Let A be a non-singular square matrix of order n. Then; `|adjA| = |A|^(n-1)`

Let A be a non-singular square matrix of order 3xx3 . Then |adjA| is equal to

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 and adj A are non-singular square matrices of order n, then adj (A^(-1))=

If A is a non-singular matrix of order nxxn, then : |adj*A|=

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

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

If A is non-singular matrix of order, nxxn,

Let A be a square matrix of order n. Then; A(adjA)=|A|I_(n)=(adjA)A

If A is a non-singlular square matrix of order n, then the rank of A is