Elementary Linear Algebra 7th Edition

Published by Cengage Learning
ISBN 10: 1-13311-087-8
ISBN 13: 978-1-13311-087-3

Chapter 2 - Matrices - 2.3 The Inverse of a Matrix - 2.3 Exercises - Page 71: 13


$A^{-1}$ is given by $$A^{-1}=\left[ \begin {array}{cccccc} 1&1&-1\\ -3&2&-1\\ 3&-3&2\end {array} \right].$$

Work Step by Step

To find $A^{-1}$, we have $$\left[ A \ \ I \right]= \left[ \begin {array}{cccccc} 1&1&1&1&0&0\\ 3&5&4&0 &1&0\\ 3&6&5&0&0&1\end {array} \right]. $$ Using Gauss-Jordan elimination, we get the row-reduced echelon form as follows $$\left[I \ \ A^{-1} \right]=\left[ \begin {array}{cccccc} 1&0&0&1&1&-1\\ 0&1&0& -3&2&-1\\ 0&0&1&3&-3&2\end {array} \right]. $$ Then $A^{-1}$ is given by $$A^{-1}=\left[ \begin {array}{cccccc} 1&1&-1\\ -3&2&-1\\ 3&-3&2\end {array} \right].$$
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