Bertrand's paradox is a problem within the classical interpretation of probability theory. Consider an equilateral triangle inscribed in a circle. Suppose a chord of the circle is chosen at random. What is the probability that the chord is longer than a side of the triangle?
This problem was originally posed by Joseph Bertrand in his work, Calcul des probabilités (1888). Bertrand gave three arguments, all apparently valid, yet yielding inconsistent results.
File:Bertrand1-figure.svgRandom chords, selection method 1; red = longer than triangle side, blue = shorter The "random endpoints" method: Choose a point on the circumference and rotate the triangle so that the point is at one vertex. Choose another point on the circle and draw the chord joining it to the first point. For points on the arc between the endpoints of the side opposite the first point, the chord is longer than a side of the triangle. The length of the arc is one third of the circumference of the circle, therefore the probability a random chord is longer than a side of the inscribed triangle is one third.
File:Bertrand2-figure.svgRandom chords, selection method 2 The "random radius" method: Choose a radius of the circle and rotate the triangle so a side is perpendicular to the radius. Choose a point on the radius and construct the chord whose midpoint is the chosen point. The chord is longer than a side of the triangle if the chosen point is nearer the center of the circle than the point where the side of the triangle intersects the radius. Since the side of the triangle bisects the radius, it is equally probable that the chosen point is nearer or farther. Therefore the probability a random chord is longer than a side of the inscribed triangle is one half.
File:Bertrand3-figure.svgRandom chords, selection method 3 The "random midpoint" method: Choose a point anywhere within the circle and construct a chord with the chosen point as its midpoint. The chord is longer than a side of the inscribed triangle if the chosen point falls within a concentric circle of radius 1/2. The area of the smaller circle is one fourth the area of the larger circle, therefore the probability a random chord is longer than a side of the inscribed triangle is one fourth.
The problem's solution thus hinges on the means by which a chord is chosen "at random". It turns out that once the method of random selection is specified, the problem has a well-defined solution. There is no unique selection method, so there cannot be a unique solution. The three solutions presented by Bertrand correspond to different selection methods, and in the absence of further information there is no reason to prefer one over another.
The selection methods can be visualized as follows. Other than a diameter, a chord is uniquely identified by its midpoint. Each of the three selection methods presented above yields a different distribution of midpoints. Methods 1 and 2 yield two different nonuniform distributions, while method 3 yields a uniform distribution. Other distributions can easily be imagined, many of which will yield a different proportion of chords which are longer than a side of the inscribed triangle.
Bertrand's "paradox" is a paradox because the word "random" in suppose a chord of the circle is chosen at random is ambiguous. Similar ambiguity is found, for example, in some gas physics calculations, a field in which the correct solution can be determined by experiment. In the field of gas physics, the correct solution can be found mathematically by considering invariance under transformation groups. In his 1973 paper The Well-Posed Problem, E. T. Jaynes used the same approach to Bertrand's paradox.[1]
Jaynes changed the question from "what is the mathematically correct experiment" to "which properties would an acceptable physical experiment have." An experiment one could imagine is to throw straws onto a coin that lies far enough away from us such that it is sufficiently random how the straws fall onto that coin and onto the floor around the coin. The circumference of the coin represents the circle. The solution to Bertrand's paradox then is the conditional probability that the chord made by the straw is longer than the side of the inscribed triangle, given that the straw intersects the circle.
If you picture a floor full of straws thrown onto it, and a coin lying below them, it is then common sense that the solution is the same no matter whether we take a smaller coin or a larger coin (the problem is scale invariant), and no matter whether the coin is placed a bit more to the left or a bit more to the right (the problem is translational invariant). With these two invariants, the random distribution of the chords can be calculated directly with integral equations, and the unique solution is precisely what was called "method 2" above, the random radius method.
This means, for the classical solutions above, if you take the chords in the pictures of method 1 or 3 above, and lay on them a smaller circle, and move that smaller circle around within the larger circle, then the probability distribution of the chords intersecting the smaller circle changes with the radius and the position of that smaller circle. In the case of "method 2", the probability distribution is always the same.
"Method 2" is the only solution that fulfills the transformation invariants that are present in certain physical systems, such as in statistical mechanics. However, one can design other practical physical experiments that give answers according to the other methods. For example, in order to arrive at the solution of "method 1", the random endpoints method, one can affix a spinner to the center of the circle, and let the results of two independent spins mark the endpoints of the chord. In order to arrive at the solution of "method 3", one could cover the circle with molasses and mark the first point that a fly lands on as the midpoint.[2] Several observers have designed experiments in order to obtain the different solutions and verified the results empirically.[3][4]
↑Gardner, Martin (1987), The Second Scientific American Book of Mathematical Puzzles and Diversions, The University of Chicago Press, pp. 223–226, ISBN978-0226282534
↑ Tissler, P.E. (Mar 1984), "Bertrand's Paradox", The Mathematical Gazette, The Mathematical Association, 68 (443): 15–19
↑ Kac, Mark (May–June 1984), "Marginalia: more on randomness", American Scientist, 72 (3): 282–283CS1 maint: Date format (link)
Michael Clark. Paradoxes from A to Z. London: Routledge, 2002.
