I am trying to solve Project Euler problem #12:

The sequence of triangle numbers is generated by adding the natural numbers. So the 7th triangle number would be 1 + 2 + 3 + 4 + 5 + 6 + 7 = 28. The first ten terms would be:

`1, 3, 6, 10, 15, 21, 28, 36, 45, 55, ...`

Let us list the factors of the first seven triangle numbers:

`1: 1 3: 1,3 6: 1,2,3,6 10: 1,2,5,10 15: 1,3,5,15 21: 1,3,7,21 28: 1,2,4,7,14,28`

We can see that 28 is the first triangle number to have over five divisors. What is the value of the first triangle number to have over five hundred divisors?

Here's the solution that I came up with:

```
triangle_number = 1
(2..9_999_999_999_999_999).each do |i|
triangle_number += i
num_divisors = 2 # 1 and the number divide the number always so we don't iterate over the entire sequence
(2..( i/2 + 1 )).each do |j|
num_divisors += 1 if i % j == 0
end
if num_divisors == 500 then
puts i
break
end
end
```

I shouldn't be using an arbitrary huge number like 9_999_999_999_999_999. It wouldn be better if we had a Math.INFINITY or some way to generate lazy infinite sequences like some functional languages. What ruby technique can be used to achieve this and make my code better?

`num_divisors == 500`

should be changed to`num_divisors > 500`

. You don't have proof that there is one that has exactly 500 divisors. Actually, that may be the reason your program is running forever. Furthuremore, the question is not asking for one with 500, but the first one over 500. Read the question carefully. – sawa Jun 16 '11 at 14:42`n * (n + 1) / 2`

factors cleanly into two mutually prime numbers... – Amadan Jun 16 '11 at 21:18