"It is difficult to find a confidant in a thousand miles, but it is easy to walk friends in the distance"; It's hard to buy a friend for a thousand dollars, but more friends always stay in spring. Mao Amin's Forever Friends is a high song, which not only shows the importance of friends between people, but also expounds how to make friends widely and more. Looking back on the growth of students for more than ten years and looking at the development of human society for thousands of years, it is closely related to mathematics, a loyal friend of mankind. Now we have started our study life in junior high school. Then, while making friends with teachers and classmates, how should we continue to make friends with mathematics?
First, honesty is the spirit. Making friends with math is the same as making friends with people. We should be sincere and diligent. In primary school, some students have a good foundation, while others have an average foundation. However, as long as students study mathematics seriously in junior high school, mathematics will become everyone's good friend. Hua, a famous mathematician in China, said: "Diligence is a good training, and diligence is a good talent." He did the same. Without guidance, he studied eight-year college courses for six and a half years on the basis of junior high school mathematics, and achieved many important scientific research results, relying on sincerity and diligence. At the same time, he explained that attitude is more important than foundation. Nowadays, students have not only the patient guidance of teachers, but also the guidance of excellent journals such as Learning Newspaper, as well as the communication between classmates. So, as long as you study hard and make good friends with math.
Second, the heart is connected. Learning mathematics, like doing other things, needs to be done well, half-hearted, half-hearted, and must be wholeheartedly. When Chen Jingrun, a famous mathematician in China, studied number theory, he split the book into pages and took it with him at any time. He sat reading, stood reading, lay reading and squatted reading until he read all the pages. What is the conclusion? What are the applications? Adhering to this method for a long time can lay a solid foundation for mathematics and learn mathematics easily and quickly; Second, the learning method of "thick before thin". Learning mathematics requires a lot of practice and thinking in each part. Professor Hua said that learning mathematics without doing problems is equal to entering the mountains without treasure. This is a "thick" stage. After learning a chapter, a book, a semester or a year, you need to extract the main knowledge at this stage. This is "thinness". Thirdly, mathematics is a subject of learning and thinking. If the brain really needs to move, why do we ask questions about everything? In this way, mathematics will be close to you; Inspiration will come to you; Excellent math scores will belong to you.
Third, make new friends and don't forget old friends. Learning mathematics, like other subjects, needs to meet every day, accumulate over a long period of time, step by step. Mathematics is a systematic and logical subject. To learn step by step, you can't just practice one stroke and one style, and you can't jump, just like going up the stairs step by step, from the first floor to the fifth floor, and even higher on the sixth floor. However, if students have five levels and you have a lot of knowledge in memory, you must remember concepts, rules, theorems and questions. As long as you remember more, you can use it freely, and you can simulate exploration when you encounter problems. Students may have encountered this phenomenon in primary school, and some problems are forgotten after learning. This is the law of nature. Psychologists have found that the law of human brain forgetting is: forgetting 50% of memory every 24 hours, and so on.
To learn mathematics, you should learn three things: learn new knowledge of mathematics and think about what the new knowledge is based on; What is the outstanding function of this new knowledge? What are the advantages of new knowledge over old knowledge? That is, when learning new knowledge, contact with old knowledge, take fewer detours, review fully and think seriously. Students may wish to try the above methods, which will certainly achieve the goal of making new friends and not forgetting old friends.
The sky is thick, the mountains are high and the water is flowing. Students let us exchange more updated learning methods with learning newspaper as the link and mathematics as the topic. Let's forge an eternal friendship with mathematics, travel through time and space, and fly to that distant place. Thank the questioner for his evaluation.