" Let "A=[[1,1,0],[0,1,0],[0,0,1]]," and let "1" denote the "3times3" identity matrix.Then "2A^(2)-A^(3)=

Let A = [(1,1,0),(0,1,0),(0,0,1)] and let I denote the 3xx3 identity matrix . Then 2A^(2) -A^(3) =

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

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

Let A=[[0, 0 ,-1],[0,-1,0],[-1,0,0]] . The only correct statement about the matrix A is

" 2.Let "A=[[1,0,2],[2,0,1],[1,1,2]]," then "(det((A-I)^(3)-4A))/(5)" is "

A=[[0,1],[3,0]]" and let "BV=[[0],[11]]" Where "B=A^(8)+A^6+A^(4)+A^(2)+I," (Where "I" is the "2times2" identity matrix) then the product of all elements of matrix "V" is "

Let A= [[1,0,2],[2,0,1],[1,1,2]] then det((A-I)^(3)-4A) is

Let A denote the matrix ({:(0,i),(i,0):}) , where i^(2) = -1 , and let I denote the identity matrix ({:(1,0),(0,1):}) . Then I + A + A^(2) + "….." + A^(2010) is -

Let A = [[0,1,0],[1,0,0],[0,0,1]] . Then the number of 3 xx 3 matrices B with entries from the set {1, 2, 3, 4, 5} and satisfying AB = BA is _______.