Consider the matrix -2 -3 AE 1 -3 3 a) Find the eigenvalues of A. And...
2. Consider the matrix (a) By hand, find the eigenvalues and eigenvectors of A. Please obtain eigenvectors of unit length. (b) Using the eigen function in R, verify your answers to part (a). (c) Use R to show that A is diagonalizable; that is, there exists a matrix of eigenvectors X and a diagonal matrix of eigenvalues D such that A XDX-1. The code below should help. eig <-eigen(A) #obtains the eigendecomposition and stores in the object "eig" X <-eigSvectors...
3. ( Find all eigenvalues and eigenvectors of the matrix A= [ 5 | 3 -1] and show the eigen- 1 vectors are linearly independent.
Question 1: Given the following matrix A. 02 A- 1 2 3 2 (a) Find the determinant of A (b) Find eigenvalues and the corresponding eigenspaces of A (c) Determine whether A is diagonalizable. If so, find a matrix P and a diagonal matrix D such that P-1AP=D If not, justify your answer. (d) Find a basis of Im(A) and find the rank of Im(A) (e) Find a basis of Ker(A) and find the rank of Ker(A) Question 1: Given...
4.22. Consider the vibrating system described by 42 -2 1 Compute the mass-normalized stiffness matrix, the eigenvalues, the normalized eigen- vectors, the matrix P, and show that PTMP I and PTKP is the diaggaal matrix of eigenvalues Л 4.22. Consider the vibrating system described by 42 -2 1 Compute the mass-normalized stiffness matrix, the eigenvalues, the normalized eigen- vectors, the matrix P, and show that PTMP I and PTKP is the diaggaal matrix of eigenvalues Л
Q2. Consider the matrix A 6 3 0 -1 0-2 0 5 (a) Find all eigenvalues of the matrix A. (b) Find all eigenvectors of the matrix A. (c) Do you think that the set of the eigenvectors of A is a basis for the vector space R3? (Justify your answer
Please answer 1 and 2 with explanation. EIGEN VALUE-VECTORS 1) Find the eigenvalues and their corresponding eigenvectors of the matrix 1 3 2 ) A=| 10 -2 ) 2) Find the eigenvalues and their corresponding eigenvectors of the matrix Tunin o diaconal matrix. Can matrix A be
eage vectors Q1-3 Determine all eigenvalues and of the given matrix 1. A=(261) 2. A = /7 / 8 lo -8 -9 0 6 G -1 3. A= 13 -2 21 7 Hint: Use the scheme to find eigen Jalues Horner the
0 0 Q2. Consider the matrix A 6 2 -5 0 1 (a) Find all eigenvalues of the matrix A. (7 pts) (b) Find all eigenvectors of the matrix A. (8 pts) (c) Do you think that the set of the eigenvectors of A is a basis for the vector space R*? (Justify your answer) (5 pts)
step by step please Find the eigenvalues of the matrix and determine whether there is a sufficient number to guarantee that the matrix is diagonalizable. (Recall that the matrix may be diagonalizable even though it is not guaranteed to be diagonalizable by the theorem shown below.) Sufficient Condition for Diagonalization If an n x matrix A has n distinct eigenvalues, then the corresponding cigenvectors are linearly independent and A is diagonalizable 02 Find the eigenvalues. (Enter your answers as a...
please solve them clear Q1. Let A= be a 2 x 2 matrix. 45 (a) Find the characteristic polynomial of the matrix A. (5 pts) (b) Find all eigenvalues and associated eigenvectors of the matrix A. (10 pts) (c) If X is an eigenvalue of A, what do you think it would be the eigenvalue of the matrix 5A?(Justify your answer) (5 pts) Q2. Consider the matrix A = 2 -5 -6 1-50 (a) Find all eigenvalues of the matrix...