Let `A=[(0, i),(i, 0)]`, where `i^(2)=-1`. Let I denotes the identity matrix of order 2, then `I+A+A^(2)+A^(3)+……..A^(110)` is equal to

Given A=[(x, 3),(y, 3)] If A^(2)=3I , where I is the identity matrix of order 2, find x and y.

Let a be a matrix of order 2xx2 such that A^(2)=O . A^(2)-(a+d)A+(ad-bc)I is equal to

If I_3 is the identity matrix of order 3 then I_3^-1 is (A) 0 (B) 3I_3 (C) I_3 (D) does not exist

Let a be a matrix of order 2xx2 such that A^(2)=O . (I+A)^(100) =

Let A be a non - singular symmetric matrix of order 3. If A^(T)=A^(2)-I , then (A-I)^(-1) is equal to

If A=[[2,-1],[-1, 2]] and I is the identity matrix of order 2, then show that A^2=4A-3I Hence find A^(-1) .

Let A=[[0, 1],[ 0, 0]] show that (a I+b A)^n=a^n I+n a^(n-1)b A , where I is the identity matrix of order 2 and n in N .

Let A be a square matrix of order 2 such that A^(2)-4A+4I=0 , where I is an identity matrix of order 2. If B=A^(5)+4A^(4)+6A^(3)+4A^(2)+A-162I , then det(B) is equal to _________

If A=[{:(,2,-1),(,-1, 3):}]" evaluate "A^2-3A+3I , where I is a unit matrix of order 2.