I've attached Handwritten solution for the given problem.
Orthogonally diagonalize as a. b. c. d. e. f. Orthogonally diagonalize A as PDPT A = ['$ ] a. 1 2 P = 1 2 1 2 D [ 6 0 0-4 1 2 b . Р = 1 1 2 12 1 1 2 2 D = 16] -60 04 - C. 2 2 P= D = 0-4 6 0 2 12 *-=[17] --66--] 0-60] O e. 1 2 v2 P = 2 12 O f. 1 2 Sila...
(7') Orthogonally diagonalize the matrix (4 12). 1
1. Orthogonally diagonalize the following matrices, if possible. If it is possi- on of the matrix ble, give the spectral decompositi 0-3 0 2 1. Orthogonally diagonalize the following matrices, if possible. If it is possi- on of the matrix ble, give the spectral decompositi 0-3 0 2
Orthogonally diagonalize A as PDPT A = []} }] 15 51
Orthogonally diagonalize A as PDPT A = []} }] 15 51
Orthogonally diagonalize A as PDPT A = 1 5 51
Orthogonally diagonalize A as PDPT A = O a. 1 V2 2 P= 0-102 2 2 b. 12 P = o=[6] -4 0 06 √ √2 OC. 2 V2 -60 P= D = 0 4 2 V2 002-[17] -[8] D- [8 ] Oe. P = 2 V2 Of. 2 2 P= p=[6 -] 1 1 2 2
Please write every step done, the gram-Schmidt process I cannot understand 6. Orthogonally diagonalize each of the following symmetric matrices. Give the similarity transformation. 112] (b) 11 2 1 -8 1 3 7. Orthogonally diagonalize each of the following symmetric matrices. Give the similarity transformation. 1 31 L3 9 1.5-0.5 -0.5 1.5
Hi~~ i need to know how to solve this! 0 Orthogonally diagonalize the following matrix 3 7 A= 0 5 0 7 0 3
Orthogonally diagonalize the matrix, giving an orthogonal matrix P and a diagonal matrix D 9 3 3 9 Enter the matrices P and D below.