If `A` and `P` are different matrices of order `n` satisfying `A^(3)=P^(3)` and `A^(2)P=P^(2)A` (where `|A-P| ne 0`) then `|A^(2)+P^(2)|` is equal to

If A and B are two events such that P(A)=0.3 , P(B)=0.25 , P(AnnB)=0.2 , then P(((A^(C ))/(B^(C )))^(C )) is equal to

Find p if x^(2) – px + p = 0 has equal roots

A and B are two events such that P(A) gt 0, P(B) ne 1 then P(barA|barB) is equal to

If z= x-iy" and "z^(1/3)= p+iq , then (((x)/(p)+(y)/(q)))/((p^(2)+q^(2)) is equal to

In R^(3) , consider the planes P_(1):y=0 and P_(2),x+z=1. Let P_(3) be a plane, different from P_(1) and P_(2) which passes through the intersection of P_(1) and P_(2) , If the distance of the point (0,1,0) from P_(3) is 1 and the distance of a point (alpha,beta,gamma) from P_(3) is 2, then which of the following relation(s) is/are true?

If 2 + isqrt3 is a root of x^(3) - 6x^(2) + px + q = 0 (where p and q are real) then p + q is

Let P and Q be 3xx3 matrices with P!=Q . If P^3=""Q^3a n d""P^2Q""=""Q^2P , then determinant of (P^2+""Q^2) is equal to (1) 2 (2) 1 (3) 0 (4) 1

If p,q are the roots of ax^(2)-25x+c=0 , then p^(3)q^(3)+p^(2)q^(3)+p^(3)q^(2)=