In many programming languages (C, Java) the modulo operator is defined so that the modulus has the same sign as the first operand. This means that the following equation holds:
(-a) % n = -(a % n)
For example, -8%3 would be -2, since 8%3 is 2.
Others, such as Python, compute a % n instead as the positive remainder when diving by n, which means
(-a) % n = n - (a % n)
For example, -8%3 is 1 because 3-(8%3) is 3-2 is 1.
Note that in modular arithmetic adding or subtracting any multiple of n does not change the result because "equality" (or congruence if you prefer that term) is defined with respect to divisibility: X is equal to 0 if it is a multiple of n, and A is equal to B if A-B is a multiple of n. For example -2 is equal to 1 modulo 3 because -2-1 = -3 is divisible by 3.