Why 4.1%2 returns 0.0999999999999996?But 4.2%2==0.2.
See here: What Every Programmer Should Know About FloatingPoint Arithmetic Real numbers are infinite. Computers are working with a finite number of bits (32 bits, 64 bits today). As a result floatingpoint arithmetic done by computers cannot represent all the real numbers. 0.1 is one of these numbers. Note that is not an issue related to Ruby, but to all programming languages because it comes from the way computers represent real numbers. 


What Every Programmer Should Know About FloatingPoint Arithmetic 


Here's a different page about floatingpoint: http://docs.python.org/tutorial/floatingpoint.html. It's from the Python docs, but it's true of all languages that use fixedsize binary floats. 


In doubleprecision, 4.1 = 4.0999999999999996447286321199499070644378662109375 and 4.2 = 4.20000000000000017763568394002504646778106689453125. In other words, the binary approximation to decimal 4.1 is slightly less than you'd expect, and the binary approximation to decimal 4.2 is slightly more. Now why did 0.20000000000000017... round to 0.2 but 0.099999999999999644... NOT round to 0.1? Ruby is probably rounding all output to 15 significant decimal digits. 


Because you're working in floatingpoint. Binary floatingpoint cannot represent 0.1 exactly. 


4.2 % 2 == 0.20000000000000018
(ruby 1.9.2) – 32bitkid Jan 9 '12 at 14:03