The probabilities of three mutually exclusive events are respectively given as `(1+3P)/(3),(1-P)/(4),(1-2P)/(2).` Prove that
`(1)/(3)lePle(1)/(2)`

The probabilities of three mutually exclusive events A, B and C are given by (1)/(3) , (1)/(4) and (5)/(12) . Then P(AuuBuuC) is ...............

If ((1-3p))/2,((1+4p))/3,((1+p))/6 are the probabilities of three mutually excusing and exhaustive events, then the set of all values of p is a. (0,1) b. (-1/4,1/3) c. (0,1/3) d.

If (1+4p)/4,(1-p)/2and(1-2p)/2 are the probabilities of three mutually exclusive events, then value of p is

If (1+3p)/(3),(1-2p)/(2) are probabilities of two mutually exclusive events, then p lies in the interval

If A,B,C are three mutually exclusive and exhaustive events.If P(B)=(3)/(4)P(A) and P(C)=(1)/(3)P(B), find P(A)

If (1+3P)/(3),(1-2P)/(2) are probabilities of two mutually exclusive events, then P lies in the interval.

A, B and C are mutually exclusive and exhaustive events. If 1/3P(C)=1/2P(A)=P(B), then p(B) = …..

For two mutually exclusive events A and B , P(A)=1/3 and P(B)=1/4, find (AuuB) .