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A. B. (1 pt) 1 0 Let/ = 184 Find an invertible matrix P and a diagonal matrix D such that PDPA D= (1 pt) 1 5 -15 LetA=1...
(1 point) Let A 12-5 Find an invertible matrix P and a diagonal matrix D such that D P- AP -24 12 5 D=
Find an invertible matrix P and a diagonal matrix D such that P- AP-D -9 0 -18 -18 00 0 1 D D O O 0000| D=
37 40 -120 1 point) Let 5 -815Find an invertible matrix P and a diagonal matrix D 10 10 -33 such that D P-1AP
I 5.3: Diagonalization Find the diagonal matrix D and invertible matrix P such that A- PDp-1 if possible. If it is not possibl which eigenspace(s) are to blame. e, eosplain A-1 2 1 3 -1 A 1 1 1 5 0 3 A- 0 2 0 し406 5.3: Diagonalization Find the diagonal matrix D and invertible matrix P such that A- PDp-1 if possible. If it is not possibl which eigenspace(s) are to blame. e, eosplain A-1 2 1 3...
Question 12 [10 points] Find an invertible matrix P and a diagonal matrix D such that P-lAP=D. | 9 6 -2 A= -20 -13 4 | -24 -12 3 Tooo oool P= 0 0 0 D = 0 0 0 0 0 0 | 0 0 0 Official Time: 19:51:55 CS Scanned with CamScanner
Diagonalise the matrix A that is, find a diagonal matrix D and an invertible matrix P such that D = P-IAP Specify a (2 × 2) matrix P which diagonalizes A. P-1 Specify a (2 x 2) diagonal matrix D such that DPAP (you should be able to write down D without performing inversion and matrix multiplication): D-
Question 2 [10 points] Find an invertible matrix P and a diagonal matrix D such that P-AP=D. [ 13 0 5 0 -12 0 0 6 1-30 0 -12 0 | 32 0 10 -3) A = 1 P= To o o o 0 0 0 0 0 0 0 0 0 0 0 0 0 o o o o 0 0 0 0 0 0 0 0 0 0 0 0
Exercise 1 Let the matrix 15 00 A-010 20 -3 a) Find an invertible matrix P such that P-TAP is diagonal. b) Find the minimal polynomial. c) Find 410 (Note that 30 = 59049).
Question 3 (1 point) Find an invertible matrix P and a diagonal matrix D that show that matrix 8 -18 A= is diagonalizable. (Matrix A is the same as in the previous 3 - 7 problem.) -1 1 P= 1 1 1]. D=11_, (21]. D= [ ] 1 P= 1 O None of the options diplayed. P-[1.]. D-[ :D
Let A be a diagonalizable n × n matrix and let P be an invertible n × n matrix such that B = P−1AP is the diagonal form of A. Prove that Ak = PBkP−1, where k is a positive integer. Use the result above to find the indicated power of A. A = −4 0 4 −3 −1 4 −6 0 6 , A5