# How can you create a unique key for two interchangable integers?

I am trying to write a simple caching mechanism for Euclid's method of finding the GCD of two numbers:

gcd(a,0) = a
gcd(a,b) = gcd(b, a % b)


Note that gcd(a,b) == gcd(b,a).

For the cache, I need to find a key for a given (a,b) or (b,a), with 0 < a < 20 and 0 < b < 20.

Of course, I could use key = a*20 + b, or key = a + b*20, but those are asymmetric - the key for (1,5) is different than for (5,1).

How could I implement this?

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In what language? – Wooble Sep 15 '11 at 17:00
@Wooble - C++, but it's applicable to any language, really. – Austin Hyde Sep 15 '11 at 18:31
not necessarily; e.g. in Python, tuple(sorted(a,b)) makes a perfectly good key and doesn't require limiting the input values. – Wooble Sep 15 '11 at 18:32
@Wooble - Very true. I always forget about those nifty little tricks in Python/Ruby/etc... – Austin Hyde Sep 15 '11 at 19:09

First, sort the numbers.

key = a > b ? b*20 + a : a*20 + b;

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Let c be min(a,b) and d be max(a,b). Then, your hash function c*20 + d is symmetric with respect to a and b.

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