I would have agreed with you a couple of weeks ago, but this video explains it well. It wouldn’t be such a well known fallacy if it wasn’t so counterintuitive.
Comment on [deleted]
Iamdanno@lemmynsfw.com 11 months agoAfter you find out there’s a goat behind door #2, you have a 50% chance whether you stay on 1 or move to three. There are only two possible outcomes at that point (car or goat), so either way it’s a coin flip.
ta_leadran_orm@lemmy.world 11 months ago
Hellnikko@lemmy.world 11 months ago
You’re incorrect. It is indeed a higher chance to switch from #1 to #3. You should look up Monty Hall paradox. It’s in the link that you replied to that explains it.
DarkDarkHouse@lemmy.sdf.org 11 months ago
You can test it empirically. It’s clearly not 50%.
Iamdanno@lemmynsfw.com 11 months ago
There are only two options at that point. It MUST be 50-50.
DarkDarkHouse@lemmy.sdf.org 11 months ago
Not sure if sarcastic… but seriously play it yourself a few times. If you’re unsure, keep playing and it will become clear.
UndercoverUlrikHD@programming.dev 11 months ago
People will claim that you’re wrong, but you’re 100% correct. It’s always 50-50. You either win, or you don’t.
Silentiea@lemm.ee 11 months ago
The important thing is that the host will always show you a goat, meaning the only way the other door has another goat is if you just so happened to pick the car the first time.
Take the situation to the extreme and imagine a hundred doors, and after you pick a door, the host opens 98 doors, all of them with goats behind them. Now which seems more likely, that you chose right the first time, or that the other door has the car?
UndercoverUlrikHD@programming.dev 11 months ago
My comment is clearly sarcastic…
Feathercrown@lemmy.world 11 months ago
You’re wrong, but you’re in good company. It’s a very counterintuitive effect. One technique that can be helpful for understanding probability problems is to take them to the extreme. Let’s increase the number of doors to 100. One has a car, 99 have goats. You choose a door, with a 1% chance of having picked the car. The host then opens 98 other doors, all of which have goats behind them. You now have a choice: the door you chose originally, with a 1% chance of a car… or the other door, with a 99% chance of a car.
june@lemmy.world 11 months ago
Oh that’s so weird. I get it from a proof perspective but it feels very wrong.
My brain tells me it’s two separate scenarios where the first choice was 99:1 and after eliminating 98 there’s a new equation that makes it 50:50.
Silentiea@lemm.ee 11 months ago
The important thing is that the host will always show you a goat, meaning the old way the other hours bed the car old if you kist so happened to pick it the first time.
Take the situation to the extreme and imagine a hundred doors, and after you pick a door, the host opens 98 doors, all of them with goats behind them. Now which seems more likely, that you chose right the first time, or that the other door has the car?
june@lemmy.world 11 months ago
Your first paragraph made it click. Thanks!
Feathercrown@lemmy.world 11 months ago
Yeah it’s very counterintuitive
Iamdanno@lemmynsfw.com 11 months ago
Now you have 2 choices: the door you chose, or the only other door left. One has a goat and one has a car. That’s fifty-fifty.
In your explanation, the door originally had a 1% chance, but after showing 98 goats, it has a 50% chance.
june@lemmy.world 11 months ago
No. Taking it to the extreme with 100 doors, your first pick was a 1% chance to get the car. The host then shows you 98 other doors that all have goats.
What’s more likely? That you picked the right door when it was 100:1? Or that the other door is the one with the car?
Silentiea@lemm.ee 11 months ago
The important thing is that the host will always show you a goat, meaning the only way the other door has the car is if you just so happened to pick it the first time.
Take the situation to the extreme and imagine a hundred doors, and after you pick a door, the host opens 98 doors, all of them with goats behind them. Now which seems more likely, that you chose right the first time, or that the other door has the car?