prior to Exercises 15–18 in Section 3.1. [Note: Finding the characteristic polynomial of a 3 x 3 matrix is not easy to do with just row operations, because the variable A is involved.] 0 1 4 -1 4 3 1 0 5 1 9. 10. 1 2 -2 7

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49 280 CHAPTER 5 Eigenvalues and Eigenvectors prior to Exercises 15-18 in Section 3.1. [Note: Finding the characteristic polynomial of a 3 x 3 matrix is not easy to do with just row operations, because the variable 2 is involved.] 22. a. If A is 3 x 3 the volume c b. det AT = (– 4 0 -1 1 1 c. The multipli of A is calle 9. 4 -1 10. 5 1 -2 value of A. 3 0. d. A row repla eigenvalues -1 2 11. 2 1 4 12. 3. 1 1 4 0. 1 A widely used met matrix A is the QR e gorithm produces a s come almost upper E the eigenvalues of matrix similar to A 6 -2 4 0 17 13. -2 9. 14. -1 0. 4 8 3 For the matrices in Exercises 15-17, list the real eigenvalues, repeated according to their multiplicities. and R1 is upper tria A1 = R1Q1, which A2 = R2Q2, and so the more general res 2 3. 6. 0. 15. 16. -2 5 -5 23. Show that if A 3 0. A1 = RQ. -5 1 24. Show that if A 17. 8. 0. 0 -7 1 .6 25. Let A = .4 A is the stocl 1 9 -2 3 18. It can be shown that the algebraic multiplicity of an eigen- value 1 is always greater than or equal to the dimension of the eigenspace corresponding to 2. Find h in the matrix A below such that the eigenspace for 1 = 4 is two-dimensional: tion 4.9.] a. Find a basi tor v2 of A b. Verify that 3 h c. For k = 1, A = and write a 0. 4 14 increases. 19. Let A be an n x n matrix, and suppose A has n real eigenval- ues, 21,..., An, repeated according to multiplicities, so that 26. Let A = 0063 9233 3330 5200 4000 5304