How to learn math, how to understand math problems, and where to start when doing it.
First of all, the most important thing is to listen carefully and take notes in class. I know, maybe there is not enough time to take notes in class, but you just need to understand what the teacher said, so you can copy down the topic directly, and take time to sort it out after class, which will not affect the class, but consolidate it again and make a deeper impression. Of course, we should also complete the corresponding homework we learned that day, mainly books and workbooks, supplemented by information books. Remember! Don't just focus on difficult problems. The most important thing is to master the foundation. It's not too late to do difficult problems again. Of course, you can't relax after these things are finished, because people's memory is spiral. After a certain period of time, you need to review immediately to deepen your memory, so that you will remember it several times and never forget it in the end (I suggest you take the time to review what important officials have learned after one week). What I want to emphasize is that if you want to learn math well, you really need to remember it again and do the questions several times (this is our score of 65438+). Is to think independently, don't be impatient, you can't do a problem, you have to think more and think more, and there will be more methods. For the problems you have done, you have to sum up and find out the rules. For mathematics, you can generally turn over the test paper, because the content in the book is limited, and many math problems are similar. Basically, you can grasp the test questions, clear your mind, and then review accordingly. Personally feel that the basic concepts of mathematics are very important. Understand this, and then do the problem, you can be clear. Personally, I think it is advisable to look at my previous homework. You can try to look at the problems you usually do wrong, recall the problem-solving ideas at that time, and compare and improve with the correct problem-solving methods. When you usually do the questions, you can circle the good questions and more kinds of questions, so it is much more convenient to review before the exam. After learning a new lesson, we should compare and review the learned knowledge step by step according to the contents of the textbook, from easy to difficult, from simple to complicated, and summarize the concepts, theorems and formulas to deepen our understanding of the knowledge. The examples in the textbook are best done by yourself. Reasoning the concepts, theorems and formulas in the textbook to form an overall understanding of knowledge. And consolidate it through some exercises. Mathematics is different from other subjects. It is impossible to solve practical problems by memorizing concepts, theorems and formulas. Only through practice can we reduce operational mistakes. In addition, for the mistakes in homework and test papers, it is best to prepare a set of wrong questions for future review. Don't make similar mistakes again.