Principles and Techniques of Vibrations
Published on 31. October 1996
Book
Paperback/Softback
704 pages
978-0-02-380141-9 (ISBN)
Description
Thisbook will be of interest to mechanical engineers, aerospace engineers, and engineering science and mechanics faculty. The main objective of the book is to present a mathematically rigorous approach to vibrations, one that not only permits efficient formulations and solutions to problems, but also enhances understanding of the physics of the problem. The book takes a very broad view approach to the subject so that the similarity of dynamic characteristics of vibrating systems will be understood.
More details
Language
English
Place of publication
United States
Publishing group
Pearson Education (US)
Target group
College/higher education
Professional and scholarly
Dimensions
Height: 184 mm
Width: 240 mm
Thickness: 36 mm
Weight
1098 gr
ISBN-13
978-0-02-380141-9 (9780023801419)
Copyright in bibliographic data and cover images is held by Nielsen Book Services Limited or by the publishers or by their respective licensors: all rights reserved.
Schweitzer Classification
Other editions
New editions
Leonard Meirovitch
Principles and Techniques of Vibrations
Book
01/1997
Pearson Education (US)
€50.75
Article exhausted; check for reprint
Previous edition
Leonard Meirovitch
Principles and Techniques of Vibrations
Book
01/1997
Pearson Education (US)
€50.75
Article exhausted; check for reprint
Content
1. Concepts and Techniques From Linear System Theory.
2. Principles of Newtonian and Analytical Dynamics.
3. Single-Degree-of-Freedom Systems.
4. Multi-Degree-of-Freedom Systems.
5. Qualitative Aspects of the Algebraic Eigenvalue Problem.
6. Computational Techniques for the Algebraic Eigenvalue Problem.
7. Distributed-Parameter Systems.
8. Approximate Methods for Distributed-Parameter Systems.
9. The Finite Element Method.
Appendix A: Elements of Laplace Transformation.
Appendix B: Elements of Linear Algebra.
Author Index.
Subject Index.
2. Principles of Newtonian and Analytical Dynamics.
3. Single-Degree-of-Freedom Systems.
4. Multi-Degree-of-Freedom Systems.
5. Qualitative Aspects of the Algebraic Eigenvalue Problem.
6. Computational Techniques for the Algebraic Eigenvalue Problem.
7. Distributed-Parameter Systems.
8. Approximate Methods for Distributed-Parameter Systems.
9. The Finite Element Method.
Appendix A: Elements of Laplace Transformation.
Appendix B: Elements of Linear Algebra.
Author Index.
Subject Index.