E327 Game TheoryAssignment 5: Due Wednesday October 28, 2015 at the BEGINNING of class1. Consider th

E327 Game TheoryAssignment 5: Due Wednesday October 28, 2015 at the BEGINNING of class1. Consider the following (2×3) strategic game.Player 2Player 1LeftCenterRightTop4,20,00,1Bottom0,02,41,3Find all the mixed-strategy Nash equilibria of this game by the “brute force methodâ€, i.e. use Proposition 116.2 in your textbook.2. Consider the following (2×3) strategic game.Player 2Player 1LeftCenterRightTop2,20,31,2Bottom3,11,00,2Find all the mixed-strategy Nash equilibria of this game by first eliminating any strictly dominatedactions and then constructing the players’ best response functions.3.(a) Represent in a diagram the two-player extensive game with perfect information in which the terminal histories are (C, E), (C, F ), (D, G), and (D, H), the player function is given by P (∅) = 1and P (C) = P (D) = 2. Player 1 prefers (C, F ) to (D, G) to (C, E) to (D, H) and player 2 prefers(D, G) to (C, F ) to (D, H) to (C, E).(b) List all of player 1’s possible strategies.(c) List all of player 2’s possible strategies.(d) List all possible strategy profiles and their corresponding outcomes and payoffs.(e) Find all Nash equilibria of the above game.(f) Find all subgame perfect equilibria of the above game.14. Two people select a policy that affects them both by alternately vetoing policies until only one remains.First person 1 vetoes a policy. If more than one policy remains, person 2 then vetoes a policy. If morethan one policy still remains, person 1 then vetoes another policy. The process continues until a singlepolicy remains unvetoed. Suppose there are three possible policies, X, Y, and Z. Person 1 prefers X toY to Z, and person 2 prefers Z to Y to X.(a) Model this situation as an extensive game and find its Nash equilibria.(b) Which of these Nash equilibria are subgame perfect?2