, it is a process of accumulation, the more you know, the better you learn, so memorize more and choose your own method. Good luck with your studies!

Hello, I don't know if you want to study seriously or study for exams, so I will share my experience with you below, I hope it will help you!

If you haven't taken a high math class yet, I have the following advice for you:

1: Be sure to listen well and don't miss every word of the teacher. Because a word from the teacher may wake up the person in the dream.

2: Do all the post-class questions again, and remember to do it seriously to ensure that you really understand.

3: The process of proving the theorem must be watched, because only if you know its principle and understand the ins and outs of each step, you can use it well.

4: Try to do a little bit of difficulty, because this can connect a lot of knowledge points, not only can play a role in review, but also open up your own ideas.

If you want to take the exam, I would like to make the following suggestions:

1: Post-class questions, mainly left by the teacher.

2: Example questions, mainly taught by the teacher in class.

3: Test papers, in previous years, you must understand every question.

Hope it helps, good luck!!

The method of learning is nothing more than preview + listen carefully + practice more after class + communicate more.

But if it's for a specific purpose, it can also be done in a specific way:

If you're coping with a final exam, it shouldn't be too difficult.

Learning is based on grasping the textbook and understanding the theorem as the core.

After understanding the example problem, cover it, do it again, think about it first if you can't think of it, and then look at the solution in the book if you really can't think of it. In this way, the example problems are completed first.

Then there are the exercises. The landlord can buy a reference book that explains the after-class exercises in detail, and complete the after-school exercises in the order of doing the questions independently, verifying the answers, and thinking about the process of solving the problems in combination with the answers.

Before the final exam, the landlord must get the high mathematics exam papers of the previous years, and do the test papers several times to understand the ideas and answering ideas.

Example questions + after-class exercises + test papers, if the final exam is not very bt, I don't think it's a problem for the landlord to score 85 points.

If you want to advance, you can consider looking at the advanced number of graduate school entrance examinations.

Li Yongle, Chen Wendeng, etc. have all published mathematics review books and tutorial handouts for high math monoblocks. The process of the advanced mathematics part follows the textbook, and there will not be too much knowledge interspersed with the back, and the solution will not be shackled by the content that has not been learned.

Listen carefully and do more exercises.