# java random percentages

I need to generate n percentages (integers between 0 and 100) such that the sum of all n numbers adds up to 100.

If I just do `nextInt()` n times, each time ensuring that the parameter is 100 minus the previously accumulated sum, then my percentages are biased (i.e. the first generated number will usually be largest etc.). How do I do this in an unbiased way?

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Interesting question, but I think the answer will not be Java-specific. –  Joachim Sauer Jun 9 '10 at 16:56
You could generate randomly until the sum would exceed 100 and then 'cap' the final number. This way all numbers except maybe the final number are random. I don't see how you can 'randomly' arrive at a pre-set sum defined by a non-random constraint. –  Alex Jun 9 '10 at 16:58
Randomize the order you do them in. Let's say you have 5 numbers then you might do #3 first, then next time #4, next #1 etc ... –  Romain Hippeau Jun 9 '10 at 17:02
I think this question can't be answered without first considering what you expect the distribution of these random numbers to look like. If you want a "normal distribution" (bell-curve), then @LanceH's answer should work. If you expect a "uniform distribution", I suspect that's impossible. What distribution you want totally drives the nature of the solution. –  Kevin Bourrillion Jun 9 '10 at 18:20
@Kevin. If people omit the probability distribution, I would say it is reasonable to assume uniform. And, getting a uniform distribution is very much possible, why do say it is not? –  Aryabhatta Jun 9 '10 at 19:23

A couple of answers suggest picking random percents and taking the differences between them. As Nikita Ryback points out, this will not give the uniform distribution over all possibilities; in particular, zeroes will be less frequent than expected.

To fix this, think of starting with 100 'percents' and inserting dividers. I will show an example with 10:

` % % % % % % % % % % `

There are eleven places we could insert a divider: between any two percents or at the beginning or end. So insert one:

` % % % % / % % % % % % `

This represents choosing four and six. Now insert another divider. This time, there are twelve places, because the divider already inserted creates and extra one. In particular, there are two ways to get

` % % % % / / % % % % % % `

either inserting before or after the previous divider. You can continue the process until you have as many dividers as you need (one fewer than the number of percents.)

` % % / % / % / / % % % / % % % / `

This corresponds to 2,1,1,0,3,3,0.

We can prove that this gives the uniform distribution. The number of compositions of 100 into k parts is the binomial coefficient 100+k-1 choose k-1. That is (100+k-1)(100+k-2)...101 / (k-1)(k-2)*...*2*1 Thus the probability of choosing any particular composition is the reciprocal of this. As we insert dividers one at a time, first we choose from 101 positions, then 102, 103, etc until we get to 100+k-1. So the probability of any particular sequence of insertions is 1 / (100+k-1)*...*101. How many insertion sequences give rise to the same composition? The final composition contains k-1 dividers. They could have been inserted in any order, so there are (k-1)! sequences that give rise to a given composition. So the probability of any particular composition is exactly what it should be.

In actual code, you probably wouldn't represent your steps like this. You should be able to just hold on to numbers, rather than sequences of percents and dividers. I haven't thought about the complexity of this algorithm.

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+1 This should be equivalent to randomly picking a number that has already been drawn (with multiplicity) or a new one. –  starblue Jun 9 '10 at 19:31
It is not because there is the possibility of choosing the space before or after a divider. Essentially, there are two ways to pick a number already drawn. (Or n+1 if that number has been drawn n times.) –  eruonna Jun 9 '10 at 19:35
Oh, if you mean either picking from the list of already drawn numbers or any number from 0-100 (not necessarily new), then they are the same. You just have to make sure to give the same probability to any choice. –  eruonna Jun 9 '10 at 19:38
Yes, that's the way to do it. –  starblue Jun 10 '10 at 11:04
There's something fishy about this to me, although I don't understand it deeply. For a given result, there were multiple possible sequences of divider insertions that would lead to it. When the result contains no zeroes, there were only n! ways to get that result (corresponding to the different orders in which the dividers could have been placed). But when there are zeroes, there's more duplication than that... or is there? Combinatorics is hard. –  Kevin Bourrillion Jun 10 '10 at 16:37

You possibly need to define what you really mean by "biased" - but if all you care about is that the distribution of the numbers is independent of their position, then you can simply create the numbers in a "biased" way and then randomise their positions.

Another "unbiased" method would be to create n-1 random percentages, sort them (call this x1 x2 x3...) and then define your final percentages to be:

``````x1
x2 - x1
x3 - x2
...
100 - x(n-1)
``````

That way you will get n random numbers that add to 100.

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@erw: This solution is much better than the one currently at the top (in number of votes)! It even has one random number call less and involves no rounding etc. Also, I think we can prove that it generates each combination with the same probability. –  Aryabhatta Jun 9 '10 at 17:36
+1 Same as Adamski's solution, and has same problem with zeroes. But perfect if all elements are > 0. –  Nikita Rybak Jun 9 '10 at 17:55
@Nikita: If you view that as a generating a multi-set of n-1 numbers, then it gives an unbiased distribution (I think, but haven't tried proving it), as each distribution we need corresponds exactly to one multi-set. My statement about the one random number call less is not really accurate as generating random numbers one by one to create the multiset is not unbiased, as you say. In fact, I believe it is possible to do this with just one random number call if n is small enough. See: stackoverflow.com/questions/3003192/…. –  Aryabhatta Jun 9 '10 at 18:33
To add to previous comment. Since 100 choose 50 < 2^128, we can do this will just two 64 bit random number calls! (I am assuming n <= 100). –  Aryabhatta Jun 9 '10 at 18:47
@Moron why would we want to limit ourselves by one random call? And the problem I mentioned (you were arguing with that, right?) is in the fact that he's not generating multisets correctly: there'll be two 'paths' to generate (1, 2) multiset (from sequence [1, 2] and [2, 1] and only one way for (1, 1). So, first one has twice as big probability. –  Nikita Rybak Jun 9 '10 at 18:48
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Generate n random integers with any range (call them `a[1]`..`a[n]`). Sum up your integers and call that `b`. Your percentages will be `[a[1]/b, ..., a[n]/b]`.

Edit: good points, rounding the results to total exactly 100 is non-trival. One approach would be to take the floor of `a[x]/b` for `x` in `1..n` as your integers, then distribute the remainding units `100-(sum of integers)` randomly. I'm not sure if this would introduce any bias into the result.

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The only problem is that a[0]/b may be not integer. –  Nikita Rybak Jun 9 '10 at 17:05
@Nikita: So what? Just round so that after rounding the sum = 100. –  Benoit Jun 9 '10 at 17:07
this seems like a good solution. say the ratio turns out not to be an integer, could I then (at random) pick on of the numbers and add to it the difference between the total sum and 100? This seems to minimize the distribution bias. –  erw Jun 9 '10 at 17:08
@Ben That tinkering will make distribution not so even (some combinations will happen more often than others). But I agree that it's pretty close if "any range" is big enough. –  Nikita Rybak Jun 9 '10 at 17:11
-1: Sorry, this is useless and making it right will make it unnecessarily complicated. I believe mikera's solution is much better. –  Aryabhatta Jun 9 '10 at 18:14
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This problem is known as uniform sampling from a simplex and Wikipedia gives two algorithms:

http://en.wikipedia.org/wiki/Simplex#Random_sampling

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+1 for giving a name –  Joachim Sauer Jun 9 '10 at 23:50
Unfortunately the wikipedia article is a little inaccessible to most of this audience. I need it dumbed down. :) –  Kevin Bourrillion Jun 10 '10 at 16:43
@Kevin: The first algorithm is the same as ataylor's, the second is the same as mikera's (which unfortunately suffers from the problem Nikita brought up - it's mentioned in the article there's a known problem, but they don't specify what). eruonna's solution solves that problem - interesting that Wikipedia doesn't know about it yet :) –  BlueRaja - Danny Pflughoeft Jun 10 '10 at 20:32
@BlueRaja: Not true about ataylor's solution. You have to generate from an exponential distribution and then normalize. –  dreeves Jun 10 '10 at 22:27
@BlueRaja: eruonna's solution has the same (great!) idea as the proof that the total number of sets is 100+N-1 choose N. It uses too many random number calls though. Imagine generating such numbers a million times. Similar ideas can give us the set with just one (or two) random number calls for n<=100. I have described that in my answer. –  Aryabhatta Jun 12 '10 at 13:47

The key is to generate N random numbers between 0 and 100 but to use these as "markers" rather than the final sequence of numbers to output. Then you iterate through your list of markers in ascending order, calculating each percentage to output as (current marker - previous marker).

This will give a much more even distribution than simply generating and outputting each number one at a time.

Example

``````import java.util.Random;
import java.util.TreeSet;
import java.util.SortedSet;

public class Main {
public static void main(String[] args) {
Random rnd = new Random();
SortedSet<Integer> set = new TreeSet<Integer>();

for (int i=0; i<9; ++i) {
}

if (set.last() < 100) {
}

int prev = 0;
int total = 0;
int output;

for (int j : set) {
output = j - prev;
total += output;
System.err.println(String.format("Value: %d, Output: %d, Total So Far: %d", j, output, total));
prev = j;
}
}
}
``````

Output

``````\$ java Main
Value: 0, Output: 0, Total So Far: 0
Value: 2, Output: 2, Total So Far: 2
Value: 55, Output: 53, Total So Far: 55
Value: 56, Output: 1, Total So Far: 56
Value: 57, Output: 1, Total So Far: 57
Value: 69, Output: 12, Total So Far: 69
Value: 71, Output: 2, Total So Far: 71
Value: 80, Output: 9, Total So Far: 80
Value: 92, Output: 12, Total So Far: 92
Value: 100, Output: 8, Total So Far: 100
``````
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I suspect the distributions will be same as ataylor or my solutions. Yours however involves inserting into a BST so O(NlogN) rather than O(N). Also you need to add a last entry to get sum to 100 –  Il-Bhima Jun 9 '10 at 17:21
+1, I like the idea. Each valid distribut translates into a set of (n - 1) markers, so we could generate markers as well. The code looks quite difficult, though, I'm sure it can be made simpler :) –  Nikita Rybak Jun 9 '10 at 17:46
It does have a problem with zeroes, though. Set of markers (1, 2, .., n - 1) will be generated in n! cases (considering order), while set of markers (100, 100, .., 100) (leading to distribution 100, 0, .., 0) will be generated only in one case. –  Nikita Rybak Jun 9 '10 at 17:53

Make an array. Randomly drop 100 %'s into each of the parts of that array. Example shows n=7.

``````import java.util.Random;

public class random100 {
public static void main (String [] args) {
Random rnd = new Random();
int percents[] = new int[7];
for (int i = 0; i < 100; i++) {
int bucket = rnd.nextInt(7);
percents[bucket] = percents[bucket] + 1;
}
for (int i = 0; i < 7; i++) {
System.out.println("bucket " + i + ": " + percents[i]);
}

}

}
``````
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Nope :) You program for n == 2 has only one way of reaching distribution (100, 0): rnd.nextInt == 0 on each step. But there're lots of ways to reach (50, 50): binomial coefficient from 50 and 100. And both distributions should have equal probability. –  Nikita Rybak Jun 9 '10 at 17:33
rnd.nextInt(2) yields 0 or 1, seems to work just fine. I'm getting results of (46, 54), (48, 52), (56,44), etc... –  LanceH Jun 9 '10 at 17:45
-1: Agree with Nikita. –  Aryabhatta Jun 9 '10 at 17:45
@LanceH notice how your examples are clustered close to (50,50). Those closer to (50,50) have a much higher probability of occuring than e.g. (100, 0). –  ataylor Jun 9 '10 at 17:50
Misread what Nikita wrote. Yes, it tends toward the middle, which looks particularly bad for n=2. But with n=2 the solution is a trivial through a simple random of the first number and the second number is determined. For n=3, no expectation is mentioned. If distribution is equal between all 3, then distribution for a single bucket is not going to be uniform from 0 to 100...which could imply the same thing for n=2. At the least it implies that n=2 is an entirely different beast than n>2. There is no mention of expected distribution. –  LanceH Jun 9 '10 at 18:04
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To be precise it depends on exactly how you want the samples to be unbiased. Here is a rough way which will roughly give you a good result.

1. Generate `n-1` integers from 0,..100, say `a[i]` for `i = 0, to n-2`.
2. Let `total` be the sum of these numbers
3. Compute `b[i] = floor(100*a[i]/total)` for `i = 0, to n-2`
4. Set `b[n-1] = 100 - (b[0] + ... b[n-2])`.

Then b is your resulting array of percentages.

The last one will be biased, but the rest should be uniform.

Of course if you want to do this in a more accurate way you'll have to use Gibbs sampling or Metropolis hastings.

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I think this is the way to go. If you could remove the integer restriction, you could get rid of the rounding which may lead to some biases, but the whole process of genererating 100 numbers and then normalizing seems sound. –  Grembo Jun 9 '10 at 19:54

Once you pick the numbers with the method you describe, shuffle the order of the numbers. This way the final list of numbers has a more even distribution.

However, note that no matter what you do, you can't get a perfectly even distribution since once you start to choose numbers, your random trials are not independent. See ataylor's answer.

Note also that the algorithm you describe might not give you the required output. The last number cannot be random since it must make the sum equal 100.

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"not independent"! Of course! I had a feeling like this but couldn't put it into words. –  Joachim Sauer Jun 9 '10 at 17:03

First, obvious solution.

``````do
int[] a = new int[n];
for (int i = 0; i < n; ++i) {
a[i] = random number between 0 and 100;
}
until sum(a) == 100;
``````

It's not perfect in terms of complexity (number of iterations to reach sum 100 can be quite large), but distribution is surely 'unbiased'.

edit
Similar problem: how to generate random point in a circle with radius 1 and center in (0, 0)? Solution: continue generating random points in range (square) [-1..1,-1..1] until one of them fits the circle :)

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What if the first random number is 99 and the second one is 2? –  Joachim Sauer Jun 9 '10 at 17:02
What if `n=3` and the first two numbers sum to > 100? –  Benoit Jun 9 '10 at 17:03
@Joachim, @Ben Then final sum will be bigger than 100 and we'll have to repeat process. –  Nikita Rybak Jun 9 '10 at 17:03
This won't work - The OP wants to generate a specific number of percentages but your code could potentially generate just 1 (if the first random number generated is 100). –  Adamski Jun 9 '10 at 17:05
lols this is the equivalent of the bogosort. The algorithm is correct but will require an enormous amount of iterations to complete. I'm working out the number now! I hope you meant it as a joke :) –  Il-Bhima Jun 9 '10 at 17:25

I had a similar issue and ended up doing as you said, generating random integers up to the difference of the sum of the existing integers and the limit. I then randomized the order of the integers. It worked pretty well. That was for a genetic algorithm.

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Imagine you have 100 stones and N buckets to place them in. You can take all 100 and place on in a random bucket. This way the total will be the 100 you started with and there will be no bias between any bucket.

``````public static int[] randomBuckets(int total, int n_buckets) {
int[] buckets = new int[n_buckets];
Random rand = new Random();
for(int i=0;i<total;i++)
buckets[rand.nextInt(n_buckets)]++;
return buckets;
}

public static void main(String... args) {
for(int i=2; i<=10;i++)
System.out.println(Arrays.toString(randomBuckets(100, i)));
}
``````

Prints

``````[55, 45]
[38, 34, 28]
[22, 21, 32, 25]
[28, 24, 18, 15, 15]
[17, 14, 13, 21, 18, 17]
[17, 19, 14, 15, 6, 15, 14]
[11, 14, 14, 14, 4, 17, 9, 17]
[13, 12, 15, 12, 8, 10, 9, 11, 10]
[11, 13, 12, 6, 6, 11, 13, 3, 15, 10]
``````

As the count increases, the distribution approaches uniform.

``````System.out.println(Arrays.toString(randomBuckets(100000000, 100)));
``````

Prints

``````[1000076, 1000612, 999600, 999480, 998226, 998303, 1000528, 1000450, 999529,
998480, 998903, 1002685, 999230, 1000631, 1001171, 997757, 1000349, 1000527,
1002408, 1000852, 1000450, 999318, 999453, 1000099, 1000759, 1000426, 999404,
1000758, 1000939, 999950, 1000493, 1001396, 1001007, 999258, 1001709, 1000593,
1000614, 1000667, 1000168, 999448, 999350, 1000479, 999991, 999778, 1000513,
998812, 1001295, 999314, 1000738, 1000211, 999855, 999349, 999842, 999635,
999301, 1001707, 998224, 1000577, 999405, 998760, 1000036, 1000110, 1002471,
1000234, 1000975, 998688, 999434, 999660, 1001741, 999834, 998855, 1001009,
999523, 1000207, 998885, 999598, 998375, 1000319, 1000660, 1001727, 1000546,
1000438, 999815, 998121, 1001128, 1000191, 998609, 998535, 999617, 1001895,
999230, 998968, 999844, 999392, 999669, 999407, 998380, 1000732, 998778, 1000522]
``````
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By the central limit theorem this will tend to a normal distribution about the centre (total/2) as n_buckets->infinity. I think what the OP wants is to have each possible combination equally likely (i.e a uniform distribution on the set of all n integers adding up to 100). –  Il-Bhima Jun 9 '10 at 20:28
as I commented at top, I don't believe uniform is possible. –  Kevin Bourrillion Jun 10 '10 at 16:46
@LL-Bhima Every bucket has an equal chance of getting being increamented, why would you suspect anything other than a equally flat distribution? –  Peter Lawrey Jun 10 '10 at 19:57
@Kevin The result is not completely uniform, by the difference between the lowest and highest in the last example is much less than 1%. –  Peter Lawrey Jun 10 '10 at 20:07