Question 2: What subjects are mainly offered in mathematics major? Mathematical analysis, advanced algebra, elementary number theory, etc. Other basic courses include real variable function, complex variable function, ordinary differential equation, partial differential equation, geometry, cryptography, group theory, topology, combinatorial mathematics and so on. There are also some courses related to the development direction of other frontier science and technology, such as mathematical and physical equations and group representation theory, which depend on basic mathematics or applied mathematics.
Question 3: What majors in the Department of Mathematics in universities are generally not subdivided? Graduate students generally have recommended answers.
Basic mathematics, applied mathematics, computational mathematics, financial mathematics, statistics, operational research, topology. There are many fields such as number theory, probability theory, functional analysis and so on.
Question 4: What are the compulsory mathematics courses in Zhejiang University?
06 Mathematical Analysis (A I) 06 Mathematical Analysis (A II) 06 Mathematical Analysis (A III) Ordinary Differential Equation (A)
Higher Algebra (i) Higher Algebra (II) Topology of Abstract Algebra Point Sets
Complex analytic geometry differential geometry of partial differential equations
Functional analysis real variable function optimization practical algorithm combinatorial optimization
Algorithm language for numerical approximation of numerical algebraic differential equations.
Discrete Mathematical Database for Scientific Computing Data Structure
Probability theory multivariate statistical analysis regression analysis mathematical statistics
Stochastic Process of Wang Xiuyun Life Insurance Modern Actuarial Risk Theory
Multivariate statistical analysis of sampling survey, mathematical planning and financial mathematics
Public class
Calculus 1 Calculus 2 Calculus 3 Advanced Mathematics
Ordinary differential equation, partial differential equation, complex variable function and integral transformation linear algebra course
Probability theory, mathematical statistics, stochastic process
optional course
Measure Theory Abstract Algebra II Algebra Geometry Introduction Algebra Topology
Fractal geometric ring theory in the basic category of harmonic analysis
Introduction to geometric analysis, group theory, real analysis, number theory guidance
Wavelet analysis of homotopy and homology differential manifolds in global differential geometry
Mathematical modeling of homology algebra mathematical model game theory
Geometric theory and method iterative control theory basis combinatorial mathematical optimization
Visual programming technology of operating system computer graphics and its application software design method
Principles of actuarial risk management of microcomputer informatics insurance
Experimental design and statistical principle of econometric reliability analysis
Modern probability theory, operational research, national economic statistics, monetary banking
Statistical computing and SAS
For details, please refer to the teaching arrangement of Mathematics Department of Zhejiang University: math.zju.edu/...%CC%AC.
Question 5: What are the career development directions of mathematics major? Let's talk about our classmate's 1. Finance. We are applied mathematics in the financial field, and we haven't learned much specialized courses in the computer field, so most of them have actually entered the financial industry. For example, those who enter the bank, securities, postgraduate entrance examination and Otawa finance are related, and it is said that undergraduate mathematics is very popular. 2. Cheng Well, I am the representative. 3. Teacher, well, Cheng sitting opposite me is also a math major, but she has been a teacher for two years. 4. Other majors have a lot to do with what major. In addition, when I was looking for a job, I found that there were few majors completely related to mathematics, but there were quite a few. So I can vote with my eyes closed. I have interviewed traders, market analysis, logistics analysis, process and so on.
Question 6: What subjects should undergraduates majoring in mathematics study? Professional basic courses:
Analytic geometry (last semester of freshman year)
Mathematical analysis I (last semester of freshman year)
Mathematical analysis II (freshman semester)
Mathematical Analysis III (sophomore last semester)
Advanced algebra I (freshman last semester)
Advanced Algebra II (freshman semester)
Ordinary differential equation (sophomore last semester)
Abstract algebra (second semester of sophomore year)
Fundamentals of probability theory (second semester of sophomore year)
Complex variable function (second semester of sophomore year)
Modern algebra (second semester of sophomore year)
Professional core courses:
Real variable function (last semester of junior year)
Partial differential equation (last semester of junior year)
Probability theory (last semester of junior year)
Topology (next semester of junior year)
Functional analysis (next semester of junior year)
Differential geometry (next semester of junior year)
Mathematical equation (junior year next semester)
Specialized elective courses (basically all senior courses):
Note: Specialized elective courses are optional, and the specialized elective courses in different schools are generally different. If it is self-study, you can choose according to your own interest direction. It should be noted that if you take the postgraduate entrance examination or work, you can choose according to your specific needs, and generally choose 3 to 5 courses.
Discrete Mathematics (last semester of sophomore year)
Numerical calculation and experiment (second semester of sophomore year)
Analysis (1)
Algebra (1)
Galois theory
complex analysis
algebraic number theory
Introduction to dynamic systems
Basic number theory
Partial differential equations (continued)
Geographical topology
theoretical mechanics
mathematical modeling
Differential topology
harmonic analysis
Geometric theory of ordinary differential equations
Selected lectures on analytical topics
Combinatorial Mathematics and Graph Theory
Category theory
Compact riemannian surface
A Preliminary Study on Riemannian Geometry
Part of modern theory
Commutative algebra
algebraic topology
Homology algebra
Manifolds and geometry
Wavelet and harmonic analysis
Lie group lie algebra
Analysis Ⅱ
Algebra Ⅱ
algebraic k theory
algebraic geometry
Multi-repetition variable basis
Functional analysis (continued)
Derived category
Recommend some links to the department of mathematics in your school:
Curriculum system of Peking University Institute of Mathematical Sciences: math.pku.edu:8000/courses/index.php? Sorting =2
Fudan Mathematics Undergraduate Education: math.fudan.edu/und/ShowClass.asp? ClassID = 46
Undergraduate Teaching Plan of Mathematics Department of Nanjing University: njumaths.nju.edu/
You can pay attention to the curriculum, training plan, curriculum arrangement, curriculum construction and syllabus of each school for reference.
Introduction to Main Courses (Normal Colleges)
0 11011mathematical analysis (1) mathematical analysis
Course nature: professional basic course hours: 1 12 credits: 7.
Introduction: Mathematical Analysis is the most important specialized course for mathematics majors. The main content of the first semester is the analysis foundation. Chapter 1 Function, Chapter 2 Limit, Chapter 3 Continuous Function, Chapter 4 Real Number Continuity, Chapter 5 Derivative and Differential, Chapter 6 Basic Theorem of Differential and Its Application, Chapter 7 Indefinite Integral and Chapter 8 Definite Integral.
Prerequisite requirements: None
Textbooks and reference books: Lectures on Mathematical Analysis edited by Liu Yulian and Fu Peiren, Higher Education Press.
Applicable Major: Mathematics and Applied Mathematics Term: Autumn
01101021mathematical analysis (2) mathematical analysis
......& gt& gt
Question 7: What should I do to learn mathematics? Hello, I am also a college student of your major. This is the information I collected. I hope you will be satisfied.
Mathematics and applied mathematics are the foundation and rising platform of computer science and technology, and they are one of the most closely related majors. This major is a basic major with a wide range of employment, but postgraduate entrance examination is still the first choice for graduates of this major. In daily life, from weather forecast to stock fluctuation, mathematical description and analysis methods are everywhere. Among the top ten majors with the largest number of graduates in Beijing, mathematics and applied mathematics are in the forefront. From the above data analysis, it is not difficult to see that the demand for mathematics talents is large and the employment prospects are promising. Moreover, it can be predicted that with the development of economy and society, there will be more and more demand for mathematics and applied mathematics professionals in the market, and the employment prospects will be broad.
Because mathematics and applied mathematics are closely related to other related majors, there are many similar majors to choose from, so it is much easier to apply for this major than other majors, and it is much easier to re-choose a job and change careers, which is conducive to better employment in the future.
Qualified software talents need to have a "solid mathematical foundation" and "strict logical thinking ability".
IT staff: Consider the needs of professional and career development.
Employment analysis: Mathematics and applied mathematics are basic majors, and they are "parents' majors" of other related majors. Graduates of this major have inherent advantages if they want to "change careers" and enter careers such as scientific research data analysis, software development and 3D animation production. "In improving the speed and efficiency of a software, new ideas and methods are needed, and the innovation ability of mathematics experts is stronger than that of ordinary computer students." An engineer from a well-known IT company said. In the sample survey of 230 successful people in IT industry, 200 people belong to those who realize career re-selection based on mathematics or related majors.
Professor Wang Xuan, an academician of China Academy of Sciences, told college students at the opening ceremony of Founder Software Technology Research Institute in Peking University: To be a qualified software talent, you need to have a "solid mathematical foundation" and "strict logical thinking ability". Strict logical thinking ability comes from a deep and solid mathematical foundation. It can be seen that the majors of mathematics and applied mathematics are the basis for engaging in other related majors.
Representative occupation: programmer
Salary: The salary level of programmers that most people will engage in varies greatly. The monthly income of junior programmers is generally around 2000 yuan, and the monthly income can reach 5000 yuan to 6000 yuan.
Case: I was forced to become a programmer-a second-rate school. After graduation, I didn't want to go back to my old tutor for junior high school mathematics, and I had too much English for postgraduate entrance examination, which forced me to turn to software design. Two years after graduation, although my salary has experienced ups and downs, on the whole, I am quite satisfied.
After graduation, I applied for a job in a company. There were three people competing for the position at that time. During the interview, we all behaved almost the same, saying how strong we are, how many languages and programming tools we can use, and how rich our experience is.
The link that won me in the end was that the recruiter came up with a fund management project, asking everyone to give their own design plan after thinking. One of the core problems is to calculate the minimum fluctuation value of funds, which requires a lot of data and high efficiency. We have no problem with the object-oriented analysis of the whole program. After all, these things are very important in school, and they are not really difficult. However, when they encounter the most critical problems, they will get stuck, and the solution needs simple double loop and time complexity (n 2). After thinking hard, one of my competitors replied: use trees. But he couldn't explain the specific technical details clearly, and the efficiency analysis was sloppy. Only I, because I like mathematics better in school, gave the scheme of using AVL tree at that time, and made a detailed efficiency analysis and time-space transformation by using high number derivation, and put forward the method of introducing assembly. Finally, I got the job.
In short, having a solid foundation in mathematics and data structure is a necessary condition for becoming a master programmer.
Paul, vice chairman of Citibank, USA? Kosslyn said: "A person engaged in banking, who doesn't know mathematics, can only do trivial things."
Business people: professional advantages and good career prospects.
Employment analysis: Financial mathematicians have become one of the most sought-after talents on Wall Street. The simplest example is that the insurance company with the highest status and income may be the general manager >>
Question 8: What's the difference between college mathematics and applied mathematics? Basically, there is not much difference. Applied mathematics is a cover, because it is difficult to recruit students for mathematics majors, so the new word applied mathematics has attracted people's attention. If you really want to apply mathematics, choose engineering or economics. Don't be fooled by this word game.
Question 9: What courses are there in the Department of Mathematics? Mathematical analysis: the theory and calculation method of calculus
Advanced Algebra: Theory and Calculation Methods of Matrix and Linear Space
Analytic geometry: spatial analytic geometry (plane analytic geometry is studied in middle school)
Complex variable function: calculus of complex numbers (mathematical analysis is calculus of real numbers)
Ordinary differential equation: To solve an equation, the equation contains only one unknown, and the unknown appears in the form of differential or integral.
Real variable function: the range of calculus is expanded, and mathematical analysis can only integrate continuous functions. After introducing measure and l integral, discontinuous function can also be integrated.
Functional Analysis: Global Properties of Functions
Abstract algebra: a certain range of numbers, and the result of an operation is still within this range (the result of rational number division is rational number, and the result of integer division is not guaranteed to be integer)
Point set topology: invariance of graphics after stretching (compression)
Differential geometry: studying the properties of geometric figures by calculus method
Partial differential equation: solving an equation, which contains many unknowns, and the unknowns appear in the form of differential or integral.
Elementary number theory: an elementary method to study the properties of numbers
* * * Theory: Almost all mathematics can be described by * * *
Probability theory: using permutation and combination and calculus to study random phenomena
Mathematical statistics: using probability theory to count the laws of things.
English: CET-4.
C language: programming language, which can directly generate the original hard code.
C++ language: programming language, adding object-oriented mechanism to C language.
Data structure: the organization method and fast algorithm of data used by programs.
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