# Mod in Java produces negative numbers

It seems like when I calculate int i = -1 % 2 I get -1 in Java. In Python I get 1. What do I have to do to get the same behavior in Java?

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No. Math teaches us an idea of modulo to group all numbers into equivalence classes so that for a modulo n all numbers a are identified with some number in range 0..n (n is positive). This is what we usually need in programming for wrapping array indeces. ** (uncensored) the division. We do not need any division. We need to work with circular buffers. Producing negative result for negative a contradicts this idea. Everybody needs index to stay in the range 0..array'length. So, there is a bug in math and Java but not in Python. That is why you want to fix it. –  Val Jan 31 '13 at 13:36
Wait, this is actually a duplicate question. It also has a perfect answer stackoverflow.com/a/4412200/1083704 –  Val Jan 31 '13 at 13:41
@Val you mentioned modulo n equivalence classes: this range {0,1,2..n-1} is good for programmers, but {-n,n+1,n+2,-1} is equivalent and has the same right to exist –  Tim Jan 8 at 20:44

It's pretty common in C derived languages for the modulus of a negative number to be negative. You can find the positive value by doing this:

int i = (((-1 % 2) + 2) % 2)

or this:

int i = -1 % 2;
if (i<0) i += 2;

(obviously -1 or 2 can be whatever you want the numerator or denominator to be)

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will only work in n%m if abs(n) < m –  amit Mar 21 '11 at 23:51
@amit_gr - no I believe it works in general –  andrewmu Mar 21 '11 at 23:56
you are right - my mistake. +1 –  amit Mar 21 '11 at 23:59
@Cachapa please provide an example to support that statement. I believe the OP's solution is general already, consider that (((-3 % 4) + 4) % 4) = 1 (the intended result) and also that (((3 % 4) + 4) % 4) = 3 (also the intended result). It works with both positive and negative dividends. –  The111 Jan 5 '13 at 8:54
@The111 Imagine the range of your integer is [-8, 7], (((5 % 6) + 6) % 6) = ((5 + 6) % 6) = (-5 % 6) = -5, but 5 % 6 is supposed to be positive. Substitute appropriately large numbers for 32 bit ints like 536887296 and 1610612736 and it is clear the second method is the better one. –  Greg Rogers Jan 2 at 20:23

If you need n % m then:

int i = (n < 0) ? (m - (abs(n) % m) ) %m : (n % m);

mathematical explanation:

n = -1 * abs(n)
-> n % m = (-1 * abs(n) ) % m
-> (-1 * (abs(n) % m) ) % m
-> m - (abs(n) % m))
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This expression didn't work for me. For negative values I was getting values between 1:m instead of the expected 0:m-1, as in the case where n is positive. The solution from andrewmu functioned as expected. –  Cachapa Dec 16 '12 at 13:42

If the modulus is a power of 2 then you can use a bitmask:

int i = -1 & ~-2; // -1 MOD 2 is 1

By comparison the Pascal language provides two operators; REM takes the sign of the numerator (x REM y is x - (x DIV y) * y where x DIV y is TRUNC(x / y)) and MOD requires a positive denominator and returns a positive result.

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