Show that the set Vof all 3 x 3 matrices with distinct entries also combination of...

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!

Are the following vector space and why? 1.The set V of all ordered pairs (x, y)...

Are the following vector space and why? 1.The set V of all ordered pairs (x, y) with the addition of R2, but scalar multiplication a(x, y) = (x, y) for all a in R. 2. The set V of all 2 × 2 matrices whose entries sum to 0; operations of M22.

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...

Determine whether the set with the definition of addition of vectors and scalar multiplication is a...

Determine whether the set with the definition of addition of vectors and scalar multiplication is a vector space. If it is, demonstrate algebraically that it satisfies the 8 vector axioms. If it's not, identify and show algebraically every axioms which is violated. Assume the usual addition and scalar multiplication if it's not defined. V = R, x + y = max( x , y ), cx=(c)(x) (usual multiplication.

The trace of a square n×nn×n matrix A=(aij)A=(aij) is the sum a11+a22+⋯+anna11+a22+⋯+ann of the entries on...

The trace of a square n×nn×n matrix A=(aij)A=(aij) is the sum a11+a22+⋯+anna11+a22+⋯+ann of the entries on its main diagonal. Let VV be the vector space of all 2×22×2 matrices with real entries. Let HH be the set of all 2×22×2 matrices with real entries that have trace 11. Is HH a subspace of the vector space VV? Does HH contain the zero vector of VV? choose H contains the zero vector of V H does not contain the zero vector...

We can identify the set V of all 3×3-matrices (real coefficients) with vector space R9. Show...

We can identify the set V of all 3×3-matrices (real coefficients) with vector space R9. Show that the set of all 3 × 3 symmetric matrices is a vector subspace of V .

Exercise 9.1.11 Consider the set of all vectors in R2,(x, y) such that x + y...

Exercise 9.1.11 Consider the set of all vectors in R2,(x, y) such that x + y ≥ 0. Let the vector space operations be the usual ones. Is this a vector space? Is it a subspace of R2? Exercise 9.1.12 Consider the vectors in R2,(x, y) such that xy = 0. Is this a subspace of R2? Is it a vector space? The addition and scalar multiplication are the usual operations.

Linear Algebra: Show that the set of all 2 x 2 diagonal matrices is a subspace...

Linear Algebra: Show that the set of all 2 x 2 diagonal matrices is a subspace of M 2x2. I know that a diagonal matrix is a square of n x n matrix whose nondiagonal entries are zero, such as the n x n identity matrix. But could you explain every step of how to prove that this diagonal matrix is a subspace of M 2x2. Thanks.

Determine whether the set with the definition of addition of vectors and scalar multiplication is a...

Determine whether the set with the definition of addition of vectors and scalar multiplication is a vector space. If it is, demonstrate algebraically that it satisfies the 8 vector axioms. If it's not, identify and show algebraically every axioms which is violated. Assume the usual addition and scalar multiplication if it's not defined. V = R^2 , < X1 , X2 > + < Y1 , Y2 > = < X1 + X2 , Y1 +Y2> c< X1 , X2...

Consider the set of all ordered pairs of real numbers with standard vector addition but with...

Consider the set of all ordered pairs of real numbers with standard vector addition but with scalar multiplication defined by  k(x,y)=(k^2x,k^2y). I know this violates (alpha + beta)x = alphax + betax, but I'm not for sure how to figure that out? How would I figure out which axioms it violates?