Suppose you are playing a series of ping pong games with Cl ́emonell until one of...

Some games, like tennis or ping pong, reach a state called deuce. This means that the...

Some games, like tennis or ping pong, reach a state called deuce. This means that the score is tied and a player wins the game when they get two points ahead of the other player. Suppose the probability that you win a point is π and this is true independently for all points. If the game is at deuce what is the probability you win the game? Explain your answer clearly writing up all the details with proper notations.

Two teams A and B play a series of games until one team wins four games....

Two teams A and B play a series of games until one team wins four games. We assume that the games are played independently and that the probability that A wins any game is p and B wins (1-p). What is the probability that the series ends after... a) 5 games b) 6 games c) 7 games d) n games

Suppose that two teams are playing a series of games, each team independently wins each game...

Suppose that two teams are playing a series of games, each team independently wins each game with 1/2 probability. The final winner of the series is the first team to win four games. Let X be the number of games that the two teams have played. Find the distribution of X.

The baseball World Series is won by the first team to win four games. Suppose both...

The baseball World Series is won by the first team to win four games. Suppose both teams are equally likely to win each game. What is the probability that the team that wins the first game will win the series?

In the baseball World Series, two teams play games until one team has won four games;...

In the baseball World Series, two teams play games until one team has won four games; thus the total length of the series must be between 4 and 7 games. What is the probability of having a World Series with a length of 4 games under the assumption that the games are independent events with each team equally likely to win?

Suppose the Sixers and the Warriors are playing in the NBA finals (a seven game series)....

Suppose the Sixers and the Warriors are playing in the NBA finals (a seven game series). The first team to win four games wins the series. Assume the Sixers have a win probability for each game of 0.483. If the Sixers lose the first game, what is the probability that they win the series? Perform a Monte Carlo simulation to answer this question. use r-studio!!! plz

Suppose that two teams play a series of games that ends when one of them has...

Suppose that two teams play a series of games that ends when one of them has won 3 games. Suppose that each game played is, independently, won by team A with probability   1/ 2 . Let X  be the number of games that are played. (a) Find P(X  =  4) (b) Find the expected number of games played.

The World Series in baseball is won by the first team to win 4 games in...

The World Series in baseball is won by the first team to win 4 games in a series of 7. Clearly it cannot go longer than 7 games. Assume the two teams are evenly matched. (a) What is the probability that the team to win the first game wins the series? Explain the reasoning behind your computation in words. (b) Suppose that a team wins the first two games. What is the chance that it wins the series?

Two teams play a series of games until one of the teams wins n games. In...

Two teams play a series of games until one of the teams wins n games. In every game, both teams have equal chances of winning and there are no draws. Compute the expected number of the games played when (a) n = 2; (b) n = 3. (To keep track of what you are doing, it can be easier to use different letters for the probabilities of win for the two teams).

Consider a best-of-5 series, where a total of five games are played, and whoever wins three...

Consider a best-of-5 series, where a total of five games are played, and whoever wins three or more games wins the series. Suppose that you participate in such a series, and the probability of you winning a game is 0.6. Assume that all games are played independently. (a) What is the probability that you win the series? (b) What is the probability that the fifth game is necessary? (i.e., 2-2 after game 4) (c) Given that you had lost the...