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

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

A matrix A is symmetric if AT = A and skew-symmetric if AT = -A. Let...

A matrix A is symmetric if AT = A and skew-symmetric if AT = -A. Let Wsym be the set of all symmetric matrices and let Wskew be the set of all skew-symmetric matrices (a) Prove that Wsym is a subspace of Fn×n . Give a basis for Wsym and determine its dimension. (b) Prove that Wskew is a subspace of Fn×n . Give a basis for Wskew and determine its dimension. (c) Prove that F n×n = Wsym ⊕Wskew....

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.

Show that the set GLm,n(R) of all mxn matrices with the usual matrix addition and scalar...

Show that the set GLm,n(R) of all mxn matrices with the usual matrix addition and scalar multiplication is a finite dimensional vector space with dim GLm,n(R) = mn. Show that if V and W be finite dimensional vector spaces with dim V = m and dim W = n, B a basis for V and C a basis for W then hom(V,W)-----MatB--->C(-)--------> GLm,n(R) is a bijective linear transformation. Hence or otherwise, obtain dim hom(V,W). Thank you!