If A is a matrix of order 3 and B=|A^(-1)`. If |A|=-5, then |B| is equal to

Suppose A is a matrix of order 3 and B=|A|A^(-1) . If |A|=5 , then |B| is equal to

If A is matrix of 3times3 order and |A|=625 ,then |(A)/(5)| is equal to

If A is a square matrix of order 3,|A|=6,B=5A^(2) then find |B|

If A is an invertible matrix of order 2 then det (A^(-1)) is equal to (a) det (A) (b) (1)/(det(A))(c)1 (d) 0

If A is matrix of order 3 such that |A|=5 and B= adj A, then the value of ||A^(-1)|(AB)^(T)| is equal to (where |A| denotes determinant of matrix A. A^(T) denotes transpose of matrix A, A^(-1) denotes inverse of matrix A. adj A denotes adjoint of matrix A)

If A be a square matrix of order 3, such that |A|=sqrt5 , then |Adj(-3A^(-2))| is equal to

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

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

"If B is a non -singular square matrix of order 3 such that |B|=1 then "det (B^-1) "is equal to (a) 1 (b) 0 (c)-1 (d) none of these"

Let A and B are two non - singular matrices of order 3 such that A+B=2I and A^(-1)+B^(-1)=3I , then AB is equal to (where, I is the identity matrix of order 3)