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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
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3 Answers

up vote 0 down vote accepted

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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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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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
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