Please follow the comment Linear Algebra Show that A and AT have the same eigenvalues. Do...

I'm studying Linear Algebra. A Matrix A is a 3*3 matrix and it has 3 linear...

I'm studying Linear Algebra. A Matrix A is a 3*3 matrix and it has 3 linear independent eigenvectors. The Matrix B has the same eigenvectors (but not necessarily the same eigenvalues). I'm supposed to prove that AB=BA. I'm given a clue that says: ,, Is it possible to diagonal A and B?''. I want to be clear that the matrixes are not given. Thank you.

Find eigenvectors associated with the eigenvalues of the following linear operator: (please show all steps) V=...

Find eigenvectors associated with the eigenvalues of the following linear operator: (please show all steps) V= R^3; T(x1,x2,x3) = (x1+x2, 2x2+2x3, 3x3)

What are the eigenvectors and eigenvalues of the matrix A = [ 0 1 1 1]...

What are the eigenvectors and eigenvalues of the matrix A = [ 0 1 1 1] how can i write the vector v = [1 0] as a linear combition of the eigenvectors? please explain

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 matrices A,B∈Mn×n(R). Show that if A and B are each similar to some diagonal matrix,...

Let matrices A,B∈Mn×n(R). Show that if A and B are each similar to some diagonal matrix, and also have the same eigenvectors (but not necessarily the same eigenvalues), then  AB=BA.

Linear Algebra Conceptual Questions • If a subset of a vector space is NOT a subspace,...

Linear Algebra Conceptual Questions • If a subset of a vector space is NOT a subspace, what are the four things that could go wrong? How could you check to see which of these four properties aren’t true for the subset? • Is it possible for two distinct eigenvectors to correspond to the same eigenvalue? • Is it possible for two distinct eigenvalues to correspond to the same eigenvector? • What is the minimum number of vectors required take to...

Assume that all the eigenvalues ​​of A have a negative real part. Show that the linear...

Assume that all the eigenvalues ​​of A have a negative real part. Show that the linear system x ̇ = Ax has at least one non-trivial solution x (t) so that lim x (t) = 0 when t tend to infinite

Linear Algebra: Given a nonzero vector x1 in X, show that there is a linear function...

Linear Algebra: Given a nonzero vector x1 in X, show that there is a linear function I such that l(x1) not equal to 0

True or False: The condition number of a matrix with respect to solving linear systems also...

True or False: The condition number of a matrix with respect to solving linear systems also determines the conditioning of its eigenvalues. Justify your answer (explain) These questions follow the exercises in Chapter 4 of the book, Scientic Computing: An Introduction, by Michael Heath. They study some of the properties of eigenvalues, eigenvectors, and some ways to compute them.

Please explain what the identity matrix is. The course is linear algebra. The book describes it...

Please explain what the identity matrix is. The course is linear algebra. The book describes it simply as a matrix with 1's on the diagonal and 0's elsewhere. Why is that? Can you explain it for a first time learner of this material? Thank you! I appreciate it!