If a subset S in a vector space V is linearly dependent & T in L(V, W), then T(S) is linearly dependent in W. Is L(V,W) the linear combination of two spaces V and W? If so, what is T(S)? I am having some trouble on getting started on this problem.

duandaTed05

duandaTed05

Answered question

2022-10-30

If a subset S in a vector space V is linearly dependent & T L(V, W), then T(S) is linearly dependent in W
Is L ( V , W ) the linear combination of two spaces V and W? If so, what is T(S)? I am having some trouble on getting started on this problem.

Answer & Explanation

Jimena Torres

Jimena Torres

Beginner2022-10-31Added 20 answers

L ( V , W ) is the set of linear transformations from Vto W
So basically they are telling us T is a linear transformation from V to W
So if v is a vector in V T ( v ) is a vector in W
In this case T ( S ) is the image of the set S under the transform.

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