# Java: Generating a random numbers with a logarithmic distribution

I am attempting to generate a random numbers with a logarithmic distribution.

Where n=1 occurs half of the time, n=2 occurs a quarter of the time, n=3 occurs an eighth of the time, etc.

``````    int maxN = 5;
int t = 1 << (maxN); // 2^maxN
int n = maxN -
((int) (Math.log((Math.random() * t))
/ Math.log(2))); // maxN - log2(1..maxN)
System.out.println("n=" + n);
``````

Most of the time, I am getting the result I need, however once every so often, I get a value of `n` that is larger than `maxN`.

Why is this so? The way I see it, the max value of `Math.random()` is 1.0;
therefore the max value of `(Math.random() * t))` is `t`;
therefore the max value of log2(t) is maxN, since t = 2^maxN;

Where has my logic gone off track?

Thanks

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logarithm of numbers less than 1.0 is negative. When the random number generated is such that it is less than 1.0, the expression `((int) (Math.log(Math.random() * t) / Math.log(2)))` is a negative number and hence `maxN - (the negative number)` is more than maxN.

The following expression should give correct distribution.

``````n = Math.floor(Math.log((Math.random() * t) + 1)/Math.log(2))
``````

Note that:

``````0.0 <= Math.random() <= 1.0
0.0 <= Math.random() * t <= t
1.0 <= (Math.random() * t) + 1 <= t + 1.0
0.0 <= Math.log((Math.random() * t) + 1) <= Math.log(t + 1.0)
0.0 <= Math.log((Math.random() * t) + 1)/Math.log(2) <= Math.log(t + 1.0)/Math.log(2)

Since t = 2^maxN,
Math.log(t + 1.0)/Math.log(2) is slightly larger than maxN.

So do a Math.floor and you get the correct result:
0.0 <= Math.floor(Math.log((Math.random() * t) + 1)/Math.log(2)) <= maxN
``````
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+1 @abhin4v : Thanks for the comment! –  bguiz Sep 19 '10 at 13:32
I had the check, then you took it! –  Leo Izen Sep 19 '10 at 13:47
+check @abhin4v : You're right about log(t)/log(2) > maxN The error was "hidden" due to the cast to `int`, but this is a more emathematically proper way. –  bguiz Sep 19 '10 at 13:47
@Leo Izen : Sorry about that! –  bguiz Sep 19 '10 at 13:49

If `Math.random()*t` is less that 1, then you will get a negative answer when you take `Math.log(Math.random()*t)`, by the rules of Logarithms. This means that you will get a negative answer when you divide by `Math.log(2)` because that is 0.69314718055994530941723212145818. This is a negative number divided by a positive number. The answer is negative. maxN - a negative number = maxN + something positive, so n is greater than maxN. To fix this cast Math.random()*t to an int and add 1:

``````int n = maxN -
((int) (Math.log((int)((Math.random() * t)+1))
/ Math.log(2))); // maxN - log2(1..maxN)
``````

Notice the cast inside the log, and the add of 1.

The purpose of adding one would be to avoid the 0. Can't take a log of 0. Also, without adding 1, you could never get maxN inside the log, because Math.random() never produces 1. This way, instead of getting 1 half, 2, a fourth, 3, and eighth, it just starts at 0. This gives 0, a half, 1 a fourth, 2 an eighth, etc.

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Casting a number less than 1.0 to `int` will produce 0 and taking a log on it will produce `-Infinity`. Hence your suggestion is incorrect. –  Abhinav Sarkar Sep 19 '10 at 13:18
@abhin4v : How would you work around this then.. is there a way to do this without using an if-then-else type construct? –  bguiz Sep 19 '10 at 13:23
I just fixed that. –  Leo Izen Sep 19 '10 at 13:23
+1 & check @Leo Izen : Thanks, that hit the spot! –  bguiz Sep 19 '10 at 13:31

The problem is in the other end of the scale.

Consider what would happen if you get a very small random number.

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