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Engineering Mathematics: Volume - III

✍ Scribed by E. Rukmangadachari, E. Keshava Reddy

Publisher
Pearson Education
Year
2010
Tongue
English
Leaves
285
Category
Library
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✦ Table of Contents

Cover
Engineering Mathematics-III
Copyright
Contents
About the Authors
Preface
1. Special Functions
1.1 Introduction
1.2 Gamma Function
1.3 Recurrence Relation or Reduction Formula
1.4 Various Integral Forms of Gamma Function
Exercise 1.1
1.5 Beta Function
1.6 Various Integral Forms of Beta Function
1.7 Relation Between Beta and Gamma Functions
1.8 Multiplication Formula
1.9 Legendre’s Duplication Formula
Exercise 1.2
1.10 Legendre Functions
Exercise 1.3
1.11 Bessel Functions
Exercise 1.4
2. Functions of a Complex Variable
2.1 Introduction
2.2 Complex Numbers— Complex Plane
Exercise 2.1
Exercise 2.2
2.3 Laplace’s Equation: Harmonic and Conjugate Harmonic Functions
Exercise 2.3
3. Elementary Functions
3.1 Introduction
3.2 Elementary Functions of a Complex Variable
Exercise 3.1
4. Complex Integration
4.1 Introduction
4.2 Basic Concepts
4.3 Complex Line Integral
4.4 Cauchy–Goursat Theorem
4.5 Cauchy’s Theorem for Multiply-Connected Domain Theorem
4.6 Cauchy’s Integral Formula (C.I.F.) or Cauchy’s Formula Theorem
4.7 Morera’s Theorem (Converse of Cauchy’s Theorem)
4.8 Cauchy’s Inequality
Exercise 4.1
5. Complex Power Series
5.1 Introduction
5.2 Sequences and Series
5.3 Power Series
5.4 Series of Complex Functions
5.5 Uniform Convergence of a Series of Functions
5.6 Weierstrass’s M-Test
5.7 Taylor’s Theorem (Taylor Series)
5.8 Laurent Series
5.9 Higher Derivatives of Analytic Functions
Exercise 5.1
6. Calculus of Residues
6.1 Evaluation of Real Integrals
Exercise 6.1
Exercise 6.2
Exercise 6.3
7. Argument Principle and Rouche’s Theorem
7.1 Introduction
7.2 Meromorphic Function
7.3 Argument Principle (Repeated Single Pole/Zero)
7.4 Generalised Argument Theorem
7.5 Rouche’s Theorem
7.6 Liouville Theorem
7.7 Fundamental Theorem of Algebra
7.8 Maximum Modulus Theorem for Analytic Functions
Exercise 7.1
8. Conformal Mapping
8.1 Introduction
8.2 Conformal Mapping: Conditions for Conformality
8.3 Conformal Mapping by Elementary Functions
8.4 Some Special Transformations
8.5 Bilinear or Mobius or Linear Fractional Transformations
8.6 Fixed Points of the Transformation w = (az+b)/(cz+d)
Exercise 8.1
Question Bank
Multiple Choice Questions
Fill in the Blanks
Match the Following
True or False Statements
Question Papers
Bibliography
Index

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