# euler challenge 12, why does this python code fail?

The Following code keeps telling me a wrong number and I can't see why, know it's brute force but it should still work... also the number it returns has indeed over 500 divisors, 512 to be exact, help would be much appreciated

``````Number = 1
Count = 2
Found = False
while Found == False:
Divisors = 0
if (Number % 2) != 0:
for i in range(1, int(Number**(1/2)), 2):
if Number % i == 0:
Divisors += 1

else:
for i in range(1, int(Number**(1/2))):
if Number % i == 0:
Divisors += 1

if Divisors >= 500:
print (Number)
Found = True

else:
Number += Count
Count += 1
``````

For reference: Problem 12 from the Euler Challange

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I think that even if this worked as you intended, you're going to have a problem. Because you're going from 1 to 1/2 the number, you're not going to include the number itself as a divisor. This might not affect your answer, but I thought you'd like to know. Let me know if I'm off here, I'm unfamiliar with python. –  Toast Dec 1 '11 at 21:20

The number of divisors of an integer is just the product of (1 + exponent) for each pure power in the factor decomposition of an integer.

As an example: 28 = 2^2 * 7

The powers are 2 and 1, so the number of divisors is `(2+1)*(1+1) = 3*2 = 6`. Easy one

Bigger one: 2047 * 2048 / 2 = 2^10 * 23 * 89

The powers are 10, 1 and 1, so the number of divisors is `11*2*2 = 44`

Easier: 100 = 2^2 * 5^2

The powers are 2, 2 so there are `3*3=9` divisors. The same applies to `36=2^2*3^2`. The only interesting part is the exponents.

So, use any prime factor decomposition (use a sieve, you don't need a primality test) it would be much faster and more reliable than trying each of the possible numbers.

``````def factorize(i):
# returns an array of prime factors
whatever

def number_of_divisors(i):
n = 1
for v in Counter(factorize(i)).values():
n *= v + 1
return n
``````
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I'm not sure what Euler Challenge 12 is, but one obvious issue is the (1/2). If you try typing that in a Python prompt, you'll get 0. The reason why is that it will try to do integer math. I suggest just putting (0.5), or alternatively you could do (1/2.0).

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That depends on whether this is Python 2.x or 3.x. See python.org/dev/peps/pep-0238 and docs.python.org/release/3.0.1/whatsnew/3.0.html#integers –  sberry Dec 1 '11 at 21:08
That's a good point. I still haven't made the transition, so that only occurred to me a second ago. –  Abe Schneider Dec 1 '11 at 21:12
the Number**(1/2) works fine in python 3.x which I use –  Daquicker Dec 1 '11 at 21:52

Your divisor counting method is wrong. 12 has 6 divisors, but your code only counts 2.

Problems:

1. a number often has divisors larger than its square root
2. range doesn't include its upper bound, so you're stopping too early
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The range only going to the square root is certainly a problem. Perhaps the OP meant to do `Number*(1.0/2)` instead of `**` –  sberry Dec 1 '11 at 21:21
@sberry2A I suspect the OP made a different error, only going to the square root is fine with a small modification. (No explicit correction to not spoil the problem.) –  Daniel Fischer Dec 1 '11 at 21:24

the code you have been write is searching till number**0.5 and it is wrong you must search until number/2 so the corrected answer is like below:

Note : I add some extra code to show the progress. and they are not affect the solution.

Another Note: since the Nubmer itself is not counted like in the problem example, I add once to perform that.

``````Number = 1
Count = 2
Found = False
big_Devisor = 0
print "Number   Count   Divisors"
while Found == False:
Divisors = 1  # because the Number is itself Devisor
if (Number % 2) != 0:
for i in range(1, int(Number/2), 2):
if Number % i == 0:
Divisors += 1
else:
for i in range(1, int(Number/2)):
if Number % i == 0:
Divisors += 1

if Divisors >= 500:
print (Number)
Found = True

else:
if Divisors > big_Devisor:
big_Devisor = Divisors
print Number,'\t', Count, '\t', Divisors
Number += Count
Count += 1
``````
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