Suppose that A, B are upper triangular matrices in R 4×4 , that is, all entries...

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.

Suppose A and B are matrices in lower triangular form, show that A ˙ ×B [...

Suppose A and B are matrices in lower triangular form, show that A ˙ ×B [ Kronecker product of A and B] is also in lower triangular form. Furthermore, every eigenvalue of A ˙ ×B [Kronecker product of A and B] has the form of αβ, where α is an eigenvalue of A and β is an eigenvalue of B.

9. Suppose AB is defined and you know all the entries in both matrices.                a)...

9. Suppose AB is defined and you know all the entries in both matrices.                a) Find the entry in row i and column j of AB                b) Write column j of AB as a linear combination of columns of A.                c) Write row i of AB as a liner combination of rows of B                d) If A is size m×n and B is size x p , write AB as the sum of n matrices of...

Suppose A and B are invertible matrices in Mn(R) and that A + B is also...

Suppose A and B are invertible matrices in Mn(R) and that A + B is also invertible. Show that C = A-1 + B-1 is also invertible.

We have learned that we can consider spaces of matrices, polynomials or functions as vector spaces....

We have learned that we can consider spaces of matrices, polynomials or functions as vector spaces. For the following examples, use the definition of subspace to determine whether the set in question is a subspace or not (for the given vector space), and why. 1. The set M1 of 2×2 matrices with real entries such that all entries of their diagonal are equal. That is, all 2 × 2 matrices of the form: A = a b c a 2....

Suppose A and B are invertible matrices, with A being m x m and B being...

Suppose A and B are invertible matrices, with A being m x m and B being n x n. For any m x n matrix C and any n x m matrix D, show that : a) (A + CBD)-1 = A-1- A-1C(B-1 + DA-1C)-1DA-1 b) If A, B and A + B are all m x m invertible matrices, then deduce from (a) above that (A + B)-1 = A-1 - A-1(B-1 + A-1)-1A-1

Indicate whether each statement is True or False. Briefly justify your answers. Please answer all of...

Indicate whether each statement is True or False. Briefly justify your answers. Please answer all of questions briefly (a) In a vector space, if c⊙⃗u =⃗0, then c= 0. (b) Suppose that A and B are square matrices and that AB is a non-zero diagonal matrix. Then A is non-singular. (c) The set of all 3 × 3 matrices A with zero trace (T r(A) = 0) is a vector space under the usual matrix operations of addition and scalar...

n×n-matrix M is symmetric if M = M^t. Matrix M is anti-symmetric if M^t = -M....

n×n-matrix M is symmetric if M = M^t. Matrix M is anti-symmetric if M^t = -M. 1. Show that the diagonal of an anti-symmetric matrix are zero 2. suppose that A,B are symmetric n × n-matrices. Prove that AB is symmetric if AB = BA. 3. Let A be any n×n-matrix. Prove that A+A^t is symmetric and A - A^t antisymmetric. 4. Prove that every n × n-matrix can be written as the sum of a symmetric and anti-symmetric matrix.

52. Suppose N=10 and r=3. PLEASE SHOW ALL ANSWERS AND FORMULAS IN EXCEL Compute the hypergeometric...

52. Suppose N=10 and r=3. PLEASE SHOW ALL ANSWERS AND FORMULAS IN EXCEL Compute the hypergeometric probabilities for the following values of n and x. a. n = 4, x = 1. b. n = 2, x =  2. c. n = 2, x =  0. d. n = 4, x = 2. e. n = 4, x = 4.

Answer all of the questions true or false: 1. a) If one row in an echelon...

Answer all of the questions true or false: 1. a) If one row in an echelon form for an augmented matrix is [0 0 5 0 0] b) A vector b is a linear combination of the columns of a matrix A if and only if the equation Ax=b has at least one solution. c) The solution set of b is the set of all vectors of the form u = + p + vh where vh is any solution...