If `A=[a_(ij)]_(3times3)` , then `|K.A|=......`

If the elements of a matrix are given by [a_(ij)]_(3times3) = i^2 - j , then |A|=?

A=[a_(ij)]_(3xx3), then |k xx A|=k^(3)|A|

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

" Let "A=(a_(ij))_(3times3)" be such that det "(A)=4" Suppose "b_(ij)=2^(i+j)a_(ij)(1<=i,j<=3)" and let "B=(b_(ij))_(3times3)" ,then det "(B)" is equal to "

Consider a square matrix A=[a_(ij)]_(3times3) of order 3, for which a_(ij)=omega^(i^2+j^2) , where omega is an imaginary cube root of unity. What is the value of |A|

Consider a square matrix A=[a_(ij)]_(3times3) of order 3, for which a_(ij)=omega^(i+j) , where omega is an imaginary cube root of unity. What is the value of |A|

let (a_(ij))_(3times3) be such that det (A)=4. Suppose b_(ij)=2^(i+j)a_(ij) (1<=i,j<=3) and let B=(b_(ij))_(3times3) ,then det (B) is equal to

If matrix A = [a_(ij)]_(3xx3), matrix B= [b_(ij)]_(3xx3) where a_(ij) + a_(ij)=0 and b_(ij) - b_(ij) = 0 then A^(4) cdot B^(3) is

if A=[a_(ij)]_(3xx3) such that a_(ij)=2 , i=j and a_(ij)=0 , i!=j then 1+log_(1/2) (|A|^(|adjA|))

If A=|a_(ij)]_(2 xx 2) where a_(ij) = i-j then A =………….