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Once again I find myself stuck with Java and modular division.

To cut a long story short, I'm doing some error correcting, and I need to divide two digits under mod 11.

Now this I know: (from using a modular calculator)

9/1 mod 11 = 9
2/10 mod 11 = 9

The problem comes in getting Java to calculate this.

In Java;
(9 / 1) % 11 = 9 - This is fine
(2 / 10) % 11 = 0 - This is not correct.

I know that Java cannot technically perform modular operations, and part of me is thinking that I either need to somehow calculate the inverse, or use an array to store the possible output values, but I thought I'd post this here to hear other people's ideas.

I look forward to hearing some opinions.

Thanks very much

Tony

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7  
Err, 2 / 10 is 0. And 0 % 11 is 0. Why would it be 9? –  JB Nizet Oct 22 '11 at 16:13
3  
Because I'm doing it under mod 11. Not normal division. –  Tony Oct 22 '11 at 16:17
    
What I've just done is: (2 * 10) % 11 = 9. Which seems to be giving me my correct answer. –  Tony Oct 22 '11 at 16:18
    
Ah, of course. But multiplication and division are not exactly the same thing. You found the correct problem for your solution. –  JB Nizet Oct 22 '11 at 16:23
1  
@stivlo: the question is about inverting multiplication in modular arithmetic. Because 10 is its own inverse mod 11, multiplying by 10 and dividing by 10 has the same effect in modulo-11 arithmetic. That's why Tony happens to get the correct answer a few comments above. –  Luke Woodward Oct 22 '11 at 19:48
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2 Answers

up vote 4 down vote accepted

I think what you are looking for is how to find the multiplicative inverse of a number modulo 11.

10 is its own inverse modulo 11, so it isn't a particularly useful example. Instead, let's find the multiplicative inverse of 7 modulo 11.

To do this, we solve the equation 7a + 11b = 1 for a and b in integers. We use the Euclidean algorithm to find suitable values for a and b. In this case, we can take a = -3 and b = 2. We ignore the value of b, and take a ( = -3) to be the inverse of 7 modulo 11. In modulo-11 arithmetic, 7 times -3 is 1.

If we don't like negative numbers, we can take the inverse of 7 modulo 11 to be 8 ( = -3 + 11) instead.

So, instead of dividing by 7 modulo 11, we multiply by -3, or by 8. For example, in modulo-11 arithmetic, 9 / 7 = 9 * 8 = 72 = 6.

If you only ever have one modulus to work with (e.g. you only ever work modulo 11), it's probably better to calculate a table of multiplicative inverses modulo 11 beforehand and use that in your calculations.

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Thanks for that Luke, I had a suspicion that's what I was going to have to do. Do you have any advice on generating such a table? I'm guessing I need a multi-dimensional array? –  Tony Oct 23 '11 at 9:49
1  
I don't see why you'd need a multidimensional array. If you only ever work modulo 11, calculate of the inverses of 1 to 10 modulo 11 and put them in a 1-dimensional array. If you're working with lots of moduli, or any large moduli, a table won't be such a good idea. –  Luke Woodward Oct 23 '11 at 10:37
    
Thanks Luke, I was getting a bit confused with what I was trying to do (it's still quite early for me) :). I've now built an inverse table using an array, and now everything is working as planned. Thanks for your help!! –  Tony Oct 23 '11 at 11:09
    
Luke, you've been a massive help, and I was wondering if I could ask of your help for a final time. Simply, I need a way in Java of it outputting 7, when I put in y = -4 % 11. Any suggestions? –  Tony Oct 23 '11 at 20:09
    
@Tony: one possible expression that handles negative numbers as well as positive numbers is ((y % 11) + 11) % 11. –  Luke Woodward Oct 24 '11 at 20:15
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Not sure if this is what you intend, but...

public static int divmod(int dividend, int divisor, int mod) {
    if (dividend >= divisor)
        return (dividend / divisor) % mod;
    return mod - dividend;
}

Testing it:

divmod(9, 1, 11)  // returns 9
divmod(2, 10, 11) // returns 9
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Thanks Óscar, this works for some number pairs, but fails for others. –  Tony Oct 23 '11 at 9:47
    
Give me a set of numbers for testing, specially the ones that fail, and I'll see what I can do to help you –  Óscar López Oct 23 '11 at 11:50
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