If A is a square matrix such that `A^2-A+l=0`, then the inverse of A is

If A is a square matrix such that A^2-A+I =0 , then the inverse of A is

If A is a non -singular matrix such that A^(3)=A+l , then the inverse of B=A^(6)-A^(5) is

If A is a square matrix satisfying A^2=I , then what is the inverse of A?

If A is a square matrix satisfying A^(2)=1 , then what is the inverse of A ?

Let A be a square matrix satisfying A^(2)+5A+5I=0 the inverse of A+2l is equal to

Let A be a square matrix satisfying A^2+5A+5I= 0 the inverse of A+2l is equal to

Let A be a square matrix satisfying A^(2)+5A+5I=0 . The inverse of A+2I is equal to :

If A square matrix such that A^2 = A , then (l+A )^3 -7A is equal to :

If A is a square matrix such that A^(2)=l where l is the identity matrix, then what is the value of A^(-1) ?