Algebra Let F: R- R2 be a linear transformation satisfying 0 (a) Find Fy (b) Find...
1. Let F: R4-R3 be a linear transformation satisfying F(1,1,1,1) (0, 1,2), F(1,1,0, 1)(0, 0,2) F(0,1,0, 0) 1,0,0) F(1,1,0,0) (0,0,0), (a) Calculate F(x, y, z, w) (b) Calculate ker(F) and R(F)
Q4. Let L: R2 + Rº be a transformation defined by L (0-2 [3u2 – U1 U1 – U2 -502 (a) Show that I is a linear transformation. (b) Find the standard matrix A of L, and find L ([31]) using the matrix A. (c) Do you think that any transformation T:R2 + R² is linear? (Justify your answer).
13. Let L : R2 → R2 be the linear transformation satisfying L(111) 1 , and L(1-11) A. B. D. E.
Let F :P3 + R2 be a linear transformation with three values given below. F(22) = 11 F(x) = 1 f(1) = 1 Find F((x – 2)2) B. Find an element of ker(F)| A.
and 02 Let T : R2 + RP be the linear transformation satisfying 9 5 Tū1) = [ and T(v2) = [ - -5 -1 X Find the image of an arbitrary vector [ Y -([:) - 1
-00)0) 2 (AB 22) Let L : R, R2 be a linear transformation. You are given that L 2- 3 (a) Find the matrix A that represents L with respect to the basisu-| | 2-1 1-1 4 1 and the 6 standard basis F1 (b) Find the matrix B that represents IL with respect to the standard basis in both R3 and R2
linear algebra Let T: R2 R2 be a reflection in the line y = -x. Find the image of each vector. (a) (-3,9) (b) (5, -1) (c) (a,0) (d) (o, b) (e) ( ed) (f) (9)
Need help with these linear algebra problems. Let TARS - R* be the linear transformation with standard matrix A A= 11 2 1 4 2 4 2 8 2 1 | 2 3 3 12 3 6 5 9 1. Find a basis of the column space of A. 2. Find a basis of the null space of A. 3. The range of T, is a 4. Is the vector a in the range of TA? Support your answer. 70...
Linear Algebra Problem! 1. Let U be the subspace of R3 given by 11 + 12 - 213 = 0. for U. Justify that is an ordered basis. What is the a) Find an ordered basis dimension of U? b) Let ū= (1,1,1). Show that ✓ EU and find the B-coordinate vector (Ū3 = C:(Ū), where Ce: U + R2 is the B-coordinate transformation.
Problem 3. Let T R2 -R be a linear transformation, with associated standard matrir A. That is [T(TleAl, where E = (e1, ē2) is the standard basis of R2. Suppose B is any basis for R2 a matrix B such that [T()= B{v]B. This matric is called the the B-matrix of T and is denoted by TB, (2) What is the first column of T]s (3) Determine whether the following statements are true or (a) There erists a basis B...