If P(A) denotes the probability of an event, then

If P(A) denotes the probability of an event A then (a) P(A) lt 0 (b) P(A) gt 1 (c) 0 leP(A) le 1 (d) -1 leP(A) le 1

If P(E) denotes the probability of an event E, then E is called certain event if :

If P(E) denotes the probability of an event E then (a) 0 lt P(E) le 1 (b) 0 lt P(E) lt 1 (c) 0 le P(E) le 1 (d) 0 le P(E) lt 1

If P (E) denotes the probability of an event E, then:

A computer producing factory has only two plants T_(1) and T_(2) . Plant T_(1) produces 20% and plant T_(2) produces 80% of the total computers produced. 7% of computers produced in the factory turn out to be defective. It is known that P(computer turns out to bedefective, given that it is produced in plant T_(1) )=10P (computer turns out to be defective, given that it is produced in plant T_(2) ), where P(E) denotes the probability of an event E.A computer produced in the factory is randomly selected and it does not turn out to be defective. Then, the probability that it is produced in plant T_(2) , is

A, B, C are any three events. If P(S) denotes the probability of S happening, then P(A cap (B cup C)) =

If 3/11 is the probabililty of an event A, then the probability of the event not A is……………….

Let E and F be two independent events. The probability that exactly one of them occurs is 11//25 and the probability of none of them occurring is 2//25. If P(T) denotes the probability of occurrence of the event T, then