ii) If there is another eigenvalue, give a basis of eigenvectors associated to this eigenvalue. Otherwise, write the null vector.sin (a)∞afəxP Find the characteristic polynomial, the eigenvalues and a basis of eigenvectors associated to each eigenvalue for the matrix-3 0₁-(₁9)A = -2142a) The characteristic polynomial isp(r) = det(A — rI) =b) List all the eigenvalues of A separated by semicolons.-3;4c) For each of the eigenvalues that you have found in (b) (in increasing order) give a basis of eigenvectors. If there is more thanone vector in the basis for an eigenvalue, write them side by side in a matrix. If there is only one eigenvalue, enter the zerovector as an answer for the second eigenvalue.i) Give a basis of eigenvectors associated to the smallest eigenvalue.əabsin (a)∞aəxfaΩ

Answered: Image /qna-images/answer/7d27be1b-c56d-413a-8267-22b3b89b4208.jpg

Answered: Find the characteristic polynomial, the…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Calculate the characteristic polynomial of the following matrix A, and use it to compute the eigenvalues of A. -8 4 A = 14 4 6 -2 4 -6 How to enter polynomials: something like 2- 3*r + 4*r^2 - 5*rA3. Remember to use * for multiplication! Enter the characteristic polynomial of the matrix A: Note: Use r as the polynomial variable. Enter the eigenvalues of A separating them by commas: something like 1, -2, 5.
Suppose the characteristic equation for a matrix A is given by X3 + 3X2 – 9A – 27 = 0. Find the eigenvalues of the matrix A and give the algebraic multiplicity of each eigenvalue. - Eigenvalue: A = 3 Eigenvalue: A = Algebraic multiplicity: Ex: 5 Algebraic multiplicity:
Find the characteristic equation and eigenvalues of the matrix and a basis for each of the corresponding eigenspaces. a- [ 6 -3 A = -2 1 the characteristic equation the eigenvalues (Enter your answers from smallest to largest.) (A1, 12) = a basis for each of the corresponding eigenspaces B2 For the matrix A, use the basis of the eigenspaces to find a nonsingular matrix P such that P-'AP is diagonal. P = Verify that PAP is a diagonal matrix with the eigenvalues on the main diagonal.
Consider the matrix A =−6 4−2 0 A) Determine the eigenvalues of the matrix A B) For each eigenvalue from part (A), determine the corresponding eigenvectors of the matrix A. Use row operation notation to indicate steps
The matrix * 8 0. A = 0. -2 -2 -6 has one real eigenvalue. Find this eigenvalue and a basis of the eigenspace. The eigenvalue is A basis for the eigenspace is
A) Find the eigenbasis of the matrix and diagonalize it (if possible): when p=4. Also, Use this diagonalization to find A^3 and A^7. (the matrix in the photo) B) For the matrix in part (A), find A^2 and A^1 theorem.using Cayley-Hamilton
Find the eigenvalues of the matrix -3 3 -3 -6 6 -3 -9 9 For each eigenvalue, find an eigenvector or some eigenvectors that form a basis for the corre- sponding eigenspace.

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