Q1) Let A = 2 0 0 1 3 -1 2 2 a) Determine all eigenvalues of A. b) Determine the basis for each eigenspace of A c) Determine the algebraic and geometric multiplicity of each eigenvalue.
Let A be the matrix To 1 0] A= -4 4 0 1-2 0 1 (a) Find the eigenvalues and eigenvectors of A. (b) Find the algebraic multiplicity an, and the geometric multiplicity, g, of each eigenvalue. (c) For one of the eigenvalues you should have gi < az. (If not, redo the preceding parts!) Find a generalized eigenvector for this eigenvalue. (d) Verify that the eigenvectors and generalized eigenvectors are all linearly independent. (e) Find a fundamental set of...
0 2 0 Q1) Let A = 1 3 2 2 0 a) Determine all eigenvalues of A. b) Determine the basis for each eigenspace of A c) Determine the algebraic and geometric multiplicity of each eigenvalue. Q2) Let aj, 02, 03, 04, agbe real numbers. Compute ai det 1 1 Q3) Determine all values of x E R such that matrix 4 0 3 х 2 5 A = is invertable. х 0 0 1 0 0 4 0
2) Let A be an nxn matrix with eigenvalue of multiplicity n. Show that Ais diagonalizable if and only if A = al.
A = [(5, 1, 0), (0, 5, 0), ( 0, 0, 5)] (each row in paranthesis) a. Find all eigenvalues of A. b. Find the eigenspaces of A. c. Find the algebraic multiplicity and the geometric multiplicity of every eigenvalue of A. d. Justify if matrix A is diagonalizable.
1 Compute and completely factor the characteristic polynomial of the following matrix: 0 A= -4 5 0 1 1 For credit, you have to factor the polynomial and show work for each step. B In the following, use complex numbers if necessary. For each of the following matrices: • compute the characteristic polynomial; • list all the eigenvalues (possibly complex) with their algebraic multiplicity; • for each eigenvalue, find a basis (possibly complex) of the corresponding eigenspace, and write the...
Given that A = 54 0 LO 3 -2 3 0] 0 has eigenvalues 11 = –2 and 12 = 4 and 4] 1 a basis for Exy is 1-2 %. 1] Choose ALL the statement(s) that are ALWAYS TRUE. = -2 are O A is NOT diagonalizable since the algebraic multiplicity and the geometric multiplicity of x different. A is NOT diagonalizable since the algebraic multiplicity and the geometric multiplicity of 12 = 4 are different. O A is...
For the given Matrix B, find: 1. The algebraic multiplicity of each eigenvalue. 2. The geometric multiplicity of each eigenvalue. 3. The matrix B is it Diagonalizable? If YES, provide the matrices P and D. ( 22-1 B = 1 3 -1 (-1 -2 2
5. Let -2 0 2AA8 (a) Show thatis an eigenvector of A. What is its eigenvalue? (b) By solving (A+2/)x 0, show that -2 is an eigenvalue of A. (c) Use the results of parts (a) and (b) to write down all eigenvalues of A along with their algebraic and geometric multiplicities. Is A diagonalizable? (Note: This question does not require finding eigenvalues by solving det(A XI) 0) 5. Let -2 0 2AA8 (a) Show thatis an eigenvector of A....
O 1/13 points | Previous Answers poolelinalg4 4.3.003.nva 5. Consider the following. 1 0 0-3 1 A= 0 4 0 (a) Compute the characteristic polynomial of A. det(A- λ- (1-λ) (-3- λ ) (4- λ ) (b) Compute the eigenvalues and bases of the corresponding eigenspaces of A. (F λι- has eigenspace span (small λ has eigenspace span has eigenspace span (largestA 41 (c) Compute the algebraic and geometric multiplicity of each eigenvalue. has algebraic multiplicity 2 has algebraic multiplicity...