What should self-taught advanced mathematics learn? Advanced Mathematics is a supplementary book which is matched with the syllabus and teaching materials of the national higher education self-study exam "Advanced Mathematics (1) Calculus".
Book catalogue:
Chapter I Functions
Chapter II Limit and Continuity
Chapter III Derivative and Differential
The fourth chapter is the application of differential mean value theorem and derivative.
Chapter 5 Integral calculus of unary function
Chapter VI Multivariate Function Calculus
What is the main content of self-taught senior one? Is it difficult to teach advanced mathematics by yourself? How many subjects should I take in the self-taught undergraduate pharmacy? What is the key to the high number of self-taught students? Advanced Mathematics (1) is a tutorial book with the national self-study exam "Advanced Mathematics (1) Calculus" through self-study syllabus and teaching materials. Content of the book: Chapter II Limit and Continuity Chapter III Derivative and Differential Chapter IV Differential Mean Value Theorem and Application of Derivative Chapter V Integral of Univariate Function Chapter VI Calculus of Multivariate Function Is it difficult to learn advanced numbers by yourself? It is difficult to teach advanced mathematics by yourself. The self-taught exam is Advanced Mathematics (1), which has a certain difficulty coefficient, especially for candidates with poor mathematical foundation. Therefore, all candidates must pay enough attention to the study of this course, so as to successfully use this course examination. The difficulty of the examination paper of Advanced Mathematics (I) depends on the particularity of this course, because mathematics courses are not able to study independently like some technical courses, but should be trained on certain basic mathematics. Therefore, students can't fully master some basic mathematics, which will endanger students' course study. What subjects do you take in the self-taught pharmacy undergraduate course? Outline of China's Modern History Planning, Introduction to Basic Concepts of Marxist Realism, Chinese Medicine (II), Chinese Medicine Evaluation, Organic Chemistry (II), Pharmacy (III), Basic Principles and Machinery of Chinese Medicine Pharmaceutical Engineering, Chinese Medicine Preparation Analysis, Pharmaceutical Administration (I), English (II), Analytical Chemistry (II), Chinese Patent Medicine, Chinese Medicine Philology, and so on. Universities offering self-taught pharmacy include Nanjing University of Traditional Chinese Medicine, Shandong University of Traditional Chinese Medicine, Fujian University of Traditional Chinese Medicine, Hunan University of Traditional Chinese Medicine, Changchun University of Traditional Chinese Medicine and Shenyang Pharmaceutical University. The applicants are only on-the-job employees who have obtained the professional qualification of environmental sanitation, and college students who have technical positions of bachelor of traditional Chinese medicine or pharmacist or above and have been engaged in the production, manufacture and management of traditional Chinese medicine for more than three years. The public's demand for the cultivation of pharmacological talents has increased, and the development trend of biopharmaceuticals has been rapid. Especially after life is getting better and better, people's requirements for health care products are expanding, and the company is more interested in outstanding pharmacological talents. Another piece is biochemistry, which is a new top-notch enterprise with very good development prospects. Pharmaceutical university graduates are assigned to pharmaceutical companies and medical research institutes to engage in drug development, scientific research, manufacturing quality assurance, safe drug use and other aspects, and many of them are also engaged in agency work. I will mainly study calculus, linear algebra and probability statistics; It is difficult to teach yourself advanced mathematics, mainly depending on your foundation; Self-taught undergraduate pharmacy requires 20 subjects. Calculus, preliminary statistics, linear algebra; The difficulty is still great; There are 20 subjects in the examination, including pharmaceutical analysis, medicinal chemistry, basic computer application, organic chemistry, molecular biology and so on. Some of the main contents of self-taught high numbers and learning are calculus, linear algebra, probability theory and preliminary statistics, which are still very difficult; Self-taught undergraduate pharmacy requires 20 courses.
The difference between advanced mathematics II and advanced mathematics I There is a subject called advanced mathematics II and advanced mathematics II in adult college entrance examination.
First advanced mathematics
Chapter 1 Function, Limit and Continuity
Section 1 Functions
Section 2 Restrictions
Synchronize exercises and reference answers.
Section III Continuity of Functions
Synchronize exercises and reference answers.
Chapter 2 Differential calculus of univariate function
Section 1 Derivative and Differential
Synchronize exercises and reference answers.
L'H?pital's law in the second quarter
Synchronize exercises and reference answers.
The application of derivative in the third quarter
Synchronize exercises and reference answers.
Chapter 3 Integral calculus of unary function
The first section indefinite integral
Synchronize exercises and reference answers.
The second quarter definite integral
Synchronize exercises and reference answers.
The application of definite integral in the third quarter
Synchronize exercises and reference answers.
Chapter 4 Differential calculus of multivariate functions
Multivariate differential calculus
Synchronize exercises and reference answers.
The second part is a preliminary study of probability theory.
Chapter V Arrangement and Combination
Arrangement and combination
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The sixth chapter is a preliminary study of probability theory.
Section 1 Random Events
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The probability of events in the second quarter
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Section 3 Conditional Probability, Multiplication Formula and Independence
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Section 4 One-dimensional Random Variables and Their Numerical Characteristics
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"advanced mathematics I" course
Chapter I Limit and Continuity
Section 1 Functions
Section 2 Restrictions
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Section 3 Continuity
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Chapter 2 Differential calculus of univariate function
first derivative
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Differences in the second quarter
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Section 3 Differential Mean Value Theorem
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Section 4 L'H?pital Law
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Section 5 Application of Derivatives
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Chapter 3 Integral calculus of unary function
The first section indefinite integral
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
The second quarter definite integral
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
The application of definite integral in the third quarter
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Chapter IV Spatial Analytic Geometry
Section 1 Plane and Straight Line
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
The second section simple quadric surface
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Chapter 5 Multivariate Function Calculus
Section 1 Multivariate Functions, Limits and Continuity
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Section 2 Partial Derivative and Total Differential
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Extreme value of binary function in the third quarter
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
In the fourth quarter, the concept and properties of double integral
I. Executive summary
Second, synchronous exercises and reference answers
Section 5 Calculation of Double Integral in Cartesian Coordinate System
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Calculation of Double Integral in Section VI Polar Coordinate System
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Section 7 Application of Double Integral
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Chapter VI Infinite Series
Section 1 Concepts and Properties of Infinite Series
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Positive term sequence in the second quarter
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Section III, Any Series
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
The fourth quarter power series
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
The fifth section expands the elementary function into a power series.
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Chapter VII Ordinary Differential Equations
Section 1 First-order differential equations
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
Section 2 Linear Differential Equations with Constant Coefficients
I. Executive summary
Second, the case analysis
Third, synchronous exercises and reference solutions
What about the poor foundation? Now there is only one advanced mathematics exam. At present, there is only one higher mathematics, limit, derivative and calculus. It is recommended to read a good book, and especially important formulas and theorems must be remembered. If you don't understand, use examples to remember, try to understand, and then do more exercises, including after-school exercises and self-taught exercises. Mathematics is boring, especially those with poor foundation. They must make up their minds and beliefs to win and force themselves to see it! ! At that time, I only had the foundation of junior high school, and it was 10 years ago. Later, the door was closed for more than 40 days, and it was still chewed out. This is my experience, I hope it will help you.
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