# Combinatorics, probability, dice

A friend of mine asked: if I have two dice and I throw both of them, what is the most frequent sum (of the two dice' numbers)?

I wrote a small script:

``````from random import randrange
d = dict((i, 0) for i in range(2, 13))
for i in xrange(100000):
d[randrange(1, 7) + randrange(1, 7)] += 1
print d
``````

Which prints:

``````2:  2770,
3:  5547,
4:  8379,
5:  10972,
6:  13911,
7:  16610,
8:  14010,
9:  11138,
10: 8372,
11: 5545,
12: 2746
``````

The question I have, why is 11 more frequent than 12? In both cases there is only one way (or two, if you count reverse too) how to get such sum (5 + 6, 6 + 6), so I expected the same probability..?

-
just fyi: the word "dice" is plural, "die" is singular, "dices" is not a word. – Jason S Mar 28 '10 at 12:45
@Jason: Well, “dices” is a word, as in, “she dices fresh onions for her stew.” – Konrad Rudolph Mar 28 '10 at 12:50
Thanks! I try to remember that. – TarGz Mar 28 '10 at 12:52
@Konrad: point taken, right you are. :-) – Jason S Mar 28 '10 at 12:55

In both cases there is only one way (or two, if you count reverse too)

There are two ways. If the dice are named A and B:

12 = one way: A=6, B=6

11 = two ways: A=5, B=6 and A=6, B=5.

-
Damn, right you are! – TarGz Mar 28 '10 at 12:46

The question I have, why is 11 more frequent than 12?

First of all, this question assumes that your arbitrary try gives an authoritative result. It doesn’t; the result is pure random and only reliable up to a degree. But in this particular case, the numbers actually reflect the real proportions nicely.

That said, there are two ways to get 11: 5 (first die) + 6 (second die) and 6 (first die) + 5 (second die) but only one way to get 12: 6 (first die) + 6 (second die).

-
@Konrad: Re to your first paragraph: It's called the law of large numbers :-) – Johannes Rudolph Mar 28 '10 at 12:51
@Johannes: exactly: large numbers. ;-) In particular, infinite sequences. And you can actually compute how likely your result is wrong given a sample size. – Konrad Rudolph Mar 28 '10 at 13:40
right, hypothesis tests with alpha and beta error. Just finished Abitur with Math LK :-) – Johannes Rudolph Mar 28 '10 at 16:29
@Johannes: congraz! And may I say, good choice on the LK (did the same, only in France). – Konrad Rudolph Mar 28 '10 at 16:53

The most frequently met sum is 7, as suggested by your empirical test.