# Fastest way to list all primes below N

This is the best algorithm I could come up.

``````def get_primes(n):
numbers = set(range(n, 1, -1))
primes = []
while numbers:
p = numbers.pop()
primes.append(p)
numbers.difference_update(set(range(p*2, n+1, p)))
return primes

>>> timeit.Timer(stmt='get_primes.get_primes(1000000)', setup='import   get_primes').timeit(1)
1.1499958793645562
``````

Can it be made even faster?

This code has a flaw: Since `numbers` is an unordered set, there is no guarantee that `numbers.pop()` will remove the lowest number from the set. Nevertheless, it works (at least for me) for some input numbers:

``````>>> sum(get_primes(2000000))
142913828922L
#That's the correct sum of all numbers below 2 million
>>> 529 in get_primes(1000)
False
>>> 529 in get_primes(530)
True
``````
• Code sniplet in question is much faster if numbers declared like numbers = set(range(n, 2, -2)). But can't beat sundaram3. Thanks for the question. – Shekhar Jan 23 '10 at 14:51
• It'd be nice if there could be Python 3 versions of the functions in the answers. – Michael Foukarakis Sep 10 '11 at 15:19
• Surely there's a library to do this so we don't have to roll our own> xkcd promised Python is as simple as `import antigravity`. Isn't there anything like `require 'prime'; Prime.take(10)` (Ruby)? – Colonel Panic Nov 10 '12 at 17:09
• @ColonelPanic As it so happens I updated github.com/jaredks/pyprimesieve for Py3 and added to PyPi. It's certainly faster than these but not orders of magnitude - more like ~5x faster than the best numpy versions. – Jared Jul 8 '15 at 1:48
• @ColonelPanic: I think editing old answers to note that they've aged is appropriate, since that makes it a more useful resource. If the "accepted" answer is no longer the best one, maybe edit a note into the question with a 2015 update to point people at the current best method. – Peter Cordes Jul 18 '15 at 18:28

Warning: `timeit` results may vary due to differences in hardware or version of Python.

Below is a script which compares a number of implementations:

Many thanks to stephan for bringing sieve_wheel_30 to my attention. Credit goes to Robert William Hanks for primesfrom2to, primesfrom3to, rwh_primes, rwh_primes1, and rwh_primes2.

Of the plain Python methods tested, with psyco, for n=1000000, rwh_primes1 was the fastest tested.

``````+---------------------+-------+
| Method              | ms    |
+---------------------+-------+
| rwh_primes1         | 43.0  |
| sieveOfAtkin        | 46.4  |
| rwh_primes          | 57.4  |
| sieve_wheel_30      | 63.0  |
| rwh_primes2         | 67.8  |
| sieveOfEratosthenes | 147.0 |
| ambi_sieve_plain    | 152.0 |
| sundaram3           | 194.0 |
+---------------------+-------+
``````

Of the plain Python methods tested, without psyco, for n=1000000, rwh_primes2 was the fastest.

``````+---------------------+-------+
| Method              | ms    |
+---------------------+-------+
| rwh_primes2         | 68.1  |
| rwh_primes1         | 93.7  |
| rwh_primes          | 94.6  |
| sieve_wheel_30      | 97.4  |
| sieveOfEratosthenes | 178.0 |
| ambi_sieve_plain    | 286.0 |
| sieveOfAtkin        | 314.0 |
| sundaram3           | 416.0 |
+---------------------+-------+
``````

Of all the methods tested, allowing numpy, for n=1000000, primesfrom2to was the fastest tested.

``````+---------------------+-------+
| Method              | ms    |
+---------------------+-------+
| primesfrom2to       | 15.9  |
| primesfrom3to       | 18.4  |
| ambi_sieve          | 29.3  |
+---------------------+-------+
``````

Timings were measured using the command:

``````python -mtimeit -s"import primes" "primes.{method}(1000000)"
``````

with `{method}` replaced by each of the method names.

primes.py:

``````#!/usr/bin/env python
import psyco; psyco.full()
from math import sqrt, ceil
import numpy as np

def rwh_primes(n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/3035188#3035188
""" Returns  a list of primes < n """
sieve = [True] * n
for i in xrange(3,int(n**0.5)+1,2):
if sieve[i]:
sieve[i*i::2*i]=[False]*((n-i*i-1)/(2*i)+1)
return [2] + [i for i in xrange(3,n,2) if sieve[i]]

def rwh_primes1(n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/3035188#3035188
""" Returns  a list of primes < n """
sieve = [True] * (n/2)
for i in xrange(3,int(n**0.5)+1,2):
if sieve[i/2]:
sieve[i*i/2::i] = [False] * ((n-i*i-1)/(2*i)+1)
return [2] + [2*i+1 for i in xrange(1,n/2) if sieve[i]]

def rwh_primes2(n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/3035188#3035188
""" Input n>=6, Returns a list of primes, 2 <= p < n """
correction = (n%6>1)
n = {0:n,1:n-1,2:n+4,3:n+3,4:n+2,5:n+1}[n%6]
sieve = [True] * (n/3)
sieve[0] = False
for i in xrange(int(n**0.5)/3+1):
if sieve[i]:
k=3*i+1|1
sieve[      ((k*k)/3)      ::2*k]=[False]*((n/6-(k*k)/6-1)/k+1)
sieve[(k*k+4*k-2*k*(i&1))/3::2*k]=[False]*((n/6-(k*k+4*k-2*k*(i&1))/6-1)/k+1)
return [2,3] + [3*i+1|1 for i in xrange(1,n/3-correction) if sieve[i]]

def sieve_wheel_30(N):
# http://zerovolt.com/?p=88
''' Returns a list of primes <= N using wheel criterion 2*3*5 = 30

This code is free for non-commercial purposes, in which case you can just leave this comment as a credit for my work.
If you need this code for commercial purposes, please contact me by sending an email to: info [at] zerovolt [dot] com.'''
__smallp = ( 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, 47, 53, 59,
61, 67, 71, 73, 79, 83, 89, 97, 101, 103, 107, 109, 113, 127, 131, 137, 139,
149, 151, 157, 163, 167, 173, 179, 181, 191, 193, 197, 199, 211, 223, 227,
229, 233, 239, 241, 251, 257, 263, 269, 271, 277, 281, 283, 293, 307, 311,
313, 317, 331, 337, 347, 349, 353, 359, 367, 373, 379, 383, 389, 397, 401,
409, 419, 421, 431, 433, 439, 443, 449, 457, 461, 463, 467, 479, 487, 491,
499, 503, 509, 521, 523, 541, 547, 557, 563, 569, 571, 577, 587, 593, 599,
601, 607, 613, 617, 619, 631, 641, 643, 647, 653, 659, 661, 673, 677, 683,
691, 701, 709, 719, 727, 733, 739, 743, 751, 757, 761, 769, 773, 787, 797,
809, 811, 821, 823, 827, 829, 839, 853, 857, 859, 863, 877, 881, 883, 887,
907, 911, 919, 929, 937, 941, 947, 953, 967, 971, 977, 983, 991, 997)

wheel = (2, 3, 5)
const = 30
if N < 2:
return []
if N <= const:
pos = 0
while __smallp[pos] <= N:
pos += 1
return list(__smallp[:pos])
# make the offsets list
offsets = (7, 11, 13, 17, 19, 23, 29, 1)
# prepare the list
p = [2, 3, 5]
dim = 2 + N // const
tk1  = [True] * dim
tk7  = [True] * dim
tk11 = [True] * dim
tk13 = [True] * dim
tk17 = [True] * dim
tk19 = [True] * dim
tk23 = [True] * dim
tk29 = [True] * dim
tk1[0] = False
# help dictionary d
# d[a , b] = c  ==> if I want to find the smallest useful multiple of (30*pos)+a
# on tkc, then I need the index given by the product of [(30*pos)+a][(30*pos)+b]
# in general. If b < a, I need [(30*pos)+a][(30*(pos+1))+b]
d = {}
for x in offsets:
for y in offsets:
res = (x*y) % const
if res in offsets:
d[(x, res)] = y
# another help dictionary: gives tkx calling tmptk[x]
tmptk = {1:tk1, 7:tk7, 11:tk11, 13:tk13, 17:tk17, 19:tk19, 23:tk23, 29:tk29}
pos, prime, lastadded, stop = 0, 0, 0, int(ceil(sqrt(N)))
# inner functions definition
def del_mult(tk, start, step):
for k in xrange(start, len(tk), step):
tk[k] = False
# end of inner functions definition
cpos = const * pos
while prime < stop:
# 30k + 7
if tk7[pos]:
prime = cpos + 7
p.append(prime)
for off in offsets:
tmp = d[(7, off)]
start = (pos + prime) if off == 7 else (prime * (const * (pos + 1 if tmp < 7 else 0) + tmp) )//const
del_mult(tmptk[off], start, prime)
# 30k + 11
if tk11[pos]:
prime = cpos + 11
p.append(prime)
for off in offsets:
tmp = d[(11, off)]
start = (pos + prime) if off == 11 else (prime * (const * (pos + 1 if tmp < 11 else 0) + tmp) )//const
del_mult(tmptk[off], start, prime)
# 30k + 13
if tk13[pos]:
prime = cpos + 13
p.append(prime)
for off in offsets:
tmp = d[(13, off)]
start = (pos + prime) if off == 13 else (prime * (const * (pos + 1 if tmp < 13 else 0) + tmp) )//const
del_mult(tmptk[off], start, prime)
# 30k + 17
if tk17[pos]:
prime = cpos + 17
p.append(prime)
for off in offsets:
tmp = d[(17, off)]
start = (pos + prime) if off == 17 else (prime * (const * (pos + 1 if tmp < 17 else 0) + tmp) )//const
del_mult(tmptk[off], start, prime)
# 30k + 19
if tk19[pos]:
prime = cpos + 19
p.append(prime)
for off in offsets:
tmp = d[(19, off)]
start = (pos + prime) if off == 19 else (prime * (const * (pos + 1 if tmp < 19 else 0) + tmp) )//const
del_mult(tmptk[off], start, prime)
# 30k + 23
if tk23[pos]:
prime = cpos + 23
p.append(prime)
for off in offsets:
tmp = d[(23, off)]
start = (pos + prime) if off == 23 else (prime * (const * (pos + 1 if tmp < 23 else 0) + tmp) )//const
del_mult(tmptk[off], start, prime)
# 30k + 29
if tk29[pos]:
prime = cpos + 29
p.append(prime)
for off in offsets:
tmp = d[(29, off)]
start = (pos + prime) if off == 29 else (prime * (const * (pos + 1 if tmp < 29 else 0) + tmp) )//const
del_mult(tmptk[off], start, prime)
pos += 1
cpos = const * pos
# 30k + 1
if tk1[pos]:
prime = cpos + 1
p.append(prime)
for off in offsets:
tmp = d[(1, off)]
start = (pos + prime) if off == 1 else (prime * (const * pos + tmp) )//const
del_mult(tmptk[off], start, prime)
# time to add remaining primes
# if lastadded == 1, remove last element and start adding them from tk1
# this way we don't need an "if" within the last while
p.pop()
# now complete for every other possible prime
while pos < len(tk1):
cpos = const * pos
if tk1[pos]: p.append(cpos + 1)
if tk7[pos]: p.append(cpos + 7)
if tk11[pos]: p.append(cpos + 11)
if tk13[pos]: p.append(cpos + 13)
if tk17[pos]: p.append(cpos + 17)
if tk19[pos]: p.append(cpos + 19)
if tk23[pos]: p.append(cpos + 23)
if tk29[pos]: p.append(cpos + 29)
pos += 1
# remove exceeding if present
pos = len(p) - 1
while p[pos] > N:
pos -= 1
if pos < len(p) - 1:
del p[pos+1:]
# return p list
return p

def sieveOfEratosthenes(n):
"""sieveOfEratosthenes(n): return the list of the primes < n."""
# Code from: <dickinsm@gmail.com>, Nov 30 2006
if n <= 2:
return []
sieve = range(3, n, 2)
top = len(sieve)
for si in sieve:
if si:
bottom = (si*si - 3) // 2
if bottom >= top:
break
sieve[bottom::si] = [0] * -((bottom - top) // si)
return [2] + [el for el in sieve if el]

def sieveOfAtkin(end):
"""sieveOfAtkin(end): return a list of all the prime numbers <end
using the Sieve of Atkin."""
# Code by Steve Krenzel, <Sgk284@gmail.com>, improved
# Code: https://web.archive.org/web/20080324064651/http://krenzel.info/?p=83
# Info: http://en.wikipedia.org/wiki/Sieve_of_Atkin
assert end > 0
lng = ((end-1) // 2)
sieve = [False] * (lng + 1)

x_max, x2, xd = int(sqrt((end-1)/4.0)), 0, 4
for xd in xrange(4, 8*x_max + 2, 8):
x2 += xd
y_max = int(sqrt(end-x2))
n, n_diff = x2 + y_max*y_max, (y_max << 1) - 1
if not (n & 1):
n -= n_diff
n_diff -= 2
for d in xrange((n_diff - 1) << 1, -1, -8):
m = n % 12
if m == 1 or m == 5:
m = n >> 1
sieve[m] = not sieve[m]
n -= d

x_max, x2, xd = int(sqrt((end-1) / 3.0)), 0, 3
for xd in xrange(3, 6 * x_max + 2, 6):
x2 += xd
y_max = int(sqrt(end-x2))
n, n_diff = x2 + y_max*y_max, (y_max << 1) - 1
if not(n & 1):
n -= n_diff
n_diff -= 2
for d in xrange((n_diff - 1) << 1, -1, -8):
if n % 12 == 7:
m = n >> 1
sieve[m] = not sieve[m]
n -= d

x_max, y_min, x2, xd = int((2 + sqrt(4-8*(1-end)))/4), -1, 0, 3
for x in xrange(1, x_max + 1):
x2 += xd
xd += 6
if x2 >= end: y_min = (((int(ceil(sqrt(x2 - end))) - 1) << 1) - 2) << 1
n, n_diff = ((x*x + x) << 1) - 1, (((x-1) << 1) - 2) << 1
for d in xrange(n_diff, y_min, -8):
if n % 12 == 11:
m = n >> 1
sieve[m] = not sieve[m]
n += d

primes = [2, 3]
if end <= 3:
return primes[:max(0,end-2)]

for n in xrange(5 >> 1, (int(sqrt(end))+1) >> 1):
if sieve[n]:
primes.append((n << 1) + 1)
aux = (n << 1) + 1
aux *= aux
for k in xrange(aux, end, 2 * aux):
sieve[k >> 1] = False

s  = int(sqrt(end)) + 1
if s  % 2 == 0:
s += 1
primes.extend([i for i in xrange(s, end, 2) if sieve[i >> 1]])

return primes

def ambi_sieve_plain(n):
s = range(3, n, 2)
for m in xrange(3, int(n**0.5)+1, 2):
if s[(m-3)/2]:
for t in xrange((m*m-3)/2,(n>>1)-1,m):
s[t]=0
return [2]+[t for t in s if t>0]

def sundaram3(max_n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/2073279#2073279
numbers = range(3, max_n+1, 2)
half = (max_n)//2
initial = 4

for step in xrange(3, max_n+1, 2):
for i in xrange(initial, half, step):
numbers[i-1] = 0
initial += 2*(step+1)

if initial > half:
return [2] + filter(None, numbers)

################################################################################
# Using Numpy:
def ambi_sieve(n):
# http://tommih.blogspot.com/2009/04/fast-prime-number-generator.html
s = np.arange(3, n, 2)
for m in xrange(3, int(n ** 0.5)+1, 2):
if s[(m-3)/2]:
s[(m*m-3)/2::m]=0
return np.r_[2, s[s>0]]

def primesfrom3to(n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/3035188#3035188
""" Returns a array of primes, p < n """
assert n>=2
sieve = np.ones(n/2, dtype=np.bool)
for i in xrange(3,int(n**0.5)+1,2):
if sieve[i/2]:
sieve[i*i/2::i] = False
return np.r_[2, 2*np.nonzero(sieve)[0][1::]+1]

def primesfrom2to(n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/3035188#3035188
""" Input n>=6, Returns a array of primes, 2 <= p < n """
sieve = np.ones(n/3 + (n%6==2), dtype=np.bool)
sieve[0] = False
for i in xrange(int(n**0.5)/3+1):
if sieve[i]:
k=3*i+1|1
sieve[      ((k*k)/3)      ::2*k] = False
sieve[(k*k+4*k-2*k*(i&1))/3::2*k] = False
return np.r_[2,3,((3*np.nonzero(sieve)[0]+1)|1)]

if __name__=='__main__':
import itertools
import sys

def test(f1,f2,num):
print('Testing {f1} and {f2} return same results'.format(
f1=f1.func_name,
f2=f2.func_name))
if not all([a==b for a,b in itertools.izip_longest(f1(num),f2(num))]):
sys.exit("Error: %s(%s) != %s(%s)"%(f1.func_name,num,f2.func_name,num))

n=1000000
test(sieveOfAtkin,sieveOfEratosthenes,n)
test(sieveOfAtkin,ambi_sieve,n)
test(sieveOfAtkin,ambi_sieve_plain,n)
test(sieveOfAtkin,sundaram3,n)
test(sieveOfAtkin,sieve_wheel_30,n)
test(sieveOfAtkin,primesfrom3to,n)
test(sieveOfAtkin,primesfrom2to,n)
test(sieveOfAtkin,rwh_primes,n)
test(sieveOfAtkin,rwh_primes1,n)
test(sieveOfAtkin,rwh_primes2,n)
``````

Running the script tests that all implementations give the same result.

• If you're interested in non-pure-Python code, then you should check out `gmpy` -- it has pretty good support for primes, via the `next_prime` method of its `mpz` type. – Alex Martelli Jan 15 '10 at 1:41
• If you're using pypy, these benchmarks (the psyco ones) seem fairly off. Surprisingly enough, I found sieveOfEratosthenes and ambi_sieve_plain to be the fastest with pypy. This is what I found for the non-numpy ones gist.github.com/5bf466bb1ee9e5726a52 – Ehsan Kia Apr 28 '14 at 1:53
• If someone wonders how the functions here fare against PG7.8 of Wikibooks for pure python without psyco nor pypy: for n = 1000000: PG7.8: 4.93 s per loop ; rwh_primes1: 69 ms per loop ; rwh_primes2: 57.1 ms per loop – gaborous Jul 9 '15 at 13:19
• Can you update this with PyPy, now that psyco is dead and PyPy has superseded it? – noɥʇʎԀʎzɐɹƆ Dec 23 '16 at 22:20
• Would be great if these functions and timings could be updated for python3. – cs95 Nov 12 '18 at 5:22

Faster & more memory-wise pure Python code:

``````def primes(n):
""" Returns  a list of primes < n """
sieve = [True] * n
for i in range(3,int(n**0.5)+1,2):
if sieve[i]:
sieve[i*i::2*i]=[False]*((n-i*i-1)//(2*i)+1)
return [2] + [i for i in range(3,n,2) if sieve[i]]
``````

or starting with half sieve

``````def primes1(n):
""" Returns  a list of primes < n """
sieve = [True] * (n//2)
for i in range(3,int(n**0.5)+1,2):
if sieve[i//2]:
sieve[i*i//2::i] = [False] * ((n-i*i-1)//(2*i)+1)
return [2] + [2*i+1 for i in range(1,n//2) if sieve[i]]
``````

Faster & more memory-wise numpy code:

``````import numpy
def primesfrom3to(n):
""" Returns a array of primes, 3 <= p < n """
sieve = numpy.ones(n//2, dtype=numpy.bool)
for i in range(3,int(n**0.5)+1,2):
if sieve[i//2]:
sieve[i*i//2::i] = False
return 2*numpy.nonzero(sieve)[0][1::]+1
``````

a faster variation starting with a third of a sieve:

``````import numpy
def primesfrom2to(n):
""" Input n>=6, Returns a array of primes, 2 <= p < n """
sieve = numpy.ones(n//3 + (n%6==2), dtype=numpy.bool)
for i in range(1,int(n**0.5)//3+1):
if sieve[i]:
k=3*i+1|1
sieve[       k*k//3     ::2*k] = False
sieve[k*(k-2*(i&1)+4)//3::2*k] = False
return numpy.r_[2,3,((3*numpy.nonzero(sieve)[0][1:]+1)|1)]
``````

A (hard-to-code) pure-python version of the above code would be:

``````def primes2(n):
""" Input n>=6, Returns a list of primes, 2 <= p < n """
n, correction = n-n%6+6, 2-(n%6>1)
sieve = [True] * (n//3)
for i in range(1,int(n**0.5)//3+1):
if sieve[i]:
k=3*i+1|1
sieve[      k*k//3      ::2*k] = [False] * ((n//6-k*k//6-1)//k+1)
sieve[k*(k-2*(i&1)+4)//3::2*k] = [False] * ((n//6-k*(k-2*(i&1)+4)//6-1)//k+1)
return [2,3] + [3*i+1|1 for i in range(1,n//3-correction) if sieve[i]]
``````

Unfortunately pure-python don't adopt the simpler and faster numpy way of doing assignment, and calling `len()` inside the loop as in `[False]*len(sieve[((k*k)//3)::2*k])` is too slow. So I had to improvise to correct input (& avoid more math) and do some extreme (& painful) math-magic.

Personally I think it is a shame that numpy (which is so widely used) is not part of Python standard library, and that the improvements in syntax and speed seem to be completely overlooked by Python developers.

• Numpy is now compatible with Python 3. The fact that it's not in the standard library is good, that way they can have their own release cycle. – Adam Mar 24 '13 at 23:17
• to just store binary values in an array i suggest `bitarray` - as used here (for the simplest prime sieve; not a contender in the race here!) stackoverflow.com/questions/31120986/… – hiro protagonist Jul 17 '15 at 19:50
• When casting in the `primesfrom2to()` method, should the division be inside of the brackets? – 355durch113 Oct 16 '15 at 22:52
• For a pure python version compatible with python 3, follow this link : stackoverflow.com/a/33356284/2482582 – Moebius Apr 8 '16 at 20:15
• Holy buttsnacks this sucker is fast. – Him Aug 2 '19 at 7:52

There's a pretty neat sample from the Python Cookbook here -- the fastest version proposed on that URL is:

``````import itertools
def erat2( ):
D = {  }
yield 2
for q in itertools.islice(itertools.count(3), 0, None, 2):
p = D.pop(q, None)
if p is None:
D[q*q] = q
yield q
else:
x = p + q
while x in D or not (x&1):
x += p
D[x] = p
``````

so that would give

``````def get_primes_erat(n):
return list(itertools.takewhile(lambda p: p<n, erat2()))
``````

Measuring at the shell prompt (as I prefer to do) with this code in pri.py, I observe:

``````\$ python2.5 -mtimeit -s'import pri' 'pri.get_primes(1000000)'
10 loops, best of 3: 1.69 sec per loop
\$ python2.5 -mtimeit -s'import pri' 'pri.get_primes_erat(1000000)'
10 loops, best of 3: 673 msec per loop
``````

so it looks like the Cookbook solution is over twice as fast.

• @jbochi, you're welcome -- but do look at that URL, including the credits: it took ten of us to collectively refine the code to this point, including Python-performance luminaries such as Tim Peters and Raymond Hettinger (I wrote the final text of the recipe since I edited the printed Cookbook, but in terms of coding my contribution was on a par with the others') -- in the end, it's really subtle and finely tuned code, and that's not surprising!-) – Alex Martelli Jan 14 '10 at 23:59
• @Alex: Knowing that your code is "only" twice as fast as mine, makes me pretty proud then. :) The URL was also very interesting to read. Thanks again. – jbochi Jan 15 '10 at 0:13
• And it can be made even faster with a minor change: see stackoverflow.com/questions/2211990/… – tzot Sep 26 '10 at 3:02
• ... And it can be made yet faster with additional ~1.2x-1.3x speedup, drastic reduction in memory footprint from O(n) to O(sqrt(n)) and improvement in empirical time complexity, by postponing the addition of primes to the dict until their square is seen in the input. Test it here. – Will Ness Aug 2 '12 at 22:28

Using Sundaram's Sieve, I think I broke pure-Python's record:

``````def sundaram3(max_n):
numbers = range(3, max_n+1, 2)
half = (max_n)//2
initial = 4

for step in xrange(3, max_n+1, 2):
for i in xrange(initial, half, step):
numbers[i-1] = 0
initial += 2*(step+1)

if initial > half:
return [2] + filter(None, numbers)
``````

Comparasion:

``````C:\USERS>python -m timeit -n10 -s "import get_primes" "get_primes.get_primes_erat(1000000)"
10 loops, best of 3: 710 msec per loop

C:\USERS>python -m timeit -n10 -s "import get_primes" "get_primes.daniel_sieve_2(1000000)"
10 loops, best of 3: 435 msec per loop

C:\USERS>python -m timeit -n10 -s "import get_primes" "get_primes.sundaram3(1000000)"
10 loops, best of 3: 327 msec per loop
``````
• I managed to speed up your function about 20% by adding "zero = 0" at the top of the function and then replacing the lambda in your filter with "zero.__sub__". Not the prettiest code in the world, but a bit faster :) – truppo Jan 20 '10 at 10:34
• @truppo: Thanks for your comment! I just realized that passing `None` instead of the original function works and it's even faster than `zero.__sub__` – jbochi Jan 20 '10 at 11:08
• Did you know that if you pass `sundaram3(9)` it will return `[2, 3, 5, 7, 9]`? It seems to do this with numerous -- perhaps all -- odd numbers (even when they aren't prime) – wrhall Sep 21 '13 at 23:57
• it has an issue: sundaram3(7071) includes 7071 while it is not prime – bigOther Jan 7 '16 at 7:08

The algorithm is fast, but it has a serious flaw:

``````>>> sorted(get_primes(530))
[2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, 47, 53, 59, 61, 67, 71, 73,
79, 83, 89, 97, 101, 103, 107, 109, 113, 127, 131, 137, 139, 149, 151, 157, 163,
167, 173, 179, 181, 191, 193, 197, 199, 211, 223, 227, 229, 233, 239, 241, 251,
257, 263, 269, 271, 277, 281, 283, 293, 307, 311, 313, 317, 331, 337, 347, 349,
353, 359, 367, 373, 379, 383, 389, 397, 401, 409, 419, 421, 431, 433, 439, 443,
449, 457, 461, 463, 467, 479, 487, 491, 499, 503, 509, 521, 523, 527, 529]
>>> 17*31
527
>>> 23*23
529
``````

You assume that `numbers.pop()` would return the smallest number in the set, but this is not guaranteed at all. Sets are unordered and `pop()` removes and returns an arbitrary element, so it cannot be used to select the next prime from the remaining numbers.

For truly fastest solution with sufficiently large N would be to download a pre-calculated list of primes, store it as a tuple and do something like:

``````for pos,i in enumerate(primes):
if i > N:
print primes[:pos]
``````

If `N > primes[-1]` only then calculate more primes and save the new list in your code, so next time it is equally as fast.

Always think outside the box.

• To be fair, though, you'd have to count the time downloading, unzipping, and formatting the primes and compare that with the time to generate primes using an algorithm - any one of these algorithms could easily write the results to a file for later use. I think in that case, given enough memory to actually calculate all primes less than 982,451,653, the numpy solution would still be faster. – Daniel G Jan 15 '10 at 8:49
• @Daniel correct. However the store what you have and continue whenever needed still stands... – Kimvais Jan 15 '10 at 10:11
• @Daniel G I think download time is irrelevant. Isn't it really about generating the numbers, so you would want to take into account the algorithm used to create that list you're downloading. And any time complexity would ignore the once of file transfer given it O(n). – Ross Oct 22 '14 at 22:56
• The FAQ for the UTM prime page suggests calculating small primes is faster than reading them off a disk (the question is what small means). – Batman May 23 '17 at 0:59

If you don't want to reinvent the wheel, you can install the symbolic maths library sympy (yes it's Python 3 compatible)

``````pip install sympy
``````

And use the primerange function

``````from sympy import sieve
primes = list(sieve.primerange(1, 10**6))
``````
• I notice this prints the whole list, whereas from the community wiki answer `primesfrom2to(10000)` returns `[ 2 3 5 ... 9949 9967 9973]`. Is that shortening a NumPy `nd.array` thing? – lukejanicke Aug 4 '20 at 19:15

If you accept itertools but not numpy, here is an adaptation of rwh_primes2 for Python 3 that runs about twice as fast on my machine. The only substantial change is using a bytearray instead of a list for the boolean, and using compress instead of a list comprehension to build the final list. (I'd add this as a comment like moarningsun if I were able.)

``````import itertools
izip = itertools.zip_longest
chain = itertools.chain.from_iterable
compress = itertools.compress
def rwh_primes2_python3(n):
""" Input n>=6, Returns a list of primes, 2 <= p < n """
zero = bytearray([False])
size = n//3 + (n % 6 == 2)
sieve = bytearray([True]) * size
sieve[0] = False
for i in range(int(n**0.5)//3+1):
if sieve[i]:
k=3*i+1|1
start = (k*k+4*k-2*k*(i&1))//3
sieve[(k*k)//3::2*k]=zero*((size - (k*k)//3 - 1) // (2 * k) + 1)
sieve[  start ::2*k]=zero*((size -   start  - 1) // (2 * k) + 1)
ans = [2,3]
poss = chain(izip(*[range(i, n, 6) for i in (1,5)]))
ans.extend(compress(poss, sieve))
return ans
``````

Comparisons:

``````>>> timeit.timeit('primes.rwh_primes2(10**6)', setup='import primes', number=1)
0.0652179726976101
>>> timeit.timeit('primes.rwh_primes2_python3(10**6)', setup='import primes', number=1)
0.03267321276325674
``````

and

``````>>> timeit.timeit('primes.rwh_primes2(10**8)', setup='import primes', number=1)
6.394284538007014
>>> timeit.timeit('primes.rwh_primes2_python3(10**8)', setup='import primes', number=1)
3.833829450302801
``````

It's instructive to write your own prime finding code, but it's also useful to have a fast reliable library at hand. I wrote a wrapper around the C++ library primesieve, named it primesieve-python

Try it `pip install primesieve`

``````import primesieve
primes = primesieve.generate_primes(10**8)
``````

I'd be curious to see the speed compared.

• It's not exactly what OP ordered but I fail to see why the downvote. It's a 2.8sec solution unlike some other outside modules. I've noticed in the source that it's threaded, got any tests on how well it scales? – ljetibo Jul 14 '15 at 7:24
• @ljetibo cheers. The bottleneck seems to be copying C++ vector to Python list, thus the `count_primes` function is much faster than `generate_primes` – Colonel Panic Jul 14 '15 at 8:19
• On my computer it can comfortably generate primes up to 1e8 (it gives MemoryError for 1e9) , and count primes up to 1e10. @HappyLeapSecond above compares algorithms for 1e6 – Colonel Panic Jul 14 '15 at 8:30

Here is two updated (pure Python 3.6) versions of one of the fastest functions,

``````from itertools import compress

def rwh_primes1v1(n):
""" Returns  a list of primes < n for n > 2 """
sieve = bytearray([True]) * (n//2)
for i in range(3,int(n**0.5)+1,2):
if sieve[i//2]:
sieve[i*i//2::i] = bytearray((n-i*i-1)//(2*i)+1)
return [2,*compress(range(3,n,2), sieve[1:])]

def rwh_primes1v2(n):
""" Returns a list of primes < n for n > 2 """
sieve = bytearray([True]) * (n//2+1)
for i in range(1,int(n**0.5)//2+1):
if sieve[i]:
sieve[2*i*(i+1)::2*i+1] = bytearray((n//2-2*i*(i+1))//(2*i+1)+1)
return [2,*compress(range(3,n,2), sieve[1:])]
``````

A deterministic implementation of Miller-Rabin's Primality test on the assumption that N < 9,080,191

``````import sys
import random

def miller_rabin_pass(a, n):
d = n - 1
s = 0
while d % 2 == 0:
d >>= 1
s += 1

a_to_power = pow(a, d, n)
if a_to_power == 1:
return True
for i in xrange(s-1):
if a_to_power == n - 1:
return True
a_to_power = (a_to_power * a_to_power) % n
return a_to_power == n - 1

def miller_rabin(n):
for a in [2, 3, 37, 73]:
if not miller_rabin_pass(a, n):
return False
return True

n = int(sys.argv[1])
primes = [2]
for p in range(3,n,2):
if miller_rabin(p):
primes.append(p)
print len(primes)
``````

According to the article on Wikipedia (http://en.wikipedia.org/wiki/Miller–Rabin_primality_test) testing N < 9,080,191 for a = 2,3,37, and 73 is enough to decide whether N is composite or not.

And I adapted the source code from the probabilistic implementation of original Miller-Rabin's test found here: http://en.literateprograms.org/Miller-Rabin_primality_test_(Python)

• Thank's for the Miller-Rabin primality test, but this code is actually slower and is not providing the correct results. 37 is prime and does not pass the test. – jbochi Jan 21 '10 at 10:07
• I guess 37 is one of the special cases, my bad. I was hopeful about the deterministic version though :) – Ruggiero Spearman Jan 21 '10 at 11:07
• There isn't any special case for rabin miller. – Misguided Nov 26 '13 at 23:37
• You misread the article. It is 31, not 37. This is why your implementation fails. – Logan Dec 24 '13 at 22:36

If you have control over N, the very fastest way to list all primes is to precompute them. Seriously. Precomputing is a way overlooked optimization.

Here's the code I normally use to generate primes in Python:

``````\$ python -mtimeit -s'import sieve' 'sieve.sieve(1000000)'
10 loops, best of 3: 445 msec per loop
\$ cat sieve.py
from math import sqrt

def sieve(size):
prime=[True]*size
rng=xrange
limit=int(sqrt(size))

for i in rng(3,limit+1,+2):
if prime[i]:
prime[i*i::+i]=[False]*len(prime[i*i::+i])

return [2]+[i for i in rng(3,size,+2) if prime[i]]

if __name__=='__main__':
print sieve(100)
``````

It can't compete with the faster solutions posted here, but at least it is pure python.

Thanks for posting this question. I really learnt a lot today.

For the fastest code, the numpy solution is the best. For purely academic reasons, though, I'm posting my pure python version, which is a bit less than 50% faster than the cookbook version posted above. Since I make the entire list in memory, you need enough space to hold everything, but it seems to scale fairly well.

``````def daniel_sieve_2(maxNumber):
"""
Given a number, returns all numbers less than or equal to
that number which are prime.
"""
allNumbers = range(3, maxNumber+1, 2)
for mIndex, number in enumerate(xrange(3, maxNumber+1, 2)):
if allNumbers[mIndex] == 0:
continue
# now set all multiples to 0
for index in xrange(mIndex+number, (maxNumber-3)/2+1, number):
allNumbers[index] = 0
return [2] + filter(lambda n: n!=0, allNumbers)
``````

And the results:

``````>>>mine = timeit.Timer("daniel_sieve_2(1000000)",
...                    "from sieves import daniel_sieve_2")
>>>prev = timeit.Timer("get_primes_erat(1000000)",
...                    "from sieves import get_primes_erat")
>>>print "Mine: {0:0.4f} ms".format(min(mine.repeat(3, 1))*1000)
Mine: 428.9446 ms
>>>print "Previous Best {0:0.4f} ms".format(min(prev.repeat(3, 1))*1000)
Previous Best 621.3581 ms
``````

A slightly different implementation of a half sieve using Numpy:

http://rebrained.com/?p=458

```import math
import numpy
def prime6(upto):
primes=numpy.arange(3,upto+1,2)
isprime=numpy.ones((upto-1)/2,dtype=bool)
for factor in primes[:int(math.sqrt(upto))]:
if isprime[(factor-2)/2]: isprime[(factor*3-2)/2:(upto-1)/2:factor]=0
return numpy.insert(primes[isprime],0,2)
```

Can someone compare this with the other timings? On my machine it seems pretty comparable to the other Numpy half-sieve.

• `upto=10**6`: `primesfrom2to()` - 7 ms; `prime6()` - 12 ms ideone.com/oDg2Y – jfs Sep 4 '10 at 1:57

It's all written and tested. So there is no need to reinvent the wheel.

``````python -m timeit -r10 -s"from sympy import sieve" "primes = list(sieve.primerange(1, 10**6))"
``````

gives us a record breaking 12.2 msec!

``````10 loops, best of 10: 12.2 msec per loop
``````

If this is not fast enough, you can try PyPy:

``````pypy -m timeit -r10 -s"from sympy import sieve" "primes = list(sieve.primerange(1, 10**6))"
``````

which results in:

``````10 loops, best of 10: 2.03 msec per loop
``````

The answer with 247 up-votes lists 15.9 ms for the best solution. Compare this!!!

I tested some unutbu's functions, i computed it with hungred millions number

The winners are the functions that use numpy library,

Note: It would also interesting make a memory utilization test :)

Sample code

Complete code on my github repository

``````#!/usr/bin/env python

import lib
import timeit
import sys
import math
import datetime

import prettyplotlib as ppl
import numpy as np

import matplotlib.pyplot as plt
from prettyplotlib import brewer2mpl

'sieveOfEratosthenes',
'ambi_sieve',
'ambi_sieve_plain',
'sundaram3',
'sieve_wheel_30',
'primesfrom3to',
'primesfrom2to',
'rwh_primes',
'rwh_primes1',
'rwh_primes2',
]

def human_format(num):
magnitude = 0
while abs(num) >= 1000:
magnitude += 1
num /= 1000.0
# add more suffixes if you need them
return '%.2f%s' % (num, ['', 'K', 'M', 'G', 'T', 'P'][magnitude])

if __name__=='__main__':

# Vars
n = 10000000 # number itereration generator
nbcol = 5 # For decompose prime number generator
nb_benchloop = 3 # Eliminate false positive value during the test (bench average time)
datetimeformat = '%Y-%m-%d %H:%M:%S.%f'
config = 'from __main__ import n; import lib'
'sieveOfEratosthenes': {'color': 'b'},
'ambi_sieve': {'color': 'b'},
'ambi_sieve_plain': {'color': 'b'},
'sundaram3': {'color': 'b'},
'sieve_wheel_30': {'color': 'b'},
# # #        'primesfrom2to': {'color': 'b'},
'primesfrom3to': {'color': 'b'},
# 'rwh_primes': {'color': 'b'},
# 'rwh_primes1': {'color': 'b'},
'rwh_primes2': {'color': 'b'},
}

# Get n in command line
if len(sys.argv)>1:
n = int(sys.argv[1])

step = int(math.ceil(n / float(nbcol)))
nbs = np.array([i * step for i in range(1, int(nbcol) + 1)])
set2 = brewer2mpl.get_map('Paired', 'qualitative', 12).mpl_colors

print datetime.datetime.now().strftime(datetimeformat)
print("Compute prime number to %(n)s" % locals())
print("")

results = dict()
results[pgen] = dict()
benchtimes = list()
for n in nbs:
t = timeit.Timer("lib.%(pgen)s(n)" % locals(), setup=config)
execute_times = t.repeat(repeat=nb_benchloop,number=1)
benchtime = np.mean(execute_times)
benchtimes.append(benchtime)
results[pgen] = {'benchtimes':np.array(benchtimes)}

fig, ax = plt.subplots(1)
plt.ylabel('Computation time (in second)')
plt.xlabel('Numbers computed')
i = 0

bench = results[pgen]['benchtimes']
avgs = np.divide(bench,nbs)
avg = np.average(bench, weights=nbs)

# Compute linear regression
A = np.vstack([nbs, np.ones(len(nbs))]).T
a, b = np.linalg.lstsq(A, nbs*avgs)[0]

# Plot
i += 1
#label="%(pgen)s" % locals()
#ppl.plot(nbs, nbs*avgs, label=label, lw=1, linestyle='--', color=set2[i % 12])
label="%(pgen)s avg" % locals()
ppl.plot(nbs, a * nbs + b, label=label, lw=2, color=set2[i % 12])
print datetime.datetime.now().strftime(datetimeformat)

ppl.legend(ax, loc='upper left', ncol=4)

# Change x axis label
ax.get_xaxis().get_major_formatter().set_scientific(False)
fig.canvas.draw()
labels = [human_format(int(item.get_text())) for item in ax.get_xticklabels()]

ax.set_xticklabels(labels)
ax = plt.gca()

plt.show()
``````

For Python 3

``````def rwh_primes2(n):
correction = (n%6>1)
n = {0:n,1:n-1,2:n+4,3:n+3,4:n+2,5:n+1}[n%6]
sieve = [True] * (n//3)
sieve[0] = False
for i in range(int(n**0.5)//3+1):
if sieve[i]:
k=3*i+1|1
sieve[      ((k*k)//3)      ::2*k]=[False]*((n//6-(k*k)//6-1)//k+1)
sieve[(k*k+4*k-2*k*(i&1))//3::2*k]=[False]*((n//6-(k*k+4*k-2*k*(i&1))//6-1)//k+1)
return [2,3] + [3*i+1|1 for i in range(1,n//3-correction) if sieve[i]]
``````

Fastest prime sieve in Pure Python:

``````from itertools import compress

def half_sieve(n):
"""
Returns a list of prime numbers less than `n`.
"""
if n <= 2:
return []
sieve = bytearray([True]) * (n // 2)
for i in range(3, int(n ** 0.5) + 1, 2):
if sieve[i // 2]:
sieve[i * i // 2::i] = bytearray((n - i * i - 1) // (2 * i) + 1)
primes = list(compress(range(1, n, 2), sieve))
primes[0] = 2
return primes
``````

I optimised Sieve of Eratosthenes for speed and memory.

# Benchmark

``````from time import clock
import platform

def benchmark(iterations, limit):
start = clock()
for x in range(iterations):
half_sieve(limit)
end = clock() - start
print(f'{end/iterations:.4f} seconds for primes < {limit}')

if __name__ == '__main__':
print(platform.python_version())
print(platform.platform())
print(platform.processor())
it = 10
for pw in range(4, 9):
benchmark(it, 10**pw)
``````

Output

``````>>> 3.6.7
>>> Windows-10-10.0.17763-SP0
>>> Intel64 Family 6 Model 78 Stepping 3, GenuineIntel
>>> 0.0003 seconds for primes < 10000
>>> 0.0021 seconds for primes < 100000
>>> 0.0204 seconds for primes < 1000000
>>> 0.2389 seconds for primes < 10000000
>>> 2.6702 seconds for primes < 100000000
``````

I've updated much of the code for Python 3 and threw it at perfplot (a project of mine) to see which is actually fastest. Turns out that, for large `n`, `primesfrom{2,3}to` takes the cake:

Code to reproduce the plot:

``````import perfplot
from math import sqrt, ceil
import numpy as np
import sympy

def rwh_primes(n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/3035188#3035188
""" Returns  a list of primes < n """
sieve = [True] * n
for i in range(3, int(n ** 0.5) + 1, 2):
if sieve[i]:
sieve[i * i::2 * i] = [False] * ((n - i * i - 1) // (2 * i) + 1)
return [2] + [i for i in range(3, n, 2) if sieve[i]]

def rwh_primes1(n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/3035188#3035188
""" Returns  a list of primes < n """
sieve = [True] * (n // 2)
for i in range(3, int(n ** 0.5) + 1, 2):
if sieve[i // 2]:
sieve[i * i // 2::i] = [False] * ((n - i * i - 1) // (2 * i) + 1)
return [2] + [2 * i + 1 for i in range(1, n // 2) if sieve[i]]

def rwh_primes2(n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/3035188#3035188
"""Input n>=6, Returns a list of primes, 2 <= p < n"""
assert n >= 6
correction = n % 6 > 1
n = {0: n, 1: n - 1, 2: n + 4, 3: n + 3, 4: n + 2, 5: n + 1}[n % 6]
sieve = [True] * (n // 3)
sieve[0] = False
for i in range(int(n ** 0.5) // 3 + 1):
if sieve[i]:
k = 3 * i + 1 | 1
sieve[((k * k) // 3)::2 * k] = [False] * (
(n // 6 - (k * k) // 6 - 1) // k + 1
)
sieve[(k * k + 4 * k - 2 * k * (i & 1)) // 3::2 * k] = [False] * (
(n // 6 - (k * k + 4 * k - 2 * k * (i & 1)) // 6 - 1) // k + 1
)
return [2, 3] + [3 * i + 1 | 1 for i in range(1, n // 3 - correction) if sieve[i]]

def sieve_wheel_30(N):
# http://zerovolt.com/?p=88
""" Returns a list of primes <= N using wheel criterion 2*3*5 = 30

This code is free for non-commercial purposes, in which case you can just leave this comment as a credit for my work.
If you need this code for commercial purposes, please contact me by sending an email to: info [at] zerovolt [dot] com."""
__smallp = (
2,
3,
5,
7,
11,
13,
17,
19,
23,
29,
31,
37,
41,
43,
47,
53,
59,
61,
67,
71,
73,
79,
83,
89,
97,
101,
103,
107,
109,
113,
127,
131,
137,
139,
149,
151,
157,
163,
167,
173,
179,
181,
191,
193,
197,
199,
211,
223,
227,
229,
233,
239,
241,
251,
257,
263,
269,
271,
277,
281,
283,
293,
307,
311,
313,
317,
331,
337,
347,
349,
353,
359,
367,
373,
379,
383,
389,
397,
401,
409,
419,
421,
431,
433,
439,
443,
449,
457,
461,
463,
467,
479,
487,
491,
499,
503,
509,
521,
523,
541,
547,
557,
563,
569,
571,
577,
587,
593,
599,
601,
607,
613,
617,
619,
631,
641,
643,
647,
653,
659,
661,
673,
677,
683,
691,
701,
709,
719,
727,
733,
739,
743,
751,
757,
761,
769,
773,
787,
797,
809,
811,
821,
823,
827,
829,
839,
853,
857,
859,
863,
877,
881,
883,
887,
907,
911,
919,
929,
937,
941,
947,
953,
967,
971,
977,
983,
991,
997,
)
# wheel = (2, 3, 5)
const = 30
if N < 2:
return []
if N <= const:
pos = 0
while __smallp[pos] <= N:
pos += 1
return list(__smallp[:pos])
# make the offsets list
offsets = (7, 11, 13, 17, 19, 23, 29, 1)
# prepare the list
p = [2, 3, 5]
dim = 2 + N // const
tk1 = [True] * dim
tk7 = [True] * dim
tk11 = [True] * dim
tk13 = [True] * dim
tk17 = [True] * dim
tk19 = [True] * dim
tk23 = [True] * dim
tk29 = [True] * dim
tk1[0] = False
# help dictionary d
# d[a , b] = c  ==> if I want to find the smallest useful multiple of (30*pos)+a
# on tkc, then I need the index given by the product of [(30*pos)+a][(30*pos)+b]
# in general. If b < a, I need [(30*pos)+a][(30*(pos+1))+b]
d = {}
for x in offsets:
for y in offsets:
res = (x * y) % const
if res in offsets:
d[(x, res)] = y
# another help dictionary: gives tkx calling tmptk[x]
tmptk = {1: tk1, 7: tk7, 11: tk11, 13: tk13, 17: tk17, 19: tk19, 23: tk23, 29: tk29}
pos, prime, lastadded, stop = 0, 0, 0, int(ceil(sqrt(N)))

# inner functions definition
def del_mult(tk, start, step):
for k in range(start, len(tk), step):
tk[k] = False

# end of inner functions definition
cpos = const * pos
while prime < stop:
# 30k + 7
if tk7[pos]:
prime = cpos + 7
p.append(prime)
for off in offsets:
tmp = d[(7, off)]
start = (
(pos + prime)
if off == 7
else (prime * (const * (pos + 1 if tmp < 7 else 0) + tmp)) // const
)
del_mult(tmptk[off], start, prime)
# 30k + 11
if tk11[pos]:
prime = cpos + 11
p.append(prime)
for off in offsets:
tmp = d[(11, off)]
start = (
(pos + prime)
if off == 11
else (prime * (const * (pos + 1 if tmp < 11 else 0) + tmp)) // const
)
del_mult(tmptk[off], start, prime)
# 30k + 13
if tk13[pos]:
prime = cpos + 13
p.append(prime)
for off in offsets:
tmp = d[(13, off)]
start = (
(pos + prime)
if off == 13
else (prime * (const * (pos + 1 if tmp < 13 else 0) + tmp)) // const
)
del_mult(tmptk[off], start, prime)
# 30k + 17
if tk17[pos]:
prime = cpos + 17
p.append(prime)
for off in offsets:
tmp = d[(17, off)]
start = (
(pos + prime)
if off == 17
else (prime * (const * (pos + 1 if tmp < 17 else 0) + tmp)) // const
)
del_mult(tmptk[off], start, prime)
# 30k + 19
if tk19[pos]:
prime = cpos + 19
p.append(prime)
for off in offsets:
tmp = d[(19, off)]
start = (
(pos + prime)
if off == 19
else (prime * (const * (pos + 1 if tmp < 19 else 0) + tmp)) // const
)
del_mult(tmptk[off], start, prime)
# 30k + 23
if tk23[pos]:
prime = cpos + 23
p.append(prime)
for off in offsets:
tmp = d[(23, off)]
start = (
(pos + prime)
if off == 23
else (prime * (const * (pos + 1 if tmp < 23 else 0) + tmp)) // const
)
del_mult(tmptk[off], start, prime)
# 30k + 29
if tk29[pos]:
prime = cpos + 29
p.append(prime)
for off in offsets:
tmp = d[(29, off)]
start = (
(pos + prime)
if off == 29
else (prime * (const * (pos + 1 if tmp < 29 else 0) + tmp)) // const
)
del_mult(tmptk[off], start, prime)
pos += 1
cpos = const * pos
# 30k + 1
if tk1[pos]:
prime = cpos + 1
p.append(prime)
for off in offsets:
tmp = d[(1, off)]
start = (
(pos + prime)
if off == 1
else (prime * (const * pos + tmp)) // const
)
del_mult(tmptk[off], start, prime)
# time to add remaining primes
# if lastadded == 1, remove last element and start adding them from tk1
# this way we don't need an "if" within the last while
p.pop()
# now complete for every other possible prime
while pos < len(tk1):
cpos = const * pos
if tk1[pos]:
p.append(cpos + 1)
if tk7[pos]:
p.append(cpos + 7)
if tk11[pos]:
p.append(cpos + 11)
if tk13[pos]:
p.append(cpos + 13)
if tk17[pos]:
p.append(cpos + 17)
if tk19[pos]:
p.append(cpos + 19)
if tk23[pos]:
p.append(cpos + 23)
if tk29[pos]:
p.append(cpos + 29)
pos += 1
# remove exceeding if present
pos = len(p) - 1
while p[pos] > N:
pos -= 1
if pos < len(p) - 1:
del p[pos + 1 :]
# return p list
return p

def sieve_of_eratosthenes(n):
"""sieveOfEratosthenes(n): return the list of the primes < n."""
# Code from: <dickinsm@gmail.com>, Nov 30 2006
if n <= 2:
return []
sieve = list(range(3, n, 2))
top = len(sieve)
for si in sieve:
if si:
bottom = (si * si - 3) // 2
if bottom >= top:
break
sieve[bottom::si] = [0] * -((bottom - top) // si)
return [2] + [el for el in sieve if el]

def sieve_of_atkin(end):
"""return a list of all the prime numbers <end using the Sieve of Atkin."""
# Code by Steve Krenzel, <Sgk284@gmail.com>, improved
# Code: https://web.archive.org/web/20080324064651/http://krenzel.info/?p=83
# Info: http://en.wikipedia.org/wiki/Sieve_of_Atkin
assert end > 0
lng = (end - 1) // 2
sieve = [False] * (lng + 1)

x_max, x2, xd = int(sqrt((end - 1) / 4.0)), 0, 4
for xd in range(4, 8 * x_max + 2, 8):
x2 += xd
y_max = int(sqrt(end - x2))
n, n_diff = x2 + y_max * y_max, (y_max << 1) - 1
if not (n & 1):
n -= n_diff
n_diff -= 2
for d in range((n_diff - 1) << 1, -1, -8):
m = n % 12
if m == 1 or m == 5:
m = n >> 1
sieve[m] = not sieve[m]
n -= d

x_max, x2, xd = int(sqrt((end - 1) / 3.0)), 0, 3
for xd in range(3, 6 * x_max + 2, 6):
x2 += xd
y_max = int(sqrt(end - x2))
n, n_diff = x2 + y_max * y_max, (y_max << 1) - 1
if not (n & 1):
n -= n_diff
n_diff -= 2
for d in range((n_diff - 1) << 1, -1, -8):
if n % 12 == 7:
m = n >> 1
sieve[m] = not sieve[m]
n -= d

x_max, y_min, x2, xd = int((2 + sqrt(4 - 8 * (1 - end))) / 4), -1, 0, 3
for x in range(1, x_max + 1):
x2 += xd
xd += 6
if x2 >= end:
y_min = (((int(ceil(sqrt(x2 - end))) - 1) << 1) - 2) << 1
n, n_diff = ((x * x + x) << 1) - 1, (((x - 1) << 1) - 2) << 1
for d in range(n_diff, y_min, -8):
if n % 12 == 11:
m = n >> 1
sieve[m] = not sieve[m]
n += d

primes = [2, 3]
if end <= 3:
return primes[: max(0, end - 2)]

for n in range(5 >> 1, (int(sqrt(end)) + 1) >> 1):
if sieve[n]:
primes.append((n << 1) + 1)
aux = (n << 1) + 1
aux *= aux
for k in range(aux, end, 2 * aux):
sieve[k >> 1] = False

s = int(sqrt(end)) + 1
if s % 2 == 0:
s += 1
primes.extend([i for i in range(s, end, 2) if sieve[i >> 1]])

return primes

def ambi_sieve_plain(n):
s = list(range(3, n, 2))
for m in range(3, int(n ** 0.5) + 1, 2):
if s[(m - 3) // 2]:
for t in range((m * m - 3) // 2, (n >> 1) - 1, m):
s[t] = 0
return [2] + [t for t in s if t > 0]

def sundaram3(max_n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/2073279#2073279
numbers = range(3, max_n + 1, 2)
half = (max_n) // 2
initial = 4

for step in range(3, max_n + 1, 2):
for i in range(initial, half, step):
numbers[i - 1] = 0
initial += 2 * (step + 1)

if initial > half:
return [2] + filter(None, numbers)

# Using Numpy:
def ambi_sieve(n):
# http://tommih.blogspot.com/2009/04/fast-prime-number-generator.html
s = np.arange(3, n, 2)
for m in range(3, int(n ** 0.5) + 1, 2):
if s[(m - 3) // 2]:
s[(m * m - 3) // 2::m] = 0
return np.r_[2, s[s > 0]]

def primesfrom3to(n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/3035188#3035188
""" Returns an array of primes, p < n """
assert n >= 2
sieve = np.ones(n // 2, dtype=np.bool)
for i in range(3, int(n ** 0.5) + 1, 2):
if sieve[i // 2]:
sieve[i * i // 2::i] = False
return np.r_[2, 2 * np.nonzero(sieve)[0][1::] + 1]

def primesfrom2to(n):
# https://stackoverflow.com/questions/2068372/fastest-way-to-list-all-primes-below-n-in-python/3035188#3035188
""" Input n>=6, Returns an array of primes, 2 <= p < n """
assert n >= 6
sieve = np.ones(n // 3 + (n % 6 == 2), dtype=np.bool)
sieve[0] = False
for i in range(int(n ** 0.5) // 3 + 1):
if sieve[i]:
k = 3 * i + 1 | 1
sieve[((k * k) // 3)::2 * k] = False
sieve[(k * k + 4 * k - 2 * k * (i & 1)) // 3::2 * k] = False
return np.r_[2, 3, ((3 * np.nonzero(sieve)[0] + 1) | 1)]

def sympy_sieve(n):
return list(sympy.sieve.primerange(1, n))

perfplot.save(
"prime.png",
setup=lambda n: n,
kernels=[
rwh_primes,
rwh_primes1,
rwh_primes2,
sieve_wheel_30,
sieve_of_eratosthenes,
sieve_of_atkin,
# ambi_sieve_plain,
# sundaram3,
ambi_sieve,
primesfrom3to,
primesfrom2to,
sympy_sieve,
],
n_range=[2 ** k for k in range(3, 25)],
logx=True,
logy=True,
xlabel="n",
)
``````

First time using python, so some of the methods I use in this might seem a bit cumbersome. I just straight converted my c++ code to python and this is what I have (albeit a tad bit slowww in python)

``````#!/usr/bin/env python
import time

def GetPrimes(n):

Sieve = [1 for x in xrange(n)]

Done = False
w = 3

while not Done:

for q in xrange (3, n, 2):
Prod = w*q
if Prod < n:
Sieve[Prod] = 0
else:
break

if w > (n/2):
Done = True
w += 2

return Sieve

start = time.clock()

d = 10000000
Primes = GetPrimes(d)

count = 1 #This is for 2

for x in xrange (3, d, 2):
if Primes[x]:
count+=1

elapsed = (time.clock() - start)
print "\nFound", count, "primes in", elapsed, "seconds!\n"
``````

pythonw Primes.py

Found 664579 primes in 12.799119 seconds!

``````#!/usr/bin/env python
import time

def GetPrimes2(n):

Sieve = [1 for x in xrange(n)]

for q in xrange (3, n, 2):
k = q
for y in xrange(k*3, n, k*2):
Sieve[y] = 0

return Sieve

start = time.clock()

d = 10000000
Primes = GetPrimes2(d)

count = 1 #This is for 2

for x in xrange (3, d, 2):
if Primes[x]:
count+=1

elapsed = (time.clock() - start)
print "\nFound", count, "primes in", elapsed, "seconds!\n"
``````

pythonw Primes2.py

Found 664579 primes in 10.230172 seconds!

``````#!/usr/bin/env python
import time

def GetPrimes3(n):

Sieve = [1 for x in xrange(n)]

for q in xrange (3, n, 2):
k = q
for y in xrange(k*k, n, k << 1):
Sieve[y] = 0

return Sieve

start = time.clock()

d = 10000000
Primes = GetPrimes3(d)

count = 1 #This is for 2

for x in xrange (3, d, 2):
if Primes[x]:
count+=1

elapsed = (time.clock() - start)
print "\nFound", count, "primes in", elapsed, "seconds!\n"
``````

python Primes2.py

Found 664579 primes in 7.113776 seconds!

I know the competition is closed for some years. …

Nonetheless this is my suggestion for a pure python prime sieve, based on omitting the multiples of 2, 3 and 5 by using appropriate steps while processing the sieve forward. Nonetheless it is actually slower for N<10^9 than @Robert William Hanks superior solutions rwh_primes2 and rwh_primes1. By using a ctypes.c_ushort sieve array above 1.5* 10^8 it is somehow adaptive to memory limits.

10^6

\$ python -mtimeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.primeSieveSeq(1000000)" 10 loops, best of 3: 46.7 msec per loop

to compare:\$ python -mtimeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.rwh_primes1(1000000)" 10 loops, best of 3: 43.2 msec per loop to compare: \$ python -m timeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.rwh_primes2(1000000)" 10 loops, best of 3: 34.5 msec per loop

10^7

\$ python -mtimeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.primeSieveSeq(10000000)" 10 loops, best of 3: 530 msec per loop

to compare:\$ python -mtimeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.rwh_primes1(10000000)" 10 loops, best of 3: 494 msec per loop to compare: \$ python -m timeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.rwh_primes2(10000000)" 10 loops, best of 3: 375 msec per loop

10^8

\$ python -mtimeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.primeSieveSeq(100000000)" 10 loops, best of 3: 5.55 sec per loop

to compare: \$ python -mtimeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.rwh_primes1(100000000)" 10 loops, best of 3: 5.33 sec per loop to compare: \$ python -m timeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.rwh_primes2(100000000)" 10 loops, best of 3: 3.95 sec per loop

10^9

\$ python -mtimeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.primeSieveSeq(1000000000)" 10 loops, best of 3: 61.2 sec per loop

to compare: \$ python -mtimeit -n 3 -s"import primeSieveSpeedComp" "primeSieveSpeedComp.rwh_primes1(1000000000)" 3 loops, best of 3: 97.8 sec per loop

to compare: \$ python -m timeit -s"import primeSieveSpeedComp" "primeSieveSpeedComp.rwh_primes2(1000000000)" 10 loops, best of 3: 41.9 sec per loop

You may copy the code below into ubuntus primeSieveSpeedComp to review this tests.

``````def primeSieveSeq(MAX_Int):
if MAX_Int > 5*10**8:
import ctypes
int16Array = ctypes.c_ushort * (MAX_Int >> 1)
sieve = int16Array()
#print 'uses ctypes "unsigned short int Array"'
else:
sieve = (MAX_Int >> 1) * [False]
#print 'uses python list() of long long int'
if MAX_Int < 10**8:
sieve[4::3] = [True]*((MAX_Int - 8)/6+1)
sieve[12::5] = [True]*((MAX_Int - 24)/10+1)
r = [2, 3, 5]
n = 0
for i in xrange(int(MAX_Int**0.5)/30+1):
n += 3
if not sieve[n]:
n2 = (n << 1) + 1
r.append(n2)
n2q = (n2**2) >> 1
sieve[n2q::n2] = [True]*(((MAX_Int >> 1) - n2q - 1) / n2 + 1)
n += 2
if not sieve[n]:
n2 = (n << 1) + 1
r.append(n2)
n2q = (n2**2) >> 1
sieve[n2q::n2] = [True]*(((MAX_Int >> 1) - n2q - 1) / n2 + 1)
n += 1
if not sieve[n]:
n2 = (n << 1) + 1
r.append(n2)
n2q = (n2**2) >> 1
sieve[n2q::n2] = [True]*(((MAX_Int >> 1) - n2q - 1) / n2 + 1)
n += 2
if not sieve[n]:
n2 = (n << 1) + 1
r.append(n2)
n2q = (n2**2) >> 1
sieve[n2q::n2] = [True]*(((MAX_Int >> 1) - n2q - 1) / n2 + 1)
n += 1
if not sieve[n]:
n2 = (n << 1) + 1
r.append(n2)
n2q = (n2**2) >> 1
sieve[n2q::n2] = [True]*(((MAX_Int >> 1) - n2q - 1) / n2 + 1)
n += 2
if not sieve[n]:
n2 = (n << 1) + 1
r.append(n2)
n2q = (n2**2) >> 1
sieve[n2q::n2] = [True]*(((MAX_Int >> 1) - n2q - 1) / n2 + 1)
n += 3
if not sieve[n]:
n2 = (n << 1) + 1
r.append(n2)
n2q = (n2**2) >> 1
sieve[n2q::n2] = [True]*(((MAX_Int >> 1) - n2q - 1) / n2 + 1)
n += 1
if not sieve[n]:
n2 = (n << 1) + 1
r.append(n2)
n2q = (n2**2) >> 1
sieve[n2q::n2] = [True]*(((MAX_Int >> 1) - n2q - 1) / n2 + 1)
if MAX_Int < 10**8:
return [2, 3, 5]+[(p << 1) + 1 for p in [n for n in xrange(3, MAX_Int >> 1) if not sieve[n]]]
n = n >> 1
try:
for i in xrange((MAX_Int-2*n)/30 + 1):
n += 3
if not sieve[n]:
r.append((n << 1) + 1)
n += 2
if not sieve[n]:
r.append((n << 1) + 1)
n += 1
if not sieve[n]:
r.append((n << 1) + 1)
n += 2
if not sieve[n]:
r.append((n << 1) + 1)
n += 1
if not sieve[n]:
r.append((n << 1) + 1)
n += 2
if not sieve[n]:
r.append((n << 1) + 1)
n += 3
if not sieve[n]:
r.append((n << 1) + 1)
n += 1
if not sieve[n]:
r.append((n << 1) + 1)
except:
pass
return r
``````
• to visualize your test results, plot them on log-log scale, to see and compare the empirical orders of growth. – Will Ness Mar 3 '16 at 12:18
• @ Will thanks for the input, i'll have this in mind the next time i need such comparison – ABri Mar 12 '16 at 20:04

The simplest way I've found of doing this is:

``````primes = []
for n in range(low, high + 1):
if all(n % i for i in primes):
primes.append(n)
``````

Here is an interesting technique to generate prime numbers (yet not the most efficient) using python's list comprehensions:

``````noprimes = [j for i in range(2, 8) for j in range(i*2, 50, i)]
primes = [x for x in range(2, 50) if x not in noprimes]
``````

You can find the example and some explanations right here

Here is a numpy version of Sieve of Eratosthenes having both good complexity (lower than sorting an array of length n) and vectorization. Compared to @unutbu times this just as fast as the packages with 46 microsecons to find all primes below a million.

``````import numpy as np
def generate_primes(n):
is_prime = np.ones(n+1,dtype=bool)
is_prime[0:2] = False
for i in range(int(n**0.5)+1):
if is_prime[i]:
is_prime[i**2::i]=False
return np.where(is_prime)[0]
``````

Timings:

``````import time
for i in range(2,10):
timer =time.time()
generate_primes(10**i)
print('n = 10^',i,' time =', round(time.time()-timer,6))

>> n = 10^ 2  time = 5.6e-05
>> n = 10^ 3  time = 6.4e-05
>> n = 10^ 4  time = 0.000114
>> n = 10^ 5  time = 0.000593
>> n = 10^ 6  time = 0.00467
>> n = 10^ 7  time = 0.177758
>> n = 10^ 8  time = 1.701312
>> n = 10^ 9  time = 19.322478
``````

My guess is that the fastest of all ways is to hard code the primes in your code.

So why not just write a slow script that generates another source file that has all numbers hardwired in it, and then import that source file when you run your actual program.

Of course, this works only if you know the upper bound of N at compile time, but thus is the case for (almost) all project Euler problems.

PS: I might be wrong though iff parsing the source with hard-wired primes is slower than computing them in the first place, but as far I know Python runs from compiled `.pyc` files so reading a binary array with all primes up to N should be bloody fast in that case.

Sorry to bother but erat2() has a serious flaw in the algorithm.

While searching for the next composite, we need to test odd numbers only. q,p both are odd; then q+p is even and doesn't need to be tested, but q+2*p is always odd. This eliminates the "if even" test in the while loop condition and saves about 30% of the runtime.

While we're at it: instead of the elegant 'D.pop(q,None)' get and delete method use 'if q in D: p=D[q],del D[q]' which is twice as fast! At least on my machine (P3-1Ghz). So I suggest this implementation of this clever algorithm:

``````def erat3( ):
from itertools import islice, count

# q is the running integer that's checked for primeness.
# yield 2 and no other even number thereafter
yield 2
D = {}
# no need to mark D[4] as we will test odd numbers only
for q in islice(count(3),0,None,2):
if q in D:                  #  is composite
p = D[q]
del D[q]
# q is composite. p=D[q] is the first prime that
# divides it. Since we've reached q, we no longer
# need it in the map, but we'll mark the next
# multiple of its witnesses to prepare for larger
# numbers.
x = q + p+p        # next odd(!) multiple
while x in D:      # skip composites
x += p+p
D[x] = p
else:                  # is prime
# q is a new prime.
# Yield it and mark its first multiple that isn't
# already marked in previous iterations.
D[q*q] = q
yield q
``````

The fastest method I've tried so far is based on the Python cookbook `erat2` function:

``````import itertools as it
def erat2a( ):
D = {  }
yield 2
for q in it.islice(it.count(3), 0, None, 2):
p = D.pop(q, None)
if p is None:
D[q*q] = q
yield q
else:
x = q + 2*p
while x in D:
x += 2*p
D[x] = p
``````

See this answer for an explanation of the speeding-up.

I may be late to the party but will have to add my own code for this. It uses approximately n/2 in space because we don't need to store even numbers and I also make use of the bitarray python module, further draStically cutting down on memory consumption and enabling computing all primes up to 1,000,000,000

``````from bitarray import bitarray
def primes_to(n):
size = n//2
sieve = bitarray(size)
sieve.setall(1)
limit = int(n**0.5)
for i in range(1,limit):
if sieve[i]:
val = 2*i+1
sieve[(i+i*val)::val] = 0
return [2] + [2*i+1 for i, v in enumerate(sieve) if v and i > 0]

python -m timeit -n10 -s "import euler" "euler.primes_to(1000000000)"
10 loops, best of 3: 46.5 sec per loop
``````

This was run on a 64bit 2.4GHZ MAC OSX 10.8.3

• posting one timing for an unknown machine says nothing. The accepted answer here says "without psyco, for n=1000000, rwh_primes2 was the fastest". So if you'd provide your timings for that code as well as yours, on the same machine, and at 2, 4, 10 mln as well, then it'd be much more informative. – Will Ness Apr 17 '13 at 7:32
• -1, This code depends on special features of the bitarray implemented in C, which is why the code is fast as most of the work is being done in native code in the slice assignment. The bitarray package BREAKS the standard definition for proper slices (indexed over a range) for mutable sequences in that it allows assigning a single boolean 0/1 or True/False to all elements of the slice, whereas the standard behavior for pure Python seems to be to not allow this and only allow the assignment value of 0 in which case it is treated as a del of all of the slice elements from the sequence/array. – GordonBGood Aug 19 '13 at 16:46
• cont'd: If calling non-standard native code were to be compared, we may as well write a "fastprimes" sequence generator package based on C code such as that of Kim Walisch's primesieve and generate all the primes in the four billion plus 32-bit number range in just a few seconds with a single call to the sequence generator. This would also use almost no memory as the linked code is based on a segmented Sieve of Eratosthenes and thus only uses a few ten's of Kilobytes of RAM, and if a sequence were generated there would be no list storage required. – GordonBGood Aug 19 '13 at 17:54

I collected several prime number sieves over time. The fastest on my computer is this:

``````from time import time
# 175 ms for all the primes up to the value 10**6
def primes_sieve(limit):
a = [True] * limit
a[0] = a[1] = False
#a[2] = True
for n in xrange(4, limit, 2):
a[n] = False
root_limit = int(limit**.5)+1
for i in xrange(3,root_limit):
if a[i]:
for n in xrange(i*i, limit, 2*i):
a[n] = False
return a

LIMIT = 10**6
s=time()
primes = primes_sieve(LIMIT)
print time()-s
``````