# prime number generator taking too much time [closed]

I'm solving the problem:

By listing the first six prime numbers: 2, 3, 5, 7, 11, and 13, we can see that the 6th prime is 13.
What is the 10 001st prime number?

``````def checkPrime(x):
facs = 0
for i in range(1,x):
if x%i==0:
facs = facs + 1
if facs == 2:
return True
else :
return False

i = 1
noPrime = 0
done = False
while(done==False):
i = i + 1
print "i = {0} and noPrime={1}".format(i,noPrime)
if checkPrime(i)==True:
noPrime = noPrime + 1
if noPrime==10001 :
print i
done=True
``````

But it is taking a lot of time.
How can I speed it up?

-
What algorithm are you using? –  Paul Mar 14 '13 at 5:03
Your `checkPrime` is wrong. The last element of `range(1,x)` is `x-1`, so what you're actually finding are numbers with exactly 3 divisors, i.e. squares of primes. If you correct that, by initialising `facs` to 1 or by checking `range(1,x+1)`, the running time would drop from a few thousand years to something like an hour (give or take a factor of 10) and it would give the correct answer. Of course, you'd then still want to use a decent prime test that stops at the square root. –  Daniel Fischer Mar 17 '13 at 11:53

## closed as not a real question by Matt Ball, Inbar Rose, Peter DeWeese, Tim Saunders, GravitonMar 18 '13 at 3:29

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A way to do it by using a primality test:

``````def isPrime(n):
if n == 2: return True
if n % 2 == 0 or n < 2: return False
for i in range(3, int(n**0.5)+1, 2):
if n % i == 0: return False
return True
if __name__ == "__main__":
n = count = 1
while count < 10001:
n += 2
if isPrime(n): count += 1
print n
``````

Runs in 0.2 seconds. Doesn't matter for this problem but, as others have said, sieve is more efficient.

-

You can use the prime number theorem to get a pretty good estimate on how far you have to go. (Estimate on the size of the array p in the program). `pi(n)`, the number of primes less than `n`, is asymptotically `n%^.n` (`n` divided by `ln n`). For the 10001-th prime, the equation is `10001=n%^.n`, and solving for `n` you get that `n` is between 1.1e5 and 1.2e5.

So, you can reduce the range of the checked values and check the number only of the range. This technique reduces the operating time of the program.

-

Since everybody else was posting their solutions, I thought I'd include some obvious improvements to the simple divide method:

``````def is_prime(nr):
if nr < 2: return false
if nr < 4: return true
if nr % 2 == 0: return false
if nr < 9: return true
if nr % 3 == 0: return false
for i in range(5, int(nr**0.5) + 1, 6):
if number % i == 0: return false
if number % (i + 2) == 0: return false
return true
``````

This improves upon the simple solution by getting rid of one unnecessary modulo operation.

-

You don't need to use Sieve of Eratosthenes for this (although you will in future problems). Finding the 10001 prime is relatively quick.

Things to note:

• Only test odd numbers (except #2)
• You only have to test for divisors up to the square root of the value.

Spoiler Below - Assuming you have solved the problem but it just takes a long time

Example in C# (sorry, don't know python):

``````class Program
{
static bool IsPrime(int value)
{
if (value == 2) return true;
if (value % 2 == 0) return false;

// Test for divisors up to the square root of "value", increment by 2.
for (int i = 3; i <= Math.Sqrt(value); i += 2)
{
if (value % i == 0)
return false;
}
return true;
}

static void Main(string[] args)
{
int primeCount = 1; // #2

// Test only odd numbers.
for (int i = 3; ; i += 2)
{
if (IsPrime(i))
{
primeCount++;
if (primeCount == 10001)
{
Console.WriteLine(i.ToString());
break;
}
}
}