Consider a game with two players, each of whom has two types. The types of player...

Consider a game with two players. Each player has a deck of 40 cards made up...

Consider a game with two players. Each player has a deck of 40 cards made up of two colors: red and black. Each player shuffles their deck, then deals seven cards, called their hand. (c) Assume that player one has 10 red cards in their deck and player two has 20 red cards in their deck. With what probability will player two have more red cards in their *hand* than player one?

A game has two players. Each player has two possible strategies. One strategy is Cooperate, the...

A game has two players. Each player has two possible strategies. One strategy is Cooperate, the other is Defect. Each player writes on a piece of paper either a C for cooperate or a D for defect. If both players write C, they each get a payoff of $100. If both players write D, they each get a payoff of 0. If one player writes C and the other player writes D, the cooperating player gets a payoff of S...

Consider an extensive-form game in which player 1 is one of two types: A and B....

Consider an extensive-form game in which player 1 is one of two types: A and B. Suppose that types A and B have exactly the same preferences; the difference between these types has something to do with the payoff of another player. Is it possible for such a game to have a separating PBE, where A and B behave differently?

1. A game with two players, Player 1 and Player 2, is represented in the matrix...

1. A game with two players, Player 1 and Player 2, is represented in the matrix below. Player 1 has two possible actions, U, M and D, and Player 2 has three possible actions, L, C and R. Player 2    L C R U 1,0 4,2 7,1 Player 1 M 3,1 4,2 3,0 D 4,3 5,4 0,2 (a) Which of player 1’s actions are best responses when player 2 chooses action R? (b) Which of player 1’s actions are...

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...

If only one player has a dominant strategy in a game with two players, will there...

If only one player has a dominant strategy in a game with two players, will there be a Nash equilibrium?

Cards can be land cards, or other cards. We consider a game with two players. Each...

Cards can be land cards, or other cards. We consider a game with two players. Each player has a deck of 40 cards. Each player shuffles their deck, then deals seven cards, called their hand. Assume that player one has 10 land cards in their deck and player two has 20. With what probability will player two have more lands in hand than player one?

Suppose you have two players, Player A and Player B. Player A has a .400 On...

Suppose you have two players, Player A and Player B. Player A has a .400 On Base Percentage in 100 Plate Appearances, while Player B has a .350 On Base Percentage in 500 Plate Appearances. Without any additional information, which player would you expect to have a higher On Base Percentage in a game played tomorrow?

Many of you probably played the game “Rock, Paper, Scissors” as a child. Consider the following...

Many of you probably played the game “Rock, Paper, Scissors” as a child. Consider the following variation of that game. Instead of two players, suppose three players play this game, and let us call these players A, B, and C. Each player selects one of these three items—Rock, Paper, or Scissors—independent of each other. Player A will win the game if all three players select the same item, for example, rock. Player B will win the game if exactly two...

Consider a two-player game between Child’s Play and Kid’s Korner, each of which produces and sells...

Consider a two-player game between Child’s Play and Kid’s Korner, each of which produces and sells wooden swing sets for children. Each player can set either a high or a low price for a standard two-swing, one-slide set. The game is given as below: Kid’s korner High price Low price Child’s play High price 64, 64 20, 72 Low price 72, 20 57, 57 a. Suppose the players meet and make price decisions only once. What is the Nash equilibrium...