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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.
4 7 5 0 2 2 Problem 7 Let A= -1 2 9 -4 1 5 -1 3 7 3 1 -4 2 0 1 1 0 10 2 a) (4 pts] Using the [V, D] command in MATLAB with rational format, find a diagonal matrix D and a matrix V of maximal rank satisfying the matrix equation A * V = V * D. Is A real-diagonalizable? b) [4 pts) Write down the eigenvalues of A. For each eigenvalue,...
1 Problem 7 Let A 4 5 - 1 5 0 2 -1 2 3 -4 7 2 1 3 7 2 -4 2 0 0 10 1 1 a) (4 pts] Using the [V, DJ command in MATLAB with rational format, find a diagonal matrix D and a matrix V of maximal rank satisfying the matrix equation A * V = V * D. Is A real-diagonalizable? b) (4 pts) Write down the eigenvalues of A. For each eigenvalue,...
Could you please just solve Question
(i) A: Thanks
3. For each of the following matrices, a. Determine the characteristic polynomial corresponding to the matrix. b. Find the eigenvalues of the matrix. c. For each eigenvalue, determine the corresponding eigenspace as a span of vectors. d. Determine an eigenvector corresponding to each eigenvalue. e. Pick one eigenvalue of each matrix and the corresponding eigenvector chosen in part (d) and verify that they are indeed an eigenvalue and eigenvector of the...
I really just need D and E
1. Throughout this problem, let A : be the 2x2 matrix : (a) (10 pts) Find the two (red) eigenvalues for A. Donote. them by ? and ?2, where 2, 422. Be sure to show all of your work. (6) (10 pts.) Find an eigen vector 3 l of A having eigenvalue 2. Be sure to show your work. Γ Χ ρ Λ (0) (10 pts.) Find an ergonverter wel of A having...
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
Linear Algebra -- Please show work on both questions. I will
upvote for both questions
4. (7 pts) Find the characteristic equation and the real eigenvalues of the matrix A= [ 4 0 -1 ] 0 4 -1 . [102] is 5. (8 pts) The only eigenvalue of the upper triangular matrix A= motrin A1 1liche 0 1 whose multiplicity is Find a basis for the eigenspace corresponding to this eigenvalue.
please show all work
1: Let 0 << 27, and set A= I cos(0) co -sin(0) 1 | sin(@) cos(0) . (a) Recall that fa(4) denotes the characteristic polynomial for A. Show that faa) = (1 - cos(O))2 + sin(0). (b) Using part (a) show that A has no eigenvalues if is not equal to 0 or . [ 2 -2 0 0 1 1 -1 0 0 2: Set B= 10 0 3 -4 0 0 2 -3 (a)...
I know A-D. Please do E-G only. Thanks!
[ 1 ]
[ 0 ] = W, W_2 is found in part F
[ 1 ]
3. (Taken from Boyce & DiPrima) Consider the 3-dimensional system of linear equations Ti 11] X' = AX = 2 1 -1 x 1-3 2 4 (a) Show that the three eigenvalues of the coefficient matrix, A, are 1, = lyd = 2. This is an eigenvalue of multiplicity 3. (b) Show that all the...
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...