# Reverse Modulus Operator

I have an expression with modulus in it that needs to be put in terms of x.

(a + x) mod m = b

I can't figure out what to do with the modulus. Is there a way to get x by itself, or am I out of luck on this one?

Edit: I realize that I can get multiple answers, but I'm looking for an answer that falls within the range of m.

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You may try to use The Chinese Remainder Theorem. Check this video. –  Mohamed Ennahdi El Idrissi Nov 27 '13 at 12:24
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## 3 Answers

You can't definitively figure out x, but we can get a bit further given the definition of the operator.

``````x mod y = z if x = ny + z for some integer n, where 0 <= z < y
``````

So in your case:

``````(a + x) mod m = b
a + x = nm + b
x = nm + b - a for some integer n
``````
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yep. you're screwed.

example:

``````5 mod 3 = 2
8 mod 3 = 2
``````

so inverse mod 2 is what? 8 or 5? or 11? or an infinitude of other numbers?

Inverse mod is a relation, you start to get to more tricky mathematics if you try to pursue this. If you're in haskell you could easilyish model it with non-determinism (an infinite list of possible answers)

Also, this isn't really a programming question. check out math exchange.

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Haha, just saw your edit. in the end i think you've thrown away too much info by applying modulus. It's a bit of an event horizon –  TheIronKnuckle Apr 12 '12 at 23:26
Right, I was hoping someone smarter than myself had a convenient solution, but I had almost come to this conclusion by myself before hand. Thx bout the tip about math exchange, I didn't know it existed till today! –  Michael Hogenson Apr 12 '12 at 23:29
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The tricky part about this equation is that even if you know a, m, and b, you can not conclusively figure out x.

For example, say your equation was:

``````(2 + x) % 4 = 3
``````

x could be 1, 5, 9, 13 etc.

This means you are out of luck, there is no way to get x by itself.

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Except that I'm looking for a value within the range of m, so it would only be 1, since 5, 9 and 13 are all outside the range I'm looking for. –  Michael Hogenson Apr 12 '12 at 23:28
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