A,B are two 3*3 matrix rank(A)=2 rank(B)=2 rank(AB)=?

Creating a 6x8 matrix with rank 2 In general, rank(AB) <= min(rank(A), rank(B)). If A and...

Creating a 6x8 matrix with rank 2 In general, rank(AB) <= min(rank(A), rank(B)). If A and B are random matrices, the relation should be an equality. Try to create a 6x8 matrix with rank 2 by modifying the above procedure. (hint: mx2 times 2xn is mxn). Verify the matrix is rank 2 with the rank command

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

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

Prove that for any 5 × 5 matrix A with rank two, there are a 5...

Prove that for any 5 × 5 matrix A with rank two, there are a 5 × 2 matrix B and a 2 × 5 matrix C such that A = BC. Justify your answer.

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

For n>=3 given the n x n matrix A with elements: A_ij=(i+j-2)^2. Determine the rank of...

For n>=3 given the n x n matrix A with elements: A_ij=(i+j-2)^2. Determine the rank of 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 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

8. Consider a 4 × 2 matrix A and a 2 × 5 matrix B ....

8. Consider a 4 × 2 matrix A and a 2 × 5 matrix B . (a) What are the possible dimensions of the null space of AB? Justify your answer. (b) What are the possible dimensions of the range of AB Justify your answer. (c) Can the linear transformation define by A be one to one? Justify your answer. (d) Can the linear transformation define by B be onto? Justify your answer.

Perform the following matrix multiplications A = [2   5   6]       [-3 0   1] B =...

Perform the following matrix multiplications A = [2   5   6]       [-3 0   1] B = [ 1]        [ 3]        [-4] C = [-2   10   1] 6a. Find AB 6b. Find BC 6c. Find AC