Shaharuddin Salleh, Albert Y. Zomaya, Sakhinah A. Bakar0470127953, 9780470127957, 9780470192627
Computing for Numerical Methods Using Visual C++ fills the need for a complete, authoritative book on the visual solutions to problems in numerical methods using C++. In an age of boundless research, there is a need for a programming language that can successfully bridge the communication gap between a problem and its computing elements through the use of visual-ization for engineers and members of varying disciplines, such as biologists, medical doctors, mathematicians, economists, and politicians. This book takes an interdisciplinary approach to the subject and demonstrates how solving problems in numerical methods using C++ is dominant and practical for implementation due to its flexible language format, object-oriented methodology, and support for high numerical precisions.
In an accessible, easy-to-follow style, the authors cover:
Numerical modeling using C++
Fundamental mathematical tools
MFC interfaces
Curve visualization
Systems of linear equations
Nonlinear equations
Interpolation and approximation
Differentiation and integration
Eigenvalues and Eigenvectors
Ordinary differential equations
Partial differential equations
This reader-friendly book includes a companion Web site, giving readers free access to all of the codes discussed in the book as well as an equation parser called “MyParser” that can be used to develop various numerical applications on Windows. Computing for Numerical Methods Using Visual C++ serves as an excellent reference for students in upper undergraduate- and graduate-level courses in engineering, science, and mathematics. It is also an ideal resource for practitioners using Microsoft Visual C++.
Table of contents :
cover……Page 1
CONTENTS……Page 12
PREFACE……Page 16
CODES FOR DOWNLOAD……Page 20
1.Modeling and Simulation……Page 22
2.Fundamental Tools for Mathematical Computing……Page 34
3.Numerical Interface Designs……Page 77
4.Curve Visualization……Page 117
5.Systems of Linear Equations……Page 148
6.Nonlinear Equations……Page 214
7.Interpolation and Approximation……Page 248
8.Differentiation and Integration……Page 288
9.Eigenvalues and Eigenvectors……Page 309
10.Ordinary Differential Equations……Page 345
11.Partial Differential Equations……Page 402
Index……Page 462
Reviews
There are no reviews yet.