As noted in the other answers, simply reversing a list does not require inverting your tuples or any kind of sorting at all; you can use the `reverse`

function from `Prelude`

. However, if you do actually want to *sort* based on the numbers in your tuples, it's a slightly more complicated problem.

The `sort`

function from `Data.List`

is probably the function your friend was referring to. It compares elements of a list using the `compare`

function, and then sorts the list according to that. As your friend noted, the implementation of `compare`

for tuples is to compare the first elements of each tuple, and if they're equal, look at the second, etc.

However, there is a more general sorting function from `Data.List`

called `sortBy`

. It has the type signature:

```
sortBy :: (a -> a -> Ordering) -> [a] -> [a]
```

Essentially, it's the same as `sort`

, only instead of calling `compare`

to compare two values and determine their ordering, you can specify how it compares values. Since you want to compare these tuples by comparing their second values, the function you want to use is `snd`

(returns the second element of a tuple). We now have this:

```
λ> :m + Data.List
λ> let list = [(WATER, 3), (WIND, 4), (CREST, 5), (HOUSE, 1),(FRAME, 2)]
λ> let cmp a b = compare (snd a) (snd b)
λ> sortBy cmp list
[(HOUSE,1),(FRAME,2),(WATER,3),(WIND,4),(CREST,5)]
λ> sortBy (flip cmp) list
[(CREST,5),(WIND,4),(WATER,3),(FRAME,2),(HOUSE,1)]
```

To get the sort in descending order I used the `flip`

function from `Prelude`

, which simply reverses the order of the arguments of a two-argument function.

As a final note I'll bring up the function `comparing`

from `Data.Ord`

. Without going into too much detail, its functionality can be fairly easily understood by seeing it used in the same snippet of code:

```
λ> :m + Data.List Data.Ord
λ> let list = [(WATER, 3), (WIND, 4), (CREST, 5), (HOUSE, 1),(FRAME, 2)]
λ> sortBy (comparing snd) list
[(HOUSE,1),(FRAME,2),(WATER,3),(WIND,4),(CREST,5)]
λ> sortBy (flip $ comparing snd) list
[(CREST,5),(WIND,4),(WATER,3),(FRAME,2),(HOUSE,1)]
```

Given a function (call it `f`

), `comparing`

will return a comparing function that calls `f`

on two values first and then compares *those* values. Basically exactly what the function `cmp`

did in the first example but more concise and readable.