Below is a game between player A and player B. Each player has two possible strategies:...

Below is a game between player A and player B. Each player has two possible strategies:...

Below is a game between player A and player B. Each player has two possible strategies: 1 or 2. The payoffs for each combination of strategies between A and B are in the bracket. For example, if A plays 1 and B plays 1, the payoff for A is 1 and the payoff for B is 0. Player B Strategy 1 Strategy 2 Player A Strategy 1 (1,0) (0,1) Strategy 2 (0,1) (1,0) How many pure strategy Nash equilibria does...

QUESTION 3 Below is a game between player A and player B. Each player has two...

QUESTION 3 Below is a game between player A and player B. Each player has two possible strategies: 1 or 2. The payoffs for each combination of strategies between A and B are in the bracket. For example, if A plays 1 and B plays 1, the payoff for A is -3 and the payoff for B is -2. Player B Strategy 1 Strategy 2 Player A Strategy 1 (-3,-2) (10,0) Strategy 2 (0,8) (0,0) How many pure strategy Nash...

4. Consider the following non-cooperative, 2-player game. Each player is a middle manager who wishes to...

4. Consider the following non-cooperative, 2-player game. Each player is a middle manager who wishes to get a promotion. To get the promotion, each player has two possible strategies: earn it through hard work (Work) or make the other person look bad through unscrupulous means (Nasty). The payoff matrix describing this game is shown below. The payoffs for each player are levels of utility—larger numbers are preferred to smaller numbers. Player 1’s payoffs are listed first in each box. Find...

In the “divide two apples” game, player 1 suggests a division scheme (x,y) from the set...

In the “divide two apples” game, player 1 suggests a division scheme (x,y) from the set {(2, 0), (1, 1), (0, 2)} where x is the number of apples allocated to player 1, and y is the number of apples allocated to player 2. Player 2 counters with a division scheme of her own that comes from the same set. The final allocation is obtained by averaging the two proposed division schemes. The apples can be cut if the resulting...

Venus and Serena are playing a tennis match. Each of them uses two strategies: Hit left...

Venus and Serena are playing a tennis match. Each of them uses two strategies: Hit left or hit right. The payoffs from each strategy combination are given below (The rows correspond to Venus's strategies, and the columns correspond to Serena's strategies. The first number in each payoff combination (x,y) is Venus's payoff, and the second number is Serena's payoff. ) Left Right Left 30,70 80,20 Right 90,10 20,80 11. What is Venus's dominant strategy? 12. What is Serena's best response,...

24. Two players are engaged in a game of Chicken. There are two possible strategies: swerve...

24. Two players are engaged in a game of Chicken. There are two possible strategies: swerve and drive straight. A player who swerves is called Chicken and gets a payoff of zero, regardless of what the other player does. A player who drives straight gets a payoff of 432 if the other player swerves and a payoff of −48 if the other player also drives straight. This game has two pure strategy equilibria and a. a mixed strategy equilibrium in...

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...

Which of the following is true for a Nash equilibrium of a two-player game? a) The...

Which of the following is true for a Nash equilibrium of a two-player game? a) The joint payoffs of the two players are highest compared to other strategy pairs. b) It is a combination of strategies that are best responses to each other.*? c) Every two-player game has a unique Nash equilibrium. d) None of the above is correct.

Game Theory: John and Dave are playing a game where they only have two strategies, either...

Game Theory: John and Dave are playing a game where they only have two strategies, either to move left or move right. The payoffs from this game are the points that each player will earn given the strategies that each play. The higher the points, the higher the payoffs each player will receive. The normal form representation of the game is presented below.                                                    DAVE                         Left                                                  Right Left 1,1 0,3 Right 3,0 2,2 John's name label should be on...

16. Two gas stations, A and B, are locked in a price war. Each player has...

16. Two gas stations, A and B, are locked in a price war. Each player has the option of raising its price (R) or continuing to charge the low price (C). They will choose strategies simultaneously. If both choose C, they will both suffer a loss of $100. If one chooses R and the other chooses C, (i) the one that chooses R loses many of its customers and earns $0, and (ii) the one that chooses C wins many...