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Fool the online buy it, it's convenient and cheap. The title of the book is the same as the one upstairs.
A Guide to the Complete Solution of Advanced Mathematics Learning Problems (Tongji 6th Edition) (Volume I) Author: Department of Mathematics, Tongji University.
Publisher: Higher Education Press.
16 open printing: 4 sheets: offset paper i s b n :
9787040207453 Packing: Paperback.
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Tongji itself published the exercises in the 6th edition of the Tongji book, and provided some answers and guidance.
A Guide to the Complete Solution of Advanced Mathematics Learning Problems (Tongji 6th Edition) (Volume I) Author: Department of Mathematics, Tongji University.
Publisher: Higher Education Press.
16 open printing: 4 sheets: offset paper i s b n :
9787040207453 Packing: Paperback.
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Upstairs is right, this book is very complete.
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(A080) Tongji University.
Engineering Mathematics Linear Algebra.
Textbook + Study Tutorial and Exercise Solution, Higher Education Press.
pwd=dj5p extraction code: dj5p (A080) Tongji University Engineering Mathematics Linear Algebra Textbook + Learning Aid and Exercises Higher Education Press|8 Li Yongle.
Mobile phone can be seen|6 Sun Yat-sen University.
Linear Algebra 78 Lectures CSF format requires a computer**|5 Sichuan University Linear Algebra 59 Lectures FLV format mobile phone can be viewed|4 University of Petroleum Linear Algebra 28 lectures CSF format requires computer**|3 Shanghai Jiao Tong University.
Linear Algebra 36 Lectures ASF format mobile phone can be seen|1 Jilin University.
Linear Algebra 66 Lectures FLV format mobile phone can be seen|CSF format version: High definition, computer required****|Linear Algebra (Lecture 66) 06 Total Review of Linear Algebra (Lecture 65) 06 Total Review of Linear Algebra (Lecture 64) 06 Total Review of Linear Algebra (Lecture 63) 06 Total Review of Linear Algebra (Lecture 62) 06 Total Review.
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Math scanned electronic pdf book.
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Give me your email and I'll send it to you.
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Probably not, it's hard to find.
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If there is one here, the bookstore will not have to do it, this is copyrighted, don't mix it up.
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A Guide to the Complete Solution of Advanced Mathematics Learning Problems is a book published by Higher Education Press in 2007. This book is a study guide for the sixth edition of Advanced Mathematics compiled by the Department of Mathematics of Tongji University.
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If you want it, you can search for the content of the fifth and sixth editions of the old Tongji edition, the basic disciplines are almost the same, and there are generally no major changes.
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Math scanned electronic pdf book.
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You can do it yourself, you're not stupid.
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Tongji Advanced Mathematics Sixth Edition Exercise Problem Solving Guide.
If you have any questions about resources, please feel free to ask
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Calculus is the most important part of advanced mathematics. To help students improve their mathematical literacy, cultivate their sense of innovation, and master the ability to use mathematical tools to solve practical problems; The content of the book was further refined and adjusted, and the application of differential equations as unary function calculus was moved to the first volume.
Revisions: Advanced Mathematics (Sixth Edition) is the sixth edition of Advanced Mathematics compiled by the Department of Mathematics of Tongji University, which is revised for students of engineering majors in Xunzi colleges and universities according to the "Basic Requirements for the Teaching of Basic Mathematics Courses for Engineering Undergraduates".
In this revision, the depth and breadth of the textbook were appropriately adjusted and balanced, and some content with advocacy numbers was set up to meet the needs of hierarchical teaching. Absorbing the advantages of excellent textbooks at home and abroad, the types and quantities of exercises have been adjusted and enriched.
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I just came here and just had a graduate school entrance examination, and I am also counting 1, I came.
Self-answer. How to say it, bai, you can't judge a certain textbook du as a number zhi1 or number 3 textbook. dao
First of all, let me give you a comprehensive explanation of the number 1, count 2, count 3
Number one and number three are both high numbers, probability, and line generations, and number two does not test line generations. However, it is also a high number, and the number one is more difficult than the number three, for example, the number three does not take the Fourier series, but the number one is tested; The range of the number test is large, such as gradient and divergence, and it is normal to forget about it even if you have learned high mathematics. In the final analysis, all knowledge is available in the textbook, but not all of them are tested.
I often count even the chapters with stars in some catalogs, but this knowledge is available in any book. The selection of textbooks is mainly the arrangement of his content, explanation, three-dimensional, and so on.
If you count 3, it is still necessary to choose the textbook, but the number 1 is not necessary, and it is basically a test. Tongji's high math is really good, and this textbook we used when we were freshmen.
In fact, the first time I took the postgraduate mathematics entrance examination was to look at the textbook to do the post-book questions, and then the whole book, basically it was not Chen Wendeng or Li Yongle, although the book was different, but the difference was not too big, just pick one and do it, this is the second time.
The review of mathematics must be many times, especially the number one, there are too many knowledge points, God knows what he will test, the syllabus is there, and you can't answer it if you can't review it, many knowledge points are very remote, like what asks how many asymptotic lines a function has and so on. Even if it is a large knowledge point, it is possible. For example, if you look at the high number first, then the line generation, and then forget about the high number when you wait for the probability, this is normal.
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Further Mathematics I
The sixth edition seems to be a book for level 07, right?
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The textbook contains the largest, and math one, two, and three can be used.
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The main difference is that the version has been updated, and the exercises in the back have been updated to be more representative.
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The details are different, some example questions have been changed, and the proof methods of some example questions in the book have changed, and the content has basically not changed.
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The difference between the seventh and sixth editions of Tongji University is that the details are different, some example questions have been changed, and the proof methods of some example questions in the book have changed, but the content has basically not changed.
Broadly speaking, mathematics other than elementary mathematics is advanced mathematics, and there are also those that refer to the more in-depth algebra, geometry, and simple set theory and logic as intermediate mathematics, as a transition between elementary mathematics in primary and secondary schools and advanced mathematics in college.
It is generally believed that advanced mathematics is a fundamental discipline formed by calculus, more advanced algebra, geometry, and the intersection between them. Topics include: limits, calculus, analytic geometry and linear algebra, series, and ordinary differential equations.
Basic subjects for engineering and science graduate examinations.
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The seventh edition corrects some of the content of the sixth edition, adjusts the order of some lessons, changes some example questions, and changes the proof methods of some example problems in the book, but the content remains basically the same.
Your adoption and praise are the best praise and affirmation for my enthusiastic help.
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I'm the most specific.,I copied the sixth edition of the table of contents for you.,I'm also taking the number two.,All of them are tested.,If you don't write it, you won't take the test.,This range is what I saw in the graduate school entrance examination forum.,It's recognized by many people.,It should be very authoritative.,I'm also reviewing according to this.,It's tiring to review during the holidays.,Come on!
Chapter 1 Functions and Limits.
Section 1 Mappings and Functions.
Section 2 The Limits of the Sequence.
Section 3 Limits of Functions.
Section 4 Infinitesimal and Infinite.
Section 5 Limit Algorithms.
Section 6 Criterion for the Existence of Limits Two important limits.
Section 7 Infinitesimal Comparisons.
Section 8 Continuity and Break Points of Functions.
Section 9 The operation of continuous functions and the continuity of elementary functions.
Section 10 Properties of Continuous Functions on Closed Intervals.
General Exercise 2: Derivatives and Differentiation.
Section 1 The Concept of Derivatives.
Section 2 Derivation of Functions.
Section 3 Higher-order derivatives.
Section 4 Implicit Functions and Derivatives of Functions Determined by Parametric Equations Correlation Rate of Change Section 5 Differentiation of Functions.
General Exercise 2. Chapter 3 The Differential Median Theorem and Applications of Derivatives.
Section 1 Differential Median Value Theorem.
Section 2 The Law of Lobida.
Section 3 Taylor's Formula.
Section 4 The monotonicity of functions and the concave and convex nature of curves.
Section 5 Extremums and Maximums and Minimums of Functions.
Section 6 Depiction of Function Graphs.
Section 7 Curvature.
Section 8 Approximate Solutions of Equations.
General Exercise 3. Chapter 4 Indefinite Integrals.
Section 1: The Concept and Properties of Indefinite Integrals.
Section 2 Commutation Integral Method.
Section 3 Partial Integral Method.
Section 4 Integrals of Rational Functions.
Section 5 Combination of Points Tables.
Total Exercise 4. Chapter 5 Application of Definite Integrals.
Section 1: The Concept and Properties of Definite Integrals.
Section 2 Basic Formulas of Calculus.
Section 3 Commutation method and partial integral method of definite integrals.
Section 4 Abnormal Points.
Total Exercise 5. Chapter 6 Application of Definite Integrals.
Section 1 The Elemental Method of Definite Integrals.
Section 2 Application of definite integrals in geometry.
Section 3 Application of definite integrals in physics.
Chapter 7 Differential Equations.
Section 1 Basic Concepts of Differential Equations.
Section 2 Differential Equations for Separable Variables.
Section 3 Homogeneous Equations.
Section 4 First-Order Linear Differential Equations.
Section 5 Reduced-Order Higher-Order Differential Equations.
Section 6 Higher-Order Linear Differential Equations.
Section 7 Homogeneous linear differential equations with constant coefficients.
Section 8 Nonhomogeneous linear differential equations with constant coefficients.
Total Exercise 7. Chapter 9 Multivariate Function Differentiation and Its Applications.
Section 1: Basic Concepts of Multivariate Functions.
Section 2 Partial Derivatives.
Section 3 Full Differentiation.
Section 4 Derivation of Multivariate Composite Functions.
Section 5 Formulas for Finding Implicit Functions.
Section 8 Extrema of Multivariate Functions and Their Methods.
Total Exercise 9. Chapter 10 Re-integral.
Section 1: The Concept and Properties of Double Integrals.
Section 2 Calculation of Double Integrals.
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If there is an outline for Mathematics II, you can go to the Graduate School Entrance Examination Network to check the scope of the Mathematics II exam, and there is more content, so I won't copy it!!
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Triple integrals, curve and surface integrals, series, plane vectors, and equations are not examined. The rest are tested.
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Generally, the syllabus of the postgraduate entrance examination will not change much, you can refer to the syllabus of last year's number (two).
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Why don't you all like to buy outlines? How good it is to use the outline to review. After reviewing a tick, you won't miss it at all.
Learning is gradual, you should at least learn junior high school mathematics first, and then learn high mathematics, generally high mathematics in the first chapter of the content is a summary and review of high school knowledge, I hope you can make up for junior high school knowledge!! I'm a math major, I feel that the major is very difficult, but if you are not a math major, you generally calculate more, such as derivatives, these must be learned, like calculus, they are all based on the opposite process of derivatives, that is to say, derivatives are very important, you must remember most of the common derivatives, so that calculus is easy. >>>More
Here's how, please refer to:
If it helps, >>>More
The calculation of the example problem should make the trembling error, the method is as follows, the ruler slips and respects the tomb carefully. >>>More
1.If there is a Taylor series, does the Taylor series necessarily converge to the function f(x) in the neighborhood of a number? >>>More
To pay money, the specific amount to be paid is equal to the high math score multiplied by the number of points retaken per credit. >>>More