Two players are playing a coin tossing game. Player A wins $1 if the coin comes...

Two players are playing a coin tossing game. Player A wins $1 if the coin comes...

Two players are playing a coin tossing game. Player A wins $1 if the coin comes up heads and loses $1 if it comes up tails. Player B is unaware that the coin is weighted so that p(heads)=.55. They start with $3 in some way divided between them. They play until one player has no money. Write the transition matrix, P, for this game from player A's point of view.

Casinos in Atlantic City are looking to offer a special coin flip game where the player...

Casinos in Atlantic City are looking to offer a special coin flip game where the player wins $4,000 if the coin comes up heads and loses $1,000 if the coin comes up tails. Assume a fair coin is used. Which statement below BEST describes the new coin flip game? A. All statements are true. B. A risk averse person would pay less than $1,500 to play this game. C. A risk neutral person would be willing to pay $1,500 to...

There is a game with two players. Both players place $1 in the pot to play....

There is a game with two players. Both players place $1 in the pot to play. There are seven rounds and each round a fair coin is flipped. If the coin is heads, Player 1 wins the round. Otherwise, if it is tails, Player 2 wins the round. Whichever player wins four rounds first gets the $2 in the pot. After four rounds, Player 1 has won 3 rounds and Player 2 has won 1 round, but they cannot finish...

Alice and Bob play a game in which they flip a coin repeatedly. Each time the...

Alice and Bob play a game in which they flip a coin repeatedly. Each time the coin is heads, Alice wins $1 (and Bob loses $1). Each time the coin is tails, Bob wins (and Alice loses) $2. They continue playing until Alice has won three flips. Prove that the expected value of Bob’s winnings is $3. (Hint: Use linearity of expected value to consider the expected value of each flip separately, with flips being worth $0 if they do...

You play a coin flip game where you win NOTHING if the coin comes up heads...

You play a coin flip game where you win NOTHING if the coin comes up heads or win $1,000 if the coin comes up tails. Assume a fair coin is used. Which of the following is TRUE? Group of answer choices a. A risk-seeking person would be willing to accept a cash payment of $500 to forgo (i.e. pass up) playing the game. b. A risk neutral person might accept a cash payment of $400 to forgo (i.e. pass up)...

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...

Amanda, Becky, and Charise toss a coin in sequence until one person “wins” by tossing the...

Amanda, Becky, and Charise toss a coin in sequence until one person “wins” by tossing the first head. a) If the coin is fair, find the probability that Amanda wins. b) If the coin is fair, find the probability that Becky wins. c) If the coin is not necessarily fair, but has a probability p of coming up heads, find an expression involving p for the probability that Becky wins. d) As in part c) find similar expressions for Amanda...

Two players P1 and P2 agree to play the following game. Each puts up a stake...

Two players P1 and P2 agree to play the following game. Each puts up a stake of 1 unit. They will play seven rounds, where each round involves flipping a fair coin. If the coin comes up H, P1 wins the round, otherwise P2 wins. The first player to win four rounds gets both stakes. After four rounds, P1 has won three rounds and P2 has won one round, but they have to stop. What is the fairest way to...

coin 1 has probability 0.7 of coming up heads, and coin 2 has probability of 0.6...

coin 1 has probability 0.7 of coming up heads, and coin 2 has probability of 0.6 of coming up heads. we flip a coin each day. if the coin flipped today comes up head, then we select coin 1 to flip tomorrow, and if it comes up tail, then we select coin 2 to flip tomorrow. find the following: a) the transition probability matrix P b) in a long run, what percentage of the results are heads? c) if the...

In the group game “Odd-One Out”: All players take out a fair coin, and everyone flips...

In the group game “Odd-One Out”: All players take out a fair coin, and everyone flips at the same time. If one player (the “odd-one”) receives heads and everyone else receives tails (or vice-versa), the game ends. Otherwise the game goes on for more rounds, until an “odd-one” is finally found. In a group of 12 players, what is the percentage probability that the game will: a) End in the 1 round? b) Not end in the first 2 rounds?...