If A = `[(0,0),(0,1)]`, then the matrix given by `B = I + A + A^(2) + … + A^(K)` is

If A = [(1,0,0),(0,1,0),(a,b,-1)] and I is the unit matrix of order 3, then A^(2) + 2A^(4) + 4A^(6) is equal to a)7 A^(8) b)7 A^(7) c)8I d)6I

If A=[(x,1),(1,0)] if A^2 is the identity matrix, then find x.

Let A=[(0,a),(b,0)] If A^4=I_2 then show that ab=1.

Let A= [(0,alpha),(0,0)] and (A + I)^(50) - 50A = [(a,b),(c,d)] then the value of a + b + c + d is a)2 b)1 c)4 d)None of these

If A = [(alpha, 0),(1,1)] and B = [(1,0),(3,1)] then value of alpha for which A^(2) = B is a)1 b)-1 c)I d)No real value of alpha

If [{:(2,1), ( 3,2):}] A [ {:(-3,2), ( 5, -3):}] = [{:( 1, 0), ( 0, 1):}], then the matrix A is equal to:

If A= [[0,1],[0,0]] ,B= [[1,0],[0,0]] , then BA=

Given A = [(3,2,0),(1,4,0),(0,0,5)] Prove that A^2 -7A +10I_3 = 0

Given A = [(3,2,0),(1,4,0),(0,0,5)] Find A^2