#9. If P and Q are two transition probability matrices with the same number of row...
Due in 2 hr (a) Use Octave as a Calculator to answer this question Suppose that A and B are two 8 × 9 matrices. The (i, j)-entry of the matrix B is given by i *j -1. The (i,j)-entry of the matrix A equals 0 if i +j is divisible by 5 and equals the (i,j)-entry of the matrix B otherwise. i. What are the rank and nullity of matrices A and B? Is vector u =[964,-71,4249, 59, 234,-196.97]...
Matlab answer only Form 1 6) [10 pts] Consider the following two matrices B=[S A 3 1 5 -7 4 6-3] a) Obtain the sum of each row of matrix A. b) Use the size function to create a magic matrix P which has the same size as matrix A. c) Create a matrix called Q from the second column of matrix A d) Extract the four numbers in the lower left-hand corner of matrix A and create matrix R....
Consider the Markov chains given by the following transition matrices. (1) Q = (1/2 1/2) (we= (1/2 162) (ii) Q = (1 o). /1/3 0 2/3 (1/2 1/2 0 (iv) Q = 1 0 1 0 1 (v) Q = 1 0 1/2 1/2 lo 1/5 4/5) \1/3 1/3 1/3) For each of the Markov chains above: A. Draw the transition diagram. B. Determine whether the chain is reducible or irreducible. Justify your answer. C. Determine whether the chain is...
Please justify answer Determine which of the following matrices is row equivalent to Z and indicate the specific row operations need to produce the new matrix from Z. 1 2 Z= 3 4 -1 5 1 2 9 12 1 9 -1 0 0 1 2 2 4 3 6
Consider a two state Markov chain with one-step transition matrix on the states 1,21, , 0<p+q<2. 91-9 ' Show, by induction or otherwise, that the n-step transition matrix is Ptg -99 Based upon the above equation, what is lim-x P(Xn-2K-1). How about limn→x P(Xn-
Suppose the matrices P and Q have the same rows as I but in any order. They are "permutation matrices". Show that P - Q is singular by solving (P - Q)X = 0.
Consider a 2x2 transition matrix P consisting of column vectors [a c] and [b d]. The matrix P has two eigenvalues: 1 and k. Find the value of k in terms of the elements of the matrix P and place constraints of the values of k. Calculate eigenvectors for each eigenvalue and hence write down the matrix S whose columns are the eigenvalues of P.
please answer 2a(i) only 2. (a) Use Octave as a Calculator to answer this question. Suppose that A and B are two 8 × 9 matrices. The (i, j)-entry of the matrix B is given by i *j - 1. The (i,j)-entry of the matrix A equals 0 if i +j is divisible by and equals the (i,j)-entry of the matrix B otherwise. i. What are the rank and nullity of matrices A and B? ii. Is vector u- [9,...
Consider the Markov chains with the following probability transition matrices: ar-(032) OP=(0503) a) P = 0.5 0.5 0.5 0.5 b) P = 0.5 1 1 0.5 0 OPEL c) P = 0 1 = 0 ( e) P = 0 d) P = WI-NI-NI- 11 Draw the transition diagram for each case and explain whether the Markov chain is irreducible and/or aperiodic.
QUESTIONS Problem 3. Let P, Q be nxn matrices with PQ = QP. Suppose that is nonsinsingular and veR" is a nonzero eigenvector of P. Determine which of the following statements is True. e: v and Qü are eigenvectors of P with the same eigenvalues. 12: v and Qü are eigenvectors of P with distinct eigenvalues. T: Qü is not an eigenvector of P. V: None of the other answers. e оооо