If A and P are `3xx3` matrices with integral entries such that P ' AP = A , then det . P is :

If A and B are any 2xx2 matrices , then det (A+B) = 0 implies :

The number of 3xx3 non - singular matrices , with four entries as 1 and all other entries as 0 , is :

If A and P are the square matrices of the same order and if P be invertible, show that the matrices A and P^(-1) have the same characteristic roots.

If P is a 3xx3 matrix such that P^(T) = 2P +I, where P^(T) is the transpose f P and I is the 3xx3 identify matrix then there exists a column matrix X = [(x),(y),(z)] != [ (0),(0),(0)] such that :

If A and B are (-2, -2) and (2, -4), respectively, find the coordinates of P such that AP = (3)/(7)AB and P lies on the line segment AB.

If A,B and C are square matrices of order n and det (A)=2, det(B)=3 and det (C)=5, then find the value of 10det (A^(3)B^(2)C^(-1)).

If A and B are two events such that P(A)=(1)/(3), P(B)=(1)/(2) and P(AnnB)=(1)/(6) , then P(A'//B) is

Let P and Q be 3 xx3 matrices with P != Q . If P^(3) = Q^(3) and P^(2) Q = P^(2)Q = Q^(2) P , then determinant of (P^(2) + Q^(2)) is equal to :

Let M and N be two 3xx3 non - singular skew symmetric matrices such that MN = NM Let P^(T) denote the transpose of P , then : M^(2)N^(2) (M^(T)N)^(-1) (MN^(-1))^(T) is equal to :

If A and B are two events such that P(AcupB)=(5)/(6), P(A)=(1)/(3) and P(B)=(3)/(4) , then A and B are