Wrong Answer for Project Euler 50

Question

I am attempting Problem 50 of project Euler.

The prime 41, can be written as the sum of six consecutive primes:

41 = 2 + 3 + 5 + 7 + 11 + 13 This is the longest sum of consecutive primes that adds to a prime below one-hundred. The longest sum of consecutive primes below one-thousand that adds to a prime, contains 21 terms, and is equal to 953. Which prime, below one-million, can be written as the sum of the most consecutive primes?

Here is my code:

    public class consPrime
    {
        static int checker(int ar[],int num,int index) //returns no.of consecutive
        {                                              //primes for the given num  
            while(true)
        {

        int temp=num;

        for(int i=index;i>=0;i--)
        {
            temp=temp-ar[i];

            if(temp==0)
            {
                return (index-i+1);
            }               
        }           
        index--;
        if(index==0)
        return 0;           
        }
    }

    public static void main(String args[])
    {               
        int n=100000;
        int ar[]=new int[n];
        int total=0;int flag;

        for(int i=2;i<1000000;i++)   //Generates an array of primes below 1 million
        {
            flag=1;

            for(int j=2;j<=Math.sqrt(i);j++)
            {
                if(i%j==0)
                {
                    flag=0;
                    break;
                }                   
            }
            if(flag==1)
            {
                ar[total]=i;
                total++;
            }               
        }

        int m=0;
        int Big=0;

        for(int i=total;i>=0;i--) //Prints the current answer with no.of prime
        {
            m=checker(ar,ar[i],i-1);
            if(Big<=m)
            {Big=m;
                System.out.println(ar[i]+"     "+Big);
            }
        }           
    }       
}

Basically it just creates a vector of all primes up to 1000000 and then loops through them finding the right answer. The answer is 997651 and the count is supposed to be 543 but my program outputs 990707 and 75175 respectively. What might be wrong?

Answer 1

Several big problems:

1. Some minor problem first: learn to proper indent your code, learn to use proper naming convention. In Java, variable names uses camelCasing while type name uses PascalCasing.

2. Lots of problems in your logics: you loop thru the prime number array, until you hit zero or until looped thru all numbers in the array. However, please be awared that, there is underflow/overflow for integer. It is possible that the "temp" keeps on deducts and become negative and become positive and so-on-and-so-forth and hit zero. However that's not the correct answer

3. You only tried to find the consecutive numbers that ends at index - 1. For example, to check for prime number at index 10, you are finding consecutive primes from index 9 backwards. However consecutive prime sum up to your target number rarely (in fact almost never, except for 5) contains the "previous" prime number. The whole logic is simply wrong.

4. Not to mention the incorrect parameters you passed for checker, which is mentioned by comment of user @pm-77-1

Answer 2

Here is another approach that takes 43 ms.

It is based on the following approach:

1) The primes <= 1000000 are generated using a sieve

2) It iterates in O(n²) through all numbers and it counts the consecutive primes. The first loop changes the first element of the sequence, the second one takes the elements starting from that position and adds them to a sum. If the sum is prime and it consists of the biggest number of primes, than it is kept in a variable.

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

public class P50 {

    private final static int N = 1_000_000;

    public static void main(String[] args) {
        boolean primes[] = generatePrimes(N);
        List<Integer> primeIntegers = new ArrayList<Integer>();
        for (int i = 0; i < primes.length; i++) {
            if (primes[i]) {
                primeIntegers.add(i);
            }
        }
        int count = 0;
        int sum = 0;
        int finalSum = 0;
        int finalCount = 0;
        int totalPrimes = primeIntegers.size();
        for (int start = 0; start < totalPrimes; start++) {
            sum = 0;
            count = 0;
            for (int current = start; current < totalPrimes; current++) {
                int actual = primeIntegers.get(current);
                sum += actual;
                if ( sum >= N ) {
                    break;
                }
                if ( primes[sum] ) {
                    if ( count > finalCount ) {
                        finalCount = count;
                        finalSum = sum;
                    }
                }
                count++;
            }
        }
        System.out.println(finalSum);
    }

    private static boolean[] generatePrimes(int n) {
        boolean primes[] = new boolean[n];
        for (int i = 0; i < n; i++) {
            primes[i] = true;
        }
        primes[0] = false;
        primes[1] = false;
        // i = step
        for (int i = 2; i * i < n; i++) {
            if (primes[i]) {
                for (int j = i * i; j < n; j += i) {
                    primes[j] = false;
                }
            }
        }
        return primes;
    }

}