Find distinct points zi, 굉,23, 24, to 1, tv2 ,W3,tv4 E CU {oo} such that there is no Möbius transformation T with T()for1,2,3,4. Justify your answer. 6. 12) Find distinct points zi, 굉,23,...
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5. Find the unique Möbius transformation that sends 1 Hii H-1, and -1H-i. What are the fixed points of this transformation? What is T(0)? What is T(0o)? 14. Find a Möbius transformation that takes the circle |z1 = 4 to the straight line 3x + y = 4. Hint: Track the progress of three points, and the rest will follow.
Due by 12:00 noon, today 05/12/20. : CU{co} → Problem 1. Consider the Möbius transformation CU{o} defined by S(z) = 171 (i) Compute f(1), f(), f(-1), f(-i). (ii) Show that for 2 = ei, where 0 ER, f(x) is real or oo, that is f(el) E RU{0} (iii) Let D = {z zz < 1} denote the open unit disc and H = {z | Im(2) >0} denote the upper half plane. Show that f takes D onto H. (iv)...
6 image of x under 4. Problem 2: With the transformation T(x)- AX, and the vector b T, find if it exists. (13 points). Is the transformation one-to-one or onto, neither or both? Justify your answer. (7 points).
6 image of x under 4. Problem 2: With the transformation T(x)- AX, and the vector b T, find if it exists. (13 points). Is the transformation one-to-one or onto, neither or both? Justify your answer. (7 points).
Find the standard matrix of T ( Call it A)
Is T one-to-one? Justify your answer
Is T onto ? Justify your answer
-> Question 5. (20 pts) Let T : R? R? be a linear transformation such that T(:21,22) = (21 - 222, -21 +3.22, 3.11 - 2:02). (1). Find the standard matrix of T (call it A). (2). Is T one-to-one? Justify your answer. (3). Is T onto? Justify your answer.
Q8 6 Points Let T : R2 + Rº be a linear transformation with PT(x) = x2 – 1. Decide whether or not such a T is always diagonalizable. Justify your answer.. Q8.2 3 Points Determine/Compute the linear transformation T2 : R2 + R2, VH T(T(u)).
For each transformation below, find the closed form of the transformation. 1) Let T be a linear transformation from R$ to M22 (R) [i Let B=1 0:00 [. :] [11] [12] [0 ] Let C= 12 41 -17 -5 65 -27 92 Let M = be the matrix transformation of T from basis B to C 17 58 -15 -51 81 The closed form of the transformation is Tb 3-1 2) Let T be a linear transformation from P3(R) to...
7. (4 points) Let T R -R' be linear transformation such that Find YORK UNIVERSITY PACULTY OF SCIENCE 8. (4 points) Determine whether the following transformation TR' answer. If it is linear, express it is a matrix transformation R' is linear. Justify your (a) 61-[2] "[:] [3] -[:]-[8) []
18. Let T be the matrix transformation T -1 2 0 -1 2 2 -1 h 2 -3 k 4 a. What are the domain and codomain of T? b. Find the REF of [T]. Hint: You'll need the REF in some of the following questions. -1 -1 -1 -3 (REF of [7]= 0 2 2 4 is given here so that you can correctly answer the following 0 0 h – 2 k-6 questions.) c. Define the range of...
6. Let T P2 P be a linear transformation such that T P2P2 is still a linear trans formation such that T(1) 2r22 T(2-)=2 T(1) = 2r22 T(12 - )=2 T(x2x= 2r T(r2)2x (a) (6 points) Find the matrix for T in some basis B. Specify the basis that you use. (d) (4 points) Find a basis for the eigenspace E2. (b) (2 points) Find det(T) and tr(T') (e) (4 points) Find a basis = (f,9,h) for P2 such that...
Show your work. Clearly identify your answer. Justify every step. 1. (5 points) The function A(t) graphed below gives the balance in a savings account after t years with interest compounded continuously. The second graph shows the derivative of A(t). (Pay attention to the units on the graphs.) u y 350 14 250 y = A(t) 10 y = A'(t) 150 6 50 2 t t 10 20. 30 10 20 30 (a) What is the balance after 20 years?...