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I have been trying to write Sieve of Eratosthenes algorithm in JavaScript. Basically I just literally followed the steps below:

  1. Create a list of consecutive integers from 2 to (n-1)
  2. Let first prime number p equal 2
  3. Starting from p, count up in increments of p and removes each of these numbers (p and multiples of p)
  4. Go to the next number in the list and repeat 2,3,4
  5. Add unintentionally deleted prime numbers back to the list

and this is what I have come up with:

function eratosthenes(n){
var array = [];
var tmpArray = []; // for containing unintentionally deleted elements like 2,3,5,7,...
var maxPrimeFactor = 0;
var upperLimit = Math.sqrt(n);
var output = [];

// Eratosthenes algorithm to find all primes under n

// Make an array from 2 to (n - 1)
//used as a base array to delete composite number from
for(var i = 2; i < n; i++){

// Remove multiples of primes starting from 2, 3, 5,...
for(var i = array[0]; i < upperLimit; i = array[0]){
    for(var j = i, k = i; j < n; j += i){
        var index = array.indexOf(j);
        if(index === -1)
            continue removeMultiples;
return array;

It works for small numbers but not for numbers larger than one million. I used Node.js to test and the process just seems endless and no memory error shown up. I've read a solution here(also in javascript) but still cannot fully comprehend it.

Question: How to make this work for sufficiently large numbers such as one million and above?

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You are making your sieve intentionally slower by making use of Array#indexOf and Array#splice –  Alexander Mar 18 '13 at 7:08
Your function returns [[2],3] instead of [2,3] on input of 5... –  loxxy Mar 18 '13 at 7:12

1 Answer 1

You are making the Sieve of Eratosthenes intentionally slower by making use of array manipulation functions such as Array#indexOf and Array#splice which runs in linear time. When you can have O(1) for both operations involved.

Below is the Sieve of Eratosthenes following conventional programming practices:

var eratosthenes = function(n) {
    // Eratosthenes algorithm to find all primes under n
    var array = [], upperLimit = Math.sqrt(n), output = [];

    // Make an array from 2 to (n - 1)
    for (var i = 0; i < n; i++) {

    // Remove multiples of primes starting from 2, 3, 5,...
    for (var i = 2; i <= upperLimit; i++) {
        if (array[i]) {
            for (var j = i * i; j < n; j += i) {
                array[j] = false;

    // All array[i] set to true are primes
    for (var i = 2; i < n; i++) {
        if(array[i]) {

    return output;

You can see a live example for n = 1 000 000 here.

share|improve this answer
Thanks. It works! And finally I found why using var j = i * i and j += 1 is enough for the problem (instead of var j = i, and add those unintentionally deleted primes back). The multiples of i and all integers under i would have been removed already in previous loops. –  Baowen Mar 18 '13 at 15:35
@Baowen, exactly. All ki for k<i have been removed already –  Alexander Mar 18 '13 at 18:07
Just a reference explaining why Array#indexOf is more time-consuming than simply looping through it. –  Baowen Mar 20 '13 at 6:28
@Baowen, take into account that you are calling Array#indexOf intensively and this is slowing down the whole execution –  Alexander Mar 20 '13 at 6:34

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