In the actual teaching activities of teaching staff, it may be necessary to prepare lecture notes, which can well correct the shortcomings of lectures. Then the question is coming, how to write the speech? The following is the speech of the first prize of junior high school mathematics that I collected for you. I hope it will help you.
The first prize of excellent mathematics in junior high school 1. Judges:
Good morning!
The topic of my speech today is that the textbook chosen for this class is the eighth grade textbook of the compulsory education curriculum standard of Beijing Normal University.
I. teaching material analysis
1, the position and function of teaching materials
This textbook is the content of XXXX junior high school mathematics grade textbook and one of the important contents of junior high school mathematics. On the one hand, this is the further deepening and expansion of XXXX on the basis of learning XXXX; On the other hand, it lays a foundation for learning -XXX and other knowledge, and is a tool for further study of XXXX. Therefore, this lesson plays a connecting role in the textbook.
2. Analysis of learning situation
Students have learned XXXX before, and have a preliminary understanding of XXXX, which lays the foundation for successfully completing the teaching tasks of this lesson. However, students may have some difficulties in understanding XXXX (due to its high abstraction), so a simple and clear analysis should be made in teaching.
3. Emphasis and difficulty in teaching
According to the position and function of the above teaching materials, as well as the analysis of the learning situation, combined with the requirements of the new curriculum standard for this class, I will determine the focus of this class as follows:
The difficulty is determined as follows:
Second, the analysis of teaching objectives
According to the teaching concept of the new curriculum standard, in order to cultivate students' mathematical literacy and lifelong learning ability, I have established the following three-dimensional goals:
1. Knowledge and skill objectives:
2. Process and method objectives:
3. Emotional attitude and value goal:
Third, the analysis of teaching methods
In this class, I will adopt heuristic and discussion-based teaching methods, and advocate students to actively participate in teaching practice in the form of independent thinking and mutual communication, and find, analyze and solve problems under the guidance of teachers. In guiding the analysis, I will give students enough time and space to think, associate and explore, and complete the real knowledge self-construction.
In addition, in the teaching process, multimedia-assisted teaching is used to present teaching materials intuitively, so as to better stimulate students' interest in learning, increase teaching capacity and improve teaching efficiency.
Fourthly, the analysis of teaching process.
In order to teach in an orderly and effective way, I mainly arranged the following teaching links in this class:
(1) Review and you will know, and you will learn new things from the old review.
Design intention: Constructivism advocates that teaching should start from students' existing knowledge system, and XXXX is the cognitive basis for this course to study XXXX in depth, so design is conducive to guiding students to enter the learning situation smoothly.
(2) Create situations and ask questions
Design intention: Create situations in the form of a series of questions, which will trigger students' cognitive conflicts, make students doubt old knowledge, and thus stimulate students' interest in learning and desire for knowledge.
By creating situations, students have a strong desire for knowledge and a strong motivation for learning. At this time, I take the students to the next link-
(3) Find problems and explore new knowledge.
Design intention: Modern mathematics teaching theory points out that teaching must be obtained on the basis of students' independent exploration and experience induction, and the process of thinking must be displayed in teaching. Here, through observation and analysis, independent thinking and group communication, students are guided to summarize.
(4) Analysis and thinking to deepen understanding.
Design intention: the theory of mathematics teaching points out the connotation and extension (conditions, conclusions, scope of application, etc. ) mathematical concepts (theorems, etc.). ) it should be clear. By expounding several important aspects of the definition, students' cognitive structure can be optimized, students' knowledge system can be improved, and students' mathematical understanding can break through the difficulties of thinking again.
Through the previous study, students have basically mastered the content of this lesson. At this time, they are eager to find a place to show themselves and experience success, so I lead students into XXXX.
(5) Strengthen training and consolidate double basics.
Design intention: several examples and exercises are from easy to deep, from easy to difficult, each with its own emphasis. Among them, example 1 ... example 2 ... embodies the teaching idea of making different students develop differently in mathematics proposed by the new curriculum standard. The overall design intention of this link is to feedback teaching and internalize knowledge.
(6) Summarize and deepen.
Summary and induction should not only be a simple list of knowledge, but also an effective means to optimize the cognitive structure and improve the knowledge system, so as to give full play to students' dominant position and let students talk about the gains of this class.
(7) Contrast feedback of in-class testing.
(8) Arrange homework to improve sublimation.
Based on the consolidation and development of homework, I designed mandatory questions and multiple-choice questions. Mandatory questions are feedback to the content of this lesson, and multiple-choice questions are an extension of the knowledge of this lesson. The overall design intention is to feedback teaching, consolidate and improve.
These are my views on this course. Please forgive my shortcomings!
The first prize of excellent mathematics in junior high school is presented in lecture 2. Teaching material analysis:
Rational number subtraction is the content of the fifth section of the second chapter of the seventh grade mathematics experiment textbook published by Beijing Normal University.
"Number operation" is an important content in the learning field of "Number and Algebra", and subtraction is one of the basic operations. The study in this lesson is far from the subtraction of integers and fractions (including decimals) in primary schools, and is closely related to the addition of rational numbers in the fourth quarter. Through the study of rational number subtraction, students have a further understanding and understanding of subtraction, which lays a solid foundation for the subsequent study of real number and complex number subtraction.
In view of the above knowledge and understanding of the position and role of teaching content in the textbook system, the teaching objectives of this course are determined as follows:
1, knowledge target:
Experience the process of exploring the rules of rational number subtraction, understand the rules of rational number subtraction, and be able to skillfully use the rules for rational number subtraction.
2, ability goal:
Experience the process of summarizing general laws from special cases, and cultivate students' abstract generalization ability and expression ability; Through the transformation from subtraction to addition, students can initially understand the mathematical thought of transformation and reduction.
3, emotional goals:
In the process of summarizing the rules of rational number subtraction, cooperative learning among peers is carried out through discussion and exchange.
In order to achieve the above teaching objectives, it is determined that the teaching focus of this course is: the understanding and application of the rational number subtraction rule. The difficulty in teaching is to understand the significance of subtraction in practical situations and solve practical problems by using the subtraction rule of rational numbers.
Second, the analysis of learning situation:
The teaching object we are facing is the students with distinctive personality with certain knowledge reserve and cognitive ability, rather than a blank sheet of paper, so it is very necessary to pay attention to the students' situation in teaching.
In life, students often compare similar quantities, so students are no strangers to subtraction, but this understanding often flows on the experience level; In primary school, students further learn subtraction as "number operation", but this kind of learning of subtraction is largely a skill-intensive training, and students lack rational understanding of it. In many cases, subtraction only exists as the inverse operation of addition. Therefore, on the one hand, these existing knowledge reserves should be regarded as the "nearest development zone" for knowledge growth to promote the study of new courses, on the other hand, students should understand the significance of subtraction through the study of subtraction operation in specific situations.
In addition, it is worth noting that students in this age group have a high enthusiasm for learning and a strong desire to explore, but they have little experience in mathematics activities and low efficiency in exploration, and their ability to cooperate and communicate needs to be strengthened. Therefore, we should do a good job of regulation in the teaching process.
Third, the choice of teaching methods and the guidance of learning methods:
Curriculum standards clearly point out that students are the masters of mathematics learning and teachers are the organizers, guides and collaborators of mathematics learning. Based on the above ideas, combined with the content of this class and the students' situation, the teaching design adopts the "guidance-discovery method" to organize teaching. Its basic program design is: creating a situation-putting forward a guess-exploring and verifying-summarizing-feedback application.
The implementation of the above-mentioned teaching procedures depends on students' learning to a great extent, so it is very important to guide students' learning methods. This class should encourage and guide students to learn through independent exploration and cooperation and exchange, so that students can experience the whole process from enumerating special cases to inducing (incomplete induction) the general subtraction law, and experience the whole process of knowledge generation and development.
Fourth, process analysis:
Teaching link
Teaching activity design
design instruction
Create a situation
Natural introduction
1. Let's talk to the students about the local temperature in Hefei today and find out the highest and lowest temperatures in Hefei today.
The first prize of excellent mathematics in junior high school is lecture 3. I. teaching material analysis
The position and function of teaching materials;
Rectangular learning is based on students' experience in learning quadrangles and parallelograms. This is one of the key contents of this chapter. It is not only an extension of parallelogram knowledge, but also provides research methods and learning strategies for learning other special parallelograms, which lays a foundation for learning other related knowledge in the future and plays an important role in connecting the preceding with the following.
Second, the teaching objectives
According to the requirements of the syllabus and the characteristics of the content of this class, using the new curriculum concept, combined with the actual situation of students, I set the teaching goal of this class as:
Knowledge and skills:
1. Understand the related concepts of rectangle, and explore and master the related properties of rectangle according to the definition.
2. Understand the application of rectangle in life and solve simple practical problems according to the nature of rectangle.
Mathematical thinking:
1. After exploring the concept and properties of rectangle, cultivate students' reasonable reasoning consciousness and master geometric thinking methods. Develop students' thinking ability and language expression ability through observation, thinking, communication, inquiry and other mathematical activities.
2. According to the nature of rectangle, carry out simple calculation and application, cultivate students' logical reasoning ability, cultivate the habit of transforming geometric intuition into thinking logic, and further understand the thinking method of combining analogy with number and shape.
Solve the problem:
Through students' observation, experiment, analysis and communication, the concept of rectangle is introduced to feel the order of mathematical thinking process and the diversity of problem-solving strategies. By collecting mathematical information in life, we can use what we have learned to solve problems in life, further understand the relationship between mathematics and life, and enhance our awareness of applied mathematics.
Emotional attitude: in the communication and cooperation with others, let students feel that mathematics activities are full of fun of exploration, improve students' enthusiasm and enthusiasm for learning, and cultivate students' awareness of cooperative communication, good quality of bold speculation, willingness to explore and ability to find and explore problems. Cultivate students' habit of active exploration and independent thinking.
Third, the teaching focus:
The properties of rectangle and its application.
Teaching difficulties: understanding the particularity of rectangle and exploring its special properties.
Fourth, teaching methods and means:
According to the content of this course, students' characteristics and teaching requirements, the method of teacher guidance-independent inquiry-cooperation and exchange is adopted. The dominant position of teachers and students is fully reflected.
Teaching means: multimedia (PowerPoint, geometric sketchpad) and physical projection are used to assist teaching.
Teaching process of verbs (abbreviation of verb)
The design links of this lesson include: creating situations to introduce new lessons, getting definitions by hands, guiding exploration to get the essence, solving problems by using new knowledge, inducing and consolidating new knowledge, and learning by layers.
In the design of each link of this lesson, we strive to highlight the following aspects:
1, mathematical problems in life
In the design, I follow the curriculum standard that mathematics comes from life and serves life. Pay attention to the creation of problem situations and make math problems come alive. In the 1 activity, I showed my classmates a photo at the campus gate, which made them feel that mathematical information was being transmitted everywhere in their lives. By observing, collecting and analyzing familiar figures, the application of mathematics in life is realized, which leads to activity 2; In the application of nature, calculating the size of TV screen is also a problem closely related to life. Some students don't know the length of the diagonal yet. Through this topic, students can understand the common sense of life, further understand the role of mathematics in life, and cultivate their enthusiasm for learning mathematics through solving problems.
2. Create an independent inquiry situation and give full play to students' initiative.
In order to explore the definition of rectangle, students took out their own parallelogram learning tools and worked in groups. Through students' observation, experiment, analysis and communication, the concept of rectangle is introduced, and the evolution process of parallelogram is transferred to the concept and properties of rectangle, making it clear that rectangle is a special parallelogram. And let students feel the beauty of mathematics and the connection between mathematics and life by looking for examples in their lives. Exploring the nature of rectangle is to let students compare the nature of parallelogram, and through observation, measurement, analysis and proof, (1) let the nature of rectangle "surface" in the activity. In the activity, let students explore by themselves, discover new knowledge in the exploration, sum up new knowledge in the exchange, and give students the initiative to learn. In the evaluation, I praise active groups and individuals, enhance students' creative confidence and experience the happiness of success. The attribute 1 is the proof of the completion of student group communication. Nature 2 requires students to carefully write the process of understanding, verification and proof. On this basis, invite one student to write on the blackboard, and the rest of the students will observe whether the blackboard writing is correct. Cultivate the habit of transforming geometric intuition into logical thinking, cultivate students' divergent thinking ability and develop good problem-solving habits. Let students fully experience the whole process of knowledge formation in the activities. At the same time, I have accumulated good learning experience.
3. Train students' logical thinking and cultivate their rigorous problem-solving habits.
In this lesson, I designed three themes for the application of new knowledge. Exercise 1 is a direct application of the definition of nature. While consolidating new knowledge, guide students to further discover the basic figures contained in rectangles, let students feel the close relationship between rectangles and isosceles triangles and right triangles, let students experience the connection and extension of knowledge, cultivate the habit of transforming geometric intuition into thinking logic, and cultivate students' divergent thinking ability. The design of examples is to let students understand the application of nature, standardize the steps and formats of solving problems, and let students feel the rigor of mathematical thinking. Exercise 2 is a problem in life. Let students experience mathematics in life, combine learning with application, and cultivate their enthusiasm and interest in learning mathematics.
4. Pay attention to reflect that everyone learns valuable mathematics in teaching activities.
First of all, according to the intelligence, ability and foundation of different students, students are arranged into inquiry groups. Pay attention to the help within the group in the inquiry, and use mutual help to promote the improvement of students at different levels. The principle of grouping is: excellent math performance, strong organizational ability, strong hands-on ability, medium performance and poor foundation. Secondly, the design of homework reflects hierarchy. I divide my homework into two types: compulsory and elective. The questions that must be asked are more basic, which can find and make up for the omissions and deficiencies in classroom learning. Multiple choice questions are only available to students with learning ability. In addition, math diary is to help students sum up the gains and shortcomings of this class and cultivate the habit of summing up and reflecting.
5. Make full use of multimedia-assisted teaching.
This course is assisted by multimedia, which enables students to have an intuitive and perceptual understanding and cultivates their ability of observation, expression and induction. So as to successfully complete the teaching objectives.
The above are some of my practices and experiences in designing this course. If you have any questions, please give us more valuable suggestions. Thank you!
First of all, I use Su Shi's Title of Xilin Wall to subtly arouse students' feelings about life and make them realize that we have experienced the knowledge of outlook in life, but we have not yet formed a concept. Then I use the simple teaching aid of "chalk" to let the students experience it again and deepen their understanding. In this way, teaching and life are closely linked, which not only naturally introduces topics, but also eliminates students' fear of new knowledge and stimulates students' interest in learning.
Then, I showed the concept of "three views" untimely, and let the students realize that the view is a plane image transformed from a three-dimensional image through experiments, and continue to train, discuss and summarize, and get the correct three-view drawing method. At this time, teachers should skillfully guide students how to observe from the front, top and side, which not only embodies the students' dominant position, but also highlights the leading role of teachers and exercises their practical ability.
The process from view to three-dimensional graphics is just the opposite of the above, which requires students to imagine according to the view and build three-dimensional images in their brains. I guide students to contact the real things in life with intuitive images, and effectively break through this difficulty through induction, summary and comparison.
In order to further stimulate students' interest in learning and cultivate students' imagination and thinking ability, students can put out several combinations at will with some small cubes and draw their own views, and then conduct classroom training from views to three-dimensional graphics.
Finally, let students sum up what they have learned, further exercise their generalization ability and systematize their knowledge.
If there is anything wrong with the above design, please give me your advice. I am very grateful.
Class evaluation record
Li Yu, Development Zone: Mr. Yu Kun has several outstanding characteristics in this class:
1, creating a vivid problem situation for students. This lesson uses Su Shi's famous sentence "Topic Xilin Wall". "From one side of the mountain, the heights are different ..." This paper introduces the topic, observes Lushan Mountain from different angles, such as horizontal, horizontal, far, near, high and low, and leads to how to observe the three-dimensional figures in life. This cut-in point is very good, which can catch students' hearts and attract their attention at once. In daily teaching, we should also find more examples like this. For example, when teaching algebra in the seventh grade, a teacher introduced that "childhood is beautiful and happy." Everyone still remembers the song "Children's Songs Without Singing", and then the students recited "A frog with one mouth, two eyes and four legs plopped into the water; Two frogs, with two mouths, four eyes and eight legs, flopped into the water; Three frogs, three mouths, six eyes, 12 legs, plopped into the water ... ",and then asked: Can you finish this nursery rhyme in one sentence? Stimulate students' interest in thinking. Some students came to the following conclusion through thinking: n frogs have n mouths, 2n eyes and 4n legs, and they flopped into the water and made n sounds, showing the advantages of letters representing numbers at once, which made the students feel refreshed.
2. Pay attention to process teaching and learning method guidance.
When teaching three views of cylinder, cuboid, sphere and cone, the teacher does not directly explain to the students what their three views are, and then let the students memorize and practice the variants. Instead, guide students to read books, observe the teaching AIDS in teachers' hands, students' own learning tools or students' self-made models, then let students answer and discuss in groups, and then teachers and students jointly determine the answers. This teaching mode: asking questions, creating problem situations-observing physical objects or students reading, calculating, drawing, thinking and guessing independently-discussing and communicating in groups-allowing one group representative to speak, and other groups to give supplementary explanations-summarizing the communication between teachers and students-expanding the application mode, which is more in line with students' cognitive laws, so that students can experience and explore the development process of knowledge in cooperative learning and learn to communicate with others.
3. Reflect students' dominant position and pay attention to the guidance of learning methods.
In this course, the teacher pays attention to the students' subjective initiative. Students are affirmed and encouraged from beginning to end, and always feel that they are the masters of learning. Teachers leave students more learning space, such as observation, discussion, hands-on placement of learning tools and so on. After asking questions, students can fully think and give timely guidance.
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