Is it possible to seed the random number generator (Math.random) in Javascript?

  • it is not clear whether you want to seed it so that you get the same results repeatedly for different test runs or whether you want to seed it with 'something unique' per user for better randomness between usage. – simbo1905 May 16 '14 at 5:45
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    No, unfortunately it is not possible. jsrand is a little library I wrote when I needed a seedable PRNG. There are also other more complex libraries that you can find googling for it. – Domenico De Felice Jan 2 '15 at 18:01
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    Adding to the question: how is it possibly a good idea to offer a PRNG without a means to seed it?? Is there any good reason for this? – Alan Jul 18 '18 at 17:58

13 Answers 13


No, it is not, but it's fairly easy to write your own generator, or better yet use an existing one. Check out: this related question.

Also, see David Bau's blog for more information on seeding.


NOTE: Despite (or rather, because of) succinctness and apparent elegance, this algorithm is by no means a high-quality one in terms of randomness. Look for e.g. those listed in this answer for better results.

(Originally adapted from a clever idea presented in a comment to another answer.)

var seed = 1;
function random() {
    var x = Math.sin(seed++) * 10000;
    return x - Math.floor(x);

You can set seed to be any number, just avoid zero (or any multiple of Math.PI).

The elegance of this solution, in my opinion, comes from the lack of any "magic" numbers (besides 10000, which represents about the minimum amount of digits you must throw away to avoid odd patterns - see results with values 10, 100, 1000). Brevity is also nice.

It's a bit slower than Math.random() (by a factor of 2 or 3), but I believe it's about as fast as any other solution written in JavaScript.

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    Is there a way to prove this RNG generate numbers that are uniformly distributed? Experimentally it seems to: jsfiddle.net/bhrLT – Nathan Breit Oct 12 '13 at 14:04
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    6,000,000 ops/second is pretty fast, I don't plan on generating more than ~3,000,000 per click. Kidding, this is brilliant. – A.M.K May 2 '14 at 0:11
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    -1, This isn't a uniform sampler at all - it is quite biased towards 0 and 1 (see jsfiddle.net/bhrLT/17, which may take a while to compute). Consecutive values are correlated - every 355 values, and even more so every 710, are related. Please use something more carefully thought-out! – spencer nelson May 22 '14 at 4:43
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    The question's not about creating a cryptographically secure random number generator, but something that works in javascript, useful for quick demos, etc. I'll take something quick and simple that gives a good looking distribution over a million random numbers for that purpose. – Jason Goemaat May 31 '14 at 0:08
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    Be careful. Math.sin() can give different results on client and server. I use Meteor (uses javascript on client & server). – obiwahn Oct 27 '15 at 16:29

I've implemented a number of good, short and fast copy-pastable PRNG functions in plain JavaScript. All of them can be seeded and provide good quality numbers.

First of all, take care to initialize your PRNGs properly. Most of the generators below have no built-in seed generating procedure, but accept one or more 32-bit values as the initial state of the PRNG. Similar seeds (e.g. a seed of 1 and 2) can cause correlations in weaker PRNGs, resulting in the output having similar properties (such as randomly generated levels being similar). To avoid this, it is best practice to initialize PRNGs with a well-distributed seed.

Thankfully, hash functions are very good at generating seeds for PRNGs from short strings. A good hash function will generate very different results even when two strings are similar. Here's an example based on MurmurHash3's mixing function:

function xmur3(str) {
    for(var i = 0, h = 1779033703 ^ str.length; i < str.length; i++)
        h = Math.imul(h ^ str.charCodeAt(i), 3432918353),
        h = h << 13 | h >>> 19;
    return function() {
        h = Math.imul(h ^ h >>> 16, 2246822507);
        h = Math.imul(h ^ h >>> 13, 3266489909);
        return (h ^= h >>> 16) >>> 0;

Each subsequent call to the return function produces a new "random" 32-bit hash value to be used as a seed in a PRNG. Here's how you might use it:

// Create xmur3 state:
var seed = xmur3("apples");
// Output four 32-bit hashes to provide the seed for sfc32.
var rand = sfc32(seed(), seed(), seed(), seed());

// Output one 32-bit hash to provide the seed for mulberry32.
var rand = mulberry32(seed());

// Obtain sequential random numbers like so:

This is of course functional JS, but it could be objectified.

Another thing to note is that these are all 32-bit generators, which means everything is bound by 32-bit operations, simulating 32-bit C code. This turns out to be a decent compromise, since 32-bit integers get a bit of a optimization boost in modern JS engines. JS can only do 32-bit bitwise operations, and can't even do 64-bit math anyway. JS has a limit of 53-bit integers, but even then you need a lot of trickery to utilize them efficiently. That is why Baagøe's supposedly super-fast 53-bit Alea generator ends up slower than these implementations.

Onward to the goods (the generators).


This gem comes from the PractRand random number testing suite, of which it passes without issue. PractRand is purportedly even more stringent than TestU01. sfc32 has a 128-bit state and is also very fast in JS (xoshiro128** is slightly faster, but worse quality). It's probably my PRNG of choice.

function sfc32(a, b, c, d) {
    return function() {
      a >>>= 0; b >>>= 0; c >>>= 0; d >>>= 0; 
      var t = (a + b) | 0;
      a = b ^ b >>> 9;
      b = c + (c << 3) | 0;
      c = (c << 21 | c >>> 11);
      d = d + 1 | 0;
      t = t + d | 0;
      c = c + t | 0;
      return (t >>> 0) / 4294967296;


Mulberry32 is also quite fast and has good quality (author states it passes all tests of gjrand). I would recommend this if you just need a simple but decent PRNG.

It has a state of 32-bits and a full period of 232. Ideal if you only want to seed with one 32-bit integer and don't care about the birthday problem. There is 4.3 billion possible states in Mulberry32 compared to the 340 undecillion in sfc32/xoshiro128**.

function mulberry32(a) {
    return function() {
      var t = a += 0x6D2B79F5;
      t = Math.imul(t ^ t >>> 15, t | 1);
      t ^= t + Math.imul(t ^ t >>> 7, t | 61);
      return ((t ^ t >>> 14) >>> 0) / 4294967296;


As of May 2018, xoshiro128** is the new member of the Xorshift family. It offers a 128-bit state, and is super fast.

function xoshiro128ss(a, b, c, d) {
    return function() {
        var t = b << 9, r = a * 5; r = (r << 7 | r >>> 25) * 9;
        c ^= a; d ^= b;
        b ^= c; a ^= d; c ^= t;
        d = d << 11 | d >>> 21;
        return (r >>> 0) / 4294967296;

This PRNG is the latest by Blackman/Vigna who also wrote the PRNGs xorshift128+ and xoroshiro that were used in Google Chrome back in 2015. It is notable as one of the few modern PRNGs with a 32-bit version. xoroshiro64** is also a promising option, but only has a 64-bit state and has largely been replaced by xoshiro.

The authors claim it passes randomness tests well (albeit with caveats). Other researchers have pointed out that fails some tests in BigCrush (particularly LinearComp and BinaryRank). But it should not matter in practice, especially if the 32-bit value is converted to a float between 0-1 like these PRNGs are. However, it may cause an issue if you rely on the low-order bits.


This is JSF or 'smallprng' by Bob Jenkins (2007), the guy who made ISAAC and SpookyHash. It performs well on PractRand tests and should be quite fast. The average period length is assumed to be 2^126 but 'hasn't been formally determined'.

function JSF(seed) {
    function jsf() {
        var e = s[0] - (s[1]<<27 | s[1]>>>5);
         s[0] = s[1] ^ (s[2]<<17 | s[2]>>>15),
         s[1] = s[2] + s[3],
         s[2] = s[3] + e, s[3] = s[0] + e;
        return (s[3] >>> 0) / 4294967296; // 2^32
    seed >>>= 0;
    var s = [0xf1ea5eed, seed, seed, seed];
    for(var i=0;i<20;i++) jsf();
    return jsf;

This version does not need a separate seed function. But as a result, only 32-bits can be seeded and this version pre-runs jsf() 20 times to disperse the initial state, which may be costly.

If need be, the entire 128-bit state can be initialized directly and the for loop removed. I decided to keep the original construction because the author verified the cycle length of every possible 32-bit seed in the given configuration.

LCG (aka Lehmer/Park-Miller RNG or MLCG)

This one is only here to provide a better alternative to options mentioned in other answers such as the Math.sin or Math.PI methods, which are less consistent or reliable across platforms. This LCG implementation is extremely fast but only has a 31-bit state and fails some statistical tests that previously mentioned generators pass with flying colors. It's a one-liner though—which is nice :).

var LCG=s=>()=>(2**31-1&(s=Math.imul(48271,s)))/2**31;

This is the minimal standard RNG as proposed by Park–Miller in 1988 & 1993 and implemented in C++11 as minstd_rand. Keep in mind that the state and period are only 31-bit (31 bits give 2 billion possible states, 32 bits give double that). This is the very type of PRNG that others are trying to replace.

It'll work, but I wouldn't use it unless you really need speed and don't care about randomness quality (what is random anyway?) or if the 31-bit state/period size bothers you. Great for a game jam or a demo or something. Also, LCGs suffer from seed correlations, so it is best to discard the first result of an LCG.

There seems to be other multipliers that do offer a full 32-bit state. I have no clue if these are any better/worse statistically than the Park-Miller one, but here they are for completeness.

var LCG=s=>()=>((s=Math.imul(741103597,s))>>>0)/2**32;
var LCG=s=>()=>((s=Math.imul(1597334677,s))>>>0)/2**32;

These multipliers are from: P. L'Ecuyer: A table of Linear Congruential Generators of different sizes and good lattice structure, April 30 1997.

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    This is an amazing answer. I sure will be coming back to this. – DavidsKanal Jan 16 at 23:30
  • Are these all inclusive of 0 and exclusive of 1? – Chad von Nau Mar 25 at 9:20
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    Yes, they're all exclusive of 1 (to match Math.random), if you need it inclusive, subtract 1 from the divider (2^32-1 or 2^31-1 in LCG's case). You could completely forgo the divider entirely and just return random 32-bit ints too. – bryc Mar 25 at 18:50
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    I believe the values you quoted from "Tables of Linear Congruential Generators..." by Pierre L’ecuyer could exceed the maximum integer size in Javascript. The max seed of (2^32-1) * 741103597 ≈ 3e18, which is greater than JavaScript's max int size of ≈ 9e15. I think the following values from Pierre's book have the largest period within native limits: seed = (seed * 185852 + 1) % 34359738337. – Lachmanski Jun 11 at 3:07
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    @Lachmanski true, but those are bound by 32-bits (and the Park-Miller 31-bits). Using Math.imul allows it to overflow as it would when using multiplication in C on 32-bit integers. What you're suggesting is an LCG utilizing the full range of JS's integer space, which is definitely an interesting area to explore as well. :) – bryc Jun 11 at 12:00

No, but here's a simple pseudorandom generator, an implementation of Multiply-with-carry I adapted from Wikipedia (has been removed since):

var m_w = 123456789;
var m_z = 987654321;
var mask = 0xffffffff;

// Takes any integer
function seed(i) {
    m_w = (123456789 + i) & mask;
    m_z = (987654321 - i) & mask;

// Returns number between 0 (inclusive) and 1.0 (exclusive),
// just like Math.random().
function random()
    m_z = (36969 * (m_z & 65535) + (m_z >> 16)) & mask;
    m_w = (18000 * (m_w & 65535) + (m_w >> 16)) & mask;
    var result = ((m_z << 16) + (m_w & 65535)) >>> 0;
    result /= 4294967296;
    return result;

EDIT: fixed seed function by making it reset m_z
EDIT2: Serious implementation flaws have been fixed

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    Has anyone tested this function for its randomness? – Justin Jan 1 '14 at 3:08
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    This is the multiply-with-carry (MWC) random generator with a pretty long period. Adapted from wikipedia Random Number Generators – Michael_Scharf Jul 21 '14 at 15:13
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    The seed function does not reset the random generator, because the mz_z variable is changed when random() is called. Therefore set mz_z = 987654321 (or any other value) in seed – Michael_Scharf Jul 21 '14 at 17:08
  • When I use it with my random color generator (HSL), it generates only green and cyan colors. The original random generator generates all colors. So, it is not same or it does not work. – Tomas Kubes Dec 7 '14 at 7:13
  • I think the seed is correct. – Tomas Kubes Dec 7 '14 at 7:14

Antti Sykäri's algorithm is nice and short. I initially made a variation that replaced Javascript's Math.random when you call Math.seed(s), but then Jason commented that returning the function would be better:

Math.seed = function(s) {
    return function() {
        s = Math.sin(s) * 10000; return s - Math.floor(s);

// usage:
var random1 = Math.seed(42);
var random2 = Math.seed(random1());
Math.random = Math.seed(random2());

This gives you another functionality that Javascript doesn't have: multiple independent random generators. That is especially important if you want to have multiple repeatable simulations running at the same time.

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    If you return the function instead of setting Math.random that would allow you to have multiple independent generators, right? – Jason Goemaat May 29 '14 at 19:38
  • Great idea! I've updated my answer accordingly. – Remco Kranenburg Jun 19 '14 at 12:52
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    Be sure to see comments above about distribution of randomness if that matters to you: stackoverflow.com/questions/521295/… – jocull Jun 27 '16 at 14:21
  • How randoms generated by this can be repeated? It keeps giving new numbers every time – SMUsamaShah Dec 25 '16 at 13:11
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    Please do not use this. Please take the time to instead use a local variable named random instead of overwriting a native javascript function. Overwriting Math.random may cause the JIST compiler to unoptimize all your code. – Jack Giffin Apr 12 '18 at 22:30

Please see Pierre L'Ecuyer's work going back to the late 1980s and early 1990s. There are others as well. Creating a (pseudo) random number generator on your own, if you are not an expert, is pretty dangerous, because there is a high likelihood of either the results not being statistically random or in having a small period. Pierre (and others) have put together some good (pseudo) random number generators that are easy to implement. I use one of his LFSR generators.


Phil Troy

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    Great answer, but not related to javascript :) – Nikolay Fominyh Mar 4 '17 at 18:59
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    The code for implementing Professor L'Ecuyer's work is publicly available for java and readily translatable by most programmers into Javascript. – user2383235 Mar 5 '17 at 23:44

To write your own pseudo random generator is quite simple.

The suggestion of Dave Scotese is useful but, as pointed out by others, it is not quite uniformly distributed.

However, it is not because of the integer arguments of sin. It's simply because of the range of sin, which happens to be a one dimensional projection of a circle. If you would take the angle of the circle instead it would be uniform.

So instead of sin(x) use arg(exp(i * x)) / (2 * PI).

If you don't like the linear order, mix it a bit up with xor. The actual factor doesn't matter that much either.

To generate n pseudo random numbers one could use the code:

function psora(k, n) {
  var r = Math.PI * (k ^ n)
  return r - Math.floor(r)
n = 42; for(k = 0; k < n; k++) console.log(psora(k, n))

Please also note that you cannot use pseudo random sequences when real entropy is needed.

  • I'm no expert, but sequential seeds follow a constant pattern. Colored pixels are >= 0.5. I am guessing its just iterating over the radius over and over? – bryc Mar 6 '17 at 3:28

Many people who need a seedable random-number generator in Javascript these days are using David Bau's seedrandom module.


Combining some of the previous answers, this is the seedable random function you are looking for:

Math.seed = function(s) {
    var mask = 0xffffffff;
    var m_w  = (123456789 + s) & mask;
    var m_z  = (987654321 - s) & mask;

    return function() {
      m_z = (36969 * (m_z & 65535) + (m_z >>> 16)) & mask;
      m_w = (18000 * (m_w & 65535) + (m_w >>> 16)) & mask;

      var result = ((m_z << 16) + (m_w & 65535)) >>> 0;
      result /= 4294967296;
      return result;

var myRandomFunction = Math.seed(1234);
var randomNumber = myRandomFunction();
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    This produces very similar results at the beginning of the sequence with different seeds. For example, Math.seed(0)() returns 0.2322845458984375, and Math.seed(1)() returns 0.23228873685002327. Changing both m_w and m_z according to the seed seems to help. var m_w = 987654321 + s; var m_z = 123456789 - s; produces a nice distribution of first values with different seeds. – undefined Apr 18 '16 at 20:21
  • @undefined the issue you described is fixed as of the last edit, it was a bug in the MWC implementation. – bryc Feb 22 at 17:29

Math.random no, but the ran library solves this. It has almost all distributions you can imagine and supports seeded random number generation. Example:

myDist = new ran.Dist.Uniform(0, 1)
samples = myDist.sample(1000)

I have written a function that returns a seeded random number, it uses Math.sin to have a long random number and uses the seed to pick numbers from that.

Use :

seedRandom("k9]:2@", 15)

it will return your seeded number the first parameter is any string value ; your seed. the second parameter is how many digits will return.

     function seedRandom(inputSeed, lengthOfNumber){

           var output = "";
           var seed = inputSeed.toString();
           var newSeed = 0;
           var characterArray = ['0','1','2','3','4','5','6','7','8','9','a','b','c','d','e','f','g','h','i','j','k','l','m','n','o','p','q','r','s','t','u','v','w','y','x','z','A','B','C','D','E','F','G','H','I','J','K','L','M','N','O','P','Q','U','R','S','T','U','V','W','X','Y','Z','!','@','#','$','%','^','&','*','(',')',' ','[','{',']','}','|',';',':',"'",',','<','.','>','/','?','`','~','-','_','=','+'];
           var longNum = "";
           var counter = 0;
           var accumulator = 0;

           for(var i = 0; i < seed.length; i++){
                var a = seed.length - (i+1);
                for(var x = 0; x < characterArray.length; x++){
                     var tempX = x.toString();
                     var lastDigit = tempX.charAt(tempX.length-1);
                     var xOutput = parseInt(lastDigit);
                     addToSeed(characterArray[x], xOutput, a, i); 

                function addToSeed(character, value, a, i){
                     if(seed.charAt(i) === character){newSeed = newSeed + value * Math.pow(10, a)}
                newSeed = newSeed.toString();

                var copy = newSeed;
           for(var i=0; i<lengthOfNumber*9; i++){
                newSeed = newSeed + copy;
                var x = Math.sin(20982+(i)) * 10000;
                var y = Math.floor((x - Math.floor(x))*10);
                longNum = longNum + y.toString()

           for(var i=0; i<lengthOfNumber; i++){
                output = output + longNum.charAt(accumulator);
                accumulator = accumulator + parseInt(newSeed.charAt(counter));
  • The sequences of numbers produced by this don't really approximate the properties of sequences of random numbers. Generate 15 numbers with it and the resulting string almost always begins with a 7 for nearly any key, for example. – Gabriel Jun 25 '18 at 18:44

A simple approach for a fixed seed:

function fixedrandom(p){
    const seed = 43758.5453123;
    return (Math.abs(Math.sin(p)) * seed)%1;

For a number between 0 and 100.

Number.parseInt(Math.floor(Math.random() * 100))
  • The question is about seeding Math.random such that whenever Math.random is seeded with the same seed, it will produce the same successive series of random numbers. This question is not, per say, about the actual usage/demonstration of Math.random. – Jack Giffin Apr 12 '18 at 22:38

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