I'm solving a Project Euler problem which involves all the n-digit numbers with a certain property. It seems that the easiest way to get them might be to get a list of all the numbers with that property (which would be infinitely long), then select out the ones with the right number of digits. Like this:

```
numsWithCoolProperty = filter hasCoolProperty [1..]
nDigitNumsWithCoolProperty n = takeWhile (< 10^n) $ dropWhile (<= 10^(n-1)) numsWithOtherCoolProperty
```

But now if I want to do the same thing with a different property, I'll be repeating myself:

```
nDigitNumsWithOtherCoolProperty n = takeWhile (< 10^n) $ dropWhile (<= 10^(n-1)) numsWithOtherCoolProperty
```

so I want a function that captures the dropWhile/takeWhile logic. Something like:

```
f :: (a -> Bool) -> [a] -> [a]
f pred = takeWhile pred . dropWhile (not . pred)
```

and then if I have a predicate `hasNDigits n m`

which returns true if m has n digits, I can do:

```
nDigitNumsWithCoolProperty n = f (hasNDigits n) numsWithCoolProperty
nDigitNumsWithOtherCoolProperty n = f (hasNDigits n) numsWithOtherCoolProperty
```

Anyway, my question is about the function `f`

which has the same type as dropWhile and takeWhile: Does it already exist somewhere? If not, what would be a good name for it? All I can think of is something like `dropUntilTakeWhile`

but I'm sure there's a better name out there.

`take until + drop while`

recursive? Otherwise it would only work on a single transition between predicate matches and non-predicate matches. (I don't know the syntax well at all, so I can't tell if your definition of`f`

already does this) – Merlyn Morgan-Graham Jun 11 '11 at 7:14`numsWithCoolProperty`

is sorted (I guess I should have said that) which means I know all the three digit numbers will be grouped together. When it switches from two-digit to three-digit numbers, I want to start including those, and when it switches from three-digit to four-digit, I want to stop. If I didn't know the list was sorted (or that all the numbers matching the predicate were grouped in a single run) then I would use`filter`

. But I can't do that here because it's an infinite list, and I want to get a finite one back. – MatrixFrog Jun 11 '11 at 7:24`takeRange`

, and call the predicate`isInRange`

– Merlyn Morgan-Graham Jun 11 '11 at 7:36`nDigitNums n = [10^(n-1)..10^n-1]`

and then filter on that. – hammar Jun 11 '11 at 11:08`dropTakeWhile`

. – Landei Jun 11 '11 at 11:24