The linear tranformation L defined byL(p(x)) = -2p' + 9p"maps P4 into P3.(a) Find the matrix representation of L with respect to the ordered basesS =E = {x³, x², x, 1} and F = {x² + x + 1, x + 1, 1}(b) Use Part (a) to find the coordinate vectors of L(p(x)) and L(g(x)) where p(x) = 4x³ + 14x and g(x) = x² + 15.[L(p(x))]F =[L(g(x))] F =

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Answered: The linear tranformation L defined by…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Let T: R² R² be defined by T -{[5].[3]} C = Given Pc = [ [T](PB (u)) 1 2 = 3x1x2 -3 ([2₂])-[¹22] Lu= [2] B-{].G]}, and [3]} = Let -x1 + Ex: 5 x1 = -2 , use the Fundamental Theorem of Matrix Representations to find [T](PB(u)). 5
Find the coordinate matrix of x in Rn relative to the basis B'. B' = {(8, 11, 0), (7, 0, 10), (1, 4, 6)), x = (4, 23, 8) [x] B¹ = ↓ 1 Need Help? Read It Watch Watch It
The linear tranformation L defined by L(p(x)) = 12p' 10p" maps P4 into P3. (a) Find the matrix representation of L with respect to the ordered bases E = {x³, x², x, 1} and F = S = (b) Use Part (a) to find the coordinate vectors of L(p(x)) and L(g(x)) where p(x) = −12x³ + 9x and g(x) = x² + 8. [L(p(x))]F = {x² + x + 1₂x + 1,1} [L(g(x))]f = =
C: Let T be the linear operator associated in the standard basis B of F2 with the matrix 2 - [44] - 1 Let B' be the basis ((2, -1), (2, 1)) M = b) Using eachof these three matrices find the dimension of the range of T (you must check that the dimension is the same with all the matrices)
2 [H] a) Treating u, v', and w' as vectors, are the following inner products defined? (i) u. v' 6) (True/False) Let u = (ii) v'. u (iii) u - w' v' = [1 3 2], and w' = [5 -1 -1]. b) Treating u, v', and w' as matrices, are the following matrix products defined? (i) uv' (ii) v'u (iii) uw'
7. (a) Consider the ordered basis ß = [1,1 +x, 1 + x + x²] for V = P₂ and F = R. Suppose is in P2 and you know these coordinates: [] = (1, 2, 3). Find the vector 7. (b) Let A be a 2 x 2 matrix and a be a real number. Prove that det (a A)=a² det(A)

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