Introduction: By exploring the process of axisymmetric essence, we have accumulated the experience of mathematical activities and further developed the concept of space and the ability to think and express in an orderly way. Let's take a look at the contents of the draft of "Axisymmetric and Axisymmetric Graphics" in the junior middle school mathematics lecture of Su Ke Edition.
I. teaching material analysis
The content of this section is lesson 1 in the first section of the first volume of the eighth grade mathematics of Su Ke Edition. This section is based on students' existing life experience and preliminary experience in mathematical activities, and starts with observing the phenomenon of axial symmetry in life, so as to understand the characteristics of axial symmetry from a holistic perspective. At the same time, it is closely related to the "folding" of one of the three major movements of graphics (translation, folding and rotation). Through the study of this lesson, students can not only feel the role of "folding" in the three basic movements of graphics in geometry knowledge, but also make full preparations for students to learn symmetric transformation, central symmetry and central symmetry graphics and parallelogram related knowledge. At the same time, this plate is also a bridge between mathematics and life.
Second, the teaching objectives:
According to the above teaching material analysis, considering the existing cognitive structure and psychological characteristics of students, the following teaching objectives are formulated:
1. Understand the concepts of axisymmetric and axisymmetric graphics through concrete examples; Be able to identify axisymmetric and axisymmetric figures and find out the axis of symmetry; Know the difference and connection between axisymmetric graphics and axisymmetric graphics.
2. Experiencing and observing axisymmetric phenomena and axisymmetric figures in life, exploring their activity processes with the same characteristics, and developing students' spatial concept and abstract generalization ability.
3. When appreciating the beauty of axisymmetrical graphics in real life, we can appreciate the wide application of axisymmetrical graphics in real life and its rich cultural value; Stimulate students' desire to learn and actively participate in mathematics learning activities.
Third, the teaching emphasis and difficulty:
According to the teaching objectives, I think the focus of this lesson is: the difference and simple application of the concepts of axisymmetric and axisymmetric graphics. The difficulty is: the connection and difference between axisymmetric graphics and axisymmetric graphics.
Fourth, teaching methods and learning methods.
In order to highlight key points, break through difficulties, and enable students to achieve the teaching objectives set in this section, I will guide students to experience observation, operation and other activities in this class, and give students sufficient space for independent exploration and communication in the activities, so that students can fully discuss, communicate, cooperate and express boldly, so that students can truly become the masters of learning.
Verb (abbreviation of verb) teaching process;
According to the above analysis, I will talk about the teaching process of this class in detail. Inquiry activity (1): Axisymmetric graph
1. Stimulate interest and experience life (demonstrate related pictures in life with multimedia) Picture appreciation (courseware): Test your observation. This eye-catching title arouses students' competitiveness and makes them think while observing: What are the same characteristics of these pictures? This design follows the principle that teaching should be close to the reality of life. After careful observation, students can find that these figures are symmetrical. Then, the teacher asked in time: How are these figures symmetrical? How can we make symmetrical parts overlap? Let students observe, guess, explore and discuss, and the teacher will guide them appropriately, so that students can find that one part of a graph can completely overlap with another part of the graph after it is folded 180 degrees along a straight line. Let students feel that mathematics is everywhere around us in life and stimulate students' interest in learning mathematics.
2, activity inquiry to form the concept: experimental inquiry: cut a pattern by folding a piece of paper in half (don't cut the crease completely), then open this folded paper and cut out a beautiful pattern. Please try imitating the teacher's method. On the basis of appreciating and perceiving the axis symmetry, students must be eager to know where the beauty of these figures lies. So I set up a paper-cutting activity to let students create beauty through hands-on practice and perceive the concept of axisymmetric graphics in operation. Then, by comparing some patterns in the last activity, we found that they have the same characteristics: "There is a straight line-fold it-overlap each other." Thus, this concept, the concept of teacher writing on the blackboard, came to a conclusion through cooperation.
3. Give some examples of axisymmetric figures in practice and tell the axis of symmetry (with courseware attached).
According to the students' own life experience, let the students say qualified figures, and let the students know the widespread existence of axisymmetric figures in their lives. Many axisymmetric figures in life not only embody a kind of symmetrical beauty, but also contain certain scientific truth, do you understand? ① The symmetry of the dial ensures the uniformity of travel time; (2) the symmetry of the plane keeps the plane balanced in the air; ③ The symmetry of human eyes makes people look at objects more accurately and comprehensively; (4) The symmetry of the ear can make the sound have a strong three-dimensional effect. ...
4. Comprehensive exercises, divergent thinking: This group of exercises is designed with graphics and mathematics ... It excavates various patterns of life, strengthens the infiltration and integration between disciplines, and enables students to find answers to knowledge in mutual arguments, supplements and exchanges, and experience the fun of learning.
Inquiry Activity (2): Axisymmetric
1, hands-on operation, introducing new knowledge
After folding a piece of paper in half, use the needle tip to pierce the pattern as shown in the figure on the paper, and observe the resulting pattern. What is the relationship between the parts on both sides of the crease? Then look at the textbook page 1 19, figure 14. 1-3, and see what * * * has in common with each pair of figures. How many figures does each pattern consist of? Because students have understood the concept of axisymmetric figure, they may mistakenly think that the axisymmetric figure formed by two figures is symmetrical and there is no difference. Therefore, first of all, with hands-on practice, paper-cutting, and with the help of people's various sensory understanding, it is emphasized that the symmetry of two graphics is "the coincidence of two graphics." According to the main line of "there is a straight line-fold it-two figures overlap", under the guidance of the teacher, students draw two figures to form the concept of an axis symmetry and a symmetrical point. Teacher's concept of writing on the blackboard.
2, consolidate exercises, improve the application (courseware) to understand and consolidate the knowledge.
3. Give an example of your talent. Give examples of axial symmetry in life to deepen the understanding of axial symmetry.
Activity (3): Summarize and observe the following two figures and talk about your findings. Compare axisymmetric and axisymmetric figures: (The list deepens the impression) Axisymmetric and axisymmetric figures are the relationship between two figures and the characteristics of a figure shape itself. After being folded in half, the two figures completely overlap with the other half. The difference is that axial symmetry refers to the symmetrical relationship between "two" graphs, while axial symmetry refers to the symmetrical nature of "one" graph.
Connection: ① All of them are defined by the graphic coincidence of folding and 180 folding;
② The two can be transformed into each other. If two axisymmetric figures are regarded as a whole, then this "one" figure is an axisymmetric figure. On the other hand, if two symmetrical parts of an axisymmetric figure are regarded as two figures, then the "two" figures are axisymmetric. Infiltrate the dialectical relationship between the whole and the part here to further develop students' abstract thinking ability.
Activity (4): Know the figure and feel the beauty of symmetry.
(1). Enjoy the pictures and experience the beauty of symmetry created by axial symmetry.
(2) Which of the numbers 0 to 9 displayed by the calculator are axisymmetric? Many Chinese characters are axisymmetric figures, such as heaven, sun, moon, clock, Shen, Wang and so on. There are many axisymmetric examples and figures in the trademarks of Lenovo, United Securities, Cai Xiang Securities, Industrial and Commercial Bank of China, Bank of China and other companies and enterprises. Many logos of various brands of cars are axisymmetric graphics, such as Audi, Hyundai, Honda, Fukang, Opel and BMW. Rectangular, diamond, square, equilateral triangle, etc. Are all axisymmetric figures; The line segment is also an axisymmetric figure, and the vertical line of the line segment is its axis of symmetry.
Key point: the symmetry axis of a figure is a straight line, not a line segment or ray, but a straight line where the line segment or ray is located. For example, students tend to think that the bisector of the angle is the symmetry axis of the angle, and the height on the bottom of the isosceles triangle is its symmetry axis, which can achieve the effect of error correction well. Secondly, we know that an angle triangle and an isosceles triangle each have an axis of symmetry, a rectangle has two, an equilateral triangle has three and a square has four axes of symmetry, and a circle is the most special figure with numerous axes of symmetry, so its symmetry is widely used. This will enable students to use the symmetry of graphics to solve some related problems in the future.
Activity (5): Hands-on operation, active practice and graphic creation.
(1), on the basis of giving half of the axisymmetric figure, let the students draw the other half on the other side of the axis of symmetry to become a complete axisymmetric figure. From simple to difficult, step by step.
(2) Let students use their imagination and creativity to create beautiful axisymmetric figures with their own hands.
This part of the design is open, which can give full play to students' imagination, creativity and practical ability, make students become the real masters of learning, give students space for self-expression and self-creation, and help cultivate students' positive learning attitude and intimacy in learning mathematics, as well as their ability to feel beauty. )
(6): class summary
(1). What did you learn in this lesson?
(the definition of axisymmetric and axisymmetric graphics; The properties of axisymmetric figures: which of the polygons we have learned are axisymmetric figures; Application of axisymmetric graphics. )
(2) Talk about your experience and confusion about this class.
(VII): Operation design
Give full play to your imagination and use the knowledge learned in this section to design a class emblem for our class. Whether the required design pattern is axisymmetric or axisymmetric has certain meaning. This is an open, interesting and challenging homework problem, which provides a platform for students to exert their imagination and creativity, and makes students' activities move from classroom to life.
These are my views on this course. Please forgive my shortcomings! thank you
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