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

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|

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

Assertion: |AadjA|=-1 , Reason : If A is a non singular square matrix of order n then |adj A|=|A|^(n-1) (A) Both A and R are true and R is the correct explanation of A (B) Both A and R are true R is not te correct explanation of A (C) A is true but R is false. (D) A is false but R is true.

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

If A is a non-singular square matrix of order 3 such that A^2 = 3A, then value of |A| is A) (-3) B) 3 C) 9 D) 27

If A; B are non singular square matrices of same order; then adj(AB) = (adjB)(adjA)

Let A be an orthogonal non-singular matrix of order n, then |A-I_n| is equal to :

Let A be a non - singular symmetric matrix of order 3. If A^(T)=A^(2)-I , then (A-I)^(-1) is equal to

Let A be a non - singular matrix of order 3 such that Aadj (3A)=5A A^(T) , then root3(|A^(-1)|) is equal to

If A is a non singular square matrix of order 3 such that A^(2)=3A , then the value of |A| is