Freshman should learn all the basic courses, mathematical analysis, advanced algebra and analytic geometry.
Reconciliation between seniors and generations is relatively simple, but it takes a year and a half to learn mathematical analysis, which can be said to be very difficult!
Senior students study for one year and learn several things for half a year.
Then there will be selected lectures on mathematical courses such as mathematical analysis and probability theory.
And if it is a regular school, this major will generally be more strict!
If you are not a math major, it is relatively easy for a freshman to learn math in senior high school. If you are a liberal arts major, you don't have to study math. ...
As for boredom, it depends on whether you study well or not. If you learn well, you are not afraid of anything and are not bored. If you can't learn, I don't need to say more!
Question 2: What is the most difficult part of college mathematics? Hello,
Feeling integral is the most difficult, obscure and confusing!
Question 3: What is the most difficult part of college advanced mathematics? Indefinite Integral and Rectangular Frame Diagram
Question 4: Is college mathematics difficult? This problem is tricky.
To be clear, advanced mathematics and high school mathematics are not the same thing, and they are basically out of reach. Advanced mathematics is more like the demonstration and research of problem-solving thinking in order to solve model problems in mathematics and physics. High school mathematics is pure advanced arithmetic.
Some people are open-minded in mathematics and easy to accept new thinking methods. Advanced mathematics may be easier to learn.
If only from the score, most people can get 60 in advanced mathematics, and most of them should get 70 to 80 points, but those who get more than 90 points are either suitable for learning advanced mathematics or work hard at ordinary times. If you get more than 95 points or even full marks in the exam, this is out of the discussion.
Generally speaking, personally, it is still difficult to count high, especially to count one and several points. I won't talk about other advanced ones.
Question 5: Is college mathematics difficult? What is it like? College mathematics is called advanced mathematics, which basically means learning calculus ... As for the difficulty, it depends on personal ability. It must be a little difficult for people who are new to advanced mathematics, but it's not impossible to learn! ! Hope to adopt!
Question 6: The most difficult math textbook in China University is Sao Nian. After you work, 90% of your classmates only need junior high school math knowledge.
So don't take it seriously, the high number is still useful in the postgraduate entrance examination, after all, there is an exam.
But for me who got full marks in advanced mathematics and won the prize in college mathematics competition, hehe, it's a piece of cake.
Question 7: Is it difficult to analyze mathematics in college courses? What is mathematical analysis? Mathematical analysis is one of the compulsory courses for mathematics majors, and its basic content is calculus, but it is quite different from calculus.
Calculus is the general name of differential calculus and integral calculus, which is abbreviated as calculation in English, because early calculus was mainly used for calculation problems in astronomy, mechanics and geometry. Later, people also called calculus analysis, or infinitesimal analysis, especially the knowledge of using extreme processes such as infinitesimal or infinity to analyze and deal with calculation problems.
The early calculus was not developed for a long time because it could not convincingly explain the concept of infinitesimal. Cauchy and later Wilstrass perfected the limit theory as the theoretical basis, which made calculus gradually evolve into a basic mathematical discipline with strict logic, called "mathematical analysis", which is translated into Chinese.
The basis of mathematical analysis is real number theory. The most important feature of real number system is continuity. Only with the continuity of real numbers can limit, continuity, differential and integral be discussed. It is in the process of discussing the legitimacy of various limit operations of functions that people gradually establish a strict theoretical system of mathematical analysis.
Mathematical analysis is a basic course for mathematics majors. Learning mathematical analysis (and advanced algebra) well is the necessary basis for learning other subsequent mathematics courses such as differential geometry, differential equations, complex variable functions, real variable functions and functional analysis, calculation methods, probability theory and mathematical statistics.
As one of the most important basic courses in the department of mathematics, the logic and historical inheritance of mathematical science determine the decisive position of mathematical analysis in mathematical science, and many new ideas and applications of mathematics come from this solid foundation. Mathematical analysis is based on the rigor and accuracy of calculus in the theoretical system, thus establishing its basic position in the whole natural science and applying it to various fields of natural science. At the same time, the subject of mathematical research is the object after abstraction, and the mathematical thinking mode has distinct characteristics, including abstraction, logical reasoning, optimal analysis, symbolic operation and so on. The cultivation of these knowledge and abilities needs to be realized through systematic, solid and strict basic education, and the course of mathematical analysis is the most important link.
We are based on cultivating outstanding talents with solid mathematical foundation, wide knowledge, innovative consciousness, pioneering spirit and application ability to meet the requirements of the new century. From the perspective of personnel training, whether a student can learn mathematics well depends largely on whether he can really master the course of mathematical analysis after entering the university.
The goal of this course is to master the basic theoretical knowledge of mathematical analysis through systematic study and strict training; Cultivate strict logical thinking ability and reasoning ability; Skilled computing ability and skills; Improve the ability of establishing mathematical model and applying calculus to solve practical application problems.
Calculus theory is inseparable from the development of physics, astronomy, geometry and other disciplines. Calculus theory has shown great application vitality since its birth. Therefore, in the teaching of mathematical analysis, we should strengthen the connection between calculus and adjacent disciplines, emphasize the application background and enrich the application content of theory. The teaching of mathematical analysis should not only reflect the strict logical system of this course, but also reflect the development trend of modern mathematics, absorb and adopt modern mathematical ideas and advanced processing methods, and improve students' mathematical literacy. Many people say it's hard to tell the difference, which is true. However, it is quite simple compared with the last question of mathematics in the college entrance examination. I mean, compared to complexity. It is very important to learn a subject well through thinking and understanding, especially a subject with strong mathematical logic thinking. Of course, there is a lot of hard work. I think if a person only holds one book in class every day but rarely turns over the books, he will be at a loss. After all, it is not difficult to learn, but as long as he studies hard, it is actually a very basic course, laying the foundation for many mathematics majors in the future. I recommend some books that you can read. I recommend Fudan Chen's book and Chen Jixiu's book, but the topic after class is better than the last one. It is best not to use Tongji version of calculus. I don't think even novices look at it. Reference books, this is the most important.
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