# Finding if a number is prime using Python [duplicate]

I am working on Project Euler Problem 10, which states as follows:

``````Find the sum of all the primes below two million.
``````

Here's my program:

``````numbers = []
sum = 0
range_number = 2000000

#Appends all numbers in range
for i in range(2, range_number):
numbers.append(i)

#i is every entry in numbers, n is the multiples of numbers[i] starting at one
#value of numbers[i] after i. This is the Sieve of Eratosthenes.
for i in range(0, len(numbers)-1):
if numbers[i] != None:
for n in range(i + numbers[i], len(numbers)-1, numbers[i]):
numbers[n] = None

#Adds all the numbers that are not None
for i in numbers:
if i != None:
sum += i

print(sum)
``````

My program changes all multiples of every number below the range to None, which should eliminate all composites and leave only primes.

When I plug in a simple number for range_number like 10, I get the wrong answer. Instead of just posting your own program, please tell me where I went wrong. Other posts mentioned using the square root, but I didn't really get that.

Thanks.

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## marked as duplicate by Wooble, bernie, Brad Mace, Jeff Mercado, GravitonJul 2 '11 at 4:37

There's no way this is your actual code; you can't assign an integer to `range` and then try to call `range()`. You don't get the wrong answer, you get an exception telling you that integers aren't callable. –  Wooble Jul 2 '11 at 4:11
You're right, I just added the variable for clarity. Thank, I'll fix it. –  LonelyWebCrawler Jul 2 '11 at 4:13
The function is_prime(a) on that post is different, it checks every number smaller than the input if it is a factor, and that is too long for my program. –  LonelyWebCrawler Jul 2 '11 at 4:16
Why are you using `for i in range(2, range_number): numbers.append(i)` instead of `numbers = range(2, range_number)` (or `numbers = list(range2, range_number))` for newer Pythons)? –  Chris Lutz Jul 2 '11 at 4:19
Guess that works too, thanks. –  LonelyWebCrawler Jul 2 '11 at 4:19

Your problem is that you never eliminate the last number in numbers. If range_number is 21, then len(numbers) is 20 and len(numbers)-1 is 19. So this line here:

``````for n in range(i + numbers[i], len(numbers)-1, numbers[i]):
``````

Never actually removes the number 20 from the list. You could have seen this if you'd printed out the list. So currently your solution gives the correct answer if range_number is one more than a prime number, but is off by range_number-1 when range_number is one more than a composite.

To fix that problem, simply change the line to be:

``````for n in range(i + numbers[i], len(numbers), numbers[i]):
``````
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I finally got the correct answer, which is 142,913,828,922. Thank you! –  LonelyWebCrawler Jul 2 '11 at 4:29