If A is a 6x5 matrix with dim(ColA) = 4, then what is dim(NulA) equal to?

1.Let A be an n x n matrix. Which of these conditions show that A is...

1.Let A be an n x n matrix. Which of these conditions show that A is invertible? •det A= 0 • dim (NulA) = 1 •ColA=R^n •A^T is invertible •an n x n matrix, D, exists where AD=In

Let B be an mxn matrix. Prove c is a non-zero scalar, then dim(rowspace(cB)) = dim(rowspace(B)).

Let B be an mxn matrix. Prove c is a non-zero scalar, then dim(rowspace(cB)) = dim(rowspace(B)).

When will change-of-basis matrix be equal to identity matrix?

When will change-of-basis matrix be equal to identity matrix?

(TRUE, FALSE) A matrix multiplied by its inverse is always equal to the identity matrix.

(TRUE, FALSE) A matrix multiplied by its inverse is always equal to the identity matrix.

Say if it is true or false and explain why a if a matrix A has...

Say if it is true or false and explain why a if a matrix A has row echelon form shown below, then dim(row(A))= 2 the matrix: [1 0 0 ]^t [1 1 0 ]^t [-2 8/3 0 ]^t [4 -10/3 0 ]^t

suppose A is a 6 x 4 matrix and b is a 4 x 6 matrix....

suppose A is a 6 x 4 matrix and b is a 4 x 6 matrix. Describe precisely why the 4 x 4 matrix AB can be invertible.

Suppose that the matrix A is an "almost identity". The columns 1, 3, 4,..., n are...

Suppose that the matrix A is an "almost identity". The columns 1, 3, 4,..., n are the vectors e_1, e_2, e_3,...,e_n respectively. But, the second column is some vector a12 a22 a32 ... an2 with a_22 not equal to 0. Find a formula for the matrix A and find a formula for the matrix A-1

Given A is a mxn matrix with dim(N(A)) if u=(α(1), α(2),..., α(n))^T ∈N(A). Prove that α(1)a(1)+α(2)a(2)+...+α(n)a(n)=0,...

Given A is a mxn matrix with dim(N(A)) if u=(α(1), α(2),..., α(n))^T ∈N(A). Prove that α(1)a(1)+α(2)a(2)+...+α(n)a(n)=0, where a(1), a(2),..., a(n) are columns of A. Now suppose that B is the matrix obtained from A by performing row operations: Show that α(1)b(1)+α(2)b(2)+...+α(n)b(n)=0, where b(1), b(2),..., b(n) are columns of B. Show that the converse is also true.

3.35 Show that if A is an m x m symmetric matrix with its eigenvalues equal...

3.35 Show that if A is an m x m symmetric matrix with its eigenvalues equal to its diagonal elements, then A must be a diagonal matrix.

What does Coca-Cola stand for? Is it the same for everyone? Explain. 2. Coca-Cola has successfully...

What does Coca-Cola stand for? Is it the same for everyone? Explain. 2. Coca-Cola has successfully marketed to billions of people around the world. Why is it so successful? 3. Can Pepsi or any other company ever surpass Coca-Cola? Why or why not? What are Coca-Cola's greatest risks?