If A,B,C are square matrix of third order and `|A|=2,|B|=3,|C|=4,|A|`means determinant value of A ,then the value of `|(A^(3)*B*AdjC)/(|C|)|` equals to

[" If "A,B,C" are square "],[" matrix of third order "],[" and "|A|=2,|B|=3,|C|=4,|A|],[" means determinant "],[" value of "A" ,then the "],[[" value of "|(A^(3)*B*AdjC)/(|C|)],[" equals to "]]

If A, B and C are square matrices of order 3 and |A|=2, |B|=3 and |C|=4 , then the value of |3(adjA)BC^(-1)| is equal to (where, adj A represents the adjoint matrix of A)

In Delta ABC, if a=2b and A=3B, then the value of (c)/(b) is equal to

If a+b+ 2c=0 , then the value of a^(3) + b^(3) + 8c^(3) is equal to

If A is a square matrix of order 3 with determinant 4, then write the value of |-A| .

If A, B and C are square matrices of same order and I is an identity matrix of the same order, such that C^(2)=CB+AC and AB=I , then (C-A)^(-1) is equal to

Let A be a matrix of order 3xx3 such that |A|=3 . Let B=3A^(-1) and C =(adjA)/(2) , then the value of |A^(2)B^(3)C^(4)| is

If A is a square matrix of order n such that |adj(adjA)|=|A|^(9), then the value of n can be 4 b.2 c.either 4 or 2 d.none of these

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