Question: :) will leave good feedback Let T : V - W be a linear transformation, and let { V1, V2, ... , Vx } be

:) will leave good feedback

Let T : V - W be a linear transformation, and let { V1, V2, ... , Vx } be vectors in 1'. Select the True statements: O If { v1, V2, ... , Vx } spans I/ then IT(v1), T(v2), ... . T(VA)} spans W. If T is onto then {T(v1). T(v2). ... . T(vx)} spans W. If { V1, V2, ".. ; Vx } is independent in V/ then {T(v1), T(v2), ... . T(Vx)} is independent in W. If IT(v1), T(v2), ... . T(Vx)} spans W then {V1, v2, ... , Vx } spans V. If IT(v1), T(v2), ... . T(v* )} spans W then T is onto. If V = span ( V1, V2. ... . Vx } and T is onto then W = span IT(VI). T(V2), ... . T( VA) ). If IT(v1), T(v2), ... . T(V*)} is independent in W then { V1, V2, ... , Vx } is independent in V. If { v1, v2, ... . Vx } is independent and T is one-to-one then IT(v1), T(v2), ... . T(V)} is independent

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