* What's in a powerset? A set's subsets.
An empty set, it's any set's subset,
so powerset of empty set's not empty.
Its only element's an empty set:*

```
(define
(powerset aL)
(cond
[(empty? aL) (list (empty))]
[else
```

* As for non-empty sets, there is a choice,
for each set's element, to be
or not to be included in subset
which is collected into powerset. *

We thus proceed along the input list, combining
each element with a resulting set
we've got recursively applying
our procedure to the rest of input.

```
(add-into (powerset (rest aL))
(first aL))]))
(define
(add-into r a) ; `r` is recursive result, `a` is first element
(cond
[(empty? r) (empty)] ; nothing to add `a` to
[else
(cons (cons a (first r)) ; either add `a`,
(cons (first r) ; or not, to the first in `r`
(add-into ; and recursively proceed
(rest r) ; to add `a` into the rest of `r`
a )))]))
```

* "There are no answers, only choices". Rather,
the choices made are what the answer's made of.*