The element `a_(ij)` of square matrix is given by `a_(ij)=(i+j)(i-j)` then matrix A must be

The element a_(ij) of square matrix is given a_(ij) = (i+j) (i - j) , then matrix A must be a)Skew - symmetric matrix b)Triangle matrix c)Symmetric matrix d)Null matrix

The square matrix A=[a_(ij)" given by "a_(ij)=(i-j)^3 , is a

The square matrix A=[a_(ij)" given by "a_(ij)=(i-j)^3 , is a

If A is a square matrix for which a_(ij)=i^(2)-j^(2) , then matrix A is

The elements a_(ij) of a 3xx3 matrix are given by a_(ij)=(1)/(2)|-3i+j|. Write the value of element a_(32)

The elements a_(ij) of a 2xx2 matrix are given by a_(ij) = (1)/(4) |-3 i + j| . Then, the value of element a_(21) is:

A=[a_(ij)]_(3xx3) is a square matrix so that a_(ij)=i^(2)-j^(2) then A is a

"In a square matrix "A=a_(ij)" if i>j then "a_(ij)=0" then the Matrix A is"

In square matrix A=(a_(ij)) if i lt j and a_(ij)=0 then A is