- Bean machine
The bean machine, also known as the
quincunx or Galton box, is a device invented by SirFrancis Galton to demonstrate thelaw of error and thenormal distribution .The machine consists of a vertical board with interleaved rows of pins. Balls are dropped from the top, and bounce left and right as they hit the pins. Eventually, they are collected into one-ball-wide bins at the bottom. The height of ball columns in the bins approximates a bell curve.
Overlaying
Pascal's triangle onto the pins shows the number of different paths that can be taken to get to each pin.A large-scale working model of this device can be seen at the
Museum of Science, Boston .Distribution of the balls
If a ball bounces to the right "k" times on its way down (and to the left on the remaining pins) it ends up in the "k"th bin counting from the left. Denoting the number of rows of pins in a bean machine by "n" the number of paths to the "k"th bin on the bottom is given by the
binomial coefficient . If the probability of bouncing right on a pin is "p" (which equals "0.5" on an unbiased machine) the probability that the ball ends up in the "k"th bin equals . This is the probability mass function of abinomial distribution .According to the
central limit theorem the binomial distribution approximates normal distribution provided that "n", the number of rows of pins in the machine, is large.Games
Several games have been developed utilizing the idea of pins changing the route of balls or other objects:
*bagatelle
*pachinko
*Plinko
*payazzo External links
* [http://www.ms.uky.edu/~mai/java/stat/GaltonMachine.html A simulation with explanations]
* [http://www.jcu.edu/math/isep/Quincunx/Quincunx.html Another simulation] fromJohn Carroll University
* [http://mw.concord.org/modeler1.3/mirror/mechanics/galton.html Yet another simulation] using the Molecular Workbench software
* [http://www.mathsisfun.com/probability/quincunx-explained.html Quincunx and its relationship to normal distribution] fromMath Is Fun
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