Assuming a working `wff`

predicate, your code will work. For example, using `numberp`

as the predicate:

```
(defun cong (fbf)
(and (eq (first fbf) 'and)
(reduce (lambda (x y) (and x y))
(mapcar #'numberp (rest fbf)))))
```

Works fine:

```
CL-USER> (cong '(and 1 2 3 4 5))
T
CL-USER> (cong '(and 1 2 3 4 foo))
NIL
CL-USER> (cong '(1 2 3 4))
NIL
```

Note, that this can be done more easily:

```
(defun cong (fbf)
(and (eq (first fbf) 'and)
(every #'wff (cdr fbf))))
```

Also, note that in CL, by convention, predicates usually should end in `p`

.

So, your, given your comment above, your problem is the `wff`

predicate, which doesn't seem to work for atoms. Since you mentioned that `p`

satisfies `wff`

, that predicate is plain wrong, but if you *have* to use it (assuming this is some kind of homework), just check if the element at hand is a cons:

```
(defun cong (fbf)
(and (eq (first fbf) 'and)
(every #'wff (remove-if-not #'consp (cdr fbf)))))
```

This assumes that every atom satisfies `wff`

. Thus, they won't change the outcome of a conjunction and can be dropped. Otherwise, you'd have to write another predicate to check for atoms satisfying `wff`

or, which would be the right thing to do, fix `wff`

in the first place.

Also, note that none of this really involves recursion, since you're only asking how to apply a predicate to a list and take the conjunction of the results.