Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.


  • I am writing a program to solve for primes. I need to solve problems to the tune of 4x^2+y^2=n, where n is a known variable.
  • Yes, it has to be Ruby.
  • I am comfortable with spending a lot of time on this project.
  • I would, preferably, like to write the solving algorithm for the equations myself and incorporate it as part of this project.

What I would really love:

  • If anyone can provide me with a link to a guide, website, or disambiguation regarding the construction of formal algorithms related specifically to solving algebraic equations, or provide me with information that seems to you the reader that it would help me in my quest.
  • Please don't suggest I use another language. I would also appreciate if, before answering, you accept that I really, really want to do this. There is no scope or time constraint on this project, and it is not for profit. It is for my own education.


  • I'm not directly opposed to implementing and using an already extant math library/module/something for Ruby, but the other way is preferable to me.

Closing comments:

Thank you guys so much for taking the time to help me with this. I really appreciate the effort that this community puts into developing really solid answers to questions. This is the first time I've posted a question on here because I can usually find the answer. The problem is that I know how to solve these equations by hand/with a calculator, but I'm not sure how to solve them in code. Thanks again!


share|improve this question
@Russell: I would use Ruby myself as well, I do pet projects in Ruby because I find it exceptional for prototyping. If a project turns serious, it is always possible to rewrite the heavy tasks in C (with RubyInline). –  karatedog May 8 '12 at 9:53
@High Performance Mark None of those numbers in that equation are necessarily prime. It's an equation related to the sieve of Atkins, which was designed in 2004 as a faster descendant to the algorithm sieve of Eratosthenes, which solves for prime numbers between two given inputs. –  Andrew May 8 '12 at 9:55
@Russell I'm set on Ruby because I'm exploring.I already know what lies in the east, so I'm heading west. –  Andrew May 8 '12 at 9:58
@karatedog I wasn't suggesting speed as a reason not to use it. It depends if speed is a requirement. It's not a straight choice between Ruby and C though - you could look at Erlang, Haskell, R... where the advantage is in the ways you can express yourself rather than the speed. Seems a shame if the aim is exploration to limit yourself in this way. –  Russell May 8 '12 at 13:03
There ain't many existing libraries for math/science/data in Ruby because everyone is focusing on web. That's one reason some people switched to Python. Try to do something serious. If you need help, let me know. I am also rewriting the matrix class in standard lib. –  texasbruce May 8 '12 at 16:06

2 Answers 2

up vote 2 down vote accepted

As it seems you are trying to implement the Sieve of Atkin then you are also probably aware that 4x^2+y^2=n is only the first of three equations. I don't want to spoil your fun and thus the below only implements that one. If you get stuck, just comment this answer and I will get back to you.

max = 100
primes = Array.new(max + 1) { false }
sqrt = Math.sqrt(max)
1.upto(sqrt) do |x|
  1.upto(sqrt) do |y|
    n = 4 * x**2 + y**2
    primes[n] ^= true if n <= max && (n % 12 == 1 || n % 12 == 5)
share|improve this answer

I suppose you are implementing the Sieve of Atkin. In that case, you don't actually solve the equation. Look at the original paper for the actual algorithm.

share|improve this answer
Your question Index shouldn't start new page was migrated to another stackexchange site (tex.sx). Please register on that site, too, and make sure that both accounts are associated with each other (by using the same OpenID), otherwise you won't be able to comment on or accept/up-/down-vote answers or edit your question. And then welcome to TeX.sx! –  Stephen May 9 '12 at 14:40

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.