# How much time should it take to find the sum of all prime numbers less than 2 million?

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I was trying to solve this Project Euler Question. I implemented the sieve of euler as a helper class in java. It works pretty well for the small numbers. But when I input 2 million as the limit it doesn't return the answer. I use Netbeans IDE. I waited for a lot many hours once, but it still didn't print the answer. When I stopped running the code, it gave the following result

Java Result: 2147483647
BUILD SUCCESSFUL (total time: 2,097 minutes 43 seconds)

This answer is incorrect. Even after waiting for so much time, this isn't correct. While the same code returns correct answers for smaller limits.

Sieve of euler has a very simple algo given at the botton of this page.

My implementation is this:

``````package support;

import java.util.ArrayList;
import java.util.List;

/**
*
*/
public class SieveOfEuler {
int upperLimit;

public SieveOfEuler(int upperLimit){
this.upperLimit = upperLimit;
for(int i = 2 ; i <= upperLimit ; i++)
generatePrimes();
}

private void generatePrimes(){
int currentPrimeIndex = 0;
int currentPrime = 2;
while(currentPrime <= Math.sqrt(upperLimit)){
ArrayList<Integer> toBeRemoved = new ArrayList<Integer>();
for(int i = currentPrimeIndex ; i < primeNumbers.size() ; i++){
}

for(Integer i : toBeRemoved){
}

currentPrimeIndex++;
}
}

public List getPrimes(){
}

public void displayPrimes(){
System.out.println(i);
}
}
``````

I am perplexed! My questions is

1) Why is it taking so much time? Is there something wrong in what I am doing?

Please suggest ways for improving my coding style, if you find something wrong.

Question Updated:

Here is the code, where I calculate the sum of the the calculated prime numbers:

``````package projecteuler;

import java.io.IOException;
import java.math.BigInteger;
import java.util.ArrayList;
import java.util.logging.Level;
import java.util.logging.Logger;
import support.SieveOfEuler;

/**
*
*/
public class Problem10 {
private int upperLimit;
private BigInteger sumOfPrimes;
public void getInput() {
try {
System.out.println("Enter the upper limit");
} catch (IOException ex) {
Logger.getLogger(Problem10.class.getName()).log(Level.SEVERE, null, ex);
}
}

public void execute() {
BigInteger sum = new BigInteger("0");
SieveOfEuler soe = new SieveOfEuler(upperLimit);
}
System.out.println(sum);
}

public void printOutput() {
//System.out.println(sumOfPrimes);
}
}
``````
-
What are the numbers you get when you sieve? – robert Dec 22 '10 at 11:34
– Jigar Joshi Dec 22 '10 at 11:34
Aside from the speed, the sum of the first 2 million primes doesn't fit in an `int`, and the result you're showing is suspiciously equal to `Integer.MAX_VALUE` – Steve Jessop Dec 22 '10 at 11:35
It will probably take longer if you use your pocket calculator and compute it manually :) – Felix Kling Dec 22 '10 at 11:38
@robert I get the correct prime numbers on sieving – Shahensha Dec 22 '10 at 11:54

The reason that your Sieve is so slow is that you have made a fundamental mistake. The `primeNumbers` should be an array of booleans, not a `List`. When you are finished, the value of `primeMumbers[i]` will be `true` for prime numbers and `false` for composites.

Here's why it makes such a big difference:

• Setting or clearing a flag in array is `O(1)` ; i.e. a small constant time per operation.
• Removing an element from an `ArrayList` is `O(N)` where `N` is the size of the list ... and very large.
• Each `ArrayList.remove(...)` operation has to search the list. If the value is no longer there (because you've already removed it), the remove operation has to look at every remaining element in the list ... up to ~2 million of them ... each time it is called.
• When `ArrayList.remove(...)` finds an element, it removes it by copying all remaining elements after the element one index to the left in the backing array. Again, you are copying up to ~2 million entries ... each time you remove one.

I'd expect a well implemented Sieve of Erasothenes to be able to calculate all prime numbers less than 2 million in a few seconds.

-
but why am i getting a wrong answer? – Shahensha Dec 22 '10 at 12:05
Either there is something else wrong with your sieve as well, or the sum of the primes won't fit into an `int`. In the latter case, the sum should fit into a `long`. – Stephen C Dec 22 '10 at 12:09
Either way, fixing the problem that makes the program run so slowly will make it easier to test / debug. – Stephen C Dec 22 '10 at 12:12
A BitSet is much more efficient than a boolean[]. (8x smaller) – Peter Lawrey Dec 22 '10 at 19:44
@Peter - smaller != more efficient. My gut feeling is that a `boolean[]` will be significantly faster than a `BitSet`. – Stephen C Dec 23 '10 at 7:07

To give an answer to the question in this topic title: this is what the project Euler web site says: http://projecteuler.net/index.php?section=about

I've written my program but should it take days to get to the answer? Absolutely not! Each problem has been designed according to a "one-minute rule", which means that although it may take several hours to design a successful algorithm with more difficult problems, an efficient implementation will allow a solution to be obtained on a modestly powered computer in less than one minute.

;-)

-
``````for(int i = currentPrimeIndex ; i < primeNumbers.size() ; i++){
}
``````

At the first step, this generates an ArrayList of 2 million multiples of 2 (toBeRemoved).

Then it iterates over toBeRemoved, scanning the entire array of 2 million candidate primes once for each entry in toBeRemoved. Half the values in toBeRemoved can't possibly be in `primeNumbers` because they're too big. Each removal results in every value with a greater index than the one removed, being shifted down one place.

I think this is the major source of inefficiency. The usual way to implement the sieve of Eratosthenes is to create an array of 2 million boolean values, initially all true. When `i` is determined to be non-prime, set `possibly_prime[i]` to false. To find the next prime, scan forward looking for a `true` value. To get a list of all primes at the end, iterate the array recording the index of each `true` value. You should do pretty much the same for the sieve of Euler.

You won't need to optimize beyond that for primes up to 2 million.

-
 correct answer, scanning and removing the numbers to remove is by far the biggest time consumer. – Olivier Heidemann Dec 22 '10 at 12:03

Some obvious mistakes:

``````while(currentPrime <= Math.sqrt(upperLimit))
``````

Square root is calculated in every step (unless optimized by the compiler). You should calculate it once and store the result.

``````currentPrimeIndex++;
``````

You should at least make the obvious optimization and only test odd numbers. You already know that even numbers aren't primes. This should cut your time in half.

Also, you are using a brute force method to find the prime numbers. This will be slow for large upper limits. You should use a better algorithm for your search - you will be able to find more info in the web, However I don't know if this is allowed in the spirit of Project Euler.

-
 sqrt is very expensive. – Peter Lawrey Dec 22 '10 at 19:44
``````import java.util.*;

public class PrimeSum
{
public static int isPrime(int num)
{
int sum = 0;
int factor = 1;
while(factor <= num)
{
if(num % factor != 0)
{
sum += factor;
factor ++;
}
else
{
factor ++;
}
}
return sum;
}

public static void main(String[] args)
{
System.out.println("The program gets the sum of all prime numbers.");

Scanner scan = new Scanner(System.in);

System.out.print("Enter a number: ");
int num = scan.nextInt();

int sum = isPrime(num);

System.out.println(sum);
}
}
``````
-

while(currentPrime <= Math.sqrt(upperLimit)) // It reduces the complexity and one more point the sum is not int. overflow occurs

If it helps you you look at my solution. Here is my solution

``````public static boolean isPrime(int i) { // general isPrime method
if (i < 2) {
return false;
} else if (i % 2 == 0 && i != 2) {
return false;
} else {
for (int j = 3; j <= Math.sqrt(i); j = j + 2) {
if (i % j == 0) {
return false;
}
}
}

return true;
}

public static boolean isPrimeForOdd(int i){ // only for odds
for (int j = 3; j <= Math.sqrt(i); j = j + 2) {
if (i % j == 0) {
return false;
}
}

return true;
}

public static long sumOfPrimes(int n) {
long sum = 2;

for (int i = 3; i < n; i += 2) {
if (isPrimeForOdd(i)) {
sum += i;
}
}

return sum;
}

public static void main(String[] args) throws ParseException {
System.out.println(sumOfPrimes(2000000));
}
``````
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 but read the comment of org.life.java – hilal Dec 22 '10 at 11:42
1. Is list the correct type for this? A Set would perform much better during `remove(obj)`. In your case, try a `BitSet`.

2. You first create a (long) list of elements to remove and then remove them individually. Why not simply remove them?

3. The result doesn't fit in an `int`.

-
 Can you please ellaborate the second point? As in can I remove a list (smaller) from another (larger)? – Shahensha Dec 23 '10 at 5:52 My point is: Why do you create the remove list at all? Just call `primeNumbers.remove(i);` in the first loop. That is always faster then creating a second list, adding elements to it, etc. – Aaron Digulla Dec 25 '10 at 23:38

Even without sieve, this question is solvable in less than 1 sec complexity. To check whether a number is prime or not : http://www.parseexception.com/how-to-check-whether-a-number-is-prime-or-not/

Perform this operation for all numbers and sum them.

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