Let V be a vector space with dimV = n. Show that : Any spanning set...

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.

Prove that if a vector space V has a basis consisting of n vectors, then any...

Prove that if a vector space V has a basis consisting of n vectors, then any spanning set must contain at least n vectors.

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 .

1. Let v1,…,vn be a basis of a vector space V. Show that (a) for any...

1. Let v1,…,vn be a basis of a vector space V. Show that (a) for any non-zero λ1,…,λn∈R, λ1v1,…,λnvn is also a basis of V. (b) Let ui=v1+⋯+vi, 1≤i≤n. Show that u1,…,un is a basis of V.

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...

A2. Let v be a fixed vector in an inner product space V. Let W be...

A2. Let v be a fixed vector in an inner product space V. Let W be the subset of V consisting of all vectors in V that are orthogonal to v. In set language, W = { w LaTeX: \in ∈V: <w, v> = 0}. Show that W is a subspace of V. Then, if V = R3, v = (1, 1, 1), and the inner product is the usual dot product, find a basis for W.

Let V be a vector subspace of R^n for some n?N. Show that if k>dim(V) then...

Let V be a vector subspace of R^n for some n?N. Show that if k>dim(V) then the set of any k vectors in V is dependent.

Let S be a set in a vector space V and v any vector. Prove that...

Let S be a set in a vector space V and v any vector. Prove that span(S) = span(S ∪ {v}) if and only if v ∈ span(S).

Complete the proof Let V be a nontrivial vector space which has a spanning set {xi}...

Complete the proof Let V be a nontrivial vector space which has a spanning set {xi} ki=1. Then there is a subset of {xi} ki=1 which is a basis for V. Proof. We will divide the set {xi} ki=1 into two sets, which we will call good and bad. If x1 ≠ 0, then we label x1 as good and if it is zero, we label it as bad. For each i ≥ 2, if xi ∉ span{x1, . ....

Let {V1, V2,...,Vn} be a linearly independent set of vectors choosen from vector space V. Define...

Let {V1, V2,...,Vn} be a linearly independent set of vectors choosen from vector space V. Define w1=V1, w2= v1+v2, w3=v1+ v2+v3,..., wn=v1+v2+v3+...+vn. (a) Show that {w1, w2, w3...,wn} is a linearly independent set. (b) Can you include that {w1,w2,...,wn} is a basis for V? Why or why not?