- 29,783
- 21,588
I thought of another angle. Imagine the game is played simultaneously by three players, each with their own instance of the game. In each game the car is behind the same random door for all three players.
The first player always chooses door 1 and sticks; the second player always chooses door 2 and sticks; and, the third player always chooses door 3 and sticks.
If stick wins 50% of the time, then each player must win 50% of the time, and the car must be behind each door 50% of the time. Which is impossible.
The first player always chooses door 1 and sticks; the second player always chooses door 2 and sticks; and, the third player always chooses door 3 and sticks.
If stick wins 50% of the time, then each player must win 50% of the time, and the car must be behind each door 50% of the time. Which is impossible.