Imagine you threw a single stone into the desert and asked your friend to go find it. It would be hard. Now imagine you threw 2 stones into the desert and asked your friend to go find them. It is twice as hard to find both stones as it is to find 1 stone. Imagine you threw 3 stones. It is 3 times as hard to find all 3 stones as it is to find 1 stone.<p>Now imagine that numbers are built out of stones. To "build" a 1, you only need 1 stone. But to "build" a 2, you need 2 stones. Thus, if you wanted to write a 3, you would have to go in the desert and find 3 stones. It's 3x as hard, and so you'd expect people to "build" 1/3 as many 3's as 1's, 1/5 as many 5's as 1's, and so on. Just as you'd expect there to be a lot more single story buildings than skyscrapers. It's easier to build a single story building.<p>Thus, the distribution is exactly what you'd expect. While it doesn't actually take stones to build numbers, we don't write the number 3 unless we have 3 of something. Unless you are lying. Which is why this is a great method of detecting fraud.<p>UPDATE: What do I mean when I say "3 times as hard"?<p>Imagine the desert is a rectangle of 10 squares. Kind of like a mancala board or a ladder on the ground. You start by stepping in square 1, and to get to square 10 you have to step through each square.<p>If there is only 1 rock, what are the odds that you'll have to walk all 10 steps to find it? This is the same thing as asking what are the odds that this rock is in square 10. The answer is 1/10 or 10%.<p>Now, if there are 3 rocks, what are the odds that you'll have to step into all 10 squares? Well, what are the odds that there's a rock in the last square? 26.1%, or approximately 3x as hard. It's interesting that it's not exactly 3x as hard, it's 2.61x as hard. Which makes the data in the OP seem even more logical since you'd expect 30.8% 1's given 11.8% 3's--the 32.62% actual number is not that far off.