Let A be a square matrix with A^2 = A. Prove that A is diagonisable and...

A square matrix A is said to be idempotent if A2 = A. Let A be...

A square matrix A is said to be idempotent if A2 = A. Let A be an idempotent matrix. Show that I − A is also idempotent. Show that if A is invertible, then A = I. Show that the only possible eigenvalues of A are 0 and 1.(Hint: Suppose x is an eigenvector with associated eigenvalue λ and then multiply x on the left by A twice.) Let W = col(A). Show that TA(x) = projW x and TI−A(x)...

A square matrix A is said to be idempotent if A2 = A. Let A be...

A square matrix A is said to be idempotent if A2 = A. Let A be an idempotent matrix. Show that I − A is also idempotent. Show that if A is invertible, then A = I. Show that the only possible eigenvalues of A are 0 and 1.(Hint: Suppose x is an eigenvector with associated eigenvalue λ and then multiply x on the left by A twice.) Let W = col(A). Show that TA(x) = projW x and TI−A(x)...

Let A be square matrix prove that A^2 = I if and only if rank(I+A)+rank(I-A)=n

Let A be square matrix prove that A^2 = I if and only if rank(I+A)+rank(I-A)=n

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?

Let A be a positive definite matrix. If a ∈ R, prove that aA is positive...

Let A be a positive definite matrix. If a ∈ R, prove that aA is positive definite if and only if a > 0.

Let A be a matrix with m distinct, non-zero, eigenvalues. Prove that the eigenvectors of A...

Let A be a matrix with m distinct, non-zero, eigenvalues. Prove that the eigenvectors of A are linearly independent and span R^m. Note that this means (in this case) that the eigenvectors are distinct and form a base of the space.

(3 pts) Let A be a square n × n matrix whose rows are orthogonal. Prove...

(3 pts) Let A be a square n × n matrix whose rows are orthogonal. Prove that the columns of A are also orthogonal. Hint: The orthogonality of rows is equivalent to AAT = I ⇒ ATAAT = AT

Let ? be an eigenvalue of the ? × ? matrix A. Prove that ? +...

Let ? be an eigenvalue of the ? × ? matrix A. Prove that ? + 1 is an eigenvalue of the matrix ? + ?? .

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 a square matrix with an inverse A-1. Show that if Ab = 0...

Let A be a square matrix with an inverse A-1. Show that if Ab = 0 then b must be the zero vector.