Just to help you wrap your brain around the answer, let me give you a simple analogy. Remember that floating point numbers are approximate. Many numbers cannot be exactly represented. Now, imagine we do the same thing with decimals, say we use six digits after the decimal place.

How do we represent 1/3? `.333333`

is the best we can do. But now `3 * 1/3`

will not equal 1.

How do we represent 2/3? `.666666`

will at least ensure `2 * 1/3 = 2/3`

. But `2/3 + 1/3`

will not equal 1.

We can represent 2/3 as `.666667`

. But then `2 * 1/3`

won't equal `2/3`

. But at least `1/3 + 2/3`

will equal one.

So the point is, with approximate representations, you can't ensure exactly right answers, only close enough answers. In general, you should never compare floating point numbers for equality unless you are 100% positive you understand what you are doing and why.