If A is an invertible matrix then `det(A^-1)` is equal to (A) 1 (B) `1/|A|` (C) `|A|` (D) none of these

If A is an invertible matrix of order 2, then det (A^(-1)) is equal to

If A is invertible matrix. Then what is det (A^(-1)) equal to ?

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

If A is a invertible matrix of order 4 then |A^(-1)|=

A square matrix A is invertible iff det (A) is equal to (A) -1 (B) 0 (C) 1 (D) none of these

If is a non-singular matrix, then det (A^(1))=

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

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

If A is an invertible matrix,then prove that (A^(1))^(-1)=(A^(-1))^(1)