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

Write the name of the square matrix A=a_(ij) in which a_(ij)=0 , i!=j ,

Name the square matrix A = [a_(ij)] in which a_(ij) = 0, I ne J .

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

A square matrix A=[a_(ij)] in which a_(ij)=0 for i!=j and [a]_(ij)=k (constant) for i=j is called a

A square matrix A=[a_(ij)] in which a_(ij)=0 for i!=j and [a]_(ij)=k (constant) for i=j is called a (A) unit matrix (B) scalar matrix (C) null matrix (D) diagonal matrix

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

If a square matrix A=[a_(ij)]_(3 times 3) where a_(ij)=i^(2)-j^(2) , then |A|=

Construct a 3xx3 matrix A=[a_(ij)] where a_(ij)=2(i-j)

" In a square matrix "A=[a_(ij)]" ,if "i>j" and "a_(ij)=0" then that matrix 'A' is an "