[" Let "^(P)=[a_(ij)]" be a "3times3" matrix and let "Q=[b_(ij)]],[" where "b_(ij)=2^(i+j)a_(ij)" for "1<=i,j<=3." If the determinant "],[" of "P" is "2," then the determinant of the matrix "],[Q" is "]

Let P = [a_(ij)] " be a " 3 xx 3 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 the determinant of the matrix Q is

Let P = [a_(ij)] " be a " 3 xx 3 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 the determinant of the matrix Q 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 the determinant of the matrix Q 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 :

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 the determinant of the matrix Q is

Let A=[a_(ij)] be a square matrix of order 3 and B=[b_(ij)] be a matrix such that b_(ij)=2^(i-j)a_(ij) for 1lei,jle3, AA i,j in N . If the determinant of A is same as its order, then the value of |(B^(T))^(-1)| is

Let A=[a_(ij)] be a square matrix of order 3 and B=[b_(ij)] be a matrix such that b_(ij)=2^(i-j)a_(ij) for 1lei,jle3, AA i,j in N . If the determinant of A is same as its order, then the value of |(B^(T))^(-1)| is

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

Construct a 3xx4 matrix [a_(ij)] , where a_(ij)=2i-j .