I was under the impression that `foldright`

starts from the end of a list and works backwards (this is how I imagined what right-associative means). So I am confused that the following works for infinite lists.

I have a function `find`

:

```
find :: (a -> Bool) -> List a -> Optional a
find p = foldRight (\c a -> if p c then Full c else a) Empty
```

Note that the following work:

```
>> find (const True) infinity
Full 0
```

I did do some searching and found this post: How do you know when to use fold-left and when to use fold-right?

Unfortunately, the accepted answer is not particularly helpful because the example for right-associative operations is:

```
A x (B x (C x D))
```

Which still means it needs to execute the right-most thing first.

I was wondering if anyone can clear this up for me, thanks.

`A`

is only evaluated if necessary. – 4castle Feb 7 '18 at 0:58`A x (B x (C x D))`

which still means it needs to execute the right-most thing first.". (Here I assume by "right-most thing" you mean`D`

, or possibly`C x D`

.) This appears to be the fundamental mistake you've made in your reasoning. – Daniel Wagner Feb 7 '18 at 2:09`A x (B x (C x D))`

, you can evaluate`A`

before`B x (C x D)`

, and if you know that`A`

provides the answer you never need to evaluate`B x (C x D)`

. (Consider for example`0 * (123456789 * (890123456 * 789123456))`

, which you can immediately see is`0`

.) – molbdnilo Feb 7 '18 at 9:32