2. (5 points) Let T: R2 + R3 be a linear transformation with 2x1 - x2] 1-3x1 + x2 | 2x1 – 3x2 Find x = (x) <R? such that [0] -1 T(x) = (-4)
3) Let T be a linear transformation from M22(R) to P3(R). Let B= (4 5] [1 ] [ 2 1]: [4 ;] Let C = (1 + 1x + 0x2 + Or?),(0+10 + 1x2 + 0x3), (0+ 0x + 1x² + 1r), (0+ 0x + 0x² + 1x2) 1 6 - 2 1 8 -8 18 15 Let M= be the matrix transformation of T from basis B to C. 3 -2 -9 6 -2 -12 5 -41 The closed...
Find a linear transformation T : R 3 → M22 such that T 1 2 4 = ( 4 1 7 2 ) , T 0 3 5 = ( 0 7 2 4 ) , and T 2 0 2 = ( 1 4 1 3 ) . 9. (4 marks) Find a linear transformation T:R3 M22 such that T | 2 = 1 ( 7 2...
2) Let T be a linear transformation from P3(R) to M22(R). Let B= (1+2x + 4x2 + 8x3), (1 + 3x + 5x2 + 10x3), (1 + 4x + 7x2 + 13r%),(1 + 4x + 7x2 + 14x²). Let C= [] [ 1];[1 ] [ ] 0 17 40 Let M= 13 31 36 124 22 52 -61 -209 23 55 -64 -220 be the matrix transformation of T from basis B to C. -47 -161 The closed form of...
For each transformation below, find the value of T(U). 1) Let T be a linear transformation from R$ to M2 (R) 2 Let B= -1 2 3 Let C= [1].[133] [131] 1 -22 -21 -22 -21 -59 14 13 Let M= be the matrix transformation of T from basis B to C 37 -59 30 30 -19 -1 Let v= 2 2 The value of T(0) = 2) Let T be a linear transformation from P3 (R) to M22(R). Let...
-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
3) Let T be a linear transformation from M22(R) to P3(R). Let B= [11] ]1 2] [3] Let C = (11 + 5x +(-3) 22 +(-1) 23), (13+6x + (-3) x2 + (-2) 2*), (8 + 3x + (-1).x2 + (-2) 23),(-5+(-2) x + 1x2 + 12) Let M= -15 2 -27 -71 28 -4 47 126 -24 5 35 -95 -67 14 -104 -276 be the matrix transformation of T from basis B to C. Let v= [1 The...
3. Let T:RE → Rž be a linear transformation, given my the formula [2x1 +3.27 T(Xje1 + x202) = 4x1 - 5x2] where E = {(1,e2} is the standard basis of R2 and B = {bı = | b2 find atrix for T relative t I) the matrix for T relative to the bases E and B is a distinct basis.
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) []
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...