# With Scheme language, how to check if a function is exponential

This shouldn't be this hard, but I'm stuck. We have a simple assignment where we're writing how to take the derivative of a function.

``````(define (derive exp var)
(cond ((number? exp) 0)
((variable? exp) (if (same-variable? exp var) 1 0))
((sum? exp) (derive-sum exp var))
((product? exp) (derive-product exp var))
((exponentiation? exp) (derive-exponentiation exp var))
(else 'Error)))
``````

But for the exponentiation, it needs to return true if I do have an exponential function. I'm just not entirely sure how to write it. So far I've just got something like this

``````(define (make-exponentiation base exponent)
(cons base exponent)

(define (base exponentiation)
(car exponentiation)

(define (exponent exponentiation)
'cdr exponentiation)

(define (exponentiation? exp)
'YourCodeHere)

(define (derive-exponentiation exp var)
(* var (make-exponentiation exp (var-1)) (derive exp))
``````

I'm not exactly sure what I'm checking about car and cdr. The whole thing is just a bit confusing. That's not the given code. I guess car and cdr are just kinda like placeholders at the moment.

-

It's quite some time, since I've done scheme. I'm more familiar with emacs lisp. So take with a grain of salt:

``````(define (make-exponentiation base exponent)
(list '^ base exponent))

(define (base exponentiation)
(car (cdr exponentiation)))

(define (exponent exponentiation)
(car (cdr (cdr exponentiation))))

(define (exponentiation? exp)
(equal? (car exp) '^))

(define (derive-exponentiation exp var)
(let ((b (base exp))
(e (exponent exp)))
(make-product e (make-exponentiation b (- e 1))))
``````
-
Oh..ooooh, ok. This actually is even better since we've already got functions to return the second and third terms. Thanks a bunch! I think I've got it. –  T T Nov 2 '12 at 19:47
Don't use `=` to compare symbols. Use `eq?`, `eqv?` or `equal?` instead. IIRC, `=` is only defined on numeric types. –  Dirk Nov 2 '12 at 19:58
@Dirk Thank you, fixed. –  Olaf Dietsche Nov 2 '12 at 19:59