# Project Euler #10, java [duplicate]

Possible Duplicate:
Project Euler, Problem 10 java solution not working

So, I'm attempting to solve Project Euler Problem 10 in Java, and I'm getting not the right answer. Here's my code:

``````public class Problem10 {
public static void main(String[] args)
{
long sum =0;
for(int i =3;i<2000000;i+=2)
{
if(isPrime(i))
{
sum+=i;
}
}
System.out.println(sum);
}

public static boolean isPrime(int n)
{
boolean prime = true;
if (n<2) return false;
if (n==2) return true;
if (n%2==0) return false;
for (int i = 3; i<=Math.sqrt(n);i+=2)
{
if (n%i==0)
{
prime=false;
break;
}
}
return prime;
}
}
``````

Which prints out 142913828920, which project Euler tells me is wrong.

Any ideas?

(Also, I know my method for finding primes is terribly inefficient.)

-

## marked as duplicate by George Stocker♦Dec 7 '12 at 15:31

this method is not terribly inefficient. In Haskell it is `2 : [n | n<-[3,5..], all ((> 0).rem n) [3,5..floor(sqrt(fromIntegral n))]]` - minimal trial division by odd numbers. The following is terribly inefficient, and popular: `sieve [2..] where sieve (x:xs) = x : sieve [n | n <- xs, rem n x > 0]` - excessive trial division by primes. Even slower and also quite popular is `[n | n<-[2..], all ((> 0).rem n) [2..n-1]]` - excessive trial division by all numbers. `[n | n<-[2..], not \$ elem n [j*k | j<-[1..n-1], k<-[1..n-1]]]` is the champion - I saw it (in Java IIRC) on SO! –  Will Ness Jun 16 '12 at 8:05

``````for(int i =3;i<2000000;i+=2)
``````

2 is prime.

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If you'll notice above that, I have if (n==2) return true; –  Colin DeClue Aug 3 '10 at 18:18
But in main, your loop starts at 3. –  dcp Aug 3 '10 at 18:19
But you start at 3, so n will never equal 2 –  Chris Cudmore Aug 3 '10 at 18:20
Wow, I feel dumb. Thanks. –  Colin DeClue Aug 3 '10 at 18:20
Just set sum = 2. –  Will Aug 3 '10 at 18:21

You can accelerate your code a little bit by only dividing the prime numbers. For example, you can know that 35 is not a prime number by just trying to divide it by 2, 3, 5. No need to try 4. The trick is, any time you find a prime number, save it in a list or a vector. And in your isPrime function, just iterate the list until it hits sqrt(n) instead of every value in between 3..sqrt(n).

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this would take a lot of memory –  Amir Rachum Aug 8 '10 at 22:29
@amir: not really... there are < 150000 primes under 2 million, and they get more and more sparse as you get higher. using a list of 32 bit ints, that would only need 600kb. –  Wallacoloo Aug 8 '10 at 22:44
In any case, the code takes less than 5 seconds to run as is. No need to optimize, really. –  Colin DeClue Aug 9 '10 at 12:51

You can accelerate your code even more by using a Sieve.

-

I found the following method very efficient , when i checked if a number is prime i only divide the number by the prime numbers previously found and are below square root of n . No need to check for all the numbers below square root of n . And it only takes more than one second !!

``````public class Problem10 {

private static List<Long> listOfPrimes = new ArrayList<Long>();

public static void main(String args[]) {

long count = 0;
for (long i = 2; i < 2000000; i++) {
if (isPrime(i)) {
count += i;
System.out.print(i + " ");
}
if (i % 1000 == 0) {
System.out.println();
}
}

System.out.println("\nTotal " + count);

}

private static boolean isPrime(long n) {

String strFromN = new Long(n).toString();
if ((strFromN.length() != 1) && (strFromN.endsWith("2") || strFromN.endsWith("4") || strFromN.endsWith("5") || strFromN.endsWith("6") || strFromN.endsWith("8"))) {
return false;
}

for (Long num : listOfPrimes) {
if (num > Math.sqrt(n)) {
break;
}
if (n % num.longValue() == 0) {
return false;
}
}

no need to test even numbers above 2; it is already known as prime: replace `long count = 0; for (long i = 2; i < 2000000; i++) {` with `long count = 2; for (long i = 3; i < 2000000; i+=2) {`. So there's no need for string conversions now. –  Will Ness Jun 16 '12 at 8:14