2-3-5-7 wheel factorization seems to skip prime number 331

When following the procedure on wikipedia for wheel factorization, I seem to have stumbled into a problem where the prime number 331 is treated as a composite number if I try to build a 2-3-5-7 wheel.

With 2-3-5-7 wheel, 2*3*5*7=210. So I setup a circle with 210 slots and go through steps 1-7 without any issues. Then I get to step 8 and strike off the spokes of all multiples of prime numbers, I eventually strike off the spoke rooted at 121, which is a multiple of 11, which is a prime. For the spoke rooted at 121, 121 + 210 = 331. Unfortunately, 331 is a prime number.

Is the procedure on Wikipedia incorrect?

Or did I misunderstand the procedure, and should have only struck out spokes that are multiples of 2, 3, 5, and 7, but not any of the other primes less than 210?

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Might get better responses at math.stackexchange.com –  Rowland Shaw Dec 1 '11 at 12:25
you absolutely need to show us your implementation. –  sehe Dec 1 '11 at 12:35
No code yet, I was just doing this on paper to get a feel for how a bigger wheel maybe implemented. –  Ants Dec 1 '11 at 13:03
I would have asked the question on math.stackexchange.com, but the FAQ there said that algorithm related questions should be asked on stackoverflow.com, and this definitely felt like an algorithm type question since it's an algorithm described in Wikipedia. –  Ants Dec 1 '11 at 13:07
Why the votes to close? Because this should be asked on math.stackexchange.com despite the FAQ there saying otherwise? –  Ants Dec 1 '11 at 13:08
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Wikipedia is correct.

331 is in the 1 spoke of the wheel. The spoke is not shaded, so 331 is potentially prime. And in fact, it is prime.

121 is also in the 1 spoke of the wheel, so 121 is potentially prime. That is, it is not eliminated as a prime by the wheel. However, it is not prime.

The wheel doesn't allow you to make any inference about the primality of 331 based on the non-primality of 121. Sorry.

I have an implementation of wheel factorization at my blog, if you want to look at it.

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In my 2-3-5-7 wheel, I see 121 and 331 to be on the same spoke, but 121 is in ring 0, while 331 is in ring 1. Anyway, I do see your point that I should only strike off multiples of 2, 3, 5, and 7. I was just beguiled by the 2-3 and 2-3-5 wheels illustrated where ring 0 in those wheels contained all primes. –  Ants Dec 1 '11 at 20:16