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We see in this game each player has a dominant strategy.
For max, if he plays strategy 1,
then that's better than playing strategy 2.
If min plays 1, then strategy 1 is also better than strategy 2.
If min plays 2, so strategy 1 is the dominant strategy,
and that should have probability 1.
Strategy 2 should have probability 0.
And it's the same thing for min,
that 2 minimizes better than 1 in both cases.
So, strategy 2 should have probability 1,
and strategy 1 should have probability 0,
and that means we're always going to end up with this outcome,
and the value of the game is 3.