By the task we've had to implement foldl by foldr. By comparing both function signatures and foldl implementation I came with the following solution:

```
myFoldl :: (a -> b -> a) -> a -> [b] -> a
myFoldl _ acc [] = acc
myFoldl fn acc (x:xs) = foldr fn' (fn' x acc) xs
where
fn' = flip fn
```

Just flip function arguments to satisfy foldr expected types and mimic foldl definition by recursively applying passed function. It was a surprise as my teacher rated this answer with zero points.

I even checked this definition stacks its intermediate results in the same way as the standard foldl:

```
> myFoldl (\a elm -> concat ["(",a,"+",elm,")"]) "" (map show [1..10])
> "((((((((((+1)+10)+9)+8)+7)+6)+5)+4)+3)+2)"
> foldl (\a elm -> concat ["(",a,"+",elm,")"]) "" (map show [1..10])
> "((((((((((+1)+10)+9)+8)+7)+6)+5)+4)+3)+2)"
```

The correct answer was the following defintion:

```
myFoldl :: (a -> b -> a) -> a -> [b] -> a
myFoldl f z xs = foldr step id xs z
where step x g a = g (f a x)
```

Just asking why is my previous definition incorrect ?