Generally speaking, we should pay attention to two points in learning mathematical language: First, we should pay attention to the meaning of additional components, keywords and related words in mathematical sentences. For example, some mathematical expressions in reverse order, such as "solution of equation", "solution of equation", "neither number is zero" and "neither number is zero", have different meanings, so we should pay attention to distinguish their different mathematical meanings;
Second, written language, symbolic language and graphic language are the three main forms of mathematical language. We should not only master the characteristics of the three languages, but also be good at mutual transformation, deepen understanding and promote the absorption of knowledge in the transformation. Mathematical language is abstract and logical. Only by reading correctly and repeatedly can we achieve remarkable results.
Since mathematics should be based on textbooks and basic concepts and theorems should be remembered, how to read and remember is effective? Mathematics should also attach importance to memory. You must read a lot to make your memory more accurate, but this kind of reading is different from Chinese and politics. To learn mathematics, we should learn examples well, understand concepts and read through the main points.
First, we should learn examples well.
Examples in textbooks are important instructions for learning how to use concepts, theorems and formulas. In the process of learning, we must take examples as the focus of learning. Learning mathematics is very different from learning other subjects, that is, you must calculate while watching. The same is true when learning examples. When we study, we students try our best to do it by ourselves without looking at the solving process of examples. If you can't do it, you can look at the detailed answers to the examples. This learning method is of great benefit to improve our ability to solve problems in mathematics.
Second, the concept should be understood.
Correct understanding and flexible application of mathematical concepts is the premise of learning mathematics well. When we study mathematical concepts, we must read word by word carefully and understand every word.
Third, the main points should be read through.
When learning important knowledge points of mathematics, we should sum up the key points, formulas and conclusions, and turn them into our own understanding and experience. For the knowledge that you can't understand for a while, you must find a teacher and learn the doubts thoroughly.
Through our own continuous efforts, we students should not only be able to remember the basic concepts and theorems of mathematics, but also be able to understand and use them flexibly on the basis of remembering.