# ruby 1.8 prime succ algorithm

I've searched every site I can imagine and am unable to determine the base algorithm that ruby 1.8 uses to create a list of primes in the Prime class under mathn. The following is a runnable version of the succ method, called 100 times (in order to find the 100th prime). Does anyone know how this works?

``````number_of_primes = 100

seed = 1
primes = Array.new
counts = Array.new

while primes.size < number_of_primes
i = -1
size = primes.size
while i < size
if i == -1
seed += 1
i += 1
else
while seed > counts[i]
counts[i] += primes[i]
end
if seed != counts[i]
i += 1
else
i = -1
end
end
end
primes.push seed
counts.push (seed + seed)
end

puts seed
``````

The actual code is of course: http://ruby-doc.org/stdlib-1.8.7/libdoc/mathn/rdoc/Prime.html

It doesn't look like a sieve algorithm as there is no predefined list to sift through, it's not a trial division algorithm as there are no division or modulus operations. I'm totally stumped.

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I think the question is quite clear, not sure why you got the downvotes and the close votes. –  Marc-André Lafortune Dec 8 '12 at 6:35
I don't mind getting downvoted if I've done something stupid/posted something unclear. It would be nice, however, if people who cast the downvotes let me know why so that I could fix it. –  cycala Dec 8 '12 at 14:52

The algorithm is based on the sieve of Eratosthenes.

`seed` is the integer being tested for primeness. `primes` is the list of primes smaller than `seed` and `counts` holds the corresponding smallest multiple that is greater than `seed`.

Think of `counts` as the list of the "next" crossed out numbers, but only one per prime, constantly updated. When finding the next largest multiple, if we get exactly `seed`, then it's not a prime, so it resets the outer loop (with `i=-1`).

Only when we've updated the list of greater multiples, without encountering exactly `seed`, can we deduce that `seed` is prime.

Here's the code slightly simplified and commented:

``````number_of_primes = 100

seed = 1
primes = []
counts = []

while primes.size < number_of_primes
seed += 1
i = 0
while i < primes.size      # For each known prime
while seed > counts[i]   # Update counts to hold the next multiple >= seed
counts[i] += primes[i] # by adding the current prime enough times
end
if seed != counts[i]
i += 1    # Go update next prime
else
i = 0     # seed is a multiple, so start over...
seed += 1 # with the next integer
end
end
# The current seed is not a multiple of any of the previously found primes, so...
primes.push seed
counts.push (seed + seed)
end

puts seed
``````
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Thank you! I appreciate your help and the clarity of your explanation. It still took me a second to fully understand what was happening, but I've got it now. –  cycala Dec 8 '12 at 14:51
Thank you so much! I've been wondering about that algorithm for years -- with your explanation, it finally makes sense. –  John Hyland Dec 10 '12 at 18:39