That's not how the Sieve of Eratosthenes works, you should read this section from the Wikipedia article :
- Create a list of consecutive integers from 2 to n: (2, 3, 4, ..., n).
- Initially, let p equal 2, the first prime number.
- Starting from p, count up in increments of p and mark each of these numbers greater than p itself in the list. These numbers will be 2p, 3p, 4p, etc.; note that some of them may have already been marked.
- Find the first number greater than p in the list that is not marked; let p now equal this number (which is the next prime).
- If there were no more unmarked numbers in the list, stop. Otherwise, repeat from step 3.
So basically what you think is the limit (
121, from your comments) is just an example they used in that animated
here's a C# implementation of this method :
static void Main(string args)
int maxprime = int.Parse(args);
ArrayList primelist = sieve(maxprime);
foreach (int prime in primelist)
Console.WriteLine("Count = " + primelist.Count);
static ArrayList sieve(int arg_max_prime)
BitArray al = new BitArray(arg_max_prime, true);
int lastprime = 1;
int lastprimeSquare = 1;
while (lastprimeSquare <= arg_max_prime)
lastprimeSquare = lastprime * lastprime;
for (int i = lastprimeSquare; i < arg_max_prime; i += lastprime)
if (i > 0)
al[i] = false;
ArrayList sieve_2_return = new ArrayList();
for (int i = 2; i < arg_max_prime; i++)
Credits go to Rosetta Code