First of all, this won't work exactly like the normal list instance. The normal instance only depends on the items of the list being orderable themselves; your proposal depends on their being *numbers* (e.g. in the `Num`

class) and so is more narrow.

It is necessary to define a new `sum`

function. Happily it's very easy to write `sum`

as a simple recursive function. (Coincidentally, you can call your function `sum'`

, which is pronounced as "sum prime" and by convention means it's a function very similar to `sum`

.)

Additionally, the instance would have to depend on the `Num`

class as well as the `Ord`

class.

Once you have a new `sum`

function, you can define an instance something like this:

```
instance (Ord n, Num n) => Ord (List n) where compare = ...
-- The definition uses sum'
```

This instance statement can be read as saying that for all types `n`

, if `n`

is in `Ord`

and `Num`

, `List n`

is in `Ord`

where comparisons work as follows. The syntax is very similar to math where `=>`

is implication. Hopefully this makes remembering the syntax easier.

You have to give a reasonable definition of `compare`

. For reference, `compare a b`

works as follows: if `a < b`

it returns `LT`

, if `a = b`

it returns `EQ`

and if `a > b`

it returns `GT`

.

This is an easy function to implement, so I'll leave it as an exercise to the reader. (I've always wanted to say that :P).