5. (2 pts) Consider a repeated game between a supplier (player 1) and a buyer (player 2). These two parties interact over an infinite number of periods. In each period, player 1 chooses a quality level q E [0, 5] at cost q. Simultaneously, player 2 decides whether to purchase the good at a fixed price of 6. If player 2 purchases, then the stage game payoffs are 6 - q for player 1 and 2q - 6 for player 2. Here, player 2 is getting a benefit of 2q. If player 2 does not purchase, then the stage-game payoffs are q for player 1 and 0 for player 2. Suppose that both players have discount factor 6. (a) (1 pt) Calculate the efficient quantity level under the assumption that transfers are possible. (b) (1 pt) For sufficiently large 6, does this game have a subgame perfect Nash equilbrium that yields the efficient outcome in each period? If so, describe the equilbrium strategies and determine how large 6 must be for this equilbrium to exist