Consider three square matrices A, B and C of order 3 such that `A^(T)=A-2B and B^(T)=B-4C`, then the incorrect option is

If A and B are square matrices of order 3, then

If A and B are square matrices of order 3 such that "AA"^(T)=3B and 2AB^(-1)=3A^(-1)B , then the value of (|B|^(2))/(16) is equal to

If A, B and C are three sqare matrices of the same order such that A = B + C, then det A is equal to

If B, C are square matrices of same order such that C^(2)=BC-CB and B^(2)=-I , where I is an identity matrix, then the inverse of matrix (C-B) is

If A and B are square matrices of the same order such that A=-B^(-1)AB then (A+3B)^(2) is equal to

If A and B are square matrices of order 3 such that |A|=-1 , |B|=3 , then find the value of |3A B| .

If A and B are two non-singular matrices of order 3 such that A A^(T)=2I and A^(-1)=A^(T)-A . Adj. (2B^(-1)) , then det. (B) is equal to

If A and B are square matrices of order 3 such that |A| = - 1 and |B| = 3 , then the value of |3AB| is a) 27 b) -27 c) -81 d) 81

If A and B are any two different square matrices of order n with A^3=B^3 and A(AB)=B(BA) then

A, B and C are three square matrices of order 3 such that A= diag (x, y, z) , det (B)=4 and det (C)=2 , where x, y, z in I^(+) . If det (adj (adj (ABC))) =2^(16)xx3^(8)xx7^(4) , then the number of distinct possible matrices A is ________ .