# How can I test for primality?

I am writing a little library with some prime number related methods. As I've done the groundwork (aka working methods) and now I'm looking for some optimization. Ofcourse the internet is an excellent place to do so. I've, however, stumbled upon a rounding problem and I was wondering how to solve this.

In the loop I use to test a number for it's primality it's more efficient to search until sqrt(n) instead of n/2 or even n - 1. But due to rounding problems some number get skipped and thus some primes are skipped! For example, the 10000th prime should be: 104729, but the 'optimized' version ends up with: 103811.

Some code (it's open for more optimization, I know, but I can handle only one thing at a time):

``````/// <summary>
/// Method for testing the primality of a number e.g.: return IsPrime(29);
/// History:
/// 1. Initial version, most basic form of testing: m smaller then n -1
/// 2. Implemented m smaller then sqrt(n), optimization due to prime factoring
/// </summary>
/// <param name="test">Number to be tested on primality</param>
/// <returns>True if the number is prime, false otherwise</returns>
public static bool IsPrime(int test)
{
// 0 and 1 are not prime numbers
if (test == 0 || test == 1) return false;

// 2 and 3 are prime numbers
if (test == 2) return true;

// all even numbers, save 2, are not prime
if (test % 2 == 0) return false;

double squared = Math.Sqrt(test);
int flooredAndSquared = Convert.ToInt32(Math.Floor(squared));

// start with 5, make increments of 2, even numbers do not need to be tested
for (int idx = 3; idx < flooredAndSquared; idx++)
{
if (test % idx == 0)
{
return false;
}
}
return true;
}
``````

I know the squared part fails me (or I fail), tried Math.Ceiling as well, with about the same results.

-
Your for loop seems to start at 3, and increment by 1; your comment states that it starts at 5 and increments by 2. – Phil H Mar 10 '09 at 10:19
This question appears to be off-topic because it is about number theory. try math.stackexchange.com. – jww Feb 17 '14 at 2:09
`squared` is not the right variable name for the result of a square root. "Squared" means raised to the second power; square root is raising to the 1/2 power. Maybe call it `sqrt_test` or something. – Todd Lehman Jul 28 '14 at 5:09

Sadly, I haven't tried the algorithmic approaches before. But if you want to implement your approach efficiently, I'd suggest doing some caching. Create an array to store all prime numbers less than a defined threshold, fill this array, and search within/using it.

In the following example, finding whether a number is prime is O(1) in the best case (namely, when the number is less than or equal to `maxPrime`, which is 821,461 for a 64K buffer), and is somewhat optimized for other cases (by checking mod over only 64K numbers out of the first 820,000 -- about 8%).

(Note: Don't take this answer as the "optimal" approach. It's more of an example on how to optimize your implementation.)

``````public static class PrimeChecker
{
private const int BufferSize = 64 * 1024; // 64K * sizeof(int) == 256 KB

private static int[] primes;
public static int MaxPrime { get; private set; }

public static bool IsPrime(int value)
{
if (value <= MaxPrime)
{
return Array.BinarySearch(primes, value) >= 0;
}
else
{
return IsPrime(value, primes.Length) && IsLargerPrime(value);
}
}

static PrimeChecker()
{
primes = new int[BufferSize];
primes[0] = 2;
for (int i = 1, x = 3; i < primes.Length; x += 2)
{
if (IsPrime(x, i))
primes[i++] = x;
}
MaxPrime = primes[primes.Length - 1];
}

private static bool IsPrime(int value, int primesLength)
{
for (int i = 0; i < primesLength; ++i)
{
if (value % primes[i] == 0)
return false;
}
return true;
}

private static bool IsLargerPrime(int value)
{
int max = (int)Math.Sqrt(value);
for (int i = MaxPrime + 2; i <= max; i += 2)
{
if (value % i == 0)
return false;
}
return true;
}
}
``````
-
This technique is called memoization, in case anyone wants to search for it. – rvighne Sep 3 '14 at 1:31

I guess this is your problem:

``````for (int idx = 3; idx < flooredAndSquared; idx++)
``````

This should be

``````for (int idx = 3; idx <= flooredAndSquared; idx++)
``````

so you don't get square numbers as primes. Also, you can use "idx += 2" instead of "idx++" because you only have to test odd numbers (as you wrote in the comment directly above...).

-

I don't know if this is quite what you are looking for but if you are really concerned about speed then you should look into probablistic methods for testing primality rather than using a sieve. Rabin-Miller is a probabilistic primality test used by Mathematica.

-

I posted a class that uses the sieve or Eratosthenes to calculate prime numbers here:

http://stackoverflow.com/questions/573692/is-the-size-of-an-array-constrained-by-the-upper-limit-of-int-2147483647/573770#573770

-
The sieve of Eratosthenes is very fast, but you can only use it if you know where the upperbound of the primaries to test will be. – Xn0vv3r Mar 10 '09 at 8:48
Not at all, take a look at the code. It expands the range in steps, so it's only limited by the capacty of the data type used to store the primes. In this case a long, so the limit is 9223372036854775807. – Guffa Mar 10 '09 at 9:24
Not at all: you can create a list of lists of sieve approximations, and take "as much as you need". You'll need lazy evaluation of course, like in a functional language. I have written an implementation of this in C# using yield statements which as far as I know worked fine. Don't have laptop with me, so I'd have to get back to this later to post the actual answer. (If you all want.) – peSHIr Nov 2 '09 at 10:52

As Mark said, the Miller-Rabin test is actually a very good way to go. An additional reference (with pseudo-code) is the Wikipedia article about it.

It should be noted that while it is probabilistic, by testing just a very small number of cases, you can determine whether a number is prime for numbers in the int (and nearly long) range. See this part of that Wikipedia article, or the Primality Proving reference for more details.

I would also recommend reading this article on modular exponentiation, as otherwise you're going to be dealing with very very large numbers when trying to do the Miller-Rabin test...

-

Try this...

``````if (testVal == 2) return true;
if (testVal % 2 == 0) return false;

for (int i = 3; i <= Math.Ceiling(Math.Sqrt(testVal)); i += 2)
{
if (testVal % i == 0)
return false;
}

return true;
``````

Ive used this quite a few times.. Not as fast as a sieve.. but it works.

-
I believe `i < Math.Ceiling` (or `i <= Math.Floor`) is enough. You don't need `i <= Math.Ceiling`. – Hosam Aly Mar 10 '09 at 10:52

You might want to look into Fermat's little theorem.

Here is the pseudo code from the book Algorithms.

``````Pick a positive integer a < N at random
if a^n-1 is equivalent to 1 (mod n)
return yes
else
return no
``````

Implementing Fermat's theorem should be faster then the sieve solution. However, there are Carmichael numbers that pass Fermat's test and are NOT prime. There are workarounds for this. I recommend consulting Section 1.3 in the fore mentioned book. It is all about primality testing and might be helpful for you.

-
You want to do that several times to have any real confidence. – Captain Segfault Mar 9 '09 at 21:44
Yes absolutely, but it is fast enough that you can do that. I edited the answer to mention Carmichael's numbers. – James McMahon Mar 9 '09 at 21:48
Soloway-Strassen and Miller-Rabin primality testing are both superior to Fermat's Little Theorem in just about every way; both can be trivially extended to deterministic (not just probabilistic) tests, though runtime isn't optimal. Don't bother with FLT. – kquinn Mar 10 '09 at 3:21
@kquinn, your technically correct, but I brought up FLT because it is the basis of Miller-Rabin. The book I linked goes on to explain the weakness of FLT and then expand it into Miller-Rabin. I also didn't see the Mark posted about Miller-Rabin until after I posted this answer. – James McMahon Mar 10 '09 at 14:59
I kept the answer up because I feel the chapter in Algorithms is worth reading and relevant to the original question. – James McMahon Mar 10 '09 at 15:03

Try the sieve of eratosthenes -- that should take out getting the root and floating point issues.

As for the `floor`, you will be better served by taking the `ceiling`.

-
ceiling will give you a false positive on a prime squared I think :) – leppie Mar 9 '09 at 18:50
Not if you take up to the ceiling. – dirkgently Mar 9 '09 at 18:59
``````private static bool IsPrime(int number) {
if (number <= 3)
return true;
if ((number & 1) == 0)
return false;
int x = (int)Math.Sqrt(number) + 1;
for (int i = 3; i < x; i += 2) {
if ((number % i) == 0)
return false;
}
return true;
}
``````

I can't get it any faster...

-
Nice try. Check my answer for an example on how to make it faster. – Hosam Aly Mar 10 '09 at 10:52

Here is a halfway decent function I wrote to solve one of the Euler:

``````private static long IsPrime(long input)
{
if ((input % 2) == 0)
{
return 2;
}
else if ((input == 1))
{
return 1;
}
else
{
long threshold = (Convert.ToInt64(Math.Sqrt(input)));
long tryDivide = 3;
while (tryDivide < threshold)
{
if ((input % tryDivide) == 0)
{
Console.WriteLine("Found a factor: " + tryDivide);
return tryDivide;
}
tryDivide += 2;
}
Console.WriteLine("Found a factor: " + input);
return -1;
}
}
``````
-
Same error as the OP - this should be "tryDivide <= threshold" or you miss the square numbers. – schnaader Mar 9 '09 at 18:34
Good catch @schnaader, thanks – Chris Ballance Mar 9 '09 at 20:36
Point taken, I have adjusted back to my original answer. – Chris Ballance Mar 9 '09 at 21:19
sorry, the <= might still be necessary if the sqrt happens to return a bit "less" then needed (like, n = 9, sqrt(n) == 2.99999999, floor -> 2, algo thinks it's prime... I was kinda mixed up. sorry – mitchnull Mar 9 '09 at 21:25

I thought Prime numbers and primality testing was useful and the AKS algorithm sounds interesting even if it isn't particularly practical compared to a probabily based tests.

-

This works very fast for testing primes (vb.net)

``````Dim rnd As New Random()
Const one = 1UL

Function IsPrime(ByVal n As ULong) As Boolean
If n Mod 3 = 0 OrElse n Mod 5 = 0 OrElse n Mod 7 = 0 OrElse n Mod 11 = 0 OrElse n Mod 13 = 0 OrElse n Mod 17 = 0 OrElse n Mod 19 = 0 OrElse n Mod 23 = 0 Then
return false
End If

Dim s = n - one

While s Mod 2 = 0
s >>= one
End While

For i = 0 To 10 - 1
Dim a = CULng(rnd.NextDouble * n + 1)
Dim temp = s
Dim m = Numerics.BigInteger.ModPow(a, s, n)

While temp <> n - one AndAlso m <> one AndAlso m <> n - one
m = (m * m) Mod n
temp = temp * 2UL
End While

If m <> n - one AndAlso temp Mod 2 = 0 Then
Return False
End If
Next i

Return True
End Function
``````
-

I have a fast algorithm for checking prime numbers. You can improve your algorithm if you know that primes are in the form 6k ± 1, with the exception of 2 and 3. So, first you can test if input is divisible by 2 or 3. Then, check all the numbers of form 6k ± 1 ≤ √input.

``````bool IsPrime(int input)
{
//2 and 3 are primes
if (input == 2 || input == 3)
return true;
else if (input % 2 == 0 || input % 3 == 0)
return false;     //Is divisible by 2 or 3?
else
{
for (int i = 5; i * i <= input; i += 6)
{
if (input % i == 0 || input % (i + 2) == 0)
return false;
}
return true;
}
}
``````
-

Your for loop should look like this:

``````for (int idx = 3; idx * idx <= test; idx++) { ... }
``````

That way, you avoid floating-point computation. Should run faster and it'll be more accurate. This is why the `for` statement conditional is simply a boolean expression: it makes things like this possible.

-
Marking this down because it is neither faster nor more accurate. The floor of the square root of an integer is exactly what he wants. IEEE floating-point arithmetic is required to produce the correct result on integers, i.e., sqrt(25) cannot be 4.999999. And it's slower because you've introduced a multiplication into the loop which wasn't there before. And finally, you've also introduced a bug, because `idx * idx` can overflow and produce negative values, causing an infinite loop. Consider `test` = 2147483647 and `idx` = 46340 and 46341. – Todd Lehman Jul 28 '14 at 5:19