In the most polite sense, your code is a bit off. You're learning Lisp this week, aren't you? That's OK! It's a fun language and can really do some awesome things.

So I'm going to walk through the creation of the routine, and take you along the tour.

Your basic case is -

```
(defun negate (n)
(if (> n 0) (- 0 n)))
(map #'negate '(1 2 3 4))
```

Walking the tree is more complex, but let's walk through the ideas.

Essentially, you have three cases to answer: is the current element nil, a list or an atom?

```
(if (not (car seq))
(if (listp (car seq))
;;Recurse
;;Otherwise negate the current element and append it to the recursed.
```

Let's try a first cut at this:

```
(defun negate-seq (seq)
(if (not seq)
(return-from negate-seq))
(if (listp (car seq))
(negate-seq seq)
(list (negate (car seq)) (negate-seq (cdr seq)))))
```

That's great!
Except...

```
(negate-seq '(1 2)) ==> (-1 (-2 NIL))
```

And...

```
(negate-seq '(1 (1 2 -3))) ==> STACK OVERFLOW!
```

Oh boy. We're in trouble now.

First, let's just try a `cons`

instead of a `list`

.
That cleans up the weird nested list problem.

It's obvious that we're gotten into a loop of infinite recursion. That shouldn't be possible, because we've got the `not seq`

guard. Okay, so let's try an debug. I'm using CLISP, and I can trace arguments with:

```
(trace 'negate-seq)
```

then,

```
(negate-seq '(1 (1 2 -3)))
```

Suddenly I see an explosion of

```
1621. Trace: (NEGATE-SEQ '((1 2 -3)))
1622. Trace: (NEGATE-SEQ '((1 2 -3)))
1623. Trace: (NEGATE-SEQ '((1 2 -3)))
1624. Trace: (NEGATE-SEQ '((1 2 -3)))
```

Crikey, I forgot my cdr and to cons up the list case! Hmmmm.

Let's try this:

```
(defun negate-seq (seq)
(if (not seq)
(return-from negate-seq))
(if (listp (car seq))
(cons (negate-seq (car seq))
(negate-seq (cdr seq)))
(cons (negate (car seq)) (negate-seq (cdr seq)))))
```

Recurse for the car, recuse on the car, cons them together, we might be on to something.

```
(negate-seq '(1 (1 2 -3))) => (-1 (-1 -2 NIL)
```

Hmmmm. Let's take a look at the trace.

- Trace: (NEGATE-SEQ '(1 (1 2 -3)))
- Trace: (NEGATE-SEQ '((1 2 -3)))
- Trace: (NEGATE-SEQ '(1 2 -3))
- Trace: (NEGATE-SEQ '(2 -3))
- Trace: (NEGATE-SEQ '(-3))
- Trace: (NEGATE-SEQ 'NIL)
- Trace: NEGATE-SEQ ==> NIL
- Trace: NEGATE-SEQ ==> (NIL)
- Trace: NEGATE-SEQ ==> (-2 NIL)
- Trace: NEGATE-SEQ ==> (-1 -2 NIL)
- Trace: (NEGATE-SEQ 'NIL)
- Trace: NEGATE-SEQ ==> NIL
- Trace: NEGATE-SEQ ==> ((-1 -2 NIL))
- Trace: NEGATE-SEQ ==> (-1 (-1 -2 NIL))

So I recurse until the -3, then.... it falls off? Odd. Ah! I'm continually grabbing the CDR of things. A CDR is always a list. (cdr '(-3)) is nil!

Let's see here....

(much rummaging around)

Negate returns nil on positive. D'oh.

```
(defun negate (n)
(if ( > n 0)
(- 0 n)
n))
(defun negate-seq (seq)
"Written by Paul Nathan"
(if (not seq)
(return-from negate-seq))
(if (listp (car seq))
(cons (negate-seq (car seq))
(negate-seq (cdr seq)))
(cons (negate (car seq))
(negate-seq (cdr seq)))))
```