. Let {v1,v2,…,vk} be a dependent system of generators of a vector space V. Prove that...

If v1 and v2 are linearly independent vectors in vector space V, and u1, u2, and...

If v1 and v2 are linearly independent vectors in vector space V, and u1, u2, and u3 are each a linear combination of them, prove that {u1, u2, u3} is linearly dependent. Do NOT use the theorem which states, " If S = { v 1 , v 2 , . . . , v n } is a basis for a vector space V, then every set containing more than n vectors in V is linearly dependent." Prove without...

Let V be a vector space and let v1,v2,...,vn be elements of V . Let W...

Let V be a vector space and let v1,v2,...,vn be elements of V . Let W = span(v1,...,vn). Assume v ∈ V and ˆ v ∈ V but v / ∈ W and ˆ v / ∈ W. Define W1 = span(v1,...,vn,v) and W2 = span(v1,...,vn, ˆ v). Prove that either W1 = W2 or W1 ∩W2 = W.

† Let β={v1,v2,…,vn} be a basis for a vector space V and T:V→V be a linear...

† Let β={v1,v2,…,vn} be a basis for a vector space V and T:V→V be a linear transformation. Prove that [T]β is upper triangular if and only if T(vj)∈span({v1,v2,…,vj}) j=1,2,…,n. Visit goo.gl/k9ZrQb for a solution.

Prove that if W^6 is not in the span{v1, v2, . . . , vk}, then...

Prove that if W^6 is not in the span{v1, v2, . . . , vk}, then span{v1, v2, . . . , vk} ⊂ span{v1, v2, . . . , vk, w}. (Notice that the inclusion got to be proven to be a strict inclusion.)

Prove that Let S={v1,v2,v3} be a linearly indepedent set of vectors om a vector space V....

Prove that Let S={v1,v2,v3} be a linearly indepedent set of vectors om a vector space V. Then so are {v1},{v2},{v3},{v1,v2},{v1,v3}，{v2,v3}

1. Prove that if {⃗v1, ⃗v2, ⃗v3} is a linear dependent set of vectors in V...

1. Prove that if {⃗v1, ⃗v2, ⃗v3} is a linear dependent set of vectors in V , and if ⃗v4 ∈ V , then {⃗v1, ⃗v2, ⃗v3, ⃗v4} is also a linear dependent set of vectors in V . 2. Prove that if {⃗v1,⃗v2,...,⃗vr} is a linear dependent set of vectors in V, and if⃗ vr + 1 ,⃗vr+2,...,⃗vn ∈V, then {⃗v1,⃗v2,...,⃗vn} is also a linear dependent set of vectors in V.

Let X be a real vector space. Suppose {⃗v1,⃗v2,⃗v3} ⊂ X is a linearly independent set,...

Let X be a real vector space. Suppose {⃗v1,⃗v2,⃗v3} ⊂ X is a linearly independent set, and suppose {w⃗1,w⃗2,w⃗3} ⊂ X is a linearly dependent set. Define V = span{⃗v1,⃗v2,⃗v3} and W = span{w⃗1,w⃗2,w⃗3}. (a) Is there a linear transformation P : V → W such that P(⃗vi) = w⃗i for i = 1, 2, 3? (b) Is there a linear transformation Q : W → V such that Q(w⃗i) = ⃗vi for i = 1, 2, 3? Hint: the...

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...

Let u, vand w be linearly dependent vectors in a vector space V. Prove that for...

Let u, vand w be linearly dependent vectors in a vector space V. Prove that for any vector z in V whatsoever, the vectors u, v, w and z are linearly dependent.

let T:V to W be a linear transdormation of vector space V and W and let...

let T:V to W be a linear transdormation of vector space V and W and let B=(v1,v2,...,vn) be a basis for V. Show that if (Tv1,Tv2,...,Tvn) is linearly independent, thenT is injecfive.