₹225
Author: Veerarajan T
ISBN: 9789388005159
Copy Right Year: 2020
Pages: 304
Binding: Soft Cover
Publisher: Yes Dee Publishing
This textbook is meant for students of first course on Fourier Series and Integral Transforms. The book provides balanced coverage of both theory and practice of concepts. A wide variety of problems and lucid language will help students understand and apply the concepts easily. The step-by-step solutions to solved problems enable clear understanding. A variety of solved and unsolved problems have been incorporated to help student’s ace university and competitive examinations.
| Weight | .3 kg |
|---|---|
| Dimensions | 22 × 15 × 1 cm |
Chapter 1 Fourier Series
1.1 Introduction
1.2 Dirichlet’s Conditions
1.3 Euler’s Formulas
1.4 Definition of Fourier Series
1.5 Important Concepts
1.6 Fourier Series of Even and Odd Functions
1.7 Theorem
1.8 Convergence of Fourier Series at Specific Points
1.9 Half-range Fourier Series and Parseval’s Theorem
1.10 Root-Mean Square Value of a Function
1.11 Harmonic Analysis
1.12 Complex Form of Fourier Series
Chapter 2 Fourier Transforms
2.1 Introduction
2.2 Fourier Integral Theorem
2.3 Fourier Transforms
2.4 Alternative from of Fourier Complex Integral Formula
2.5 Relationship between Fourier Transform And Laplace Transform
2.6 Properties of Fourier Transforms
2.7 Finite Fourier Transforms
Chapter 3 Z-Transforms
3.1 Introduction
3.2 Properties of Z-transforms
3.3 Z-Transforms of Some Basic Functions
3.4 Inverse Z-Transforms
3.5 Use of Z-Transforms to Solve Finite Difference Equations
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