Actually, `(foldl.foldr) f z xs === foldr f z (concat $ reverse xs)`

.

Even if `f`

is an associative operation, the correct sequence of applications matters, as it can have an impact on performance.

We begin with

```
(foldl.foldr) f z xs
foldl (foldr f) z xs
```

writing with `g = foldr f`

and `[x1,x2,...,xn_1,xn] = xs`

for a moment, this is

```
(...((z `g` x1) `g` x2) ... `g` xn)
(`g` xn) ((`g` xn_1) ... ((`g` x1) z) ... )
foldr f z $ concat [xn,xn_1, ..., x1]
foldr f z $ concat $ reverse xs
```

So in your case the correct reduction sequence is

```
(foldl.foldr) 1 [[1,2,3],[4,5,6]]
4+(5+(6+( 1+(2+(3+ 1)))))
22
```

To wit,

```
Prelude> (foldl.foldr) (:) [] [[1..3],[4..6],[7..8]]
[7,8,4,5,6,1,2,3]
```

Similarly, `(foldl.foldl) f z xs == foldl f z $ concat xs`

. With `snoc a b = a++[b]`

,

```
Prelude> (foldl.foldl) snoc [] [[1..3],[4..6],[7..8]]
[1,2,3,4,5,6,7,8]
```

Also, `(foldl.foldl.foldl) f z xs == (foldl.foldl) (foldl f) z xs == foldl (foldl f) z $ concat xs == (foldl.foldl) f z $ concat xs == foldl f z $ concat (concat xs)`

, etc.:

```
Prelude> (foldl.foldl.foldl) snoc [] [[[1..3],[4..6]],[[7..8]]]
[1,2,3,4,5,6,7,8]
Prelude> (foldl.foldr.foldl) snoc [] [[[1..3],[4..6]],[[7..8]]]
[7,8,1,2,3,4,5,6]
Prelude> (foldl.foldl.foldr) (:) [] [[[1..3],[4..6]],[[7..8]]]
[7,8,4,5,6,1,2,3]
```