(You can write `1:2:3:4:5:[]`

more simply as `[1,2,3,4,5]`

or even `[1..5]`

.)

## Comprehensions

You'd like to use list comprehensions, so here it is:

```
subtractOne xs = [ x-1 | x <- xs ]
```

Here I'm using `xs`

to stand for the list I'm subtracting one from.

The first thing to notice is `x <- xs`

which you can read as "`x`

is taken from `xs`

". This means we're going to take each of the numbers in `xs`

in turn, and each time we'll call the number `x`

.

`x-1`

is the value we're calculating and returning for each `x`

.

For more examples, here's one that adds one to each element `[x+1|x<-xs]`

or squares each element `[x*x|x<-xs]`

.

## More than one list

Let's take list comprehension a little further, to write a function that finds the squares then the cubes of the numbers we give it, so

```
> squaresAndCubes [1..5]
[1,4,9,16,25,1,8,27,64,125]
```

We need

```
squaresAndCubes xs = [x^p | p <- [2,3], x <- xs]
```

This means we take the powers `p`

to be 2 then 3, and for each power we take all the `x`

s from `xs`

, and calculate `x`

to the power `p`

(`x^p`

).

What happens if we do that the other way around?

```
squaresAndCubesTogether xs = = [x^p | x <- xs, p <- [2,3]]
```

We get

```
> squaresAndCubesTogether [1..5]
[1,1,4,8,9,27,16,64,25,125]
```

Which takes each `x`

and then gives you the two powers of it straight after each other.

Conclusion - the order of the `<-`

bits tells you the order of the output.

## Filtering

What if we wanted to only allow some answers?

Which numbers between 2 and 100 can be written as `x^y`

?

```
> [x^y|x<-[2..100],y<-[2..100],x^y<100]
[4,8,16,32,64,9,27,81,16,64,25,36,49,64,81]
```

Here we allowed all `x`

and all `y`

as long as `x^y<100`

.

Since we're doing exactly the same to each element, I'd write this in practice using `map`

:

```
takeOne xs = map (subtract 1) xs
```

or shorter as

```
takeOne = map (subtract 1)
```

(I have to call it `subtract 1`

because `- 1`

would be parsed as negative 1.)

`Prelude> subtractOne x`

? Remember that Haskell doesnotuse parentheses with functions. – Code-Apprentice Jan 30 '13 at 1:27`subtractOne(x)`

is perfectly legal, though non-Haskellish – nameless Jan 30 '13 at 1:31whyit works. I suspect that the parens simply surround the expression`x`

and arenotfor a function call. – Code-Apprentice Jan 30 '13 at 1:35`add (x,y)`

illustrate Haskell's pattern matching feature to extract the two elements of a 2-tuple. – Code-Apprentice Jan 30 '13 at 1:40