6. (16 points) For the two linear transformations defined as T: Pz → P3, T1(p) =...
15 5. Let P2 and Pz denote the vector space of polynomials of degrees atmost 2 and 3 respectively. Let T:P2 P3 be the transformation that maps a polynomial p(t) to the polynomial (t - 2)p(t). (a) Find the image of p(t) = t2, that is, find T(t2). (b) Show that T is a linear transformation. (c) Find the matrix of T relative to the bases B = {1,t, tº} and C = {1,t, t², tº}. (d) Is T onto?...
6. Let T: P, – P, be the linear operator defined as T(p(x)) = p(5x), and let B = {1,x,x?} be the standard basis for Pz. a.) (5 points) Find [7]s, the matrix for T relative to B.
could u help me for this question?thanku!! 21. Let T be a linear transformation from P2 into P3 over R defined by T(p(x)) xp(x). (a) Find [T]B.A the matrix of T relative to the bases A = {1-x, l-x2,x) and B={1,1+x, 1 +x+12, 1-x3}. (b) Use [TlB. A to find a basis for the range of T. (c) Use TB.A to find a basis for the kernel of T. (d) State the rank and nullity of T. 21. Let T...
Suppose T: P3-R is a linear transformation whose action on a basis for Pa is as follows 45 0 -3 0 0 T(-2x-2) T(-2x3-2x2-2x-2) T(x3+2x2+2x+2) = 12 T(1) 1 4 -13 |-2 -3 2 Determine whether T is one-to-one and/or onto. If it is not one-to-one, show this by providing two polynomials that have the same image under T If T is not onto, show this by providing a vector in R that is not in the image of T...
3) Let T: P2 → P3 be such that T (p) = 2p(x) - xp(x). Let Sy be the standard basis for P, and S, the standard basis for Pz. a) Find T (2 + 5x). b) Find [T(S)]sz: c) Use [T(S)]s to find [T(3 – x2)]sz. d) Verify that Vp € P2, [T (p)]sz = [T(S)][p]sz:
: Let L: P1 → Pz be defined by L[p(t)] = t_p(t). Let S {t, 1} and S' = {t,t +1} be bases for P1. Let T = {t”, t², t, 1} and T' {tº, t? – 1,7,t+1} be bases for P3. Find the matrix of L with respect to (a) S and T and (b) S' and T + Drag and drop your files or click to browse...
(1 point a. The linear transformation T : R2 → R2 is given by: Ti (x, y) = (2x + 9y, 4x + 19y). Find T1x, y). 「-i(x, y) =( x+ y, x+ b. The linear transformation T2 : R' → R' is given by: T2(x, y, z) (x + 2z,2r +y, 2y +z) Find (x, y, z). T2-1(x,y,z)=( x+ y+ z, x+ y+ z, x+ y+ z)
show work pls! Let L :P2 →P3 be the linear transformation given by L(p(t)) = 5p"(t) + 3p' (t) + 1p(t) + 4tp(t). Let E = (e1, C2, C3) be the basis of Pề given by ei(t) = 1, ez(t) = t, ez(t) = 62. and let F = (f1, f2, f3, f4) be the basis of P given by fi(t) = 1, fz(t) = t, f3(t) = ť, fa(t) = {'. Find the coordinate matrix LFE of L relative...
6. Let T:P, P, be the linear operator defined as (p(x)) = p(5x), and let B = {1,x,x?} be the standard basis for Pz. a.) (5 points) Find [T]s, the matrix for T relative to B. b.) (4 points) Let p(x) = x + 6x?. Determine [p(x)]s, then find T(p(x)) using [T]g from part a. c.) (1 point) Check your answer to part b by evaluating T(x+6x²) directly.
1. (10 points) Let T:P3 → P3 be the linear transformation satisfying T(x2 - 1) = x² + x - 3, T(2x) = 4x, and T(3x + 2) = 2(x + 3). Determine T(ax+ bx + c), where a, b, and c are arbitrary real numbers.