Let `A=[a_(ij)]_(nxxn)` be a square matrix and let `c_(ij)` be cofactor of `a_(ij)` in A. If `C=[c_(ij)]`, then

A =[a_(ij)]_(mxxn) is a square matrix ,if

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

Let A = [a_(ij)] " be a " 3 xx3 matrix and let A_(1) denote the matrix of the cofactors of elements of matrix A and A_(2) be the matrix of cofactors of elements of matrix A_(1) and so on. If A_(n) denote the matrix of cofactors of elements of matrix A_(n -1) , then |A_(n)| equals

Lat A = [a_(ij)]_(3xx 3). If tr is arithmetic mean of elements of rth row and a_(ij )+ a_( jk) + a_(ki)=0 holde for all 1 le i, j, k le 3. sum_(1lei) sum_(jle3) a _(ij) is not equal to

Lat A = [a_(ij)]_(3xx 3). If tr is arithmetic mean of elements of rth row and a_(ij )+ a_( jk) + a_(ki)=0 holde for all 1 le i, j, k le 3. Matrix A is

For A=[a_(ij)]_(nxxn)'a_(ij)=0,i nej then is a .... matrix . (a_(ii)nea_(ij)),(ngt1)

Let A be a square matrix of order 3xx3 then |KA| is equal to ……

If A=[a_(ij)]_(nxxn) such that a_(ij)=0 , for i nej then , A is …….. (a_(ij)nea_(jj))(ngt1)

Obtain a mxxn matrix A=[a_(ij)] . Such that a_(ij)=2i-j,m=2,n=4 .