Bertrand's box paradox explained

Bertrand's box paradox is a veridical paradox in elementary probability theory. It was first posed by Joseph Bertrand in his 1889 work Calcul des Probabilités.

There are three boxes:

  1. a box containing two gold coins,
  2. a box containing two silver coins,
  3. a box containing one gold coin and one silver coin.

Choose a box at random. From this box, withdraw one coin at random. If that happens to be a gold coin, then what is the probability that the next coin drawn from the same box is also a gold coin?

A veridical paradox is a paradox whose correct solution seems to be counterintuitive. It may seem intuitive that the probability that the remaining coin is gold should be, but the probability is actually .[1] Bertrand showed that if were correct, it would result in a contradiction, so cannot be correct.

This simple but counterintuitive puzzle is used as a standard example in teaching probability theory. The solution illustrates some basic principles, including the Kolmogorov axioms.

Solution

The problem can be reframed by describing the boxes as each having one drawer on each of two sides. Each drawer contains a coin. One box has a gold coin on each side (GG), one a silver coin on each side (SS), and the other a gold coin on one side and a silver coin on the other (GS). A box is chosen at random, a random drawer is opened, and a gold coin is found inside it. What is the chance of the coin on the other side being gold?

The following faulty reasoning appears to give a probability of :

The flaw is in the last step. While those two cases were originally equally likely, the fact that you are certain to find a gold coin if you had chosen the GG box, but are only 50% sure of finding a gold coin if you had chosen the GS box, means they are no longer equally likely given that you have found a gold coin. Specifically:

Initially GG, SS and GS are equally likely

\left(i.e.,P(GG)=P(SS)=P(GS)=

13\right)
. Therefore, by Bayes' rule the conditional probability that the chosen box is GG, given we have observed a gold coin, is:
P(GG\midsee gold)=
P(see gold\mid
GG) x 13
P(see gold\mid
GG) x 13+P(see gold
\mid
SS) x 13+P(see gold
\mid
GS) x 13

=

13
x
13
1
1+0+12

=

2
3

The correct answer of can also be obtained as follows:

Bertrand's purpose for constructing this example was to show that merely counting cases is not always proper. Instead, one should sum the probabilities that the cases would produce the observed result; and the two methods are equivalent only if this probability is either 1 or 0 in every case. This condition is applied correctly by the second solution method, but not by the first.

Experimental data

In a survey of 53 Psychology freshmen taking an introductory probability course, 35 incorrectly responded ; only 3 students correctly responded .[2]

Related problems

Other veridical paradoxes of probability include:

The Monty Hall and Three Prisoners problems are identical mathematically to Bertrand's Box paradox. The construction of the Boy or Girl paradox is similar, essentially adding a fourth box with a gold coin and a silver coin. Its answer is controversial, based on how one assumes the "drawer" was chosen.

References

External links

Notes and References

  1. Web site: Bertrand's box paradox . Oxford Reference . en .
  2. 10.1016/0010-0277(82)90021-X . Some teasers concerning conditional probabilities . 1982 . Bar-Hillel . Maya. Maya Bar-Hillel . Falk . Ruma . Ruma Falk. Cognition . 11 . 2 . 109–22 . 7198956. 44509163 .