The problem is not the modulo operator, but rather the nature of floating point numbers. A double cannot hold the precise value of either 5.55, 3.14 or 2.41, so you get an approximate answer.

To understand this better, try to write down the value of 1/3 as a decimal, when you only have limited space on the paper to write it. You'll end up with something like `0.33333`

, which is an approximation of the actual value. The same happens to 5.55 when you write it in binary - it turns into `101.10001100110011001100110011...`

which gets cut off somewhere to fit the space of the double.