Let F be a subfield of a field K satisfying the condition that the dimension of...

Let T:V→V be an endomorphism of a finite dimensional vector space over the field Z/pZ with...

Let T:V→V be an endomorphism of a finite dimensional vector space over the field Z/pZ with p elements, satisfying the equation Tp=T. Show that T is diagonalisable.

5. Let V be a finite-dimension vector space and T : V → V be linear....

5. Let V be a finite-dimension vector space and T : V → V be linear. Show that V = im(T) + ker(T) if and only if im(T) ∩ ker(T) = {0}.

Let R = R[x], f ∈ R \ {0}, and I = (f). Show that R/I...

Let R = R[x], f ∈ R \ {0}, and I = (f). Show that R/I is a real vector space of dimension equal to deg(f).

Suppose we have a vector space V of dimension n. Let R be a linearly independent...

Suppose we have a vector space V of dimension n. Let R be a linearly independent set with order n−2. Let S be a spanning set with order n+ 2. Outline a strategy to extend R to a basis for V. Outline a strategy to pare down S to a basis for V .

Let F be the field of two elements and let V be a two dimensional vector...

Let F be the field of two elements and let V be a two dimensional vector space over F. How many vectors are there in V?How many one dimensional subspaces? How many different bases are there?

Let V be a vector space of dimension n > 0, show that (a) Any set...

Let V be a vector space of dimension n > 0, show that (a) Any set of n linearly independent vectors in V forms a basis. (b) Any set of n vectors that span V forms a basis.

Let the set W be: all polynomials in P3 satisfying that p(-t)=p(t), Question: Is W a...

Let the set W be: all polynomials in P3 satisfying that p(-t)=p(t), Question: Is W a vector space or not? If yes, find a basis and dimension

Let V and W be finite-dimensional vector spaces over F, and let φ : V →...

Let V and W be finite-dimensional vector spaces over F, and let φ : V → W be a linear transformation. Let dim(ker(φ)) = k, dim(V ) = n, and 0 < k < n. A basis of ker(φ), {v1, . . . , vk}, can be extended to a basis of V , {v1, . . . , vk, vk+1, . . . , vn}, for some vectors vk+1, . . . , vn ∈ V . Prove that...

1. Let ??(?) = ∑︀??=1 ??? denote the operation of taking the trace of ? ∈...

1. Let ??(?) = ∑︀??=1 ??? denote the operation of taking the trace of ? ∈ ??(F). Show that (by constructing a proof) ??(??+??) = ???(?)+???(?) for any ?,? ∈ ??(F) and ?,? ∈ F. Conclude that ?? is a linear transformation from ??(F) to F. 2. For a fixed ? ∈ R, determine the dimension of the subspace of P?(R) defined by {? ∈ P?(R) | ?(?) = 0}. 3. Let ? be a finite dimensional vector space. Suppose...

（a）Suppose A ∈ M3(R) is nonzero, but A · A = 0. What are the possibilities...

（a）Suppose A ∈ M3(R) is nonzero, but A · A = 0. What are the possibilities for the dimension of the kernel of A? （b）Let V be a finite dimensional vector space, and U ⊂ V a subspace.Show that there exists a linear map T:V→V with Im(T) = U.