{e₁,e2, e3} be the standard basis of R³ and let f,g : R³ → R³ be the linear map1. Let E =satisfying¹We definef(e₁): = cos() e₁ + sin (7) e₂f(e₂) = = sin() e₁ + cos (7) €₂ƒ(e3)=-e3B =--{000}g(e₁) = e₁g(e₂) =g(e3) =which is a basis of R³.(a) Explain why f and g are well-defined.₁ + e₂₁ + ₂ + e3

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Answered: {e₁,e2, e3} be the standard basis of R³…

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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dont wrong solution
4) Let V be the vector space of polynomials of degree <2 and let p(x) = ax² + bx + c. Find the adjoint operator (T*@)(p) for T:V → V and o:V → R given by d) Tp(x) = x²p(x) + x³p'(x), @(p) = p"(1).
Find the matrix A' for T relative to the basis B'. A': = T: R² → R², T(x, y) = (−6x + y, 6x − y), B' = {(1, −1), (-1,5)} -
8. Let A = | 1 -3 -5 -7 7 5 (a) Find the image of u = and define T: R³ R2 by T(x) = Ax. 2 1 under T. (b) Find a vector x whose image under T is b = -12 12 Explain why your work makes sense.
Let c₁ (t) = esti + 3 sin(t)j + t7k and c₂(t) = e−³¹i + 2 cos(t)j – 8t¹k. (Enter your solution as a single vector using the vector form (*,*,*). Use symbolic notation and fractions where needed.) -[c₁ (t) + c₂ (t)] = dt
4. Vector u is a unit vector orthogonal to vectors a and b, where a = i+j-k, b=2i-j. Then the coordinates of vector u in the basis {i, j,k} are 2 3 (a) (b) (-1, 2,–3) (c) None of the above is true
Let the vector C represents the coefficients of a polynomial pt=c1+c2t+c3t2+c4t3. Express the conditions p0=1, p'0=2, p1=1, p'1=0 in the form AC=b.
easy functional analysis
3. (12) Let V = R². Define vector addition and scalar multiplication as follows: (u1, uz)O(v1, v2) = (u1V1, U2V2) and c(u1,u2) = (u,C, u2^), c > 0 (a) Does V have an additive identity? If so, what would it be? (b) Does the distributive axiom c(uOv) = cu@cv hold? (Show why or why not). 4
A3) Lat M = (sin(nz): n1,3,5,} Can M form a basis for L'(0, n)?
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