Exam (elaborations)

A First Course in Integral Equations Solutions Manual (Second Edition) – Complete Step-by-Step Solutions to All Exercises and Problems from Linear and Nonlinear Integral Equations, Fredholm and Volterra Equations, and Applications. This comprehensive comp

Rating

Sold

Pages

185

Grade

A+

Uploaded on

30-10-2025

Written in

2025/2026

This Solutions Manual for “A First Course in Integral Equations” (Second Edition) by A.M. Wazwaz provides complete, carefully written solutions to all exercises and problems found in the main textbook. It is an indispensable resource for students, instructors, and researchers studying applied mathematics, engineering, and physical sciences who need a deeper understanding of integral equation theory and its wide range of applications. The manual covers Fredholm and Volterra integral equations, both linear and nonlinear types, and demonstrates how to apply various analytical and numerical techniques to solve them. Each chapter solution is presented in a clear, logical format, emphasizing the connection between differential equations and their equivalent integral forms. Detailed derivations show how to obtain exact or approximate solutions using methods such as Laplace transforms, Green’s functions, successive approximations, and the Adomian decomposition method. In addition to direct problem solutions, the manual offers step-by-step reasoning, helping students follow each stage of the solution process. It also includes practical examples that illustrate how integral equations arise naturally in engineering, physics, and applied mathematics, such as in heat conduction, potential theory, population models, and boundary value problems. The Solutions Manual is fully aligned with the structure of the textbook and provides in-depth explanations of all key theorems and proofs. It highlights the mathematical tools used for solving first- and second-kind equations, convolution-type equations, and singular integral equations. Each chapter concludes with worked examples designed to reinforce theoretical understanding and support independent study.

Show more Read less

Institution

Introduction To Continuum Mechanics

Course

Introduction to continuum mechanics

Whoops! We can’t load your doc right now. Try again or contact support.

Report Copyright Violation

Written for

Institution: Introduction to continuum mechanics
Course: Introduction to continuum mechanics

Document information

Uploaded on: October 30, 2025
Number of pages: 185
Written in: 2025/2026
Type: Exam (elaborations)
Contains: Questions & answers

Subjects

laplace transforms
boundary value problems
engineering math
integral equations fredholm equations
volterra equations greens functions
adomian decomposition method
applied mathematics numerical methods

Content preview

@SOLUTIONSSTUDY

Covers All 8 Chapters

SOLUTIONS MANUAL

, Contents

Preface ix

1 Introductory Concepts 1
1.2 Classification of Linear Integral Equations ................................... 1
1.3 Solution of an Integral Equation ..................................................... 2
1.4 Converting Volterra Equation to an ODE...................................... 4
1.5 Converting IVP to Volterra Equation ............................................ 7
1.6 Converting BVP to Fredholm Equation ...................................... 11
1.7 Taylor Series .................................................................................. 13

2 Fredholm Integral Equations 15
2.2 Adomian Decomposition Method .................................................. 15
2.3 The Variational Iteration Method ................................................ 22
2.4 The Direct Computation Method ................................................. 25
2.5 Successive Approximations Method .............................................. 29
2.6 Successive Substitutions Method ................................................... 33
2.8 Homogeneous Fredholm Equation .................................................. 35
2.9 Fredholm Integral Equation of the First Kind ............................. 39

3 Volterra Integral Equations 41
3.2 Adomian Decomposition Method .................................................. 41
3.3 The Variational Iteration Method ................................................ 54
3.4 The Series Solution Method .......................................................... 57
3.5 Converting Volterra Equation to IVP........................................... 63
3.6 Successive Approximations Method .............................................. 67
3.7 Successive Substitutions Method ................................................... 75
3.9 Volterra Equations of the First Kind ........................................... 79

vii

, @SOLUTIONSSTUDY

viii Contents

4 Fredholm Integro-Differential Equations 85
4.3 The Direct Computation Method ................................................. 85
4.4 The Adomian Decomposition Method .......................................... 90
4.5 The Variational Iteration Method ................................................ 94
4.6 Converting to Fredholm Integral Equations ................................. 96

5 Volterra Integro-Differential Equations 101
5.3 The Series Solution Method ........................................................ 101
5.4 The Adomian Decomposition Method ........................................ 103
5.5 The Variational Iteration Method .............................................. 105
5.6 Converting to Volterra Equations ............................................... 107
5.7 Converting to Initial Value Problems ........................................ 110
5.8 The Volterra Integro-Differential Equations of the First
Kind .............................................................................................. 113

6 Singular Integral Equations 117
6.2 Abel’s Problem ............................................................................ 117
6.3 Generalized Abel’s Problem ........................................................ 122
6.4 The Weakly Singular Volterra Equations ................................. 122
6.5 The Weakly Singular Fredholm Equations ............................... 130

7 Nonlinear Fredholm Integral Equations 133
7.2 Nonlinear Fredholm Integral Equations ...................................... 133
7.2.1 The Direct Computation Method ................................... 133
7.2.2 The Adomian Decomposition Method ............................ 141
7.2.3 The Variational Iteration Method .................................. 148
7.3 Nonlinear Fredholm Integral Equations of the First
Kind .............................................................................................. 149
7.4 Weakly-Singular Nonlinear Fredholm Integral Equations ......... 153

8 Nonlinear Volterra Integral Equations 157
8.2 Nonlinear Volterra Integral Equations ........................................ 157
8.2.1 The Series Solution Method ............................................ 157
8.2.2 The Adomian Decomposition Method ............................ 163
8.2.3 The Variational Iteration Method .................................. 168
8.3 Nonlinear Volterra Integral Equations of the First Kind .......... 170
8.3.1 The Series Solution Method ............................................ 170
8.3.2 Conversion to a Volterra Equation of the Second
Kind.................................................................................. 172
8.4 Nonlinear Weakly-Singular Volterra Equation .......................... 173

, Chapter 1

Introductory Concepts

1.2 Classification of Linear Integral Equations
Exercises 1.2

1. Fredholm, linear, nonhomogeneous
2. Volterra, linear, nonhomogeneous
3. Volterra, nonlinear, nonhomogeneous
4. Fredholm, linear, homogeneous
5. Fredholm, linear, nonhomogeneous
6. Fredholm, nonlinear, nonhomogeneous
7. Fredholm, nonlinear, nonhomogeneous
8. Fredholm, linear, nonhomogeneous
9. Volterra, nonlinear, nonhomogeneous
10. Volterra, linear, nonhomogeneous
11. Volterra integro-differential equation, nonlinear
12. Fredholm integro-differential equation, linear
13. Volterra integro-differential equation, nonlinear
14. Fredholm integro-differential equation, linear
15. Volterra integro-differential equation, linear
∫x
16. u(x) = 1 4u(t)dt
0
+ ∫x
3t2u(t)dt
17. u(x) = 1 0
∫ x
+
u2(t)dt
0
18. u(x) = 4
+

$20.99

Get access to the full document:

100% satisfaction guarantee

Immediately available after payment

Both online and in PDF

No strings attached

Get to know the seller

solutionsstudy

4.0

(2)

Get to know the seller

solutionsstudy Teachme2-tutor

View profile

Sold

Member since

2 year

Number of followers

Documents

593

Last sold

1 month ago

TOPSCORE A+

Welcome All to this page. Here you will find ; ALL DOCUMENTS, PACKAGE DEALS, FLASHCARDS AND 100% REVISED & CORRECT STUDY MATERIALS GUARANTEED A+. NB: ALWAYS WRITE A GOOD REVIEW WHEN YOU BUY MY DOCUMENTS. ALSO, REFER YOUR COLLEGUES TO MY DOCUMENTS. ( Refer 3 and get 1 free document). I AM AVAILABLE TO SERVE YOU AT ANY TIME. WISHING YOU SUCCESS IN YOUR STUDIES. THANK YOU.

4.0

2 reviews

Why students choose Stuvia

Created by fellow students, verified by reviews

Quality you can trust: written by students who passed their tests and reviewed by others who've used these notes.

Didn't get what you expected? Choose another document

No worries! You can instantly pick a different document that better fits what you're looking for.

Pay as you like, start learning right away

No subscription, no commitments. Pay the way you're used to via credit card and download your PDF document instantly.

“Bought, downloaded, and aced it. It really can be that simple.”

Alisha Student

Frequently asked questions

What do I get when I buy this document?

You get a PDF, available immediately after your purchase. The purchased document is accessible anytime, anywhere and indefinitely through your profile.

Satisfaction guarantee: how does it work?

Our satisfaction guarantee ensures that you always find a study document that suits you well. You fill out a form, and our customer service team takes care of the rest.

Who am I buying these notes from?

Stuvia is a marketplace, so you are not buying this document from us, but from seller solutionsstudy. Stuvia facilitates payment to the seller.

Will I be stuck with a subscription?

No, you only buy these notes for $20.99. You're not tied to anything after your purchase.

Can Stuvia be trusted?

4.6 stars on Google & Trustpilot (+1000 reviews) 51249 documents were sold in the last 30 days Founded in 2010, the go-to place to buy study notes for 16 years now

A First Course in Integral Equations Solutions Manual (Second Edition) – Complete Step-by-Step Solutions to All Exercises and Problems from Linear and Nonlinear Integral Equations, Fredholm and Volterra Equations, and Applications. This comprehensive comp

Written for

Document information

Subjects

Content preview

Get to know the seller

Recently viewed by you

Why students choose Stuvia

Created by fellow students, verified by reviews

Didn't get what you expected? Choose another document

Pay as you like, start learning right away

Frequently asked questions

What do I get when I buy this document?

Satisfaction guarantee: how does it work?

Who am I buying these notes from?

Will I be stuck with a subscription?

Can Stuvia be trusted?