If P is a `3xx3` matrix such that `P^T = 2P+I`, where `P^T` is the transpose of P and I is the `3xx3` identity matrix, then there exists a column matrix, `X = [[x],[y],[z]]!=[[0],[0],[0]]` such that

A is a 3xx3 matrix , then |3A|=....|A| .

P is a 2xx2 matrix . P'=P^(-1) then P=……..

If A is an 3xx3 non-singular matrix such that A A^T=A^TA and B=A^(-1)A^T," then " B B^T equals

If A is skew -symmetric 3xx3 matrix , |A| =……..

If A=[1 2 2 2 1-2a2b] is a matrix satisfying the equation AA^T=""9I , where I is 3xx3 identity matrix, then the ordered pair (a, b) is equal to : (1) (2,-1) (2) (-2,""1) (3) (2, 1) (4) (-2,-1)

Let M and N be two 3xx3 non singular skew-symmetric matrices such that M N=N Mdot If P^T denote the transpose of P , then M^2N^2(M^T N)^-1(MN^(-1))^T is equal to

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

Let P = [a_(ij)] " be a " 3 xx 3 matrix and let Q = [b_(ij)], " where " b_(ij) = 2^(i +j) a_(ij) " for " 1 le i, j le 3 . If the determinant of P is 2, then the determinant of the matrix Q is

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