In Exercises 1 – 12, determine whether the given matrix A is diagonalizable. If A is diagonalizable, calculate A 5 using the method of Example 2. A = [ 1 1 − 2 0 2 − 1 0 0 1 ]
In Exercises 1 – 12, determine whether the given matrix A is diagonalizable. If A is diagonalizable, calculate A 5 using the method of Example 2. A = [ 1 1 − 2 0 2 − 1 0 0 1 ]
Solution Summary: The author explains that the matrix A is not diagonalizable if S-1AS=D are eigenvectors and D is a diagonal matrix.
In Exercises 5–8, use the definition of to write the matrix equation as a vector equation, or vice versa.
Find the inverses of the matrices in Exercises 1–4.
Unless otherwise specified, assume that all matrices in these exercises are nxn. Determine which of the matrices in Exercises 1–10 are invertible. Use as few calculations as possible. Justify your answers
Chapter 4 Solutions
Introduction to Linear Algebra (Classic Version) (5th Edition) (Pearson Modern Classics for Advanced Mathematics Series)
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