For the matrix A, find (if possible) a nonsingular matrix P such that P−1AP is diagonal....

Find a matrix P such that PTAP orthogonally diagonalizes A. Verify that PTAP gives the proper...

Find a matrix P such that PTAP orthogonally diagonalizes A. Verify that PTAP gives the proper diagonal form. (Enter each matrix in the form [[row 1], [row 2], ...], where each row is a comma-separated list.) A = 3 3 3 3

Prove: Why must every upper triangular matrix with no zero entries on the main diagonal be...

Prove: Why must every upper triangular matrix with no zero entries on the main diagonal be nonsingular? (Linear Algebra)

1. What are the possible eigenvalues of a square matrix P which satisfies P^2=P?

1. What are the possible eigenvalues of a square matrix P which satisfies P^2=P?

Show that for each nonsingular n x n matrix A there exists a permutation matrix P...

Show that for each nonsingular n x n matrix A there exists a permutation matrix P such that P A has an LR decomposition. [note: A factorization of a matrix A into a product A=LR of a lower (left) triangular matrix L and an upper (right) triangular matrix R is called an LR decomposition of A.]

Q‒5. [8+4+8 marks] Let Find the eigenvalues of A and the corresponding eigenvectors. Find a matrix...

Q‒5. [8+4+8 marks] Let Find the eigenvalues of A and the corresponding eigenvectors. Find a matrix P and a diagonal matrix D such thatD=P-1AP . Using the equationD=P-1AP , computeA27 .

Show that if A is an (n × n) upper triangular matrix or lower triangular matrix,...

Show that if A is an (n × n) upper triangular matrix or lower triangular matrix, its eigenvalues are the entries on its main diagonal. (You may limit yourself to the (3 × 3) case.)

Let A be an n×n nonsingular matrix. Denote by adj(A) the adjugate matrix of A. Prove:...

Let A be an n×n nonsingular matrix. Denote by adj(A) the adjugate matrix of A. Prove: 1)   det(adj(A)) = (det(A)) 2)    adj(adj(A)) = (det(A))n−2A

Suppose A is a 2x2 matrix with vectors v1=(-12, 10) v2=(-15,13). Find an invertible matrix P...

Suppose A is a 2x2 matrix with vectors v1=(-12, 10) v2=(-15,13). Find an invertible matrix P and a diagonal matrix D so that A=PDP-1. Use your answer to find an expression for A7 in terms of P, a power of D, and P-1 in that order.

3. Diagonalize the matrix J by computing P, D, and P −1 . J = "...

3. Diagonalize the matrix J by computing P, D, and P −1 . J = " 1 3 −1 5# 4. Find the eigenvalues and eigenvectors of the following matrix. W = " 7 −9 4 7 #

Matrix A is given as A = 0 2 −1 −1 3 −1 −2 4 −1...

Matrix A is given as A = 0 2 −1 −1 3 −1 −2 4 −1    a) Find all eigenvalues of A. b) Find a basis for each eigenspace of A. c) Determine whether A is diagonalizable. If it is, find an invertible matrix P and a diagonal matrix D such that D = P^−1AP. Please show all work and steps clearly please so I can follow your logic and learn to solve similar ones myself. I...