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

Similar Questions

Explore conceptually related problems

If A is a square matrix such that A^(2)=1 then (A-I)^(3)+(A+I)^(3)-7A is equal to

If A is square matrix suct that A^(2)=I , then (A-I)^(3)+(A+I)^(3)-7 A is equal to

If A is a square matrix such that A^(2)=A show that (I+A)^(3)=7A+I.

If A is a square matrix such that A^(2)=A, then (I+A)^(3)-7A is equal to (a) A (b) I-A(c)I(d)3A

If A is a square matrix such that A^(2)=A show that (I+A)^(3)=7A+I

Suppose A is square matrix such that A^(3) =I then (A+I)^(3) +(A-I)^(3)-6A equals

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

If A is a square matrix such that A^2 =A then (I+A)^2 -7A =……

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