Consider Apple and Samsung considering developing an entering a new market (by developing a new type of device). Each firm simultaneously makes its choice whether or not to Enter (E) or to Not Enter (NE).  If both firms enter (E) the payoff is -5 to each firm. If both firms do not enter (NE) they each get a profit of 2. If one enters and the other chooses to NE, the entrant gets 10 and the other firm gets a profit of 0. What are the Nash equilibria of the game?Group of answer choices. (NE, E) and (E, NE), where the first strategy in each parentheses is Apple’s and the second is Samsung’s(E, E)(E, NE)(E, E) and (NE, NE)(NE, E)

Consider Apple and Samsung considering developing an entering a new market (by developing a new type of device). The timing of the game is that Apple gets to choose whether to Enter (E) or to Not Enter (NE). Then, observing its rival’s choice, Samsung gets to choose whether to E or to NE. If both firms enter (E) the payoff is -5 to each firm. If both firms do not enter (NE) they each get a profit of 2. If one enters and the other chooses to NE, the entrant gets 10 and the other firm gets a profit of 0. Which statement is true?Group of answer choicesIn the outcome of the credible equilibrium Apple Enters, then Samsung also Enters; there is a second-mover advantageIn the outcome of the credible equilibrium Apple Enters, then Samsung chooses NE; there is a first-mover advantageIn the outcome of the credible equilibrium Apple chooses to NE, then Samsung Enters; there is a second-mover advantageIn the outcome of the credible equilibrium Apple chooses to NE, then Samsung also chooses to Not Enter; there is a first-mover advantageNone of the above

Consider the following game in which Sally can play T or B and John chooses between L or R. Each player makes their choice simultaneously. If Sally chooses T and John chooses L, Sally gets a payoff of 3 and John has a payoff of 7. If Sally plays T and John R, Sally’s payoff is 5 and John gets 1. If Sally Chooses B and John L, the payoffs are 1 to Sally and 2 to John. Finally, if Sally chooses B and John R, the payoffs are 4 to Sally and 3 to John. What are the Nash equilibria of the game?Group of answer choices(T,L) and (B,R)(T,L)(B,R)None of the other answers are correct.(T, R)

Consider two restaurants, R1 and R2, simultaneously decide what sort of cuisine they will focus on, Thai (T) or Vietnamese (V). If both opt for T, the payoffs are 10 each. If both opt for V, the payoffs are 20 each. If R1 plays T and R2 V the payoffs are (30, 40). If R1 plays V and R2 T, the payoffs are (50, 60) for R1 and R2, respectively. What are the Nash equilibria?Group of answer choices(V, V)(T, T)(T, T) and (V, V); this is a coordination game(T, V) and (V, T); this is a coordination game.None of the above.

Consider the following game. Player A and B simultaneously choose to work on either Project 1 (P1) or Project 2 (P2). The payoffs are as follows: if both players choose P1 the payoffs are 6 to A and 2 to B; if A chooses P1 and B chooses P2 the payoffs are 0 to each party; likewise, if A chooses P2 and B chooses P1 the payoffs are 0 to each party; and, finally, if A chooses P2 and B P2 the payoffs are 3 to both players. What are all of the Nash equilibria of this game? a. (P1, P1) b. (P1, P1), (P2, P2) c. (P1, P1), (P2, P2) and (Player A plays P1 with probability 1/3, Player B plays P1 with probability 1/2) d. (P1, P1), (P2, P2) and (Player A plays P1 with probability 3/5, Player B plays P1 with probability 1/3) e. (P1, P2), (P2, P2) and (Player A plays P1 with probability 1/2, Player B plays P1 with probability 2/3)

NASH equilibrium