¿Deberías cambiar de sobre si uno contiene el doble de dinero que el otro?
If you have $V$, the other envelope has $0.5V$ or $2V$ with prob 0.5.
Expected Value = $0.5 \times (0.5V) + 0.5 \times (2V) = 0.25V + V = 1.25V$
This implies calculating simply, you gain 25% on average by switching indefinitely!
This calculation assumes any value $X$ is equally likely (uniform prior on $[0, \infty]$), which cannot exist mathematically. In any real constrained scenario (like this game capped at $100), the endpoints distort this logic.
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