# My sieve of eratosthenes implementation in Python [closed]

Could you please take a look at my implementation of the sieve of eratosthenes in Python and tell me how can I improve/optimize it?

I'm a beginner in programming, so I don't have any ideas how to optimize it, and I'd really appreciate it if you check it out and tell me what can be improved.

``````# -*- coding: utf-8 -*-
"""
Created on Fri Sep 27 19:57:14 2013

@author: stefan
"""
def sqrt_int(n):
n = n**0.5
if n == int(n):
return True
else:
return False

def cbrt_int(n):
n = n**(1.0/3)
if n == int(n):
return True
else:
return False

def sieve(limit):
first_primes = [2,3,5,7]
primes = [x for x in range (2,limit+1)]

for y in first_primes:
primes = filter(lambda x: x % y != 0, primes)

primes = filter(lambda x: not sqrt_int(x), primes)
primes = filter(lambda x: not cbrt_int(x), primes)

if limit > 10:
primes = first_primes + primes
else:
primes = filter(lambda x: x <= limit, first_primes)
return primes
``````
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Requests for improvement of existing code might get better answers on codereview.stackexchange.com –  Robᵩ Sep 27 at 19:26

## closed as off-topic by Robᵩ, Generic Holiday Name, Blastfurnace, HansUp, miki725Sep 27 at 20:18

• This question does not appear to be about programming within the scope defined in the help center.
If this question can be reworded to fit the rules in the help center, please edit the question.

Here is a much simpler version of the Sieve of Eratosthenes:

``````def primes(n): # sieve of eratosthenes
ps, sieve = [], [True] * (n + 1)
for p in range(2, n + 1):
if sieve[p]:
ps.append(p)
for i in range(p * p, n + 1, p):
sieve[i] = False
return ps
``````

There are ways to make that run faster without too much complexity. If you are interested in programming with prime numbers, I modestly recommend this essay at my blog.

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Thanks, I will check it out. I figured out mine doesn't even work correctly for huge numbers. –  Stefan P. Sep 27 at 19:29