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Let B={p1,p2,p3} be a basis for P2 , where p1(t)= 3+4 t−2 t2 ,p2(t)= −3+t−4 t2 , p3(t)= −4+3 t−t2 . Let S={1,t,t2} be thestandard basis for P2 . Suppose that T:P2→P2 is defined byT(p(t))=tp′(t)+p(0) . Use equation editor to enter the matrix ofthe linear transformation with respect ot the basis B for thedomain and the standard basis S for the codomain.
Let B = {P1, P2, P3} be a basis for P2, where P₁(t) = 3+4t-2t² P₂ (t) = −3+t-4t². P3 (t) = −4+3t-t² Let S = {1, t, t²} be the standard basis for P2 Suppose that T: P2 → P2 is defined by T(p(t)) = tp' (t) + p(0). Use equation editor to enter the matrix of the linear transformation with respect of the basis B for the domain and the standard basis S for the codomain. ab sin (a) dr 8 R Ω B A₂