Let P be an nxn projectionmatrix with the columnspace W(n geq 2). Define the matrix A...

Let A be an nxn matrix. Show that if Rank(A) = n, then Ax = b...

Let A be an nxn matrix. Show that if Rank(A) = n, then Ax = b has a unique solution for any nx1 matrix b.

Let A be an n×n matrix, I be n×n identity matrix. Define Lij =I+Mij, (1) i...

Let A be an n×n matrix, I be n×n identity matrix. Define Lij =I+Mij, (1) i > j, where the only non-zero element of Mij is mij on i-th row, j-th column. 1. Calculate LijA. What is the relationship between LijA and A? 2. Calculate L−1. ij 3. Suppose now we have a series of nonzero real numbers mi+1,i, mi+2,i, · · · , mn,i. Define Li+1,i , Li+2,i , · · · , Ln,i in the fashion of equation...

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 a (n × n) matrix. Show that A and AT have the same...

Let A be a (n × n) matrix. Show that A and AT have the same characteristic polynomials (and therefore the same eigenvalues). Hint: For any (n×n) matrix B, we have det(BT) = det(B). Remark: Note that, however, it is generally not the case that A and AT have the same eigenvectors!

Let A be an symmetric matrix. Assume that A has two different eigenvalues ?1 ?= ?2....

Let A be an symmetric matrix. Assume that A has two different eigenvalues ?1 ?= ?2. Let v1 be a ?1-eigenvector, and v2 be and ?2-eigenvector. Show that v1 ? v2. (Hint: v1T Av2 = v2T Av1.)

For these two problems, use the definition of eigenvalues. (a) An n × n matrix is...

For these two problems, use the definition of eigenvalues. (a) An n × n matrix is said to be nilpotent if Ak = O for some positive integer k. Show that all eigenvalues of a nilpotent matrix are 0. (b) An n × n matrix is said to be idempotent if A2 = A. Show that all eigenvalues of a idempotent matrix are 0, or 1.

A projection matrix (or a projector) is a matrix P for which P2 = P. a)...

A projection matrix (or a projector) is a matrix P for which P2 = P. a) (10 pts) Find the eigenvalues of a projector. Show details. b) (10 pts) Show that if P is a projector, then (I – P) is also projector. Explain briefly. c) (5 pts) What assumption about matrix A should be made to run the power method?

Q 1) (25 pts) A projection matrix (or a projector) is a matrix P for which...

Q 1) (25 pts) A projection matrix (or a projector) is a matrix P for which P^2 = P. a) (10 pts) Find the eigenvalues of a projector. Show details b) (10 pts) Show that if P is a projector, then (I – P) is also projector. Explain briefly. c) (5 pts) What assumption about matrix A should be made to run the power method?

Let A be an m × n matrix, and Q be an n × n invertible...

Let A be an m × n matrix, and Q be an n × n invertible matrix. (1) Show that R(A) = R(AQ), and use this result to show that rank(AQ) = rank(A); (2) Show that rank(AQ) = rank(A).