If A is an invertible square matrix; then `adj A^T = (adjA)^T`

If A is an invertible square matrix then |A^(-1)| =?

If A is an invertible square matrix of order 4 , then |adjA|= .......

If A is an invertible square matrix,then A^(T) is also invertible and (A^(T))^(-1)=(A^(-1))^(T)

If A is a square matrix, then what is adj A^(T) - (adj A)^(T) equal to ?

If A is an invertible square matrix of the order n such that |A| ne1 and |adj(adjA)|=|A|^((2n^(2)-7n+7)) then the sum of all possible values of n is

If A is a square matrix, then adj(A')-(adjA)'=

If A is a square matrix, then the value of adj A^(T)-(adj A)^(T) is equal to :

If A is a non singular square matrix,then adj(adjA)=|A|^(n-2)A

Let B is an invertible square matrix and B is the adjoint of matrix A such that AB=B^(T) . Then

If A is an invertible matrix,tehn (adj.A)^(-1) is equal to adj.(A^(-1)) b.(A)/(det.A) c.A d.(det A)A