My implementation of the Sieve of Eratosthenes is flawed?

I am making a Sieve of Eratosthenes implementation in Python. A problem that occurs is not all primes appear (mainly the lower numbered ones).

Here is my code:

``````def prevPrimes(n):
from math import sqrt
from time import time
start = time()
if type(n) != int and type(n) != long:
raise TypeError("Arg (n) must be of <type 'int'> or <type 'long'>")
if n <= 2:
raise ValueError("Arg (n) must be at least 2")
limit, x, num, primes = sqrt(n), 2, {}, []
for i in range(1, n+1):
num[i] = True
while x < limit:
for i in num:
if i%x==0:
num[i] = False
x += 1
for i in num:
if num[i]:
primes.append(i)
end = time()
primes = sorted(primes)
print round((end - start), 2), ' seconds'
return primes
``````

If I input `>>> prevPrimes(1000)`, I would expect the result to start out as: `[2, 3, 5, 7, 11, 13, 17]` etc. However, this is what it looks like: `[1, 37, 41, 43, 47, #more numbers]`.

I know that the issue lies in the fact that it is stating the 'original' primes (2, 3, 5, 7, 11, 13, 17, etc.) as `False` because of the way my program checks for the primes. How can I avoid this? Thanks in advance :)

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That is not the sieve of Eratosthenes, by the way. The real algorithm doesn't use `%` at all. This is just trial division. –  hammar Nov 21 '12 at 5:40

So that wasn't an actual SoE implementation, one I wrote a while ago is below.

``````number_primes = 10
prime_list = [True]*number_primes

for i in range (2, number_primes):    #check from 2 upwards
if prime_list[i]:                   #If not prime, don't need to bother about searching
j = 2
while j*i < number_primes:        # Filter out all factors of i (2...n * prime)
prime_list[j*i] = False
j+=1
``````
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Sometimes when you iterate through `num`, `x` is equal to `i`, so `i % x` equals 0, and `i` gets marked as a non-prime.

You need to add `if not x == i:` somewhere in your while loop, e.g.:

``````while x < limit:
for i in num:
if not x == i:
if num[i] and i%x==0:
num[i] = False
``````
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Also, while this may well find primes, it's not really using the Sieve of Eratosthenes method, it's more of a brute-force method. –  Marius Nov 21 '12 at 5:42

First, the answer to your specific question. You are discarding the primes less than the square root of n. The easiest fix is to change the line `num[i] = False` to `num[i] = (not x == i)` at the end of your inner loop (I think that works, I haven't tested it).

Second, your algorithm is trial division, not the Sieve of Eratosthenes, and will have time complexity O(n^2) instead of O(n log log n). The modulo operator gives the game away. The simplest Sieve of Eratosthenes looks like this (pseudocode, which you can translate into Python):

``````function primes(n)
sieve := makeArray(2..n, True)
for p from 2 to n step 1
output p
for i from p+p to n step p
sieve[i] := False
``````

There are ways to improve that algorithm. If you're interested in programming with prime numbers, I modestly recommend this essay, which includes an optimized Sieve of Eratosthenes with implementation in Python.

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