Suppose Larry and Megan are playing a game in which both must simultaneously choose the action Left or Right. The payoff matrix that follows shows the payoff each person will earn as a function of both of their choices. For example, the lower-right cell shows that if Larry chooses Right and Megan chooses Right, Larry will receive a payoff of 5 and Megan will receive a payoff of 5.

Megan

Left Right

Larry Left 6, 6 6, 3

Right 4, 3 5, 5

The only dominant strategy in this game is for to choose.

The outcome reflecting the unique Nash equilibrium in this game is as follows: Larry chooses and Megan chooses

Question

Moises Duke

Business

9 January, 21:53

Suppose Larry and Megan are playing a game in which both must simultaneously choose the action Left or Right. The payoff matrix that follows shows the payoff each person will earn as a function of both of their choices. For example, the lower-right cell shows that if Larry chooses Right and Megan chooses Right, Larry will receive a payoff of 5 and Megan will receive a payoff of 5.

Megan

Left Right

Larry Left 6, 6 6, 3

Right 4, 3 5, 5

The only dominant strategy in this game is for to choose.

The outcome reflecting the unique Nash equilibrium in this game is as follows: Larry chooses and Megan chooses

+5

Answers (1)

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Ezekiel · Answer 1

Here, the payoff matrix says, when Megan plays left, the best strategy for Larry is to choose left, (as 6>4) When Megan plays right, the best strategy for Larry is to choose left, (as 6>5) Now, when Larry plays plays left the best strategy for Megan is to play left (as 6>3) When Larry plays plays right, the best strategy for Megan is to play right. (3<5)

Therefore the only dominant strategy for Larry and Megan to choose left.

Therefore, The outcome reflecting the unique Nash equilibrium in this game is Larry choosing left, and Megan choosing left (6,6).