Remember the rules of doing problems, the methods of solving problems, the skills of catching people's eyes, the induction of similarities and differences, the outline of the catalogue, and the derivation of mathematical formulas. Be sure to listen attentively in class, finish your homework independently after class, encounter knowledge points that you don't understand, theorems or formulas that you can't deduce and prove, and problems that you can't do. Be sure to read textbooks and counseling materials.
Review what the teacher said, sort out the key definitions, mathematical formula derivation process, properties or judgment theorems, and extract them neatly. According to the usual homework or exams, write some classic basic questions that are often tested, and write the problem-solving process neatly to facilitate your reading and review.
Understand some common exam questions, summarize some ideas and methods to solve problems, summarize some commonly used geometric models, and summarize the conclusions of some topics. But don't write your notes into the problem set. Otherwise, how can you copy all these questions? Common questions that can be tested in daily homework. Classic questions that are easy to confuse and make mistakes can be sorted into a book.
When taking notes, you must write neatly and standardize the process of writing and solving problems. Because your notes are samples of your test paper. So you should write down the classic questions, what you don't understand and the mistakes you are prone to make. Copying them can deepen understanding and impression, and then study methods and sum up ideas.
Otherwise, it's no use just copying the questions. So pay attention to your learning methods.
What to do after writing notes:
What is the purpose of taking notes? Just to review and consolidate what I have learned. Not where, to prove how thick your notebook is. Therefore, we should always review, read and understand our notes. Look at the classic problems that can be summarized, or the problems that are easy to make mistakes, or the problem-solving skills of geometric models.
Especially when you encounter related topics and have similar problems, you can open your notes and compare them with a certain knowledge point. Only in this way can notes be helpful to study.
I took notes so that I could review them at any time. So, you must be neat. If you take notes, you must read them every day to understand them. Why did you copy this note like this? Why is this problem solved like this? Is there any other way to solve the problem, similar to another one?
After taking notes, you must read, understand and deepen your memory every day. Never take notes, never care, never read. What's the use of this note? Then it's just a notebook, that's all.