Statement 1 Let a `2xx2` matrix A has determinant 2. If `B = 9A^2`, then the determinant of `B^T` is equal to 36. Statement II If A, B, C are three square matrices such that `C= AB`, then `|C|=|A||B|.`

Statement 1 Let a 2xx2 matrix A has determinant 2. If B=9A^(2) ,then the determinant of B^(T) is equal to 36. Statement III If A,B,C are three square matrices such that C=AB, then |C|=|A||B|

Statement-1 (Assertion and Statement- 2 (Reason) Each of these questions also has four alternative choices, only one of which is the correct answer. You have to select the correct choice as given below. Statement-1 Let A 2xx2 matrix A has determinant 2. If B= 9 A^(2) , the determinant of B^(T) is equal to 36. Statement- 2 If A, B and C are three square matrices Such that C= AB then abs(C) = abs(A) abs(B).

If AneB, AB = BA and A^(2)=B^(2) , then the value of the determinant of matrix A+B is (where A and B are square matrices of order 3xx3 )

Let B and C be two square matrices such that BC=CB and C^(2)=0 . If A=B+C then A^(3)-B^(3)-3B^(2)C is

If A , B and C are three square matrices of the same size such that B = CA C^(-1) then CA^(3) C^(-1) is equal to

Which of the following is/are true? If A is a square matrix such that A = A then (1 + A) - 7A=1 If A is a square matrix such that A = A then (1+4)° -7A=0 Let B and C be two square matrices such that BC = CB and C=0. If A = B+C then A - B -3B+C = 0 Let B and C be two square matrices such that BC = CB and C=0. If A = B+C then A+B -3B+C =0

Let A;B;C be square matrices of the same order n. If A is a non singular matrix; then AB=AC then B=C