Let D be the differentiation operator on P3, and let S = {p ∈ P3 | p(0) = 0} Show...

Let D be the differentiation operator on P₃, and let

S = {p ∈ P₃ | p(0) = 0}

Show that

(a) D maps P₃ onto the subspace P₂, but D: P₃ → P₂ is not one-to-one.

(b) D: S → P₃ is one-to-one but not onto.