# triangle numbers in python

I'm trying to solve the problem:

What is the value of the first triangle number to have over five hundred divisors?

A triangle number is a number in the sequence of the sum of numbers i.e. 1+2+3+4+5...

I'm pretty sure that this is working code but I don't know because my computer is taking too long to calculate it. Does anybody have any idea of how to make the program a little faster.
Thanks.

``````import math

def main():
l = []
one = 0
a = 1
b = 2
while one == 0:
a = a + b
b += 1
for x in range(1, int(a/2 + 1)):
if a % x == 0:
l.append(x)
if len(l) > 499:
print a

if __name__ == '__main__':
main()
``````
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Please don't post code where "one == 0" evaluates to true. It hurts to look at :| – Daniel LeCheminant Feb 20 '09 at 22:33
Get used to it:-) It is as good a comparison as any other. And in this program, it is always true... – Renze de Waal Feb 20 '09 at 22:41
@Renze de Waal: You can't say `while 1` or at least `while 1==1`? Couldn't the variable be called `running` or something? – Daniel LeCheminant Feb 20 '09 at 23:05
Ok, but please try to use consistent indenting, for your own sanity :) – Ali Afshar Feb 21 '09 at 3:52
while True: seems the correct thing to do (I'm no Python expert, but my Python accepts it). – starblue Feb 21 '09 at 7:03

Hints:

• what is the formula for `n`-th triangular number?
• `n` and `n+1` have no common factors (except `1`). Question: given number of factors in `n` and `n+1` how to calculate number of factors in `n*(n+1)`? What about `n/2` and `(n+1)` (or `n` and `(n+1)/2`)?
• if you know all prime factors of `n` how to calculate number of divisors of `n`?

If you don't want to change your algorithm then you can make it faster by:

• replace `l.append` by `factor_count += 1`
• enumerate to `int(a**.5)` instead of `a/2` (use `factor_count += 2` in this case).
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You are giving away too much of the solution. – starblue Feb 21 '09 at 6:56
But he is giving good directions! (unlike the above almost brute force solution of Ghose). – nimrodm Feb 21 '09 at 7:35
+1: Very, very helpful hints. Especially the prime factors to number of divisors -- genius. – S.Lott Feb 21 '09 at 20:06
I've posted solution based on the above hints gist.github.com/68515 – J.F. Sebastian Feb 22 '09 at 16:37

You'll have to think more and use less brute force to solve Project Euler questions.

In this case you should investigate which and how many divisors triangle numbers have. Start at the beginning, look for patterns, try to understand the problem.

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You're not updating the value of `one`, so your program will never end.

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I think it is @mark lincoln's idiom for `while True`. And considering the problem `while True` is appropriate here. He needs just to add a `break` after `print`, fix couple of bugs and the solution will work (although too slow). – J.F. Sebastian Feb 20 '09 at 23:01
I agree - returning after the print would do the trick, at least as far as that part goes. I personally try to stay away from while true because I have a nasty habit of forgetting to return things :P – Andy Mikula Feb 20 '09 at 23:15

Just for sanity's sake, you should use

``````while True:
``````

and get rid of `one`.

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yeah thanks ill make sure not to use that again. – marc lincoln Feb 22 '09 at 16:01

First of all, the people telling you that you can't solve this problem with brute force in under a minute are wrong. A brute force algorithm for a problem this size will run in a few seconds.

Second, the code that you posted has several problems, some of them already mentioned.

• You should terminate the loop by setting `one` to some value other than `0` once you reach your goal condition (where you currently `print a`).
• You never reinitialize the list (`l = []`). This should be done each time you recalculate `a` and `b`, right before you enter the for loop.
• The question asks for the first triangle number to have over five hundred divisors. Your condition for termination should be `if len(l) > 500:`.
• Your probably don't want to `print a` inside the for loop, but wait until the while loop is done.

The thing that's really slowing you down is that for each triangle number `a` you're checking every value up to `a / 2` to see if it's a divisor. Your only need to check values up to the square root of `a`. This way for each value of `x`, if `x` is a divisor you can just add `x` and `a / x` to the list.

Here's your code with the modifications I outlined above:

``````import math

def main():
l = []
one = 0
a = 1
b = 2
while one == 0:
a = a + b
b += 1
l = []

sqrt_a = int(math.sqrt(a))

for x in range(1, sqrt_a + 1):
if a % x == 0:
l.append(x)
if x < math.sqrt(a):
l.append(a // x)
if len(l) > 500:
# print(a)
one = 1

print(a, b, len(l))

if __name__ == '__main__':
main()
``````

You'll see that it runs in about 5 or 6 seconds, so well under a minute with these modifications.

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Your current brute force algorithm is too inefficient to solve this problem in the Project Euler time limit of 1 minute. Instead, I suggest looking at the Divisor Function:

http://www.artofproblemsolving.com/Wiki/index.php/Divisor_function

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