Introduction to Linear Algebra Applications with Introduction to Linear Algebra Applications with Jim DeFranza St. Lawrence University Daniel Gagliardi SUNY Canton For information about this book, contact: Waveland Press, Inc. 4180 IL Route 83, Suite 101 Long Grove, IL 60047-9580 (847) 634-0081 [email protected] www.waveland.com Copyright © 2009 by Jim DeFranza and Daniel Gagliardi Reissued 2015 by Waveland Press, Inc. 10-digit ISBN 1-4786-2777-8 13-digit ISBN 978-1-4786-2777-7 All rights reserved. No part of this book may be reproduced, stored in a retrieval system, or transmitted in any form or by any means without permission in writing from the publisher. Printed in the United States of America 7 6 5 4 3 2 1 To Regan, Sara, and David —JD To Robin, Zachary, Michael, and Eric —DG About the Authors Jim DeFranza was born in 1950 in Yonkers New York and grew up in Dobbs Ferry New York on the Hudson River. Jim DeFranza is Professor of Mathematics at St. Lawrence University in Canton New York where he has taught undergraduate mathematics for 25 years. St. Lawrence University is a small Liberal Arts College in upstate New York that prides itself in the close interaction that exists between students and faculty. It is this many years of working closely with students that has shaped this text in Linear Algebra and the other texts he has written. He received his Ph.D. in Pure Mathematics from Kent State University in 1979. Dr. DeFranza has coauthored PRECALCULUS, Fourth Edition and two other texts in single variable and multivariable calculus. Dr. DeFranza has also published a dozen research articles in the areas of Sequence Spaces and Classical Summability Theory. Jim is married and has two children David and Sara. Jim and his wife Regan live outside of Canton New York in a 150 year old farm house. DanielGagliardi is an Assistant Professor of Mathematics at SUNY Canton, in Canton New York. Dr. Gagliardi began his career as a software engineer at IBM in East Fishkill New York writing programs to support semiconductor development and manufacturing. He received his Ph.D. in Pure Mathematics from North Carolina State Universityin2003underthe supervisionofAloysiusHelminck.Dr. Gagliardi’s principle area of research is in Symmetric Spaces. In particular, his current work is concerned with developing algorithmic formulations to describe the fine structure (characters and Weyl groups) of local symmetric spaces. Dr. Gagliardi also does research in Graph Theory. His focus there is on the graphical realization of certain types of sequences. In addition to his work as a mathematician, Dr. Gagliardi is an accomplished double bassist and has recently recorded a CD of jazz standards with Author/PianistBillVitek.Dr.GagliardilivesinnorthernNewYorkinthepicturesque Saint Lawrence River Valley with his wife Robin, and children Zachary, Michael, and Eric. vii Contents Preface xi 1 CHAPTER SystemsofLinearEquationsandMatrices 1 1.1 Systems of Linear Equations 2 Exercise Set 1.1 12 1.2 Matrices and Elementary Row Operations 14 Exercise Set 1.2 23 1.3 Matrix Algebra 26 Exercise Set 1.3 37 1.4 The Inverse of a Square Matrix 39 Exercise Set 1.4 45 1.5 Matrix Equations 48 Exercise Set 1.5 51 1.6 Determinants 54 Exercise Set 1.6 65 1.7 Elementary Matrices and LU Factorization 68 Exercise Set 1.7 77 1.8 Applications of Systems of Linear Equations 79 Exercise Set 1.8 84 Review Exercises 89 Chapter Test 90 2 CHAPTER LinearCombinationsandLinearIndependence 93 2.1 Vectors in (cid:31)n 94 Exercise Set 2.1 99 2.2 Linear Combinations 101 Exercise Set 2.2 108 2.3 Linear Independence 111 Exercise Set 2.3 120 Review Exercises 123 Chapter Test 125 viii Contents ix 3 CHAPTER VectorSpaces 127 3.1 Definition of a Vector Space 129 Exercise Set 3.1 137 3.2 Subspaces 140 Exercise Set 3.2 154 3.3 Basis and Dimension 156 Exercise Set 3.3 171 3.4 Coordinates and Change of Basis 173 Exercise Set 3.4 182 3.5 Application: Differential Equations 185 Exercise Set 3.5 193 Review Exercises 194 Chapter Test 195 4 CHAPTER LinearTransformations 199 4.1 Linear Transformations 200 Exercise Set 4.1 211 4.2 The Null Space and Range 214 Exercise Set 4.2 223 4.3 Isomorphisms 226 Exercise Set 4.3 233 4.4 Matrix Representation of a Linear Transformation 235 Exercise Set 4.4 245 4.5 Similarity 249 Exercise Set 4.5 253 4.6 Application: Computer Graphics 255 Exercise Set 4.6 268 Review Exercises 270 Chapter Test 272 5 CHAPTER EigenvaluesandEigenvectors 275 5.1 Eigenvalues and Eigenvectors 276 Exercise Set 5.1 285 5.2 Diagonalization 287 Exercise Set 5.2 298 5.3 Application: Systems of Linear Differential Equations 300 Exercise Set 5.3 309
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