There were some challenges and experiences in teaching first-year mathematics online. From the perspective of teaching, teachers should change their ideas in preparing lessons, highlight important and difficult points, design learning activities, integrate network resources, but pay attention to authority. In class, they had to complete the details, send live broadcast links in advance, write down topics, etc., pay attention to student interaction, and attract students by showing excellent homework. The marking of homework was more complicated, so students had to be urged to submit homework and give timely feedback. From the perspective of students 'learning, students should be self-disciplined, and teachers should guide them to establish the idea of self-conscious learning. There were some shortcomings in the teaching, such as the students 'lack of practical training leading to disobedience, poor sense of cooperation, the direction of the teacher's questions was not clear enough, the students did not speak widely in the classroom, the teacher's language was not refined enough, and so on. Read more exciting novels for free
The following is the design and possible reflections on the teaching methods of the second volume of mathematics in the first grade: ##1. Teaching Method Design ###(1) Use visual aids 1. * * Understand the graphics ** - For the teaching of two-dimensional figures, one could prepare various three-dimensional figures (such as cubes, cuboids, columns, spheres) and two-dimensional figures (such as squares, cuboids, pyramids, circles). When explaining the two-dimensional figures, the students were asked to observe the faces of the three-dimensional figures and obtain the two-dimensional figures by rubbing or drawing. This way, the students could intuitively understand the concept of "face on body" and establish the connection between the three-dimensional figures and the two-dimensional figures. 2. * * Awareness of Mathematics ** - Prepare a small stick, a counter, and other teaching materials within 100. For example, when explaining the composition of numbers within 100, let the students use a small stick to count and intuitively see a few tens and a few ones to form a number; when explaining the concept of numbers, use a counter to let the students move the beads to understand the meaning of one, ten, and hundred, as well as the different values represented by the numbers on different digits. ###(2) Combining Reality with Life 1. * * Understanding RMB ** - It allowed students to simulate shopping scenes in class. Prepare some learning tools for RMB, set up a small shop, and let the students act as customers and salespeople to carry out simple commodity trading activities. In this process, the students can deeply understand the conversion relationship between yuan, jiao, and fen, as well as the use of RMB. 2. * * In addition and subtract within 100 ** - Create a life situation question, such as "Xiao Ming has 20 yuan and bought a 12 yuan stationery. How much money is left?" Or,"There are 30 boys and 25 girls in the class. How many students are there in total?" This kind of situation allowed students to feel the application of mathematics in their daily lives and improve their ability to solve practical problems. ###(3) Diverse practice methods 1. * * Mental Arithmetic Practice ** - It was in the form of a game, such as a group competition. The students were divided into small groups. The teacher showed the addition and deduction questions within 100 and let the groups take turns to answer. If they answered correctly, they would get points. If they answered wrongly, they would get points. Finally, the winning group would be selected. This method could increase the enthusiasm and speed of the students. - Make mental arithmetic cards and let the students do a certain amount of mental arithmetic practice every day. The card could write the calculations on one side and the answers on the other, making it convenient for the students to self-check. 2. * * Problem-solving practice ** - Layered assignments were assigned according to the students 'learning ability, which were divided into three levels: basic, improvement, and expansion. The basic homework was mainly to imitate the examples in the textbook; the improvement homework was to modify the examples appropriately and let the students use the knowledge they had learned to solve them; the expansion homework was some open questions, encouraging the students to solve the problems in different ways and cultivating the students 'innovative thinking. ###(4) Guiding the Exploration of Patterns 1. * * Find a pattern to teach ** - In the teaching of finding the pattern, some simple patterns or numbers were presented first, such as "red, blue, red, blue..." or "1, 3, 5, 7...", so that the students could observe and find the pattern. Then, he would gradually increase the difficulty and guide the students to create their own regular arrangements. This would cultivate the students 'interest in exploring mathematical problems and their ability to discover patterns. ##2. Reflection on Teaching ###(I) Reflection on the use of visual aids 1. * * Strengths ** - Visual aids could visualize abstract mathematical concepts, making it easier for first-year students to understand. For example, through the use of small sticks and counters, students had a clearer understanding of numbers within 100, and they could better use the concept of numbers in subsequent calculation studies. - When recognizing the graphics, the three-dimensional graphics and two-dimensional graphics were displayed in real life, so that students could personally feel the connection between them, which improved classroom participation and learning effect. 2. * * Inadequacies and improvements ** - Sometimes, the use of teaching aids might distract students. For example, in a shopping simulation, students might focus too much on the goods and ignore the learning of RMB. The improvement method was to clarify the rules and learning priorities before the activity, and strengthen the guidance and supervision of teachers during the activity. ###(2) Reflection on the combination of reality in life 1. * * Strengths ** - Combining it with reality could make students feel the practicality of mathematics and increase their interest in learning mathematics. For example, in the teaching of RMB, the simulation of shopping scenes allowed students to have a deeper experience of the use of RMB, and also enhanced their ability to apply mathematical knowledge in life. 2. * * Inadequacies and improvements ** - The creation of life situations may not be completely consistent with the student's life experience. For example, some students might not have any shopping experience and would have difficulty understanding the concept of price and change. The improvement measure was to understand the students 'life background before creating the situation, try to choose the scene that most students were familiar with, or supplement the relevant life knowledge in the teaching. ###(3) Reflection on Practice Methods 1. * * Strengths ** - The variety of practice methods, especially the mental arithmetic exercises in the form of games, greatly increased the students 'enthusiasm for learning. The group competition allowed the students to improve their speed and accuracy in mental arithmetic, and at the same time, it cultivated the spirit of teamwork. Layered assignments could meet the learning needs of students at different levels, allowing each student to improve within their own abilities. 2. * * Inadequacies and improvements ** - In the game practice, there might be situations where individual students 'participation was too high or too low. Students with high participation should be guided to learn to listen and help other students, while students with low participation should be encouraged and paid more attention to. When assigning assignments, one should pay attention to the difficulty of the assignment to avoid the difficulty being too high or too low. At the same time, one should give feedback and guidance to the students in a timely manner. ###(4) Reflection on the Teaching of Law Exploration 1. * * Strengths ** - Guiding the students to explore the law is helpful to cultivate their logical thinking ability and innovative thinking ability. The process of exploring laws from simple to complex allowed students to gradually master the methods of exploring laws and improve their ability to solve mathematical problems. 2. * * Inadequacies and improvements ** - Students with weaker comprehension abilities might not be able to keep up with the teaching progress. The improvement method was to use group cooperation in teaching, so that students could help each other and explore the rules together. Teachers could also provide individual tutoring for these students. <a href="/?from=ask_words" style="color:red" target="_blank">Read more exciting novels for free</a>
The following is a reflection on the teaching of first-year mathematics: - ** Success ** - ** Situation and interest cultivation **: integrate the concept of "efficient classroom group cooperative learning" into the teaching. By creating vivid and specific situations (such as animal sports prizes, calculation of the number of notebooks, etc.) to attract the students 'attention, students can learn to calculate in the situation, avoid boredom, enhance learning interest, and easily achieve learning goals. - ** Group Cooperation and Exchange **: Use group exchange and learning activities, and report individually within the group to create a warm and active learning atmosphere, which helps students understand and master calculation methods and theories. - ** Arithmetic Ability Cultivation **: Pay attention to the training of mathematical ability. Take 10 + 20 as an example. Students will have a variety of algorithms, such as placing small sticks (1 bundle plus 2 bundles, 3 bundles, or 30), using counters (1 plus 2 beads on the 10 digits, 3 tens, or 30), number composition (1 plus 2 tens, 3 tens, or 30), and adding the same digits (1 plus 1, 10 plus 10, 10 plus 10, 30). This will reflect the variety of algorithms and allow students to understand mathematical theory and broaden their minds during communication. - Knowledge comparison and pattern discovery: Guide students to compare knowledge, such as distinguishing between a few ones and a few tens, so that they can better grasp the calculation method and theory of adding and deducting a whole ten. They can quickly and accurately do mental arithmetic. - ** Inadequacies ** - ** Time allocation and ability to ask questions **: Although the teaching process is smooth and most students can calculate correctly, there is an uneven time allocation (first loose and then tight), and the students 'ability to ask questions is relatively weak. - ** Students 'ability to express themselves **: Many students can calculate the results, but when they are asked about the calculation ideas, they will not express themselves. This reflects the lack of expression training. Students should be allowed to speak more. - ** Practice design **: Practice forms, methods of guidance, and other aspects need to be carefully designed. Practice is an important means to consolidate new knowledge. It should be designed according to the physical and mental characteristics of the lower grade students, so that all students can actively participate in learning and consolidate new knowledge. <a href="/?from=ask_words" style="color:red" target="_blank">Read more exciting novels for free</a>
The following are some possible reflections on the fifth grade mathematics teaching of the People's Education Press: ** 1. Number and algebra ** 1. ** Elements and Multipliers ** - As for the teaching of the concepts of factor and multiple, students might have difficulties in understanding the concept of " In integral division, if the quotient is an integral number without a remainder, the dividends are the multiple of the dividends, and the dividends are the factors of the dividends." Teachers needed more examples to help students understand. For example, through specific integral division formulas, such as 12 div3 = 4, it was explained that 12 was a multiple of 3, and 3 was a factor of 12. - When teaching the features of 2, 5, and 3, although the rules were relatively clear, students might be confused when using these features to solve complex problems. For example, to determine whether a large number is a multiple of 2, 3, or 5 at the same time, teachers need to strengthen the teaching of the connections and differences between different characteristics. - The concepts of prime numbers and composite numbers were more abstract, and students might find it difficult to distinguish the relationship between prime numbers, composite numbers, and 1. The teacher had to guide the students to understand these concepts from the perspective of the number of factors, and let the students list the prime numbers and composite numbers within a certain range to deepen their memory. 2. ** The meaning and nature of scores, addition and deduction of scores ** - The meaning of a score was a difficult problem for students. Take a whole as a unit " 1 ", then divide the unit " 1 " evenly into a number of parts. The number that represented such a part or parts was the score. Teachers could use more physical demonstration or graphic display in teaching, such as taking a circle or a rectangular as the unit " 1 ", and then dividing it to represent the score, helping students understand the meaning of the score from intuitive to abstract. - In the teaching of fraction addition and substitution, students were prone to making mistakes in addition and substitution of different decimators, especially in the process of general fraction. Teachers needed to emphasize that the basis of general scores was the basic nature of scores, and through a large number of exercises, students should be familiar with the methods of general scores and reduction scores to improve the accuracy of the calculation of scores. ** 2. Spatial and graphic aspects ** 1. ** Observing objects ** - Students might find it hard to imagine different shapes when they put together a geometric object according to the shape seen from one direction. The teacher could let the students use the small cubes to observe from different angles, so as to cultivate the students 'spatial imagination and concept. 2. ** Cuboids and cubes ** - When teaching the characteristics of cuboids and cubes, students might not have a deep understanding of the concepts of edges, surfaces, and vertexes. Teachers could use physical models to let students count the number of edges and faces, measure the length of the edges, and better grasp the characteristics of cuboids and cubes. - As for the derivation and application of the formulas for the volume and surface area of cuboids and cubes, students might not be able to correctly judge whether to calculate the volume or the surface area when solving practical problems, or make calculation errors when using the formulas. Teachers should strengthen the analysis of practical problems, guide students to correctly distinguish the concept of volume and surface area, and carry out more targeted exercises. ** 3. In terms of statistics ** When teaching single-line and double-line charts, students might have problems reading the data in the chart, analyzing the trend of the data, and making predictions based on the chart. Teachers could ask students to collect data and create a line chart by themselves. In this process, they could understand the elements and significance of the chart and improve their ability to analyze and interpret the data. ** 4. Comprehensive applications ** In the comprehensive application of mathematics activities, students might not have a clear division of labor and lack the spirit of cooperation when working in a group. Or when solving practical problems, they could not effectively apply the mathematical knowledge they had learned to practical situations. Teachers should clarify the rules of group division before the activity, strengthen guidance during the activity, help students connect mathematical knowledge with practical problems, and improve students 'mathematical application ability. <a href="/?from=ask_words" style="color:red" target="_blank">Read more exciting novels for free</a>
The following is some content about the reflection and evaluation of mathematics teaching design in the first grade: * * 1. Achievement of teaching objectives ** 1. * * Knowledge and Skill Target ** - If the teaching goal was to let students master the composition of numbers within 100, for example,"10 ones are ten, 10 tens are 100" In the reflection of teaching, one could consider whether the students could skillfully use this knowledge to read and write numbers, split numbers, and other operations. The evaluation method could be judged by the completion of the classroom questions and exercises. For example, the students could write down the number of tens and ones in a certain number and see the accuracy of the students. - As for the teaching goals of the calculation class, such as ten minus nine and so on, they would abdicate within 20. Reflect on whether the students really understood the calculation method, such as the calculation theory of the "Breaking Ten Method". The evaluation could be measured by the student's calculation speed and accuracy. For example, a time-limited mental arithmetic test could be used to observe whether the student could skillfully use the method learned to calculate the formula of ten minus nine. 2. * * Course, Method, and Target ** - In terms of cultivating students 'observation, operation, and reasoning abilities, for example, in the teaching of finding patterns. Reflect on whether or not to give students enough space to explore independently, allowing them to discover the pattern of patterns or numbers. The evaluation could be done by observing the students 'ability to discover, describe, and use the rules to solve problems in class. For example, let the students continue to write a set of figures or numbers according to the rules to see if the students could operate accurately. - In statistics teaching, the goal was to let students experience the complete process of statistics. Reflect on whether or not to guide students to participate effectively in data collection, sorting, and analysis. The evaluation could be based on the student's performance in actual statistics, such as whether they could accurately collect and sort out data such as tooth replacement and simply analyze the information contained in the data. 3. * * Emotions, attitudes, goals ** - Think about whether the teaching process has cultivated students 'interest in mathematics. For example, whether the teaching has attracted students through interesting situations (such as counting lambs, Xiong Da and Xiong Er's wall, etc.). The evaluation could observe the students 'participation and enthusiasm in the classroom, as well as whether the students' attitude towards mathematics had improved. For example, whether they were more active in mathematics activities, whether they were more curious about mathematics problems, etc. * * 2. Teaching content ** 1. * * Reasonableness and difficulty of content ** - Reflect on whether the teaching content meets the cognitive level of first-year students. For example, in the teaching of numbers within 100, the number method when the number is close to the whole ten may be a difficult point for the first grade students. They have to consider whether the teaching content has been properly decomposed and guided. The evaluation could be based on the student's reaction in class, such as whether there were more confused expressions or questions that were difficult to understand. - The cohesiveness of the content was also very important. For example, when learning from numbers within 20 to numbers within 100, whether the knowledge was reasonably connected so that students could naturally learn new knowledge from the existing knowledge base. 2. * * The richness and variety of content ** - Check if the teaching content is rich and varied, and if it can attract the students 'attention. For example, in terms of practice design, other than written practice, are there more forms of practice, such as game-style mental arithmetic practice (like clapping games, etc.)? In terms of teaching materials, whether there were enough daily life examples (such as statistics on teeth, the number of lambs, etc.) to help students understand abstract mathematical knowledge. * * 3. Teaching methods and strategies ** 1. * * The effectiveness of teaching methods ** - If an intuitive teaching method was used, such as using a small stick to demonstrate the composition of numbers in the teaching. Reflect on whether this method really helped students understand abstract mathematical concepts, and whether there were still students who had difficulties understanding them. The evaluation could be judged by observing the process of the student operating the stick and the subsequent mastery of relevant knowledge. - In the application of inquiry-based teaching methods, such as finding the law in the teaching method, students can explore the law independently. Consider whether the students were given enough guidance and time, and whether each student could actively participate in the inquiry process. The evaluation could be measured by the participation of the group discussion, the discovery of the students in the process of inquiry, and the questions posed. 2. * * The flexibility of teaching strategies ** - In the classroom, whether the teaching strategy can be adjusted according to the students 'classroom reaction in time. For example, if a student found it difficult to understand a certain calculation method, could he explain it in another way, such as changing from an abstract numerical explanation to a specific physical demonstration? The evaluation could be judged by observing the teacher's adaptability in the classroom and the student's subsequent learning effect. * * 4. Usage of teaching resources ** 1. * * Use of teaching materials ** - He reflected on whether he had fully explored the examples and exercises in the textbook. For example, in the teaching of ten minus nine, whether the situation map and practice questions in the textbook were effectively used, whether the students could understand the calculation theory and master the algorithm from the content of the textbook. 2. * * Use of teaching and learning tools ** - As for the teaching tools used, such as sticks, discs, etc. He thought about whether they had played their greatest role and whether every student could learn effectively through the operation of teaching aids. The evaluation could be judged by observing the students 'concentration when operating the teaching materials and learning tools, as well as the improvement in their understanding of knowledge. * * 5. Student participation and individual differences ** 1. * * Overall student participation ** - Reflect on the participation of students in the classroom. Whether most students can actively participate in teaching activities, such as group learning, classroom discussion, practice, etc. It could be evaluated by observing the students 'classroom performance, the number of times they took the initiative to answer questions, and so on. 2. * * Individual differences ** - Consider whether the individual differences of the students have been taken into account in the teaching. For example, whether students with strong learning ability were provided with expansive learning content, and whether students with learning difficulties were provided with additional tutoring and support. It could be evaluated by analyzing the completion of homework and the answers to questions in class. <a href="/?from=ask_words" style="color:red" target="_blank">Read more exciting novels for free</a>
There were some achievements and challenges in the teaching of solving problems in the second volume of the second volume of mathematics in the second year. In terms of teaching results, through the creation of life situations, such as using the theme map of "happy festivals" to lead to practical problems that require division calculation, students will realize that quotient calculation is the need to solve problems, and they will realize that quotient calculation is an effective tool to solve practical problems. At the same time, through knowledge transfer, the students would be allowed to independently explore the quotient calculation method using the multiplication formula of 7 - 9. They would first review the quotient calculation method of the previous unit, then independently try to calculate the new division problem. Finally, through the teacher-student exchange to consolidate the learning method, it would help the students master the general method of quotient calculation and form calculation skills. Furthermore, when solving practical problems such as how many times a number is another number, the students would experience the process of abstracting the specific problem into a mathematical problem and determining the algorithm. This would cultivate the students 'sense of number. However, there were also some problems in the teaching process. The speed and accuracy of some students 'calculations were relatively low. This was an aspect that needed to be paid attention to. For example, in the unit test paper, some students did not carefully examine the questions, such as asking how many bottles of soda each person had on average. The students did not correctly distinguish the relationship between the number of people in each group and the total number of people. Also, in the question about comparing the prices of items, the students didn't take into account the fact that different quantities needed to be calculated first before they could compare them. It was easy to confuse concepts, such as the concept of "divide" and "divide by". This meant that the focus of solving problems in teaching was to analyze the relationship between quantities. It needed to be further strengthened to make the students more serious in examining the questions to improve the accuracy of the answers. <a href="/?from=ask_words" style="color:red" target="_blank">Read more exciting novels for free</a>
In the second volume of the sixth-grade mathematics semester, there were the following reflections. The teachers found many differences and perplexities in the process of teaching the sixth grade mathematics many times. Although there were innovation and improvements in this semester's teaching, such as grasping the key points to develop the students 'thinking and comprehensive application ability, there were still some problems. 1. [Problem with the progress of underachievers: After investing more time and energy in underachievers, the improvement in their grades will be small, and there will be a gap between their results and expectations.] They forgot knowledge quickly, and soon forgot what they had just been taught. It was difficult to make up for the accumulation of knowledge during comprehensive practice. 2. ** Students 'thinking and application ability problems **: Some students are not good at using their brains to think, drawing inferences from one instance, and passively accepting knowledge. He was not good at using knowledge to solve more complicated application questions, nor did he use line diagrams to help understand the meaning of the questions. 3. ** Study habits ** - ** Calculating Habits **: A small number of students have not developed good calculating habits. - ** Question review habit **: Some students do not review questions carefully, and they are prone to making mistakes in simple questions. - ** Checking Habits **: A small number of students do not check or do not check after they finish the questions. They turn a blind eye to obvious mistakes or are too lazy to check. 4. ** Comprehensiveness of teaching **: There are some inadequacies in the teaching process. <a href="/?from=ask_words" style="color:red" target="_blank">Read more exciting novels for free</a>
1. Teaching should start from life experience, such as using campus activities ("buying kites","changing glass", etc.) as the background, which can help stimulate the students 'childlike interest and encourage them to use the relationship between "yuan, angle" and "meter, decimeter" to smoothly communicate the relationship between decimal multiplication and integral multiplication, making students feel close. 2. The teaching of the significance of decimals and multiplication should be weakened, and the teaching of calculation should be emphasized. Through the creation of life situations, such as calculating the total price of mathematics books (0.52 yuan per book, four books per person), the students could make it clear that the meaning of multiplying decimals by whole numbers was the same as the meaning of multiplying whole numbers. They were both simple operations to find the sum of several identical addenda. 3. The conversion method should be used to teach the multiplication of decimals. For example, in the teaching of 0.72×5, the students should be guided to convert it into a known multiplication formula, let the students experience the conversion process, and learn to use the conversion thought to explore new knowledge. <a href="/?from=ask_words" style="color:red" target="_blank">Read more exciting novels for free</a>
The following is a second-year mathematics teaching case and reflection: ** 1. Teaching Case ** #(I) Introduction of the Situation 1. The animation video of the amusement park was used to show the train, the rotating plane, the cable car, the slide, and other amusement projects, guiding the students to observe the movement of each project. 2. Let the students classify the amusement park according to the way of exercise and introduce the concept of parallel movement. #(2) Initial Perception Shift Phenomenon 1. Show the pictures of cable cars, slide, and so on. Let the students use hand gestures to draw their movements and feel the characteristics of translation. That is, moving along a straight route, the size and direction of the object remain unchanged, only the position changes. 2. Ask the students to look for the translation phenomenon in their lives, such as sliding doors and windows, objects on the conveyor belt, etc., and let the students use the objects on the table to do the translation movement. #(3) Shift of Teaching Images 1. Show me an example of a triangle shift, such as three squares to the right. Many students might make the mistake of only counting one point and shifting it three squares to draw the shifted figure. The correct way was to first find the important points connected by the three sides of the triangle, shift these points three squares to the right, and then connect the lines to get the shifted figure. #(4) Count the movement distance in the grid map 1. For example, when the house moves up, the bird on the chimney says it moves up 5 squares, and the bird on the eaves says it moves up 4 squares. Let the students discuss who is correct and guide the students to think about the method of counting squares. 2. For the entire house to move to the right, let the students express their views on how many squares the house moved and evaluate it. 3. The students completed the textbook related exercises by themselves. #(5) Using translation knowledge to solve problems in life 1. Let the students summarize the gains of the knowledge. 2. Show the application of Pan motion in daily life and inspire students to think about how to use Pan motion to improve things around them for the convenience of life. ** 2. Reflection on Teaching ** 1. For the teaching of the concept of translation, through life examples and intuitive movements, it can help students understand better. However, in the teaching of graph translation, it was easy for students to make mistakes in counting the number of squares, especially when the whole graph was translated. They only paid attention to the translation of one point and ignored the corresponding points of the whole graph to shift the same number of squares as required. 2. In teaching, letting students prepare by themselves, communicate and demonstrate in small groups could improve students 'participation and understanding of knowledge. However, some students might make mistakes in group communication due to insufficient preparation or deviation in understanding of knowledge. Teachers needed to correct and guide them in time. 3. It was effective to let the students explore the grid method in the discussion by counting the moving distance in the grid diagram and judging the right or wrong by the number of squares moved by the bird's position. However, it was found that the students still had difficulty in judging the moving distance of different parts of the complex figure or the figure. They might need more practice and different types of examples. 4. The application of translation in teaching could make students realize the connection between translation knowledge and life. However, in the process of using translation knowledge to improve daily objects, the stimulation of innovative thinking was not enough. More guidance or case studies were needed. <a href="/?from=ask_words" style="color:red" target="_blank">Read more exciting novels for free</a>
The following is the teaching design and teaching reflection of the fourth grade's second volume, White Goose: ##1. Teaching Design ###(1) Introduction 1. Analyzing and Learning to Draw Questions - Let the students recite the words "Goose, goose, goose, curved neck to the sky; white hair floating in the green water, red palm stirring the clear waves" and appreciate it. Find out the color words, such as white, green, red, clear, etc., and then write a "goose" on the blackboard. - Students will be guided to compare the title of this poem with the title of the text. They will also review similar titles such as "White Bird","Golden Bamboo Hat","Wisteria Waterfall","Love of White Butterfly","White-haired Girl", etc. to draw out the beauty of the title. 2. introduce a new lesson - He introduced the topic about the goose that the students were familiar with. For example, what would come to mind when the goose was mentioned? If a student mentioned the poem "Ode to the Goose", they could recite it together, and then lead them to learn "White Goose" written by Mr. Feng Zikai to stimulate the students 'interest and want to know what the white goose looked like under his pen. ###(2) Catching Aoli's Clue 1. Please read the full text quickly and find the number of "Ao" words in the text (a total of 8) to draw out the clue of the "Ao" word. ###(3) Digging for Proud Comprehension components 1. Divide the students into groups (such as four groups) and ask them to find out which five aspects of "arrogance" are displayed and answer them first. - One-Pride craned his neck to look around. - Second Ao shouted. - the three prideful ones are in the way they walk. - Si Ao was eating. - Fifth Ao was looking at the scenery with his chest raised and his belly bulging. 2. According to the student's speech, the overall layout of "Proud" was revealed. ###(4) Deducting the reward for witty remarks 1. Ask the students to find the specific sentence describing "pride" in the text and say its subtlety. - For example,"It stretched its neck and looked left and right. When I saw his attitude, I thought, What a proud animal! Here, he used actions, expressions, and the psychology of others to write pride. The wonderful thing was that the front and back positions made the goose's pride appear in front of him. - "And in its cries, gait, and eating habits, it shows a kind of arrogance." The wonderful thing was to write pride through three aspects, and the two phrases "cry, gait, eating" formed the first paragraph, which was imposing and comprehensive. - "The duck's yapping sounds trivial and cheerful, with a hint of caution. The goose's yapping sounds solemn and solemn, as if it's scolding. A dog's barking was especially used for strangers or small people. When it saw its master, the dog would shake its head and tail, whining and begging for mercy. The goose, on the other hand, berated everyone and when it asked for food, it sounded like a master scolding me for being late for dinner." The wonderful thing was to compare ducks and geese, to write pride by analogy with Sir System, and to highlight the center through comparison and analogy. - "It stands proudly and won't let people come. Sometimes it won't let people come, but it will stretch its neck to bite you." The use of the former total after the points, the former general after the specific style to write arrogance, exquisite language. - "When the goose came back to eat, the rice pot was already empty. The goose raised its head and cried loudly, as if blaming the people for not providing enough. At this time, we will add food for it and stand to wait on it." He wrote about pride by describing the goose's expression and actions. - "Therefore, when the goose eats, there must be someone to serve it. You're really full of airs!" It could also allow students to perform with a full air of arrogance and draw out the vivid beauty of the language. ###(5) Proud of Being a Man 1. Teacher's example - When it was mentioned that the goose had contributed both physically and spiritually to us, so that both the mistress and the master liked it, the teacher held on to the "material and spiritual" to comment. For example, the material contribution was laying eggs, and the spiritual contribution was the joy of the master's mother and child picking up eggs, reflecting the comfortable life of the small farmhouse. ##2. Reflection on Teaching 1. ** Target and Time Control ** - In terms of teaching goals, it should be based on the characteristics of the teaching materials, the learning level of the students, and the intentions of the editors. For example, he had to clarify his knowledge and ability goals (reading, writing words, understanding words, correctly, fluently, and emotionally reading the text, etc.), process and method goals (understanding the characteristics of the white goose, learning the author's specific methods of grasping the characteristics, etc.), emotional attitude and values goals (experiencing the author's love). However, in actual teaching, attention should be paid to time control. For example, in some classrooms, because students had difficulty reading and understanding the text, especially middle and lower students, it was difficult for them to enter the inner taste of the language, resulting in prolonged teaching time and failure to complete the teaching task as expected. In the future, the teaching goal should be determined according to the focus of the unit training. The non-key content can let the students simply understand or read the interesting parts independently. 2. ** Students understand the situation ** - In the teaching process, we should pay attention to the students 'understanding of key sentences. For example, when students did not have a thorough understanding of words such as "snapped, shouted, and shouted," they could use comparison and other methods to guide them. However, they should pay attention to the effectiveness of the methods and avoid asking questions that were too difficult for the students to start with. 3. ** Reflection of teaching philosophy ** - Teaching should highlight the essential characteristics of the language subject, with language and writing as the core, so that students can learn through listening, speaking, reading, writing and other language practices. At the same time, the teacher should reflect the student's main body. As the student's collaborator, partner, and initiator, the teacher should guide the student to read and comprehend by himself. In reading, he should feel and taste the subtlety of the language. <a href="/?from=ask_words" style="color:red" target="_blank">Read more exciting novels for free</a>
In the second volume of the fifth grade of the People's Education Press, there are the following teaching reflections: - ** The role of the review segment **: The previous review of the least common multiple, the basic nature of scores, and the comparison of scores is effective. This allowed most students to solve problems independently and communicate within the class. - ** Class Communication **: There are many ways to communicate in the class, which reflects the variety of students 'thinking, but also reveals some problems. The students needed more practice in language expression, and because the students thought their own method was the best, it took more time to explain why they used the general fraction method to compare sizes and break through the difficulty of determining the common decimal. - ** Teaching Preset **: Due to the time-consuming communication segment in the beginning, the final expansion exercise could not be carried out. This shows that the teaching preset is not perfect enough. - ** Understanding of teaching methods **: The original intention was to let the students explore independently, cooperate and communicate, and make the students the masters of learning, but in practice, the teacher still said too much. This made teachers realize that in order to let students truly learn independently, teachers not only had to study the teaching materials in depth, but they also had to study the students 'learning and life experiences. In general, the general score teaching had its successes. For example, the review session laid the foundation for new knowledge learning, but there were also shortcomings. For example, the control of classroom communication and teaching assumptions needed to be improved, and the student-centered teaching method needed to be further implemented. <a href="/?from=ask_words" style="color:red" target="_blank">Read more exciting novels for free</a>