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I cant seem to find any kind of answer to this, but if I have an equation like the square root of (X^2-4n) where 4n is a constant, how could I set x so the equation gives a whole number.

I know setting x to n+1 works, but I'm looking for an algorithm that would generate all solutions.

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So, the problem is to find all pairs of integers (x, m) such that:

sqrt(x^2 - 4n) = m

We have:

x^2 - 4n = m^2

or

x^2 - mˆ2 = 4n

so

(x + m)(x - m) = 4n

Now, 2 divides 4n and so it must divide (x+m) or (x-m). But if it divides any of them it will divide the other too. Thus a := (x+m)/2 and b := (x-m)/2 are both integers. Therefore

a*b = n

So, it is just a matter of factoring n as a*b in all possible ways and recover x and m from the equations above:

x = a + b.
m = a - b.

Your solution x = n+1 corresponds to the trivial factorization n = n*1 where a=n and b=1.

UPDATE

Here is an algorithm that prints all pairs (x, m)

  1. [Initialize] a := n.
  2. [Check] if n % a = 0 then
    • b := n / a.
    • print(a + b), print(a - b)
  3. [Decrement] a := a - 1.
  4. [End?] if a * a > n go to Step 2.

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