Question

Problem 7: (9 total points) Let A 11 0 -1 2 1 -1 3 -1 0 = 1 | -2 1 4 -13 3 -1 -5 1 -6 a) Find a basis for ker A. b) Find a 5 x 5 matrix M with rank 2 such that AM = 0, where is the 4 x 5 zero matrix. is the 4 x 5 zero matrix. Prove c) Suppose that B is a 5 x 5 matrix such that AB = 0, where that rank(B) 2.

three small problem!!!!!

Answer 1

Page No. Date. / FA 1 0 1 2 I RRethi Lo-1 2 1 - 1 3 lot lo 12 1-2 1 4 -1 3 The R2R, To I 2 3 5 1 13 -1 -5 1-6 Rut Ru-R, 10 -1 -2 5-9 A3 7 R ₂ R2 / ia - 2 17 R7 R₂ o 2 11 n o 2 1 10 10 / 1 2 / 0 1tr20 o 2 4lee n to o o 1 z 1 To o o -4 -8 Ru Futur Looo ool @ Now Xe kert if Axeo equivaleset to To -) 2 ; 77*7707 Jo 2 /0210 o o 10 o 12 1/ 1 To o o 1 2 Huut Tol To oo oool . e) 9, - 1+ 21, tap 20, 24,4 2,44+2, +5,24442 = 1 x = 12 +244-45 e 2₂ - 2413-14-ust Uu= -245 -2 -26-246) -UG U2 = -243 +215 25 24 = 43 +349 so (x, U. Uz u ug) -243 +45 - 243 +45 23 - 235 15

Page No. Date. I e so basis of kent is 10.-2,1,0,0)", (3,1,9-2,094 6 Casar M = [1 3oo of -2 í 0 0 0 Glan 77 0 To-2 0 o 0 o o Then ③ AM-O and Rank M = 2. as we know if Air mxn and B is nom, thes Rank(A) + Ronk (B) - n < Rank (AB) 3+ RankB - 5 so as AB = 0 RankB-2 so Rank B 22
if you have any questions about it ask me in comment