The Curious Incident of the Dog in the Night-Time - Mark Haddon [21]
This is because Mr. Jeavons doesn't understand numbers.
Here is a famous story called The Monty Hall Problem which I have included in this book because it illustrates what I mean.
There used to be a column called Ask Marilyn in a magazine called Parade in America. And this column was written by Marilyn vos Savant and in the magazine it said that she had the highest IQ in the world in the Guinness Book of World Records Hall of Fame. And in the column she answered maths questions sent in by readers. And in September 1990 this question was sent in by Craig F. Whitaker of Columbia, Maryland (but it is not what is called a direct quote because I have made it simpler and easier to understand)
You are on a game show on television. On this game show the idea is to win a car as a prize. The game show host shows you three doors. He says that there is a car behind one of the doors and there are goats behind the other two doors. He asks you to pick a door. You pick a door but the door is not opened. Then the game show host opens one of the doors you didn't pick to show a goat (because he knows what is behind the doors). Then he says that you have one final chance to change your mind before the doors are opened and you get a car or a goat. So he asks you if you want to change your mind and pick the other unopened door instead. What should you do?
Marilyn vos Savant said that you should always change and pick the final door because the chances are 2 in 3 that there will be a car behind that door.
But if you use your intuition you think that chance is 50-50 because you think there is an equal chance that the car is behind any door.
Lots of people wrote to the magazine to say that Marilyn vos Savant was wrong, even when she explained very carefully why she was right. Of the letters she got about the problem, 92% said that she was wrong and lots of these were from mathematicians and scientists. Here are some of the things that they said
I'm very concerned with the general public's lack of mathematical skills. Please help by confessing your error.
Robert Sachs, Ph.D., George Mason University
There is enough mathematical illiteracy in this country, and we don't need the world's highest IQ propagating more. Shame!
Scott Smith, Ph.D., University of Florida
I am in shock that after being corrected by at least three mathematicians, you still do not see your mistake.
Kent Ford, Dickinson State University
I am sure you will receive many letters from high school and college students. Perhaps you should keep a few addresses for help with future columns.
W. Robert Smith, Ph.D., Georgia State University
You are utterly incorrect . . . How many irate mathematicians are needed to get you to change your mind?
E. Ray Bobo, Ph.D., Georgetown University
If all those Ph.D.'s were wrong, the country would be in very serious trouble.
Everett Harman, Ph.D., U.S. Army Research Institute
But Marilyn vos Savant was right. And here are 2 ways you can show this.
Firstly you can do it by maths like this
* * *
Let the doors be called X, Y and Z.
Let Cx be the event that the car is behind door X and so on.
Let Hx be the event that the host opens door X and so on.
Supposing that you choose door X, the possibility that you win a car if you then switch your choice is given by the following formula
P(HZ ^ CY) + P(HY ^ CZ)
= P(CY)•P (HZ| CY) + P(CZ)•P(HY | CZ)
= (1⁄3 • 1) + (1⁄3 • 1) = 2⁄3
Let the doors be called X, Y and Z.
Let Cx be the event that the car is behind door X and so on.
Let Hx be the event that the host opens door X and so on.
Supposing that you choose door X, the possibility that you win a car if you then switch your choice is given by the following formula
P(HZ ^ CY) + P(HY ^ CZ)
=