`Aa n dB` play a series of games which cannot be drawn and `p , q` are their respective chance of winning a single game. What is the chance that `A` wins `m` games before `B` wins `n` games?

A, B, and C in order toss a coin. The one to throw a head wins. What are their respective chances of winning assuming that the game may continue indefinitely?

If chance of A , winning a certain race be (1)/(6) and the chance of B winning it is (1)/(3) , what is the chance that neither should win ?

If the probability of winning a game is 0.3, what is the probability of loosing it?

A and B throw a die alternatively till one of them gets a 6 and wins the game. Find their respective probabilities of winning, if A starts first.

It is given that the probability of winning a game is (3)/(7) . What is the probability of lossing the game.

Aman and Bhuvan throw a pair of dice alternately. In order to win, they have to get a sum of 8. Find their respective probabilities of winning if Aman starts the game.

Aman and Bhuvan throw a pair of dice alternately. In order to win, they have to get a sum of 8. Find their respective probabilities of winning if Aman starts the game.

Thomas and Jonelle are playing darts in their garage using the board with the point value for each region shown below. The radius of the outside circle is 10 inches, and each of the other circles has a radius 2 inches smaller than the next larger circle. All of the circles have the same center. Thomas has only 1 dart left to throw and needs at least 30 points to win the game. Assuming that his last dart hits at a random point within a single region on the board, what is the percent chance that Thomas will win the game?

Aa n dB participate in a tournament of best of 7 games. It is equally likely that either A wins or B wins or the game ends in a draw. What is the probability that A wins the tournament.

Three students Aa n dBa n dC are in a swimming race. Aa n dB have the same probability of winning and each is twice as likely to win as Cdot Find the probability that the BorC wins. Assume no two reach the winning point simultaneously.