Originally posted by: 91TTZ
This sounds like they're going for a Monte Hall type situation, but the way it's worded doesn't allow the same type of math.
In the Monte Hall problem, you're initially faced with a 1/3 chance, then he shows you an empty window and asks if you want to change your guess. You should, since now you'll have a 1/2 chance of being right, as opposed to 1/3 before.
But in this problem, you start with a 1/2 chance of it being the 2x amount, and you still have a 1/2 chance after he asks if you want to change your guess. I can see people trying to argue that you didn't know what your chances were when he asked you the first time, but now you do know the chances. But that doesn't change the probability since you'd always end up with a 50/50 shot.
Originally posted by: bobert
Originally posted by: 91TTZ
This sounds like they're going for a Monte Hall type situation, but the way it's worded doesn't allow the same type of math.
In the Monte Hall problem, you're initially faced with a 1/3 chance, then he shows you an empty window and asks if you want to change your guess. You should, since now you'll have a 1/2 chance of being right, as opposed to 1/3 before.
But in this problem, you start with a 1/2 chance of it being the 2x amount, and you still have a 1/2 chance after he asks if you want to change your guess. I can see people trying to argue that you didn't know what your chances were when he asked you the first time, but now you do know the chances. But that doesn't change the probability since you'd always end up with a 50/50 shot.
The wiki link above states you have 2/3 chance when switching,
Originally posted by: CaesaR
Originally posted by: desteffy
This is not the monty hall problem, this one is harder.
Think about a "double or nothing" bet, if you bet X dollars you could either get 2X or 0 back, and that is a "fair bet", if you do it over time you will come out even.
But this you could get either 2X or X/2, which is better than the double or nothing bet.
If you dont understand the solution to monty hall problem or why .9999.... = 1 you probably wont even understand what the question is here...
I know that Einstien. I thought your problem may have a similar solution. But thanks for being condescending.
Originally posted by: Zenmervolt
Very interesting... In effect it is a variant of the Monty Hall problem. (Bear with me here.)
Assume we have two people playing against each other using the Monty Hall problem. There are three doors, each of the two players must choose a door and they cannot choose the same door as the other player. One of the two players has chosen the correct door, so Monty opens the one remaining door revealing nothing. Is it in the players' best interest to switch?
Traditional logic says that they should switch, that each player has a 2/3 chance of winning when he or she switches to the other remaining door. However, when there are two players, this would then mean that if they switch the combined probability is 4/3, which isn't possible. It would likewise mean that if neither switched, the probability that one of the two would win is only 2/3, which again isn't possible since Monty has revealed that the prize is not behind the thrid door and must therefore be behind the door of one of the players (that is, a 1/1 probability that one of the players will win).
The base level paradox is the same.
In the OP, imagine two people playing this envelope game against each other. The expected value equation leads us to believe that it is in both players' best interest to switch. However, that means that the combined probabilities for the players add up to more than 1, which cannot happen.
My own response to the OP regarding the paradox:
I friggin hate you. This question is going to haunt me now.
ZV
Except, if you think about it - this is clear nonsense. The two envelopes are indistinguishable, so let's say you are playing with a friend, and the friend opens it and finds $20. Should you swap. Your friend performs the same calculation and swaps. The method you use to calculate the amount you are likely to win following a switch is wrong.Originally posted by: Slew Foot
Assume your envelope has $10. This means that the other has either $5 or $20.
If you always keep your envelope, you'll end up with $10 on average.
If you switch, assuming a fair game, youll average (5+20)/2, 12.50 each time on average.
Only if you assume that the player knows he or she chose the correct door.Originally posted by: msparish
Your whole analogy breaks down when you say that one of the players chose the correct door.Originally posted by: Zenmervolt
Very interesting... In effect it is a variant of the Monty Hall problem. (Bear with me here.)
Assume we have two people playing against each other using the Monty Hall problem. There are three doors, each of the two players must choose a door and they cannot choose the same door as the other player. One of the two players has chosen the correct door, so Monty opens the one remaining door revealing nothing. Is it in the players' best interest to switch?
Traditional logic says that they should switch, that each player has a 2/3 chance of winning when he or she switches to the other remaining door. However, when there are two players, this would then mean that if they switch the combined probability is 4/3, which isn't possible. It would likewise mean that if neither switched, the probability that one of the two would win is only 2/3, which again isn't possible since Monty has revealed that the prize is not behind the thrid door and must therefore be behind the door of one of the players (that is, a 1/1 probability that one of the players will win).
The base level paradox is the same.
In the OP, imagine two people playing this envelope game against each other. The expected value equation leads us to believe that it is in both players' best interest to switch. However, that means that the combined probabilities for the players add up to more than 1, which cannot happen.
My own response to the OP regarding the paradox:
I friggin hate you. This question is going to haunt me now.
ZV
In this case, keeping it simple AND using math both result in the correct answer.Originally posted by: 91TTZ
Sometimes it's easier to rely on common sense in situations like this, since the math involved gets so complicated and abstract that you lose a grip on it and lose the ability to pick out pretty basic logical errors.
On the other hand, trying to use common sense without knowing the math can get you in trouble, too. I guess the "keep it simple, stupid" principle applies. Always try to use the simplest method that works.