Assuming you want to write a `collatz_list/2`

predicate with parameters `(int, list)`

, where `list`

is the collatz sequence starting with `int`

and eventually ending with `1`

(we hope so! It's an open problem so far); you just have to code the recursive definition in the declarative way.

Here's my attempt:

```
/* if N = 1, we just stop */
collatz_list(1, []).
/* case 1: N even
we place N / 2 in the head of the list
the tail is the collatz sequence starting from N / 2 */
collatz_list(N, [H|T]) :-
0 is N mod 2,
H is N / 2,
collatz_list(H, T), !.
/* case 2: N is odd
we place 3N + 1 in the head of the list
the tail is the collatz sequence starting from 3N + 1 */
collatz_list(N, [H|T]) :-
H is 3 * N + 1,
collatz_list(H, T).
```

**Modified version, includes starting number**

Let's test it:

```
full_list(N, [N|T]) :-
collatz_list(N, T).
collatz_list(1, []).
collatz_list(N, [H|T]) :-
0 is N mod 2,
H is N / 2,
collatz_list(H, T), !.
collatz_list(N, [H|T]) :-
H is 3 * N + 1,
collatz_list(H, T).
?- full_list(27, L).
L = [27, 82, 41, 124, 62, 31, 94, 47, 142|...].
```