# How would I express this Scheme function more clearly?

``````(define (repeated f n)
if (= n 0)
f
((compose repeated f) (lambda (x) (- n 1))))
``````

I wrote this function, but how would I express this more clearly, using simple recursion with repeated?

I'm sorry, I forgot to define my compose function.

``````(define (compose f g) (lambda (x) (f (g x))))
``````

And the function takes as inputs a procedure that computes f and a positive integer n and returns the procedure that computes the nth repeated application of f.

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Have you tested this function? Does it currently do what you think it should? –  Hugh Allen Nov 10 '08 at 2:23
Sorry about not making it clear enough, I updated my post. –  Brian Leahy Nov 10 '08 at 2:37

## 3 Answers

What is your function trying to do, just out of curiosity? Is it to run `f`, `n` times? If so, you can do this.

``````(define (repeated f n)
(for-each (lambda (i) (f)) (iota n)))
``````
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I'm assuming that (repeated f 3) should return a function g(x)=f(f(f(x))). If that's not what you want, please clarify. Anyways, that definition of repeated can be written as follows:

``````(define (repeated f n)
(lambda (x)
(if (= n 0)
x
((repeated f (- n 1)) (f x)))))

(define (square x)
(* x x))

(define y (repeated square 3))

(y 2) ; returns 256, which is (square (square (square 2)))
``````
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``````(define (repeated f n)
(lambda (x)
(let recur ((x x) (n n))
(if (= n 0)
args
(recur (f x) (sub1 n))))))
``````

Write the function the way you normally would, except that the arguments are passed in two stages. It might be even clearer to define `repeated` this way:

``````(define repeated (lambda (f n) (lambda (x)
(define (recur x n)
(if (= n 0)
x
(recur (f x) (sub1 n))))
(recur x n))))
``````

You don't have to use a 'let-loop' this way, and the lambdas make it obvious that you expect your arguments in two stages. (Note:recur is not built in to Scheme as it is in Clojure, I just like the name)

``````> (define foonly (repeat sub1 10))
> (foonly 11)
1
> (foonly 9)
-1
``````

The cool functional feature you want here is currying, not composition. Here's the Haskell with implicit currying:

``````repeated _ 0 x = x
repeated f n x = repeated f (pred n) (f x)
``````

I hope this isn't a homework problem.

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