If P(1) be the probability of an event A, then.
If 1 is a zero of the polynomial P(x), then:
Let E1 and E2 be two independent events such that P(E1)=P1 and P(E2)=P2. Describe in words of the events whose probabilities are
(i) P1P2
(ii) (1−P1)P2
(iii) 1−(1−P1)(1−P2)
(iv) P1+P2−2P1P2
In R3, consider the planes P1:y=0 and P2:x+z=1. Let P3 be a plane , different from P1 and P2, which passes through the intersection of P1 and P2. If the distance of the point (0, 1, 0) from P3 is 2, then which of the following relation(s) is/are true?