Three college students play a game every Thursday night. Only one student can win the game....

Penny will play 2 games of badminton against Monica. Penny’s chances of winning the first game...

Penny will play 2 games of badminton against Monica. Penny’s chances of winning the first game is 70 % . If Penny wins the first game then the chances to win the second game is 80% but if Penny lose the first game then chances to win the second game is 50%. Find the probability that Penny winning exactly one match. First game Penny (A) win =                        First game Monica (A) win =     Second game Penny (C) win...

A team play a series of games with win, lose, or draw outcomes. The transition probabilities...

A team play a series of games with win, lose, or draw outcomes. The transition probabilities between winning, losing, and drawing are averaged over a long time and treated as independent: Loss Draw Win Loss 0.3 0.4 0.3 Draw 0.4 0.5 0.1 Win 0.2 0.4 0.4 A. If the team wins two games in a row, what is the probability that it will draw its next game? B. On average the team wins 50% of the time, draws 20% of...

Vietnam's national soccer team is playing this season. For every game they play, the probability that...

Vietnam's national soccer team is playing this season. For every game they play, the probability that they win the game is 0.6. For the upcoming month, they are schedule to play 15 games. What is the probability they will lose only 1 games out of 15? Round your answer to 4 decimals (For example: 0.1234)

Ross and Rachel play chess. For any one game the probability of Rachel’s win is 0.35....

Ross and Rachel play chess. For any one game the probability of Rachel’s win is 0.35. If they are to play 8 times and the outcomes are independent of one another, what is the probability that Rachel will win exactly 4 games?

Suppose that on each play of a certain game a gambler is equally likely to win...

Suppose that on each play of a certain game a gambler is equally likely to win or to lose. Let R = Rich Rate. In the first game (n=1), if a player wins, his fortune is doubled (r= 2), and when he loses, his fortune is cut in half (r= 1/2). a) For the second game (n = 2), R can take values r={4,1,1/4} (Why?). Let i be the number of wins in n games. What are the possible values...

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).

You enter a special kind of chess tournament, whereby you play one game with each of...

You enter a special kind of chess tournament, whereby you play one game with each of three opponents, but you get to choose the order in which you play your opponents. You win the tournament if you win two games in a row. You know your probability of a win against each of the three opponents. What is your probability of winning the tournament, assuming that you choose the optimal order of playing the opponents?

Two groups are having competition for chase. If one plays it in its own campus it...

Two groups are having competition for chase. If one plays it in its own campus it will win with probability P> ½. They will play three times, two in group 1’s campus and one in group 2’s campus. If one wins game 1 and 2, then game 3 is not going to be played. a) What is P[T], the probability that the group 1 wins the series? b) If they play only once will group 1 have higher chance of...

A player is given the choice to play this game. The player flips a coin until...

A player is given the choice to play this game. The player flips a coin until they get the first Heads. Points are awarded based on how many flips it took: 1 flip (the very first flip is Heads): 2 points 2 flips (the second flip was the first Heads): 4 points 3 flips (the third flip was the first Heads): 8 points 4 flips (the fourth flip was the first Heads): 16 points and so on. If the player...

1. Two groups are having competition for chase. If one plays it in its own campus...

1. Two groups are having competition for chase. If one plays it in its own campus it will win with probability P> ½. They will play three times, two in group 1’s campus and one in group 2’s campus. If one wins game 1 and 2, then game 3 is not going to be played. a) What is P[T], the probability that the group 1 wins the series? b) If they play only once will group 1 have higher chance...