# Use of integers and doubles give different answers when they shouldn't

I'm solving a Project Euler Problem 14 using java. I am NOT asking for help solving the problem. I have already solved it, but I ran into something I can't figure out.

The problem is like this:

The following iterative sequence is defined for the set of positive integers:

n = n/2, if n is even
n = 3n + 1, if n is odd

Using the rule above and starting with 13, we generate the following sequence:

13 -> 40 -> 20 -> 10 -> 5 -> 16 -> 8 -> 4 -> 2 -> 1. Here, the length of the chain is 10 numbers.

Find the starting number below 1,000,000 that produces the longest chain.

So I wrote this code:

``````public class Euler014 {
public static void main(String[] args){
int maxChainCount = 0;
int n;
int chainCount = 1;

for(int i = 0; i < 1000000; i++){
n = i;
while(n > 1){
if(n%2 == 0){       //check if even
n /= 2;
}else{              //else: odd
n = 3*n + 1;
}
chainCount++;
}
if(chainCount > maxChainCount){ //check if it's the longest chain so far
maxChainCount = chainCount;
}
chainCount = 1;
}
System.out.println("\n\nLongest chain: i = " + answer);
}
}
``````

This gives me the answer 910107, which is wrong.

HOWEVER, if i change the type of my n variable to `double n` it runs and gives me the answer 837799, which is right!

This really confuses me, as I can't see what the difference would be at all. I understand that if we use `int` and do divisions we can end up rounding numbers when we don't intend to. But in this case, we always check to see if the `n` is divisble by 2, BEFORE dividing by 2. So I thought that it would be totally safe to use integers. What am I not seeing?

This is the code in its entirety, copy, paste and run it if you'd like to see for yourself. It runs in a couple of seconds despite much iteration. =)

-
`int` is too small, that overflows for several values. Use `long`. – Daniel Fischer Jun 20 '13 at 22:45
The first value you get `int` overflow for is `113383`, after 121 steps. `837799` overflows after 59 steps. – Daniel Fischer Jun 20 '13 at 22:51

Your problem is overflow. If you change `int n` to `long n`, you'll get the right answer.
Remember: The numbers in the sequence can be really big. So big they overflow `int`'s range. But not (in this case) `double`'s, or `long`'s.
At one point in the chain, `n` is `827,370,449` and you follow the `3n + 1` branch. That value wants to be `2,482,111,348`, but it overflows the capacity of `int` (which is `2,147,483,647` in the positive realm) and takes you to `-1,812,855,948`. And things go south from there. :-)