Let A,B be a m by n matrix, Prove that |rank(A)-rank(B)|<=rank(A-B)

Prove the following: Given k x m matrix A, m x n matrix B. Then rank(A)=m...

Prove the following: Given k x m matrix A, m x n matrix B. Then rank(A)=m --> rank(AB)=rank(B)

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

Let A be an nxn matrix. Prove that A is invertible if and only if rank(A)...

Let A be an nxn matrix. Prove that A is invertible if and only if rank(A) = n.

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 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).

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 m×n be a given matrix with m > n. If the time taken to...

Let A m×n be a given matrix with m > n. If the time taken to compute the determinant of a square matrix of size j is j to the power 3, find upper bound on the a) total time taken to find the rank of A using determinants b) number of additions and multiplications required to determine the rank using the elimination procedure.

Suppose A ∈ Mm×n(R) is a matrix with rank m. Show that there is an n...

Suppose A ∈ Mm×n(R) is a matrix with rank m. Show that there is an n × m matrix B such that AB = Im. (Hint: Try to determine columns of B one by one

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.

In the system AX=b, where A is m x n matrix and rank of A is...

In the system AX=b, where A is m x n matrix and rank of A is m, you are given n vectors and among them p vectors are linearly dependent (p > m). Please write down the procedure to reduce the number of dependent vector by 1.