## The simple answer

To understand this behaviour, you need to know that the expression `[a,b..c]`

will be desugared into `enumFromThenTo a b c`

where `enumFromThenTo`

is a method of the `Enum`

class.

The Haskell standard says that

For `Float`

and `Double`

, the semantics of the `enumFrom`

family is given by the rules for `Int`

above, except that the list terminates when the elements become greater than `e3 + i∕2`

for positive increment `i`

, or when they become less than `e3 + i∕2`

for negative `i`

.

Standards are standards, after all. But that's not very satisfactory.

## Going deeper

The `Double`

instance of `Enum`

is defined in the module GHC.Float, so let's look there. We find:

```
instance Enum Double where
enumFromThenTo = numericFromThenTo
```

That's not *incredibly* helpful, but a quick Google search reveals that `numericFromThenTo`

is defined in GHC.Real, so let's go there:

```
numericEnumFromThenTo e1 e2 e3 = takeWhile pred (numericEnumFromThen e1 e2)
where
mid = (e2 - e1) / 2
pred | e2 >= e1 = (<= e3 + mid)
| otherwise = (>= e3 + mid)
```

That's a bit better. If we assume a sensible definition of `numericEnumFromThen`

, then calling

```
numericEnumFromThenTo 0.1 0.3 1.0
```

will result in

```
takeWhile pred [0.1, 0.3, 0.5, 0.7, 0.9, 1.1, 1.3 ...]
```

Since `e2 > e1`

, the definition of `pred`

is

```
pred = (<= e3 + mid)
where
mid = (e2 - e1) / 2
```

Therefore we will take elements (call them `x`

) from this list as long as they satisfy `x <= e3 + mid`

. Let's ask GHCi what that value is:

```
>> let (e1, e2, e3) = (0.1, 0.3, 1.0)
>> let mid = (e2 - e1) / 2
>> e3 + mid
1.1
```

That's why you see `1.09999...`

in the list of results.

The reason that you see `1.0999...`

instead of `1.1`

is because `1.1`

is not representable exactly in binary.

## The reasoning

Why would the standard prescribe such bizarre behaviour? Well, consider what might happen if you only took numbers that satisfied `(<= e3)`

. Because of floating point error or nonrepresentability, `e3`

may never appear in the list of generated numbers at all, which could mean that innocuous expressions like

```
[0.0,0.02 .. 0.1]
```

would result in

```
[0.0, 0.02, 0.04, 0.06, 0.08]
```

which seems a little bizarre. Because of the correction in `numericFromThenTo`

, we make sure that we get the expected result for this (presumably more common) use case.

`f1`

is the closest floating point number to`m1/n`

and`f2`

is the closest floating point number to`m2/n`

, it does NOT follow that`f1+f2`

is the closest floating point number to`(m1+m2)/n`

. And no, no IEEE floating point numbers are exactly equal to 0.1 or 0.2. – aschepler Nov 2 '12 at 22:27nonterminatingbinary fraction, though. – Daniel Fischer Nov 2 '12 at 22:5610more comments