Thought Toys · Exhibit 06
Pick a door. The host — who knows where the prize is — throws open a losing door and offers you the swap. Your gut says it's a coin flip now, so why bother. Your gut is wrong: switching wins twice as often. Play a few rounds, then run a thousand and watch two-thirds rise out of the noise.
Pick a door.
Three closed doors. Choose one to begin.
At the start, your one door has a 1-in-N chance of hiding the prize, and everything you didn't pick holds the rest of the chance between them. That split is fixed the moment you choose — the prize doesn't move. Then the host, who knows what's where, deliberately opens losing doors. He never opens yours and never opens the prize. He's not adding luck; he's removing known losers from the pile you rejected.
So the whole leftover probability that used to be spread across all those other doors gets funnelled onto the single door he pointedly leaves shut. Your door is still stuck at its original 1-in-N. The other one now carries everything else. With three doors that's 1/3 against 2/3 — switch and you double your odds.
If that still feels like a trick, drag the slider to 100 doors. Pick one, and watch the host fling open ninety-eight empties, leaving just your door and one other. Now the question asks itself: did you really nail it first try at 1-in-100 — or is the prize behind the one door he was suspiciously careful to keep closed? Press Run 1000 rounds and the two bars settle onto their predicted marks: switching wins (N−1)/N of the time, staying just 1/N. Your intuition isn't bad at chance — it just forgot the host was giving away an answer.
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