If A is amatrix such that `A^2=A+I` where I is the unit matrix then `A^5` is equal to

Matrix A such that A^(2)=2A-I, where I is the identity matrix,the for n>=2.A^(n) is equal to 2^(n-1)A-(n-1)l b.2^(n-1)A-I c.nA-(n-1)l d.nA-I

A skew symmetric matrix S satisfies the relations S^(2)+1=0 where I is a unit matrix then SS' is equal to

Matrix A is such that A^(2)=2A-I , where I is the identify matrix. Then for n ne 2, A^(n)=

If A is a square matrix such that A(a d j\ A)=5I , where I denotes the identity matrix of the same order. Then, find the value of |A| .

If A=[[4,32,5]], find values of x and y such that A^(2)-xA+yI=O where I is a 2x2 unit matrix and O is a 2x2 zero matrix.

If for a matrix A,A^2+I=0, where I is an identity matrix then A equals (A) [(1,0),(0,1)] (B) [(-1,0),(0,-1)] (C) [(1,2),(-1,1)] (D) [(-i,0),(0,-i)]

If A is skew symmetric matrix, then I - A is (where I is identity matrix of the order equal to that of A)