| 000 | 04658cam a2200409Mi 4500 | ||
|---|---|---|---|
| 001 | 8225499 | ||
| 003 | OSt | ||
| 005 | 20190812162947.0 | ||
| 007 | ta | ||
| 008 | 180924b2017 xxk||||| |||| 00| 0 eng d | ||
| 020 | _z9780128097304 (pbk) | ||
| 035 | _aucoclc973048447 | ||
| 037 |
_a9780128099025 _bIngram Content Group |
||
| 040 |
_aNLE _beng _erda _cLearning Resource Center _dHoly Name University. |
||
| 049 | _aCLYY | ||
| 050 | 4 | _aTA330 | |
| 082 | 0 | 4 |
_223 _a620.00151/Y16 |
| 084 | _aCOECS/E | ||
| 089 | 0 | 4 |
_aCOECS/E 620.00151/Y16 _223 |
| 100 | 1 |
_aYang, Xin-She, _eauthor. _uSchool of Science and Technology, Middlesex University, UK _915196 |
|
| 245 | 1 | 0 |
_aEngineering Mathematics with Examples and Applications / _cXin-She Yang |
| 264 |
_aLondon, [England], UK : _bAcademic Press, _c©2017. |
||
| 300 |
_axiii, 385 pages : _billustrations ; _c28 cm. |
||
| 336 |
_atext. _btext. |
||
| 504 | _aIncludes bibliographical references and index. | ||
| 505 | 0 | _aFront Cover; Engineering Mathematics with Examples and Applications; Copyright; Contents; About the Author; Preface; Acknowledgment; Part I Fundamentals; 1 Equations and Functions; 1.1 Numbers and Real Numbers; 1.2 Equations; 1.3 Functions; 1.4 Quadratic Equations; 1.5 Simultaneous Equations; Exercises; 2 Polynomials and Roots; 2.1 Index Notation; 2.2 Floating Point Numbers; 2.3 Polynomials; 2.4 Roots; Exercises; 3 Binomial Theorem and Expansions; 3.1 Binomial Expansions; 3.2 Factorials; 3.3 Binomial Theorem and Pascal's Triangle; Exercises; 4 Sequences; 4.1 Simple Sequences. 4.2 Fibonacci Sequence 4.3 Sum of a Series; 4.4 In nine Series; Exercises; 5 Exponentials and Logarithms; 5.1 Exponential Function; 5.2 Logarithm; 5.3 Change of Base for Logarithm; Exercises; 6 Trigonometry; 6.1 Angle; 6.2 Trigonometrical Functions; 6.3 Sine Rule; 6.4 Cosine Rule; Exercises; Part II Complex Numbers; 7 Complex Numbers; 7.1 Why Do Need Complex Numbers?; 7.2 Complex Numbers; 7.3 Complex Algebra; 7.4 Euler's Formula; 7.5 Hyperbolic Functions; Exercises; Part III Vectors and Matrices; 8 Vectors and Vector Algebra; 8.1 Vectors; 8.2 Vector Algebra; 8.3 Vector Products. 8.4 Triple Product of Vectors Exercises; 9 Matrices; 9.1 Matrices; 9.2 Matrix Addition and Multiplication; 9.3 Transformation and Inverse; 9.4 System of Linear Equations; 9.5 Eigenvalues and Eigenvectors; Exercises; Part IV Calculus; 10 Differentiation; 10.1 Gradient and Derivative; 10.2 Differentiation Rules; 10.3 Series Expansions and Taylor Series; Exercises; 11 Integration; 11.1 Integration; 11.2 Integration by Parts; 11.3 Integration by Substitution; Exercises; 12 Ordinary Differential Equations; 12.1 Differential Equations; 12.2 First-Order Equations; 12.3 Second-Order Equations. 12.4 Higher-Order ODEs12.5 System of Linear ODEs; Exercises; 13 Partial Differentiation; 13.1 Partial Differentiation; 13.2 Differentiation of Vectors; 13.3 Polar Coordinates; 13.4 Three Basic Operators; Exercises; 14 Multiple Integrals and Special Integrals; 14.1 Line Integral; 14.2 Multiple Integrals; 14.3 Jacobian; 14.4 Special Integrals; Exercises; 15 Complex Integrals; 15.1 Analytic Functions; 15.2 Complex Integrals; Exercises; Part V Fourier and Laplace Transforms; 16 Fourier Series and Transform; 16.1 Fourier Series; 16.2 Fourier Transforms. 16.3 Solving Differential Equations Using Fourier Transforms 16.4 Discrete and Fast Fourier Transforms; Exercises; 17 Laplace Transforms; 17.1 Laplace Transform; 17.2 Transfer Function; 17.3 Solving ODE via Laplace Transform; 17.4 Z-Transform; 17.5 Relationships between Fourier, Laplace and Z-transforms; Exercises; Part VI Statistics and Curve Fitting; 18 Probability and Statistics; 18.1 Random Variables; 18.2 Mean and Variance; 18.3 Binomial and Poisson Distributions; 18.4 Gaussian Distribution; 18.5 Other Distributions; 18.6 The Central Limit Theorem; 18.7 Weibull Distribution; Exercises. | |
| 520 | _aThis title provides a compact and concise primer in the field, starting with the foundations, and then gradually developing to the advanced level of mathematics that is necessary for all engineering disciplines. | ||
| 521 | _aSpecialized. | ||
| 521 | _a | ||
| 546 | _aIn English. | ||
| 590 | _aUCLA Library - CDL shared resource. | ||
| 650 | 0 |
_aEngineering mathematics. _98816 |
|
| 776 | 0 | 8 |
_iPrint version: _aYang, Xin-She. _tEngineering mathematics with examples and applications. _dLondon : Academic Press, 2017 _z0128097302 _z9780128097304 _w(OCoLC)964303424 |
| 910 |
_acdl 180214 _acdl 170705 |
||
| 942 |
_2ddc _cBK |
||
| 999 |
_c11574 _d11574 |
||