Question

let T: P2 --> R be the linear transformation defined by T(p(x))=p(2)

a) What is the rank of T?

b)what is the nullity of T?

c)find a basis for Ker(T)

Answer 1

U Given Tip IR is a linear transformation given by T (P(x)) = p (2). @ Now we find Rnk of T i.e. dimension of Im T. [IMT denotes image of Now the basis of Py is {1, 2, x2} .e. sp, (n), P 2 (M), P3 laj} where p(x) = 1, P2 (X) = X, Pg (X) =X? Let of Then IMT is spanned by the set of vectors ST (7); T (P2(%)), T (P₂ (81)} i.e. spanned by the set of vectors {1, 2,43 : TCP(x)) = \,(3) = 1, T (A(X))=bx(72 J T (P₂ (1) = P₂ (2) = 4 These vectors are lineanly dependent to each other. Then the basis of Im T is {1}. Hence dim Im T = r basis consist of one veetor / 6 and Now we find the basis of kert. net $(x) E kert Them T (1(x)) = 0. Since 2) Ekerte P₂. Then P(x) = at, (x) + (2 Pz (X) + C3 C3 (2) for some ,C2, s. Now T (P(x)) = 0 gives at(P, (x)) + (2 T (12(*) * C3T (B3 (x)) = 0 IT is a linear froms formation od +262 +4 C3=0 or, G=-262-463 Thens p (x) = (-24-493) , () + C2P2(X) + C3 by (8)