# Finding the largest modulus of congruence for two integers?

Given two integers is there an easy way to find the largest modulus of congruence for them? i.e. a % n == b %n, Or even to enumerate all of them? Obviously, I could try every value less than them, but it seems like there should be an easier way.

I tried doing something with gcds, but then you just get things where a % n == b % n == 0, which isn't as cool as I was hoping for, and I'm pretty sure this isn't necessarily the largest n.

Any ideas?

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## 1 Answer

If a and b are the numbers, then we consider:

a = nx + r
b = ny + r

Where n is the modulus we want to find, and r is the common remainder. So,

a - b = n(x - y)

Maximum n is achieved with x - y = 1. So,

n = a - b

(If I understood the question correctly.)

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Yes, that's just what I was looking for. It makes sense that the difference between the two is a valid modulus, it wasn't obvious to me that this was the maximum. Thanks! –  Chad Mourning Oct 25 '11 at 23:04
Cool :) Just make sure to check for the degenerate case where a = b, in which case n would calculate to 0, which is meaningless. The 'real' n in that case would of course be 'a' (or 'b'). –  lurker Oct 25 '11 at 23:10
Also take care that a > b. –  Brian Gordon Oct 26 '11 at 2:21
Good catch, Brian. I should have stated that as an assumption. :) –  lurker Oct 26 '11 at 2:39