Player II
C D
__________________
Player 1 A 6,3 2,6
B 4,3 8,1
Suppose that in the game above Player 2 plays strategy C with probability q=0.3. The value for is:
A) 3.9
B) 4.6
C) 8.3
D) 3.2
Player II C D __________________ Player 1 A 6,3 2,6 B 4,3 8,1 Suppose that in...
Player lI C D Player A 6,3 2,6 В 4,3 8,1 Suppose that in the game above Player 2 plays strategy C with probability q:03. The value for ET71(A, q) is: a. 8.3 b. 3.2 C.3.9 d. 4.6
Player II D E F A 2,6 0A 4A В 3,3 0,0 1,5 С 1,1 3,5 2,3 Player Consider the game above. Suppose Player 1 conjectures that Player 2 plays D with probability 1/4, E with probability 1/8, and F with probability 5/8. Player 1's best response to her conjecture about Player 2's strategy is to play a. A b. B OC.C . Another mixed strategy.
Player Il D EF A 5,3 3,5 8,5 В 1,2 0,2 9,3 С 6,3 2,4 8,9 Player The game above has a Nash Equilibrium in which Player 1 plays strategy and Player 2 plays strategy E with probability at least (Please, do not use fractions, if your answer is 2/5 use 0.4)
Player II A 5,3 3,5 8,5 Player C 6,3 24 8,9 Consider the strategic form game above. In this game, the following strategy profiles are inefficient (Please, select all that apply) b. (A,F C (C,E) d. (B,E) e (B,D) f. (A,D) . (B,F
Player II A 4,4 6,3 В 3,5 7,2 Player l Consider the strategic form game above. In this game, the following strategy profiles are efficient (Please, select all that apply) a (AD) O c (B,D) d. (А,C)
QUESTION 4 Player II DE F 5,3 3,5 8,5 1,2 0,2 9,3 6,3 2,4 8,9 A B C Player ' Consider the strategic form game above. In this game, the following strategy profiles are inefficient (Please, select all that apply) a. (B,E) b. (CD) C. (CE) d. (A,F) €. (B,D) Of. (B,F) 9. (A,D)
Player 2 9 1-9 Question 4: (15pt total] Consider the following game: X Y Player 1 P A 1,3 2,4 1-PB 0,2 8,0 Suppose Player 1 plays A with probability p, and Player 2 plays X with probability q. Let E (-) and E2(-) be the expected payoff functions. 4)a) [8pt total] Calculate the following: 4)a)i) (2pt] E(A) = 4)a)ii) [2pt] E (B) = 4)a)iii) [2pt] E(X) = 4)a)iv) [2pt] E2(Y) = 4)b) (3pt] Indifference strategy for Player 1: Answer:...
1-4 Player 2 2 Question 4: (15pt total] Consider the following game: X Y Player 1 p A1, 32, 4 1-p B 0,28,0 Suppose Player 1 plays A with probability p, and Player 2 plays X with probability q. Let E1 (-) and E2(-) be the expected payoff functions. 4)a) [8pt total] Calculate the following: 4)a)i) (2pt] E1(A) 4)a) ii) (2pt] E1(B) 4)a) iii) [2pt] E2(X) = 4)a)iv) (2pt] E(Y) = 4)b) (3pt) Indifference strategy for Player 1: Answer: 4)c)...
Player II A 2,6 0A 4A B 3,3 0,0 15 С 1,1 3,5 2,3 Player Consider the strategic form game above. The number of strategies player 1 has is ike 0,1, 74, eta.). and player 2 moves at information sets (Please write numerical values
Player II A x5 0,4 4,4 В 3,3 0,0 1,5 С 1,1 3,5 2,3 Player Consider the game above. Suppose Player 1 conjectures that Player 2 plays D with probability 1/4, E with probability 1/8, and F with probability 5/8. The value of X that makes Player 1 randomize evenly between strategies A and C (i.e., play p=(12, 0, 1/2)) is [x]. Please, do not use fractional forms; if your answer is -1/2 use -0.5 instead