Question

Question 4: Suppose that A is a 2 x 2 matrix and Find A? Hint: The conditions give information about the eigenvalues and eigenvectors of A.

Answer 1

Given A is a 2x2 mateix Given A ( 37 - (0) (2 573) = 62 (peta] = [5] - zatb=6 3ctd =2 (1) (2) and 4 (2] = [3] => [a 21 3 ]-[5] Lacted] =( → 2a+b= (3) 20+ 6d=3 (4) Multiply (1) with a and (3) with 3 ( 3a+b = 6)*a = 6a+2b = 12 ->(5) (2a +66=1) 3 6a+ 18b=3 (6) subtract (6) from (5) 6a + 2b = 12 (-) 6a+ 18b = 3 16b = a b = -2 peet b=-9/16 in (1) 3a+b=6 => 30 - 56

- 30161a-4 = 480 = =(16) 105 48 Multiply (2) with a and (4) with 3 (3ctd =2) 2 Gctad=4 (7) (Qc+60 =3) * 3 = 60+ 18 d = 9 (8) subtract (8) from (7) 6c+ad = 4 ( 6cf18d=a - 16d=-5 d = 5/16 peet d value in (2) 30+ d = 2 → 3 + 5 = 2 = 3(16)+5=2016) 480 = 27 c=27 = 1 Hence A = { a }} = ( 355 - A. A = À = 9416 5/16 1 9 16 calculate 7 135/16 -9/16] [35116 1167 5/16 J = 1143/32 - untaa 45/32 -732 A. A - 8 = 1 143/32 - 48/32 7135/16 -9/16 7 45132 -7/32 / 9/16 sli6 ]

- २-० 515८५ - 08/641 [18१/८५ -5516५ A AS. A = 150516 -Igale.m(3510 -9167 [189 164 aanley 9116 5116 | - (२303/28 -1651281 [ 465 (28 - २५ (12x A% A9. A = (१२5256 -3069/256 ] | 306/256 - 10151256 A - 45. A = [368 63/12 - (२२85/5121 ta28 5/510 -५०६२/51२] - 36863/512 -12285/512 7/3516 -1107 | (2285/510 -4087 (5124/16516 AT A A 141455 १०२५ -491५१ 1024 4149 -1695 1024 (024 (१५३५551102५ -५११५१/१०५ ५११५१(१०३५ -16395/1024 ने45500+ 1024 ५११५१) १ 1014 ५१13 - 512 16387 /-163760 4149) + Tozu (024 for A are d=2,1% The eigenvalues ergenvectors for A are [3]. [3]