If `A^2 = A`, then `(I + A)^(4)` is equal to

If A^(2) - A + I = 0 then A^(-1) is equal to

If A is non-singular and (A-2I) (A-4I) = O , then 1/6 A + 4/3 A^(-1) is equal to

If A=[[1,23,4]] then 8A^(-4) is equal to (I is an identity matrix of order 2)

If A^(5)=O such that A^(n)!=I for 1<=n<=4 then (I-A)^(-1) is equal to

If A^(2) - 3 A + 2I = 0, then A is equal to

If the number of onto functions from [1,2,3,4}rarr{2,3,4} such that f(1)!=i for i=1,2,3,4 is k then (k)/(4) is equal to

(1+2i)/(1+3i) is equal to

1+i+i^(2)+i^(3) is equal to