2) Here's another game: There are three players, numbered 1,2, and 3. At the beginning of...
Game Theory: Will rate for correct and descriptive answers! 2) Here's another game: There are three players, numbered 1,2, and 3. At the beginning of the game, players1 and 2 simultaneously make decisions, each pulling out a Red or Blue marble. Neither player can see what the other player is choosing. After this choice, the players secretly reveal their marbles to each other without letting player 3 see. If both players choose Red, then the game ends and the payoff...
3. (15 points) Consider a sequential game with two players with three-moves, in which player 1 moves twice: Player 1 chooses Enter or Erit, and if she chooses Exit the game ends with payoffs of 2 to player 2 and 0 to player 1. • Player 2 observes player l's choice and will have a choice between Fight or Help if player 1 chose Enter. Choosing Help ends the game with payoffs of 1 to both players. • Finally, player...
First part: Consider the following two-player game. The players simultaneously and independently announce an integer number between 1 and 100, and each player's payoff is the product of the two numbers announced. (a) Describe the best responses of this game. How many Nash equilibria does the game have? Explain. (b) Now, consider the following variation of the game: first, Player 1 can choose either to "Stop" or "Con- tinue". If she chooses "Stop", then the game ends with the pair...
Problem 1. (20 points) Consider a game with two players, Alice and Bob. Alice can choose A or B. The game ends if she chooses A while it continues to Bob if she chooses B. Bob then can choose C or D. If he chooses C the game ends, and if he chooses D the game continues to Alice. Finally, Alice can choose E or F and the game ends after each of these choices. a. Present this game as...
Consider a game in which Player 1 first selects between L and R. If Player 1 selects L, then players 1 and 2 play a prisoner’s dilemma game represented in the strategic form above. If Player 1 selects R then, Player 1 and 2 play the battle-of-the-sexes game in which they simultaneously and independently choose between A and B. If they both choose A, then the payoff vector is (4,4). If they both choose B, then the payoff vector is...
Consider a game between a police officer (player 3) and two drivers (players 1 and 2). Player 1 lives and drives in Wynwood, whereas player 2 lives and drives in Sweetwater. On a given day, players 1 and 2 each have to decide whether or not to use their cell phones while driving. They are not friends, so they will not be calling each other. Thus, whether player 1 uses a cell phone is independent of whether player 2 uses...
In previous rounds of the Golden Balls game show, these players have built up a jackpot of £47,250. Now, they must decide how the jackpot will be distributed. Each player in this round of has two strategies: split or steal. The payoffs to each player depend on the strategies played: If both choose split, they each receive half the jackpot. If one chooses steal and the other chooses split, the steal contestant wins the entire jackpot and the split contestant...
Represent the following strategic interactions using payoff matrix/matrices: Three players are playing the following game: Each of them will put a penny (1 cent in the US) down simultaneously, each choosing between head and tail. If players 1's and 2's penny are on the same side (i.e., both heads or both tails), then player 1 takes over player 2's penny. If player 1's and 2's penny are mismatched (i.e., one head, one tail), player 2 takes over player 1's penny....
3. (30 pts) Consider the following game. Players can choose either left () or 'right' (r) The table provided below gives the payoffs to player A and B given any set of choices, where player A's payoff is the firat number and player B's payoff is the second number Player B Player A 4,4 1,6 r 6,1 -3.-3 (a) Solve for the pure strategy Nash equilibria. (4 pta) (b) Suppose player A chooses l with probability p and player B...
In previous rounds of the Golden Balls game show, these players have built up a jackpot of £47,250. Now, they must decide how the jackpot will be distributed. Each player in this round of has two strategies: split or steal. The payoffs to each player depend on the strategies played: If both choose split, they each receive half the jackpot. If one chooses steal and the other chooses split, the steal contestant wins the entire jackpot and the split contestant...