If `A=[a_(ij)]` is a `2xx2` matrix such that `a_(ij)=i+2j` then A will be___

If A = [a_(ij)] is a 2 xx2 matrix such that a_(ij)=i+2j , then A will be

If A=[a_(ij)] is a 3xx2 matrix whose elements are given by a_(ij)=3i-2j , then A will be__

If A=[a_(ij)] is a care 2xx2 matrix whose elements are a_(ij)=(1)/(2) (i+2j)^(2) , then A will be____

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

If A=[a_(ij)] is a 2xx3 matrix whose elements are given by a_(ij)=(1)/(2) |3i-4j|, then A will be ___

Let A=[a_("ij")] be 3xx3 matrix and B=[b_("ij")] be 3xx3 matrix such that b_("ij") is the sum of the elements of i^(th) row of A except a_("ij") . If det, (A)=19 , then the value of det. (B) is ________ .

Let A=[a_("ij")] be 3xx3 matrix and B=[b_("ij")] be 3xx3 matrix such that b_("ij") is the sum of the elements of i^(th) row of A except a_("ij") . If det, (A)=19 , then the value of det. (B) is ________ .

Consider a matrix A=[a_("ij")] of order 3xx3 such that a_("ij")=(k)^(i+j) where k in I . Match List I with List II and select the correct answer using the codes given below the lists.

Consider an arbitarary 3xx3 non-singular matrix A[a_("ij")] . A matrix B=[b_("ij")] is formed such that b_("ij") is the sum of all the elements except a_("ij") in the ith row of A. Answer the following questions : If there exists a matrix X with constant elemts such that AX=B , then X is

If A=([a_(i j)])_(nxxn) is such that ( a )_(i j)=bar (a_(j i)),AAi ,j and A^2=O , then Statement 1: Matrix A null matrix. Statement 2: |A|=0.