If A is a non singular square matrix 3 then `|adj(A^3)|` equals (A) `|A|^8` (B) `|A|^6` (C) `|A|^9` (D) `|A|^12`

If A is a non singular square matrix then |adj.A| is equal to (A) |A| (B) |A|^(n-2) (C) |A|^(n-1) (D) |A|^n

If A is a non-singular matrix of order 3, then |adjA^(3)|=

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

If A is a non singular matrix of order 3 then |adj(adjA)| equals (A) |A|^4 (B) |A|^6 (C) |A|^3 (D) none of these

If A is a non singular matrix of order 3 then |adj(A)|= ……………

If A is a 2xx2 non singular matrix, then adj(adj A) is equal to :

If A is a non-singular matrix, then A (adj.A)=

If A is a 3xx3 non-singular matrix,then |A^(-1)adj(A)| is

Let A be a non-singular square matrix of order 3 xx 3. Then |adj A| is equal to (a) |A| (B) |A|^2 (C) |A|^3 (D) 3|A|

If A is a non-singular matrix of order n, then A(adj A)=