If in a square matrix `A=(a_(i j))` we have `a_(ji)=a_(i j)` for all `i`,` j` then `A` is

Construct a 2xx2 matrix A = [a_(ij)] where a_(ij) =(i-j)/(2) .

the square matrix A=[a_(ij)]_(mxxn) given by a_(ij)=(i-j)^(n), show that A is symmetic and skew-sysmmetic matrices according as n is even or odd, repectively.

If A= (a_(ij) ) is a scalar matrix of order nxx n such that a_(ii)=k for all i, then trace of A is equal to

If matrix A=[a_(ij)]_(3xx) , matrix B=[b_(ij)]_(3xx3) , where a_(ij)+a_(ji)=0 and b_(ij)-b_(ji)=0 AA i , j , then A^(4)*B^(3) is

Let P = [a_(ij)] be a 3xx3 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 tehd etarminat of the matrix Q is :

If matrix A = [a_(ij)] _(2xx2) where a_(ij) {:(-1," if " i !=j ),(=0 , " if " i = j):} then A^(2) is 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

In a square matrix A of order 3 the elements a_(ij) 's are the sum of the roots of the equation x^(2) - (a+b) x + ab =0, a_(I,i+1) 's are the product of the roots, a_(I,i-1) 's are all unity and the rest of the elements are all zero. The value of the det (A) is equal to

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

Construct a 3 xx 4 matrix, A = [a_(ij)] whose elements are given by: (ii) a_(ij) = 2i - j