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

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

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

Give an example of a nondiagonal 2x2 matrix that is diagonalizable but not invertible. Show that...

Give an example of a nondiagonal 2x2 matrix that is diagonalizable but not invertible. Show that these two facts are the case for your example.

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 A be an n × n matrix and let x be an eigenvector of A...

Let A be an n × n matrix and let x be an eigenvector of A corresponding to the eigenvalue λ . Show that for any positive integer m, x is an eigenvector of Am corresponding to the eigenvalue λ m .

Let A be an m x n matrix and let E be a m x m...

Let A be an m x n matrix and let E be a m x m elementary matrix. Show that EA is the matrix that results from applying the corresponding elementary row operation on A.

Prove or disprove: Can a symmetric matrix be necessarily diagonalizable? Please show clear steps. Thank you.

Prove or disprove: Can a symmetric matrix be necessarily diagonalizable? Please show clear steps. Thank you.

1.Let A be an n x n matrix. Which of these conditions show that A is...

1.Let A be an n x n matrix. Which of these conditions show that A is invertible? •det A= 0 • dim (NulA) = 1 •ColA=R^n •A^T is invertible •an n x n matrix, D, exists where AD=In

Let A be an n x M matrix and let T(x) =A(x). Prove that T: R^m...

Let A be an n x M matrix and let T(x) =A(x). Prove that T: R^m R^n is a linear transformation

Let A be a n × n matrix, and let the system of linear equations A~x...

Let A be a n × n matrix, and let the system of linear equations A~x = ~b have infinitely many solutions. Can we use Cramer’s rule to find x1? If yes, explain how to find it. If no, explain why not.