Write a matrix of order `3xx3` in which every element is equal to 3.

Let A_(i) denote a square matrix of order n xx n with every element a; Then,the sum of fall elements of the product matrix (A_(1)A_(2)...A_(n)) is

Let A be a non-singular square matrix of order 3xx3 . Then |adjA| is equal to

If A is a matrix of order 3xx3 , then |3A| is equal to………

Write a matrix of order 3xx3 which is both symmetric and skew-symmetric matrix.

If A is invertible matrix of order 3xx3 , then |A^(-1)| is equal to…………

If A is a diagonal matrix of order 3xx3 is commutative with every square matrix of order 3xx3 under multiplication and trace (A)=12, then

If is A is a matrix of order 3xx3 , then (A^(2))^(-1) is equal to…………….

If A is a diagonal matrix of order 3xx3 is commutative with every square matrix or order 3xx3 under multiplication and tr(A)=12, then the value of |A|^(1/2) is

Let A be a square matrix of order 3xx3 , then |k A| is equal to (A) k|A| (B) k^2|A| (C) K^3|A| (D) 3k" "|A|

Construct a matrix of order 2xx3 , whose elements are given by (a) aij=((i-2j)^(2))/(2)