A six-faced unbiased die is thrown twice and the sum of the numbers appearing on the upper face is observed to be 7. The probability that the number 3 has appeared atleast once, is
If A, B and C are mutually exclusive and exhaustive events of a random experiment such that P(B) = P(A) and P(C) = P(B), then P(A ∪ C) equals to
Two persons A and B are throwing an unbiased six faced dice alternatively, with the condition that the person who throws 3 first wins the game. If A starts the game, then probabilities of A and B to win the same are, respectively
B.
The letters of the word 'QUESTION' are arranged in a row at random. The probability that there are exactly two letters between Q and S is
A speaks truth in 75% of the cases and B in 80% of the cases. Then, the probability that their statements about an incident do not match, is
A bag P contains 5 white marbles and 3 black marbles. Four marbles are drawn at random from P and are put in an empty bag Q. If a marble drawn at random from Q is found to be black then the probability that all the three black marbles in P are transfered to the bag Q
There are 10 intermediate stations on a railway line between two particular stations. The number ofways that a train can be made to stop at 3 of these intermediate stations so that no two of these halting stations are consecutive is
56
20
126
120