Give an example with a proof of an infinite-dimensional vector space over R

1. Suppose that ? is a finite dimensional vector space over R. Show that if ???(?...

1. Suppose that ? is a finite dimensional vector space over R. Show that if ???(? ) is odd, then every ? ∈ L(? ) has an eigenvalue. (Hint: use induction). (please provide a detailed proof) 2. Suppose that ? is a finite dimensional vector space over R and ? ∈ L(? ) has no eigenvalues. Prove that every ? -invariant subspace of ? has even dimension.

Let V be an n-dimensional vector space and W a vector space that is isomorphic to...

Let V be an n-dimensional vector space and W a vector space that is isomorphic to V. Prove that W is also n-dimensional. Give a clear, detailed, step-by-step argument using the definitions of "dimension" and "isomorphic" the Definiton of isomorphic:  Let V be an n-dimensional vector space and W a vector space that is isomorphic to V. Prove that W is also n-dimensional. Give a clear, detailed, step-by-step argument using the definitions of "dimension" and "isomorphic" The Definition of dimenion: the...

Provide an example of a 10 dimensional vector space with a brief explanation of what sets...

Provide an example of a 10 dimensional vector space with a brief explanation of what sets such vector space aside of others. Trying to understand this concept for a linear algebra exam. Thank you!

Prove that if ? is a finite dimensional vector space over C, then every ? ∈...

Prove that if ? is a finite dimensional vector space over C, then every ? ∈ ℒ(? ) has an eigenvalue. (note: haven't learned the Fundamental Theorem of Algebra yet)

Let V be a vector space: d) Suppose that V is finite-dimensional, and let S be...

Let V be a vector space: d) Suppose that V is finite-dimensional, and let S be a set of inner products on V that is (when viewed as a subset of B(V)) linearly independent. Prove that S must be finite e) Exhibit an infinite linearly independent set of inner products on R(x), the vector space of all polynomials with real coefficients.

Let V be a finite-dimensional vector space over C and T in L(V) be an invertible...

Let V be a finite-dimensional vector space over C and T in L(V) be an invertible operator in V. Suppose also that T=SR is the polar decomposition of T where S is the correspondIng isometry and R=(T*T)^1/2 is the unique positive square root of T*T. Prove that R is an invertible operator that committees with T, that is TR-RT.

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.

Let V be a finite dimensional vector space over R with an inner product 〈x, y〉...

Let V be a finite dimensional vector space over R with an inner product 〈x, y〉 ∈ R for x, y ∈ V . (a) (3points) Let λ∈R with λ>0. Show that 〈x,y〉′ = λ〈x,y〉, for x,y ∈ V, (b) (2 points) Let T : V → V be a linear operator, such that 〈T(x),T(y)〉 = 〈x,y〉, for all x,y ∈ V. Show that T is one-to-one. (c) (2 points) Recall that the norm of a vector x ∈ V...

Suppose that V is a vector space and R and S are both subspaces of V...

Suppose that V is a vector space and R and S are both subspaces of V such that R ⊆ S. Prove that dim(R) ≤ dim(S). Give an example of V , R and S such that dim(R) < dim(S).

"The closed unit ball of an infinite-dimensional Banach space is not compact", why this does not...

"The closed unit ball of an infinite-dimensional Banach space is not compact", why this does not contradict Alaoglu's theorem?