# Getting the first Triangle number with more than 400 divisors [duplicate]

Possible Duplicate:
Project Euler Problem 12 - C++

I am trying to get the first triangle number with more than 400 divisors (Triangle Number eg: 1,3,6,10). For an example, triangle number 6 has four divisors 1,2,3,6. The following is my attempt to get the triangle number with 400 divisors

import java.math.BigInteger;

public class IQ3
{

static int num1 = 1;
static int devideResult = 0;

public static void main(String[]args)
{

while(true)
{
int triangle = num1*(num1+1)/2;

if(devide(triangle))
{
break;
}

num1++;
}

}

static boolean devide(int num)
{
boolean result = false;
int devideCounter = 2;

for(int i=1;i<=num/2;i++)
{
if(num%i == 0)
{
devideCounter++;
System.out.println("Devide Counter: "+devideCounter);
//System.out.println("i number: "+i);
//System.out.println("input number: "+num);

if(devideCounter>400)
{
System.out.println("Number: "+num);
result = true;
break;
}
}
}

return result;
}
}

But this takes a huge time, and some times it crashes.

However, since the answer could be really big, I thought of using BigInteger.

import java.math.BigInteger;

public class IQ2P2
{

static BigInteger num1 = new BigInteger("1");
static BigInteger two = new BigInteger("2");
static BigInteger one = new BigInteger("1");
static BigInteger i = new BigInteger("1");
static BigInteger zero = new BigInteger("0");

static int devideResult = 0;
//    static int devideCounter = 0;

public static void main(String[]args)
{

while(true)
{

if(devide(triangle))
{
break;
}

}

}

static boolean devide(BigInteger num)
{
boolean result = false;
int devideCounter = 2;

while((i.compareTo(num))<(num.divide(two).intValue()))
{
if(num.remainder(i) == zero)
{
devideCounter++;
System.out.println("Devide Counter: "+devideCounter);
//System.out.println("i number: "+i);
//System.out.println("input number: "+num);

if(devideCounter>400)
{
System.out.println("Number: "+num);
result = true;
break;
}
}
}

return result;
}
}

But the biginteger one never returned anything.

Note: This is not a homework. I am not a student.

The following is a response to an answer

import java.math.BigInteger;

public class IQ2
{

static long num1 = 1;
static long devideResult = 0;

static   long triangleNum = 1;
static long incrementer = 2;
//    static int devideCounter = 0;

public static void main(String[]args)
{

while(true)
{
triangleNum += incrementer++;

if(devide(triangleNum))
{
break;
}

num1++;
}

}

static boolean devide(long num)
{
boolean result = false;
int devideCounter = 2;

for(long i=1;i<=num/2;i++)
{
if(num%i == 0)
{
devideCounter++;
System.out.println("Devide Counter: "+devideCounter);
//System.out.println("i number: "+i);
//System.out.println("input number: "+num);

if(devideCounter>400)
{
System.out.println("Number: "+num);
result = true;
break;
}
}
}

return result;
}
}
-
I saw this on project euler. –  nikhil Jul 3 '12 at 6:33
My algorithm below can be made a lot more efficient. But if this is a project euler problem it is up to you to find out how. –  Peter van der Heijden Jul 3 '12 at 6:38
@PetervanderHeijden: I am not in project Euler. I will check your answer –  FlowOverStack Jul 3 '12 at 6:41
It is project euler problem 12 (projecteuler.net/problem=12). I have retracted my answer (PE problems should not be spoiled). –  Peter van der Heijden Jul 3 '12 at 6:55
You don't need BigInteger. The 21735th triangle number is just 236215980 (< 2^28), and has 768 divisors. –  Markus Jarderot Jul 3 '12 at 7:19

## marked as duplicate by George Stocker♦Jul 31 '12 at 2:27

you need to optimize the way you find out the amount of divisors for a given number. First, for every d <= sqrt(n) such that n%d==0, there is m=n/d such that n%m==0 and m >= sqrt(n). That means you can count both of them at once, stopping at sqrt(n).

But the real optimization is to calculate the prime factorization of a number instead, and find out the amount of divisors from there.

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