I am trying to get a 50/50 chance of get either 1 or 2 in a random generator.

For example:

Random random = new Random();
int num = random.nextInt(2)+1;

This code will output either a 1 or 2.

Let's say I run it in a loop:

for ( int i = 0; i < 100; i++ ) {
    int num = random.nextInt(2)+1 ;

How can I make the generator make an equal number for 1 and 2 in this case?

So I want this loop to generate 50 times of number 1 and 50 times of number 2.

  • 9
    As many others have noted, you're confused here I think: if you toss a coin 100 times, your expectation is 50 heads. Any number between 0 and 100 is possible, with varying probability. I think you're falling for the en.wikipedia.org/wiki/Gambler's_fallacy – Ben Allison Mar 8 '13 at 11:16
  • 1
    Actually your expectation shouldn't be 50 heads, but rather between 45 and 55 heads... :D. Its just that 50 heads itself is the most likely (around 8% chance of that happening) – SinisterMJ Mar 8 '13 at 13:00
  • 5
    @AntonRoth, no. – Rotsor Mar 8 '13 at 16:41

One way: fill an ArrayList<Integer> with fifty 1's and fifty 2's and then call Collection.shuffle(...) on it.

  • 1
    Assuming @Sulaiman actually wants exactly 50 1's and 2's, this is it. But just gotta point out that the actual randomness is gone (which may have lead to 47 1's and 53 2's or similar). – Mercurybullet Mar 8 '13 at 2:28
  • 6
    @Mercurybullet: I agree 100%. As per usual, the exact solution depends completely on his requirements – Hovercraft Full Of Eels Mar 8 '13 at 2:38
  • Why so hard to generate a random sequence? – Mikhail Mar 12 '13 at 8:40

You can't achieve this with random. If you need exactly 50 1s and 50 2s, you should try something like this:

int[] array = new int[100];
for (int i = 0; i < 50; ++i)
 array[i] = 1;
for (int i = 50; i < 100; ++i)
 array[i] = 2;

shuffle(array); // implement shuffling algorithm or use an already existing one
  • +1 simple and practical. – armandino Mar 19 '13 at 1:37

50/50 is quite easy with Random.nextBoolean()

private final Random random = new Random();

private int next() {
  if (random.nextBoolean()) {
    return 1;
  } else {
    return 2;

Test Run:

final ListMultimap<Integer, Integer> histogram = LinkedListMultimap.create(2);
for (int i = 0; i < 10000; i++) {
    nal Integer result = Integer.valueOf(next());
  histogram.put(result, result);
for (final Integer key : histogram.keySet()) {
  System.out.println(key + ": " + histogram.get(key).size());


1: 5056
2: 4944
  • 7
    He wants (from what I understood) 50 1s and 50 2s exactly. What you posted will give the same results as what he already has. – Simon Arsenault Mar 8 '13 at 14:56

You can adjust the probability along the way so that the probability of getting a one decreases as you get more ones. This way you don't always have a 50% chance of getting a one, but you can get the result you expected (exactly 50 ones):

int onesLeft = 50;

for(int i=0;i<100;i++) {
  int totalLeft = 100 - i;
  // we need a probability of onesLeft out of (totalLeft)
  int r = random.nextInt(totalLeft);
  int num;
  if(r < onesLeft) {
    num = 1;
    onesLeft --;
  } else {
    num = 2;

This has an advantage over shuffling because it generates numbers incrementally so it desn't need memory to store the numbers.

  • 1
    But the distribution won't be uniform, you're most likely to go the end filled with identical numbers. – Danubian Sailor Mar 8 '13 at 7:59
  • @lechlukasz, I thought about that, but I can't seem to prove or disprove that. Can you? – Rotsor Mar 8 '13 at 16:29
  • @lechlukasz, experiment refutes your claim. – Rotsor Mar 8 '13 at 16:38
  • I also have a proof sketch: assuming the algorithm makes a uniform shuffle for array of size (n-1), we can extend it to size n by observing that the probability distribution of the first number chosen is correct and the rest of the algorithm is a shuffle of size (n-1). The base case of shuffling the empty list is trivial. – Rotsor Mar 8 '13 at 17:22
  • Maybe frame the proof as: How many trials do I need to get either 50 of the first number or 50 of the second number? We'd find that at most this would take 99 trials (the case where you get up to 49/49 and then pull the tie-breaker). So to get the equal 50/50, we'd pad one of the other number to match. In every other case, one side would get to 50 before the 99th trial, which would cause more padding of the other number to get to 100 trials. – SeKa Mar 16 '13 at 21:29

You have already successfully created a random generator that returns 1 or 2 with equal probability.

As (many) other's have mentioned, your next request, to force an exact 50/50 distributions in 100 trials, does not fall in line with random number generation. As shown in https://math.stackexchange.com/questions/12348/probability-of-getting-50-heads-from-tossing-a-coin-100-times, the realistic expectation of that occurring is only around 8%. So even while you might expect 50 of each, that exact outcome is actually rather rare.

The Law of Large Numbers states that you should close in on expected value as your number of trials increases.

So for your actual question: How can I make the generator make an equal number for 1 and 2 in this case?

The best (humorous) answer I can come up with is: "Run it in an infinite loop."

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