Find P such that P^T*AP orthogonally diagonalizes A= [-2 2 4 ] . State what the...

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

For the matrix A, find (if possible) a nonsingular matrix P such that P−1AP is diagonal. (If not possible, enter IMPOSSIBLE.) A = 6 −3 −2 1 . Verify that P−1AP is a diagonal matrix with the eigenvalues on the main diagonal.

Consider the Markov chain with the state space {1,2,3} and transition matrix P= .2 .4 .4...

Consider the Markov chain with the state space {1,2,3} and transition matrix P= .2 .4 .4 .1 .5 .4 .6 .3 .1 What is the probability in the long run that the chain is in state 1? Solve this problem two different ways: 1) by raising the matrix to a higher power; and 2) by directly computing the invariant probability vector as a left eigenvector.

Consider a Markov chain with state space {1,2,3} and transition matrix. P= .4 .2 .4 .6...

Consider a Markov chain with state space {1,2,3} and transition matrix. P= .4 .2 .4 .6 0 .4 .2 .5 .3 What is the probability in the long run that the chain is in state 1? Solve this problem two different ways: 1) by raising the matrix to a higher power; and 2) by directly computing the invariant probability vector as a left eigenvector.

You are given a transition matrix P. Find the steady-state distribution vector. HINT [See Example 4.]...

You are given a transition matrix P. Find the steady-state distribution vector. HINT [See Example 4.] P = 3/4 1/4 8/9 1/9 You are given a transition matrix P. Find the steady-state distribution vector. HINT [See Example 4.] P = 4/5 1/5 0 5/6 1/6 0 5/9 0 4/9

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 .

. Let A = (−2, 4) and B = (7, 6). Find the point P on...

. Let A = (−2, 4) and B = (7, 6). Find the point P on the line y = 2 that makes the total distance AP + BP as small as possible.

You are given a transition matrix P. Find the steady-state distribution vector. HINT [See Example 4.]...

You are given a transition matrix P. Find the steady-state distribution vector. HINT [See Example 4.] A) P = 5/6 1/6 7/9 2/9 B) P = 1/5 4/5 0 5/8 3/8 0 4/7 0 3/7

Find a basis B for the domain of T such that the matrix for T relative...

Find a basis B for the domain of T such that the matrix for T relative to B is diagonal. T: R3 → R3: T(x, y, z) = (−5x + 2y − 3z, 2x − 2y − 6z, −x − 2y − 3z)

Suppose A is the matrix for T: R3 → R3 relative to the standard basis. Find...

Suppose A is the matrix for T: R3 → R3 relative to the standard basis. Find the diagonal matrix A' for T relative to the basis B'. A = −1 −2 0 −1 0 0 0 0 1 , B' = {(−1, 1, 0), (2, 1, 0), (0, 0, 1)}

Find a basis B for the domain of T such that the matrix for T relative...

Find a basis B for the domain of T such that the matrix for T relative to B is diagonal. T: R3 → R3: T(x, y, z) = (−4x + 2y − 3z, 2x − y − 6z, −x − 2y − 2z) B =