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1. Step by step. Mathematics is an interlocking subject, and any disconnection will affect the entire learning process. Therefore, you should not be greedy for learning at ordinary times, you should pass chapter by chapter, and don't easily leave questions that you don't understand or don't understand deeply.
2. Emphasize understanding. Concepts, theorems, and formulas should be memorized on the basis of understanding. My experience is that every time I learn a new theorem, I try to do an example problem without looking at the answer to see if I can apply the new theorem correctly. If not, compare the answers to deepen your understanding of the theorem.
3. Basic training. Learning mathematics is indispensable for training, usually do more exercises of moderate difficulty, of course, do not fall into the mistake of drilling problems, to be familiar with the types of questions in the common test, training to be targeted. 4. Mark the key points.
When you usually look at the textbook, if you have a good solution method or key content, you can use a bright colored pen to draw it out, so that you can see it at a glance when you review it later. Finally, I would like to talk about the test-taking skills of mathematics. In a nutshell, it is"Easy first, then difficult"。
We often have the experience that when we are clear-headed, some difficult questions will be easily made; On the contrary, when the mind is chaotic, some simple questions will also waste a lot of time. During the exam, it is inevitable to encounter obstacles, and there are two possibilities to stop, one is that it took a lot of effort to finally make it, but because it took a lot of time, the next or not enough time to complete the question, or worried that there is not enough time, and the heart is anxious, and even the simple question cannot be done for a while; The second is that it is still not done, and the result is not only a waste of time, but also not even the following questions are completed. The first easy and then the difficult is to become more and more confident, and the mind is always clear, or finally make the difficult problems, or at least ensure that the questions that can be done do not lose points.
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This question is good to ask 11 you are a very good student ! 1. To learn math, first of all, you have to be interested in it! 11 Love it and don't hate it!
Take it with your heart and combine it with life11 1 1 1 Do more, practice more, accumulate more! 1. Focus on the basics of mathematics! Lay the groundwork!
Of course, perseverance is indispensable! 1. Actually, you already have a lot of potential! It's just that it hasn't rushed out yet!
1 1 But have faith that it will reward you well! ~!Believe in yourself! 1 Oh.
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1.Build a foundation in mathematics: Advanced mathematics is based on elementary mathematics, so you'll need to build a solid foundation in mathematics first. If you have difficulties in elementary mathematics courses, it is recommended that you review your knowledge of elementary mathematics until you have a deep understanding of the concepts and skills of elementary mathematics.
2.Math Tutorials: Tutorials can help you understand math concepts and examples. A large number of high-quality math** tutorials are available for free on YouTube and online course information platforms.
While learning more about new concepts, don't forget to review earlier chapters, which can help build memory and strengthen your math skills.
4.Get involved in the math community: Connect with other students who are learning math, and through discussions, you may get useful insights and tips on specific math concepts and examples.
5.Problem solving: Math is a science that requires practice, so you need to try to do more math problems. Doing problems will help you strengthen your understanding of mathematical concepts and sharpen your mathematical skills. Defending the rent.
Finally, to reiterate, it takes a lot of time and effort to learn advanced mathematics quickly. Mathematics is a subject that requires thoughtful and comprehensive mastery, there are no shortcuts, but if you put in a lot of effort and time, overcoming the difficulties will improve your math skills and make you more confident in applying mathematics.
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Wow, the above has said so much, if you read it, you can also finish reading a chapter of high number one (hehe, just kidding) In fact, high number one is mainly calculus, it is actually a variety of operations related to functions, so learners need to be familiar with the properties of various functions, operations, etc., these are basically the content of high school textbooks, in the high number one books are just a brief introduction. Personally, I think that to learn high mathematics well, you must first have solid basic skills. In particular, we must be familiar with the chapters on exponential functions, power functions, logarithmic functions, trigonometric functions, etc., and it is best to summarize the various properties and operations of these basic functions into a single **, which is convenient for query and use, otherwise it may take a lot of time to learn high math one.
The second is to read more books and do more topics. Because the chapters of the higher mathematics are interrelated and advanced layer by layer, each chapter is the basis of the next chapter, so the study must be done step by step, only the previous chapter can be really understood before you can enter the next chapter of learning, do not go to the speed of learning for the sake of speed, otherwise the problems that you do not understand will accumulate more and more, which will lead to the mentality of self-learners becoming more and more irritable, until you give up halfway. To learn high mathematics, confidence is very important, don't be frightened by temporary difficulties, you must persevere!
Good luck with your studies!
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If you want to learn the basics of high mathematics quickly, it is recommended to use a book from a vocational college The definition is easy to understand, and the basic derivative formula is the formula.
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This impatient, weak question, did you have a good foundation in high mathematics before? Personally, I think that only when the foundation is solid can I accept the high difficulty behind.
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There are a bunch of formulas, calculus formulas, and the questions in the workbook are OK to practice casually.
Since you said that it is the first semester of your junior year, then I advise you to focus more on professional courses, because professional courses also have to be studied well, and it is not too late to prepare for the next semester!!
1.Solution: f(x-a)=x(x-a)=(x-a+a)(x-a).
So f(x)=x(x+a). >>>More
I'd like to ask what the t in the first question is ...... >>>More
The first question is itself a definition of e, and the proof of the limit convergence can be referred to the pee. >>>More
First of all, understanding the example questions and being able to do the questions are two different things, so don't mix them up. Understanding the example questions can only say that you understand other people's thoughts, but not necessarily thoroughly (note that they are thorough). If you don't believe me, you will encounter a lot of details when you close the book and do the example questions in the book. >>>More