# Java modular inverse

I'm doing some error correction in Java and to cut a long story short;

Under mod 11:

``````-4 mod 11 = 7
``````

This I've confirmed by using Google's calculator and a couple of online modulo calculators, but I cannot for the life of me figure out how to do it in Java.

I'm thinking that I need to use an inverse table to find the correct number but I seem to be going round in circles.

Any input would be appreciated.

Tony

-

The following will compute `n mod 11` for any integer `n`:

``````(n % 11 + 11) % 11
``````

The result of `n % 11` is in the range `-10`...`10`. The subsequent addition and the second modulo operation add `11` to `n % 11` iff the latter is negative.

This formula works for any base: just replace `11` with another positive integer.

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Or in general for `n` mod `y`: `(n % y + y) % y`. –  msandiford Oct 23 '11 at 22:26
Thank you very much! That was driving me crazy :) –  Tony Oct 23 '11 at 22:26

It'd be pretty simple to just write a mod function which does what you require. Example here:

``````private int mod(int x, int y)
{
int result = x % y;
if (result < 0)
{
result += y;
}
return result;
}
``````

It's much clearer than using `% 11 + 11) % 11`, and the operation makes sense immediately when you look at it. `mod(32, 11)` is more clearly `32 mod 11` than `(32 % 11 + 11) % 11`, and it saves an extra `%` operation.

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... and it costs an extra test and branch. –  EJP Oct 24 '11 at 2:25
This answer and comments on it provide my reasoning. Mod is likely a more expensive CPU operation compared to a test and branch. It may not even end up branching. –  darvids0n Oct 24 '11 at 3:22
Yes, I read it. I guess I will never understand why computer programmers are so terrified of arithmetic, given that formula translation is how it all started. –  EJP Oct 24 '11 at 3:52
According to the Java Language Spec, Java's `%` operator is a remainder operator, not a modulo operator.