Problem 2: Let 4 1 2 5 1-1 0 3 2 0 3 2 a) Find the eigenvalues, eigenspaces of the linear operators LB, Lo. b) Using part a), find a basis for R3 that diagonalizes the linear operators c) Write B- EDE- with D a diagonal matrix. d) Find the eigenvalues, eigenspaces, and generalized eigenspaces of LA Problem 2: Let 4 1 2 5 1-1 0 3 2 0 3 2 a) Find the eigenvalues, eigenspaces of the linear...
30 01 1. Let A-0 3 4 0 4 3] (a) Find the eigenvalues and their corresponding eigenspaces for A. (b) Is A diagonalisable? If so, find a diagonalisation for A. (c) Find a formula for A" where n is any positive integer
(b) The matrix B= 1 2 2 3 3 1 3 2 4 has eigenvalues 7,2, -1. i. Find a column and a row eigenvector of B corresponding to the Perron eigenvalue. ii. Find a rank one nonnegative matrix C such that the matrix B+C will have eigenvalues 13, 2, -1. iii. Let a and B be real numbers. Calculate the eigenvalues of D(a, b) = aB+ BC. iv. Find limno(+B)"
Question 3 Set Let A-Σ 1 λ¡ViuT be the spectral decomposition with positive eigenvalues λ1,···Ae > 0. Ak Prove the following properties: 1. AT İs symmetric and AT PAP is its spectral decomposition: 3, Denote A-2-(A*) . Then A 2 E 1 where Question 3 Set Let A-Σ 1 λ¡ViuT be the spectral decomposition with positive eigenvalues λ1,···Ae > 0. Ak Prove the following properties: 1. AT İs symmetric and AT PAP is its spectral decomposition: 3, Denote A-2-(A*) ....
3 1. Let A = 0 (a) Compute the eigenvalues of A and specify their algebraic multiplicities. (b) For every eigenvalue 1, determine the eigenspace Ex and specify its dimension. (c) Is A a defective matrix? Why or why not? (d) Is A a singular matrix? Why or why not? (e) Determine the eigenvalues of (74) + 5.
Let the matrix 10 1 act on c. Find the eigenvalues and a basis for each eigenspace in c? 45 4 Select all that apply. 3+61 I A. 1 =7-61; v= A B. = -7 +61,v= -3-6i 15 6 -3-6 i O c. 1 = 7+6 iv= - 3+6 D. 1 = 7+61,v= 45 Click to select your answer(s). 10 1 Let the matrix act on c? Find the eigenvalues and a basis for each eigenspace in C? 45 4...
5 -1 03 5 o 3 -3 3 0 3 4. (25 pts) Let a) (10 pts) You are told that two of the eignenvalues of A are 2, and 9. Either prove or disprove that these are eigenvalues. Show your work clearly
01910.0 points Let A be a 3 x 3 matrix with eigenvalues 1, and -2 and corresponding eigenvectors 6 16 If fx%^ is the solution of the difference equa- tion determine xj 1.x1 - 4 4 4 4 4 -244-442 44-2 5
Let 4-β 0 0 A=1 0 4-3 024-β where β > 0 is a parameter. (a) Find the eigenvalues of A (note the eigenvalues will be functions of β). (b) Determine the values of β for which the matrix A is positive definite. Determine the values of β for which the matrix A is positive semidefinite. (c) For each eigenvalue of A, find a basis for the corresponding eigenspace. (d) Find an orthonormal basis for R3 consisting of eigenvectors of...
11 18 7 Let 4 6 10 (a) Find the eigenvalues of A. (b) For each eigenvalue find the corresponding eigenvectors. (c) Let 21 and 22 be the eigenvalues of A such that 21 <12. Find a match for 11. Find a match for 12 Find a matching eigenvector vị for 11 - Find a matching eigenvector v2 for 12 Let P and D be 2 x 2 matrices defined as follows: 20 and P = [v1v2] o 22 that...