Let A be any 2 by 2 stochastic matrix. Is A always diagonalizable? Justify your answer.

Let A be an n x n invertable and diagonalizable matrix. Is A^2 diagonalizable? Please give...

Let A be an n x n invertable and diagonalizable matrix. Is A^2 diagonalizable? Please give proof.

Let A be a n × n real diagonalizable matrix. Show that A + αIn is...

Let A be a n × n real diagonalizable matrix. Show that A + αIn is also real diagonalizable.

Let P be a 2 x 2 stochastic matrix. Prove that there exists a 2 x...

Let P be a 2 x 2 stochastic matrix. Prove that there exists a 2 x 1 state matrix X with nonnegative entries such that P X = X. Hint: First prove that there exists X. I then proved that x1 and x2 had to be the same sign to finish off the proof

Let (pij ) be a stochastic matrix and {Xn|n ≥ 0} be an S-valued stochastic process...

Let (pij ) be a stochastic matrix and {Xn|n ≥ 0} be an S-valued stochastic process with finite dimensional distributions given by P(X0 = i0, X1 = i1, · · · , Xn = in) = P(X0 = i0)pi0i1 · · · pin−1in , n ≥ 0, i0, · · · , in ∈ S. Then {Xn|n ≥ 0} is a Markov chain with transition probability matrix (pij ). Let {Xn|n ≥ 0} be an S-valued Markov chain. Then the...

Let P be a stochastic matrix. Show that λ=1 is an eigenvalue of P. What is...

Let P be a stochastic matrix. Show that λ=1 is an eigenvalue of P. What is the associated eigenvector?

True or False? (Make sure to justify your answer.) For this question let ?A be a...

True or False? (Make sure to justify your answer.) For this question let ?A be a non-zero ?×?m×n matrix, and ?B an invertible ?×?n×n matrix. If {?1,...,??}{x1,...,xk} is a basis for null(?)null(A), then dim(null(??))=?dim(null(AB))=k.

Prove that for any 5 × 5 matrix A with rank two, there are a 5...

Prove that for any 5 × 5 matrix A with rank two, there are a 5 × 2 matrix B and a 2 × 5 matrix C such that A = BC. Justify your answer.

True or False? Justify your answer. If the kernel of matrix A contains two different vectors,...

True or False? Justify your answer. If the kernel of matrix A contains two different vectors, then homogeneous system A.x=θ has infinitely many solutions.

8. Consider a 4 × 2 matrix A and a 2 × 5 matrix B ....

8. Consider a 4 × 2 matrix A and a 2 × 5 matrix B . (a) What are the possible dimensions of the null space of AB? Justify your answer. (b) What are the possible dimensions of the range of AB Justify your answer. (c) Can the linear transformation define by A be one to one? Justify your answer. (d) Can the linear transformation define by B be onto? Justify your answer.

For each of the following statement, determine it is “always true” or “always false”. Explain your...

For each of the following statement, determine it is “always true” or “always false”. Explain your answer. (a) For any matrix A, the matrices A and −A have the same row space. (b) For any matrix A, the matrices A and −A have the same null space. (c) For any matrix A, if A has nullity 0, then A is nonsingular.