Consider the following incomplete-information game. First, nature chooses between one of the following two A and B tables, each with probability 0.5: A L R B L R U 0,0 6,-3 U -20, -20 -7, -16 D -3, Suppose only player 1 observes nature’s move (and it is common knowledge).
(a) Represent the game in extensive form.
(b) Represent the game in Bayesian normal form.
(c) Find the unique BNE and calculate the expected equilibrium payoffs of both players.