How can I make this summation of primes function faster? [duplicate]

``````def is_prime(x):
if x<2:
return False
elif x%2==0:
if x==2:
return True
else:
return False
else:
for i in range(3,x+1,2):
if x%i==0 and i==x:
return True
break
elif x%i==0:
return False
break

def sum_primes(m):
total=0
for i in range (3,m,2):
if is_prime(i):
total+=i

print sum_primes(2000000)
``````

I'm trying to solve one the Project-Euler problems, and this program works but it takes too much time to give me the answer. How can I make it faster guys ?

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marked as duplicate by Jesse Rusak, abarnert, joaquin, manuell, glengDec 31 '13 at 14:15

have a look at the Sieve of Erathostenes. You can find some Python implementations here – w0lf Dec 30 '13 at 21:16
If you're asking how to improve your specific code, take it to Code Review. If you're asking for a faster algorithm, that's been asked hundreds of times, which is why the Related questions sidebar is full of obvious duplicates. – abarnert Dec 30 '13 at 21:35

This question has been asked before:

You might also consider trying to optimize this using Cython.

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The Sieve of Eratosthenes enumerates the primes, `sum` accumulates them; first make a list of the number from 2 to n, marking them prime, then scan the list in order, stopping at each prime to mark its multiples composite, collecting the primes in order.

``````function sumPrimes(n) # sum of primes less than n
sum, sieve := 0, makeArray(2..n, True)
for p from 2 to n
if sieve[p]
sum := sum + p
for i from p*p to n step p
sieve[i] = False
return sum
``````

I'll leave it to you to translate to Python.

If you're interested in programming with prime numbers, I modestly recommend this essay at my blog.

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