Dominic Jordan, P. Smith
Mathematical Techniques
An Introduction for the Engineering, Physical, and Mathematical Sciences
Dominic Jordan, P. Smith
Mathematical Techniques
An Introduction for the Engineering, Physical, and Mathematical Sciences
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Mathematical Techniques provides a complete course in mathematics, covering all the essential topics with which a physical sciences or engineering student should be familiar. It introduces and builds on concepts in a progressive, carefully-layered way, and features over 2000 end of chapter problems, plus additional self-check questions.
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Mathematical Techniques provides a complete course in mathematics, covering all the essential topics with which a physical sciences or engineering student should be familiar. It introduces and builds on concepts in a progressive, carefully-layered way, and features over 2000 end of chapter problems, plus additional self-check questions.
Hinweis: Dieser Artikel kann nur an eine deutsche Lieferadresse ausgeliefert werden.
Hinweis: Dieser Artikel kann nur an eine deutsche Lieferadresse ausgeliefert werden.
Produktdetails
- Produktdetails
- Verlag: Oxford University Press
- 4th Revised edition
- Erscheinungstermin: April 2008
- Englisch
- Abmessung: 246mm x 189mm x 48mm
- Gewicht: 2031g
- ISBN-13: 9780199282012
- ISBN-10: 0199282013
- Artikelnr.: 23375624
- Herstellerkennzeichnung
- Books on Demand GmbH
- In de Tarpen 42
- 22848 Norderstedt
- info@bod.de
- 040 53433511
- Verlag: Oxford University Press
- 4th Revised edition
- Erscheinungstermin: April 2008
- Englisch
- Abmessung: 246mm x 189mm x 48mm
- Gewicht: 2031g
- ISBN-13: 9780199282012
- ISBN-10: 0199282013
- Artikelnr.: 23375624
- Herstellerkennzeichnung
- Books on Demand GmbH
- In de Tarpen 42
- 22848 Norderstedt
- info@bod.de
- 040 53433511
Dominic Jordan is formerly of the Mathematics Department, Keele University, UK. Peter Smith is Emeritus Professor in the School of Computing and Mathematics, Keele University, UK.
PART 1. ELEMENTARY METHODS, DIFFERENTIATION, COMPLEX NUMBERS
1: Standard functions and techniques
2: Differentiation
3: Further techniques for differentiation
4: Applications of differentiation
5: Taylor series and approximations
6: Complex numbers
PART 2. MATRIX AND VECTOR ALGEBRA
7: Matrix algebra
8: Determinants
9: Elementary operations with vectors
10: The scalar product
11: Vector product
12: Linear algebraic equations
13: Eigenvalues and eigenvectors
PART 3. INTEGRATION AND DIFFERENTIAL EQUATIONS
14: Antidifferentiation and area
15: The definite and indefinite integral
16: Applications involving the integral as a sum
17: Systematic techniques for integration
18: Unforced linear differential equations with constant coefficients
19: Forced linear differential equations
20: Harmonic functions and the harmonic oscillator
21: Steady forced oscillations: phasors, impedance, transfer functions
22: Graphical, numerical, and other aspects of first-order equations
23: Nonlinear differential equations and the phase plane
PART 4. TRANSFORMS AND FOURIER SERIES
24: The Laplace transform
25: Laplace and z transforms: applications
26: Fourier series
27: Fourier transforms
PART 5. MULTIVARIABLE CALCULUS
28: Differentiation of functions of two variables
29: Functions of two variables: geometry and formulae
30: Chain rules, restricted maxima, coordinate systems
31: Functions of any number of variables
32: Double integration
33: Line integrals
34: Vector fields: divergence and curl
PART 6. DISCRETE MATHEMATICS
35: Sets
36: Boolean algebra: logic gates and switching functions
37: Graph theory and its applications
38: Difference equations
PART 7. PROBABILITY AND STATISTICS
39: Probability
40: Random variables and probability distributions
41: Descriptive statistics
PART 8. PROJECTS
42: Applications projects using symbolic computing
Self-tests: selected answers
Answers to selected problems
Appendices
Further reading
Index
1: Standard functions and techniques
2: Differentiation
3: Further techniques for differentiation
4: Applications of differentiation
5: Taylor series and approximations
6: Complex numbers
PART 2. MATRIX AND VECTOR ALGEBRA
7: Matrix algebra
8: Determinants
9: Elementary operations with vectors
10: The scalar product
11: Vector product
12: Linear algebraic equations
13: Eigenvalues and eigenvectors
PART 3. INTEGRATION AND DIFFERENTIAL EQUATIONS
14: Antidifferentiation and area
15: The definite and indefinite integral
16: Applications involving the integral as a sum
17: Systematic techniques for integration
18: Unforced linear differential equations with constant coefficients
19: Forced linear differential equations
20: Harmonic functions and the harmonic oscillator
21: Steady forced oscillations: phasors, impedance, transfer functions
22: Graphical, numerical, and other aspects of first-order equations
23: Nonlinear differential equations and the phase plane
PART 4. TRANSFORMS AND FOURIER SERIES
24: The Laplace transform
25: Laplace and z transforms: applications
26: Fourier series
27: Fourier transforms
PART 5. MULTIVARIABLE CALCULUS
28: Differentiation of functions of two variables
29: Functions of two variables: geometry and formulae
30: Chain rules, restricted maxima, coordinate systems
31: Functions of any number of variables
32: Double integration
33: Line integrals
34: Vector fields: divergence and curl
PART 6. DISCRETE MATHEMATICS
35: Sets
36: Boolean algebra: logic gates and switching functions
37: Graph theory and its applications
38: Difference equations
PART 7. PROBABILITY AND STATISTICS
39: Probability
40: Random variables and probability distributions
41: Descriptive statistics
PART 8. PROJECTS
42: Applications projects using symbolic computing
Self-tests: selected answers
Answers to selected problems
Appendices
Further reading
Index
PART 1. ELEMENTARY METHODS, DIFFERENTIATION, COMPLEX NUMBERS
1: Standard functions and techniques
2: Differentiation
3: Further techniques for differentiation
4: Applications of differentiation
5: Taylor series and approximations
6: Complex numbers
PART 2. MATRIX AND VECTOR ALGEBRA
7: Matrix algebra
8: Determinants
9: Elementary operations with vectors
10: The scalar product
11: Vector product
12: Linear algebraic equations
13: Eigenvalues and eigenvectors
PART 3. INTEGRATION AND DIFFERENTIAL EQUATIONS
14: Antidifferentiation and area
15: The definite and indefinite integral
16: Applications involving the integral as a sum
17: Systematic techniques for integration
18: Unforced linear differential equations with constant coefficients
19: Forced linear differential equations
20: Harmonic functions and the harmonic oscillator
21: Steady forced oscillations: phasors, impedance, transfer functions
22: Graphical, numerical, and other aspects of first-order equations
23: Nonlinear differential equations and the phase plane
PART 4. TRANSFORMS AND FOURIER SERIES
24: The Laplace transform
25: Laplace and z transforms: applications
26: Fourier series
27: Fourier transforms
PART 5. MULTIVARIABLE CALCULUS
28: Differentiation of functions of two variables
29: Functions of two variables: geometry and formulae
30: Chain rules, restricted maxima, coordinate systems
31: Functions of any number of variables
32: Double integration
33: Line integrals
34: Vector fields: divergence and curl
PART 6. DISCRETE MATHEMATICS
35: Sets
36: Boolean algebra: logic gates and switching functions
37: Graph theory and its applications
38: Difference equations
PART 7. PROBABILITY AND STATISTICS
39: Probability
40: Random variables and probability distributions
41: Descriptive statistics
PART 8. PROJECTS
42: Applications projects using symbolic computing
Self-tests: selected answers
Answers to selected problems
Appendices
Further reading
Index
1: Standard functions and techniques
2: Differentiation
3: Further techniques for differentiation
4: Applications of differentiation
5: Taylor series and approximations
6: Complex numbers
PART 2. MATRIX AND VECTOR ALGEBRA
7: Matrix algebra
8: Determinants
9: Elementary operations with vectors
10: The scalar product
11: Vector product
12: Linear algebraic equations
13: Eigenvalues and eigenvectors
PART 3. INTEGRATION AND DIFFERENTIAL EQUATIONS
14: Antidifferentiation and area
15: The definite and indefinite integral
16: Applications involving the integral as a sum
17: Systematic techniques for integration
18: Unforced linear differential equations with constant coefficients
19: Forced linear differential equations
20: Harmonic functions and the harmonic oscillator
21: Steady forced oscillations: phasors, impedance, transfer functions
22: Graphical, numerical, and other aspects of first-order equations
23: Nonlinear differential equations and the phase plane
PART 4. TRANSFORMS AND FOURIER SERIES
24: The Laplace transform
25: Laplace and z transforms: applications
26: Fourier series
27: Fourier transforms
PART 5. MULTIVARIABLE CALCULUS
28: Differentiation of functions of two variables
29: Functions of two variables: geometry and formulae
30: Chain rules, restricted maxima, coordinate systems
31: Functions of any number of variables
32: Double integration
33: Line integrals
34: Vector fields: divergence and curl
PART 6. DISCRETE MATHEMATICS
35: Sets
36: Boolean algebra: logic gates and switching functions
37: Graph theory and its applications
38: Difference equations
PART 7. PROBABILITY AND STATISTICS
39: Probability
40: Random variables and probability distributions
41: Descriptive statistics
PART 8. PROJECTS
42: Applications projects using symbolic computing
Self-tests: selected answers
Answers to selected problems
Appendices
Further reading
Index