Life is full of mathematics, and it is all around us. Let students learn mathematics, starting from the existing experience and knowledge, create some problem situations close to students' real life purposefully and reasonably, and abstract the actual problems in life into interesting mathematical problems. As long as students' interest is aroused, their thirst for knowledge will be greatly increased, and students will take the initiative to open the door to wisdom.
For example, when I was studying application problems, I showed such an exercise problem to students to practice. "Use 139 GSM mobile phone, the monthly fee is 50 yuan, and the phone bill is 0.4 yuan per minute; However, a person who uses 136 Shenzhouxing mobile phone has no monthly fee and calls 0.6 yuan every minute, while this person uses 136 mobile phone, and the monthly fee is 150 yuan. Is it worthwhile for him to change the GSM mobile phone? " These topics that students come into contact with from the demonstration are very close to the real life of senior one. By letting students calculate, they can not only consolidate their knowledge and understand real life, but also create a new way of life and stimulate students' interest in learning.
For another example, when learning "the area of a circle", you can set questions. "Why is the tap water pipe round instead of rectangular?" "Have you ever seen a square tap water pipe?" is a question with common sense in life. As soon as it was put forward, students were full of interest in it, and they talked with each other in Kan Kan, so that the contents of the textbook could be integrated into the interesting life plot, so that students could learn new knowledge with interest, so that students could have the joy of trying to succeed and rekindle their interest in learning.
Second, apply mathematics knowledge to life, so that students can understand the reality of life.
In mathematics teaching, students should not only clarify concepts, but also correctly understand various knowledge points and concepts, and pay more attention to the practicality of knowledge. In practice, we should apply mathematical knowledge to practice and consider mathematical problems from many aspects, so as to broaden students' horizons, increase students' information and understand the reality of life.
For example, in the third national progress assessment of the United States, there is a test question: each truck can carry 36 soldiers, and now there are 1 128 soldiers who need to be sent to the training camp by truck. How many trucks do you need? At first glance, this is a very simple division problem. The test results also show that 70% of the students completed the calculation correctly, that is, the quotient of 36 divided by 1 128 is 3 1 and the remainder is 12. However, on this basis, only 23% students gave 32 correct answers. What does this mean? This shows that students do not regard this problem as a real problem and do not think about it from the perspective of real life. On the contrary, they just regard the topic as a fictional math problem, a story made up for practice. What they do is to calculate and write scores, which is also a common problem for some students. They only pay attention to mechanical exercises and seldom consider other issues. This is just a small example in mathematics teaching, and there are many such examples in teaching, which gives us an inspiration: we should strengthen the sense of reality in mathematics, apply what we have learned, solve practical problems, learn mathematics to serve our lives, and increase students' mathematical consciousness.
Third, starting from the practice of mathematics, expand the vision of mathematics.
Carrying out mathematical practice activities can make students experience the application of mathematics in life, which is of great positive significance for cultivating students' interest and hobby in learning mathematics.
For example, in teaching, let students walk, run, measure and measure on the playground, let students feel the distance of 50 meters, 100 meters and 400 meters, and let students distinguish the difference between step measurement and visual measurement; Let the students go to the canteen to have a look and weigh it. According to the weight of various fruits and vegetables, let students feel the actual weight of 100g, 1kg, 10kg, etc. These activities are deeply loved by students. They can not only acquire mathematical knowledge, but also cultivate their mathematical consciousness, which is full of fun for mathematics learning.
First, walk into life and observe and understand things around you with a mathematical eye:
The world is big, and there are important contributions of mathematics everywhere. Cultivating students' mathematical consciousness and ability to solve practical problems with mathematical knowledge is not only one of the goals of mathematics teaching, but also the need to improve students' mathematical quality. In teaching, let students get in touch with reality, understand life, and understand that life is full of mathematics, and mathematics is around you.
For example, in the introduction of "the meaning and basic nature of proportion", I designed a passage like this: Do you know that there are many interesting proportions in our human body? The ratio of the length of the fist to the length of the sole is about 1: 1, and the ratio of the length of the sole to the height is about 1: 7 ... It is very useful to know these interesting ratios. If you buy socks in the store, just wrap them around your fist for a week and you will know whether they are suitable for you. If you are a detective, as long as you find the footprints of the criminal, you can estimate the height of the criminal ... these are all interesting proportions that make up the body proportion. Today we will learn "the meaning and basic nature of proportion";
In addition, teachers can also design some practical assignments such as "investigation", "experience" and "operation" according to the age characteristics of students, so that students can consolidate their knowledge and improve their abilities in all aspects. For example, before teaching the relationship between unit price, quantity and total price, students can be arranged to be a small investigator and complete the following form:
Name cucumber, cabbage, radish and pork.
Unit price (yuan)
Quantity (kg)
Total price (yuan)
In this way, students have a perceptual knowledge of what they have learned, which slows down the slope of learning and helps students deeply understand the relationship between unit price, quantity and total price. For another example, after learning the stability of triangles, students can observe where the stability of triangles is used in their lives; After learning the knowledge of circle, ask the students to explain why the shape of the wheel is round and triangular from a mathematical point of view. Students can also find out where the center of the pot cover and washbasin is; ..... This greatly enriches the knowledge students have learned, and makes them really realize that mathematics is everywhere around them, and mathematics is in our life, which is not mysterious. At the same time, we unconsciously realize the true meaning of mathematics, thus arousing students' feelings of loving, learning and using mathematics since childhood, promoting students' thinking to develop into a scientific way of thinking, and cultivating students' consciousness of consciously applying what they have learned to real life.
Second, realize life and build a bridge between mathematics and life;
"Everyone learns useful mathematics, and useful mathematics needs to be learned by important people" has become the slogan of mathematics teaching reform experiment. In teaching, I contact the reality of life, close the distance between students and mathematics knowledge, and explain mathematics problems with concrete and vivid life examples.
1, solving mathematical problems with life experience
In the content of the lesson "Numbering by Letters", I used CAI courseware to demonstrate the scene of Li Lei's students finding money, and then played a "lost and found notice":
Lost?and?Found?
Li Lei found RMB A near the flag-raising platform on campus, and asked the owner to come to the Young Pioneers Brigade to claim it.
Xiao young pioneers team headquarters
2002.3
The students were surprised at the way the teacher talked about lost and found in math class. By analyzing and discussing the meaning of monism,
Teacher: Can one yuan be 1 yuan? Student 1: One yuan can be 1 yuan, which means 1 yuan has been found.
Teacher: Can one yuan be 5 yuan money? Health 2: Yes! Said to change 5 yuan.
Teacher: How much can a dollar have? Health 3: It can also be 85 yuan, which means you found 85 yuan's money.
Teacher: How much can a dollar have? Health 4: It can also be 0.5 yuan, which means you got 50 cents. ……
Teacher: So can one yuan be 0 yuan? Health 5: Absolutely not. If it is 0 yuan, then this lost and found notice is a big joke to everyone!
Teacher: Why not just say how much you found and use one yuan instead? ……
Because it is easy for students to know concrete and definite objects, and the numbers represented by letters are uncertain and changeable, it is often difficult for students to understand when they start learning. The "lost and found notice" in this topic is a familiar activity for students, which stimulates their desire to learn new knowledge, and students can participate in the problem-solving process involuntarily. In discussion and communication, brainstorming enables students to learn new knowledge in a pleasant atmosphere and to understand and master what they have learned more firmly; On the other hand, it also improves interpersonal skills, enhances the awareness of mutual assistance and cooperation, receives a good ideological education, and also exercises students' insight into society.
2, using mathematical knowledge to solve practical problems
For example, after learning the calculation of rectangular and square areas and the calculation of combined graphics, I try my best to let students use what they have learned to solve practical problems in life. The teacher's home has a two-bedroom apartment, as shown in the picture. Can you help him calculate the living area of two rooms and one living room? To calculate the size of the area, which area should we measure first? Let the students calculate after giving some data; Next, I asked the students to go home and measure the actual living area of their home. In this practical calculation process, not only the interest is improved, but also the ability of practical measurement and calculation is cultivated, so that students can learn and use it in their lives.
For example, after learning the addition and subtraction within 100, the teaching situation of "buying a car" was created: the price of a mini-car was greatly reduced, and Kobayashi spent 100 yuan to buy several cars. How many cars did he buy? Which ones?
Through observation, thinking and discussion, with my encouragement and guidance, the students expressed the following in an orderly way:
(1) decompose 100 into the sum of two numbers: (2) decompose 100 into the sum of three numbers:
50+50= 100 40+60= 100 30+70= 10020+80= 100 60+20+20= 100 50+20+30= 100 40+40+20= 100 30+30+40= 100
(3) decompose 100 yuan into the sum of four numbers (4) decompose 100 yuan into the sum of five numbers 40+20+20 = 100.
20+20+20+20+20= 100 30+30+20+20= 100
Students explore, innovate and seek original answers with the mentality of discoverer, which also verifies what Suhomlinski said: "In the deep heart of people, there is a deep-rooted need, that is, I hope to be a discoverer, researcher and explorer." This kind of illustrated application problem makes students feel that they are not solving application problems, but solving problems in life, which trains students' ability to capture information and improves the application taste of application problems: the form of cartoons is closer to children's real life, students get information about various car prices from pictures, and also get the information of "Kobayashi spent 100 yuan" from words. Because the question has practical significance, it cannot be rigidly classified into which one. Combining with the problems in real life, we can get different solutions. The whole learning activity provides students with a broad thinking space, allowing them to experience the learning process of observation, analysis, generalization and induction. It not only consolidates the understanding and addition within 100, but also promotes the exchange of mathematics, cultivates students' ability to analyze and solve problems, which is conducive to teaching students in accordance with their aptitude, reflects the different levels of learning mathematics by different people, and makes students feel the close connection between mathematics and life and the ubiquitous interest and role of mathematics in life.
Third, create life and solve mathematical problems in life.
In the teaching after the two-step application problem, I asked the students to "create" the application problem, and the students actively thought and used their imagination: "A chicken wing 8 yuan and a hamburger are more expensive than it. 4 yuan, I ate a chicken wing and a hamburger. How much do you think I spent? " ; "My mother bought a catty of vegetables in the morning and bought twice as many radishes as vegetables. How many Jin of vegetables did my mother buy? ; There are 62 episodes of Journey to the West and 5 episodes of Journey to the West. How many episodes are there in The Journey to the West? " Students are very happy, exaggerated actions and humorous language when compiling application questions, which often cause laughter. Because the theme comes from things that students are familiar with, students speak actively and fluently, and their thinking is multipolar and diversified. They came to a new view that "after snow melts, it is spring, not water". They are very excited about creation, and they realize that there is mathematics everywhere in life.
For example, after learning the knowledge of "proportional distribution", let students help parents calculate how much water (electricity) each household in this residential building should pay; After learning the knowledge of "interest", calculate how much principal and interest you can get after the money deposited in the bank expires; For example, after learning the knowledge of scale, let the students draw "I designed a plan for the future campus" and "I designed a plan for the living area" and so on. The richness of the chart content and the degree of social concern are amazing!
Life is the center of education, and the theory of "life is education" has opened up a vast Yuan Ye for the reform of mathematics teaching in primary schools. "Let students learn mathematics in life" makes students feel close to mathematics, feel that mathematics and life are together, enhance students' initiative in learning mathematics, develop students' thinking of seeking differences, cultivate students' style of study of integrating theory with practice and the spirit of being brave in exploration, bold innovation and continuous progress, and let students experience the pleasure of participating in applying what they have learned to solve practical problems.