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1. Arrange your time carefully. First of all, you need to know what you want to do during the week, and then create a schedule of work and rest. Fill in the form with the time you have to spend, such as eating, sleeping, going to class, having fun, etc.
Once these times have been scheduled, a suitable, fixed time is chosen for studying, and sufficient time must be set aside for normal reading and homework. Of course, studying should not occupy all the free time on the schedule, but should always set aside some time for rest, hobbies, and entertainment, which is important for studying. A schedule may not solve all your problems, but it will give you an idea of how to spend your time during the week so that you have plenty of time to study and have fun.
2. Pre-school preview. This means that before you start learning, you should take a quick look at the content you want to learn to understand the general content and structure of the learning so that you can understand and digest it in time. Of course, you need to pay attention to the importance and detail, you can spend less time in less important places, and you can slow down the learning process a little bit in important places.
3. Make the most of class time. Students who do well academically benefit greatly from making the most of their time in class, which also means spending less effort after class. In class, you should cooperate with the teacher in a timely manner, take notes to help you remember what the teacher teaches, and it is especially important to actively think independently and keep up with the teacher's thinking.
Fourth, there should be reasonable rules in learning. The notes you take in class should be reviewed after class, not only to review the important content that the teacher taught in class, but also to review what you still have vague understanding. If you keep reviewing your notes and textbooks regularly and doing some related exercises, you will be able to understand them more deeply and your memory will last longer.
5. Find a quiet and comfortable place to study. It's important to choose a place to be your place of study. It can be your single den or classroom or library, but it must be comfortable and quiet. When you start studying, you should give your full attention to your homework.
Sixth, you can't study when you have mood swings. Scientific studies have shown that it is very difficult to concentrate when studying mathematics and other science and engineering subjects, so it is important not to have emotions such as arguing with classmates or excitating strenuous exercise before studying. Otherwise, you will not be able to concentrate for a while and will not be able to enter the learning state.
Therefore, before studying, it is necessary to calm down and concentrate on the work, so as to achieve twice the result with half the effort.
7. Establish a correct view of examinations. The purpose of the test is mainly to see how well you have mastered the coursework, so you should not cheat on it, but treat it calmly. Perhaps, you have one or two exam results that are not satisfactory, but it doesn't matter, as long as you study solidly and take it seriously, you will definitely get good results in the next exam.
Quizzes will help you understand where you need more effort in your next step, and it will help you remember your new knowledge firmly.
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It is necessary to master some analytical methods, such as: combination of numbers and shapes, complementary thoughts, reverse thinking, and then do more questions to summarize in time.
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Study the textbook first, and then do more questions.
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High school is different from junior high school, and high school has a lot of knowledge points, and it also extends a lot. Can't let up. I was pretty good at math in high school.
Always one hundred and thirty-five or more. Most of them are careless points lost. My approach is also very simple.
Hope it helps.
First of all, I always know the concept of the book very well and understand it well. For example, the first year of high school is mainly a function, and a function is the foundation. Function concepts, parity, elementary functions, etc.
Second, I attach great importance to the example questions in the book and always study them. The example problems show the basic application methods and problem-solving thinking. It mainly depends on thinking and methods, if you have the conditions, you can learn from a tutorial class to expand your own learning thinking, this is how I came over, you can refer to it.
Third, do the exercises. The practice of math problems is indispensable. But don't do all the questions, you will do a lot of useless work. The exercises in the book, the types of questions in the college entrance examination, etc., are generally very standardized. From easy to difficult.
Fourth, learn to think independently. Don't ask anyone about everything. Don't always look at the answer to form a dependency. It's important to think more and have your own thinking system. It also exercises the brain.
Fifth, there will be no practice there.
Special exercises are carried out for the type of questions, knowledge points, and places that will not be conducted. Now there's a word for deliberate practice. That's what I'm talking about.
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Mistakes are summarized. Summarize the rules. Listen carefully to the explanations in class. Example analysis is good to watch. It's best not to make up classes! Don't let the tutor's solution ideas affect you.
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Hope it helps!
Wish: Academic progress!
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Listen carefully in class and practice more after class.
Mathematics: Theorems in textbooks, you can try to reason on your own. This will not only improve your proof ability, but also deepen your understanding of the formula.
There are also a lot of practice questions. Basically, after each class, you have to do the questions of the after-class exercises (excluding the teacher's homework).
Listening: You should grasp the main contradictions and problems in the lecture, think synchronously with the teacher's explanation as much as possible when listening to the lecture, and take notes if necessary
Reading: When reading, you should carefully scrutinize, understand and understand every concept, theorem and law, and study together with similar reference books for example problems, learn from others' strengths, increase knowledge, and develop thinking
**: To learn to think, after the problem is solved, then explore some new methods, learn to think about the problem from different angles, and even change the conditions or conclusions to find new problems
Homework: Review first and then homework, think first and then start writing, do a class of questions to understand a large piece, homework should be serious, writing should be standardized, only in this way down-to-earth, step by step, in order to learn mathematics well
In short, in the process of learning mathematics, we should realize the importance of mathematics, give full play to our subjective initiative, pay attention to small details, develop good mathematics learning habits, and then cultivate the ability to think, analyze and solve problems, and finally learn mathematics well
In short, it is a process of accumulation, the more you know, the better you learn, so memorize more and choose your own method.
Good luck with your studies!
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It is impossible not to make careless mistakes, but you can reduce them, do more exercises, do more mistakes in the same type of questions, know where mistakes may go wrong, and reduce the chance of mistakes due to carelessness when you do it again next time.
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If you learn math well in high school, it will help you in other subjects. In particular, Confidence High School Mathematics focuses on ideas, not simple problem solving.
First of all, you must master every knowledge point taught by the teacher in class.
Memorize definitions, formulas, etc., as well as the characteristics of formulas. It is best to write the second silently in the morning, do the questions, and practice the thinking.
Look at what each question requires, and what knowledge points or formulas should be placed in the thing If other conditions are needed in the formula used, then combine the knowledge told in the question, think about other formulas or knowledge points with the required results, so as to form a habit and push it down layer by layer. The mind is here.
Third, after exercising, find the feeling.
That is, each question has a breakthrough point, once you analyze a question, you will find it, this is the inspiration you have cultivated, in the case of familiarity with the formula, a brain emerges, which knowledge points can be combined, it is logical...
Good luck with improved grades. Friend..
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Considering that your foundation is relatively poor, I will say something that is more practical for the exam, I hope it will be useful to you.
First of all, the first three questions of the multiple-choice questions are hard calculations, and they are guaranteed to be won step by step, as for the 4th to 10th questions, it depends on whether they can substitute special values, and many times special values can be applied, as for the last two multiple-choice questions, if you can't substitute special values, if you can't, don't waste time, it's good to be blind, it's best to choose b or c, I spent two minutes on multiple choice questions, all of them, and finally got 9 questions right, so the answers are still skillful.
The second is the fill-in-the-blank question, it is best to win the first two questions, if you really can't do it, there is no way, if you think the final answer is a number, try to fill in 0 or 1, so that the accuracy rate may be a little higher.
For the next big questions, the first three are simple, you don't waste time now on any other problems, that is, now do more of the first three such questions, this is the key place you want to think of 70 points, trigonometric functions, simple probability problems, as well as simple functions and simple geometry, these are all you have to get back, in fact, it is very simple, do more questions, do more questions before the exam is your magic weapon to win is also the only **, I myself am a vivid example, My college entrance examination score is 100 points higher than my score in the third model, and the secret is to do more questions.
As for the last few questions, generally the first question is very simple, you must try to get it, for the proof question, no matter what, you have to write out all that you can get by passing the conditions, no matter whether you will be able to do this question or not, you must not not use the pen because you can't, remember.
For solid geometry, if you don't know, then use the stupidest method, establish a coordinate system, mark the coordinates of each point, write it, and write as many conclusions as you can get, try to rely on what you need, remember, rather write more than less.
I hope these heartfelt words are useful to you.
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1. Changes in the characteristics of high school mathematics and junior high school mathematics.
1. The language of mathematics is abrupt in the degree of abstraction.
Many students reported that concepts such as sets and mappings were difficult to understand, and they felt that they were far away from life and seemed to be very "mysterious". Indeed, there is a significant difference between the language of mathematics in middle and high school. Mathematics in junior high school is mainly expressed in a figurative and popular language.
In the first year of high school, mathematics suddenly touches on the abstract set language, the logical operation language, the function language to be learned later, the three-dimensional geometry of space, and so on.
2. The thinking method jumps to the rational level.
Another reason why high school students have math learning disabilities is that the way of thinking about math in high school is very different from that in junior high school. At the junior high school level, many teachers have established a unified thinking mode for students to solve various problems, such as solving fractional equations in several steps, factoring what to look at first, and then what to look at, even if it is a plane geometry problem with very flexible thinking, it also determines their own thinking routines for line segments and angles 、、、 equal. Therefore, junior high school learning is accustomed to this mechanical, easy-to-operate fixed way, while high school mathematics has produced great changes in the form of thinking, as mentioned in the previous section, the abstraction of mathematical language has put forward high requirements for thinking ability.
Of course, the development of ability is gradual, not overnight, and this sudden change in ability requirements makes many high school freshmen feel uncomfortable, so it leads to a decline in grades. Freshmen must be able to transition from empirical abstract thinking to theoretical abstract thinking, and finally need to initially form dialectical thinking.
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It's very simple to improve your score in high school math, memorize the basic formulas, do some basic questions, and make sure that the simple questions don't lose points, and it's good to get points for multiple-choice questions in this regard, because if you do the math correctly, there will be the same answer below!
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Emphasis is placed on listening to lectures in class, timely review after class The acceptance of new knowledge and the cultivation of mathematical ability are mainly carried out in the classroom, so special attention should be paid to the learning efficiency in class and the correct learning methods should be sought. During class, you should follow the teacher's ideas, think positively, and compare the differences between your own problem-solving ideas and what the teacher said. In particular, it is necessary to grasp the learning of basic knowledge and basic skills, and review them in a timely manner after class without leaving any doubts.
First of all, recall the knowledge points taught by the teacher before doing various exercises, correctly grasp the reasoning process of various formulas, try to recall by yourself, and do not turn the book immediately when you encounter difficulties. Conscientiously and independently complete homework, diligent thinking, in a sense, I do not fully agree with the learning style of not knowing that you do not understand, for some topics due to their own unclear thinking, it is difficult to solve for a while, you should let yourself solve, you should let yourself calm down and seriously analyze the topic, try to solve it yourself. In each stage of learning, it is necessary to organize and summarize the points, lines, and surfaces of knowledge to weave a knowledge network and incorporate it into one's own knowledge system.
Do more questions appropriately and develop good problem-solving habits.
If you want to learn mathematics well, it is inevitable to do more problems, and be proficient in solving ideas for various types of problems. At the beginning, you should start with the basic questions, focus on the exercises in the textbook, practice repeatedly to lay a good foundation, and then find some extracurricular exercises to help you develop ideas, improve your analytical and problem-solving skills, and master the general rules of problem solving. For some easy-to-make solutions, you can prepare a set of mistakes, write your own solution ideas and correct solution process, and compare the two to find out your mistakes, so as to correct them in time.
In normal times, it is necessary to develop good problem-solving habits. Let your energy be highly concentrated, so that your brain is excited, your mind is quick, you can get into the best shape, and you can use it freely in exams. Practice has proven that:
When it comes to critical times, you will be in the same way as you would normally practice. If you are casual, careless, careless, etc., you will often be fully exposed in the big exam, so it is very important to develop a good habit of solving problems. Adjust your mindset and approach revision exams correctly.
During the period of review for the exam, first of all, we should focus on the three aspects of basic knowledge, basic skills, and basic methods, because the vast majority of each exam is also a basic topic, and for those difficult and comprehensive topics as an adjustment, think carefully, try to sort yourself out, and summarize after completing the questions. Adjust your mentality, make yourself calm at all times, think in an orderly manner, and overcome impetuousness. Especially have confidence in yourself and always encourage yourself.
Before the exam, you should be prepared, practice the regular questions, put your own thinking, and do not drill difficult problems before the exam. During the exam, it is necessary to seek stability first, and then attack difficulties. Improve the speed of problem solving on the premise of ensuring the accuracy rate.
For some easy basic questions, you must be sure to get full marks; For some difficult problems, you should also try to get points, and learn to try to score in the exam, so that your level is normal or even extraordinary.
Mathematics: 1Do a good job of pre-class preparation and grasp the initiative to listen to the class. >>>More
Yes, the basic questions of any high school math test paper should account for 70%, and you just need to insist on mastering a few knowledge points every day, doing more questions, and doing more test papers.
I only scored 61 points in math in the high school entrance examination, but after I entered high school, I got better at math. The main reason is that I listened carefully in class, consolidated carefully after class, and asked the teacher quickly if I didn't know the questions, and the grades were raised.
Mathematics mainly cultivates students' thinking, and if you want to learn high school mathematics well, I think you should start with the following points: >>>More
I'm also having the same issue.