Let L : V → W be a linear transformation, and let T be a subspace of W. The inverse imag...

Let L : V → W be a linear transformation, and let T be a subspace of W. The inverse image of T , denoted L⁻¹(T ), is defined by

L ^{− 1} ( T ) = {v ∈ V | L(v) ∈ T }

Show that L⁻¹(T ) is a subspace of V.