If `A=[[4,2],[-1,1]]` and I is `2xx2` unit matrix then `A^2-5A+7I`=

If A= [[2,-1],[-1,2]] and I is the unit matrix of order 2 , then A^2 is equal to

If A=[(0,-tan (alpha/2)),(tan (alpha/2),0)] and I is 2 xx 2 unit matrix, then (I-A)[(cos alpha,-sin alpha),(sin alpha, cos alpha)] is

If [[2+x,3,4],[1,-1,2],[x,1,-5]] is singular matrix then x is

For the matrix A=[[3, 2],[ 1, 1]] , find the numbers a and b such that A^2+a A+b I=O . Hence, find A^(-1) .

If A = [[1,2], [5,4]] then (A+I)(A-6 I)=

Let a be a 2xx2 matrix with non-zero entries and let A^(2)=I , where I is a 2xx2 identity matrix. Define Tr(A)= sum of diagonal elements of A and |A| = determinant of matrix A. Statement 1 : Tr (A) = 0 Statement 2 : |A|=1

Matrix A such that A^(2)=2A-I , where I is the identity matrix, then for n ge 2, A^(n) is equal to

Show that the matrix A = {:[( 2,3),( 1,2) ]:} satisfies equation A^(2) -4A +I=0 where I is 2xx2 identity matrix and 0 is 2xx2 Zero matrix. Using this equation, Find A^(-1)