It has to do with how the double type is implemented and the fact that the floating-point types don't make the same precision guarantees as other simpler numerical types. Although the following answer is more specifically about sums, it also answers your question by explaining how there is no guarantee of infinite precision in floating-point mathematical operations: Why does changing the sum order returns a different result?. Essentially you should never attempt to determine the equality of floating-point values without specifying an acceptable margin of error. Google's Guava library includes DoubleMath.fuzzyEquals(double, double, double) to determine the equality of two double values within a certain precision. If you wish to read up on the specifics of floating-point equality this site is quite useful; the same site also explains floating-point rounding errors. In summation: the expected and actual values of your calculation differ because of the rounding differing between the calculations due to the order of operations.
