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Below is an attempt I've made to create a procedure that returns the function composition given a list of functions in scheme. I've reached an impasse; What I've written tried makes sense on paper but I don't see where I am going wrong, can anyone give some tips?

; (compose-all-rec fs) -> procedure 
; fs: listof procedure
; return the function composition of all functions in fs:
; if fs = (f0 f1 ... fN), the result is f0(f1(...(fN(x))...))
; implement this procedure recursively

(define compose-all-rec (lambda (fs)
     (if (empty? fs) empty
     (lambda (fs)
         (apply (first fs) (compose-all-rec (rest fs)))
     ))))

where ((compose-all-rec (list abs inc)) -2) should equal 1
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2  
Have you been introduced to a design recipe or other formal methodology for attacking these kinds of problems? See: ccs.neu.edu/home/matthias/HtDP2e/index.html For example, you probably want to consider a few concrete test cases. Specifically, express expected output given some simple inputs. You've gone straight into coding, and that's often a problematic approach for problems larger than one-liners. –  dyoo Jan 22 '13 at 20:50
    
Concrete example about the empty case: what should (compose-all-rec (list)) be? What do you expect ((compose-all-rect (list)) -2) to be? –  dyoo Jan 22 '13 at 21:01

2 Answers 2

up vote 5 down vote accepted

I'd try a different approach:

(define (compose-all-rec fs)
  (define (apply-all fs x)
    (if (empty? fs)
        x
        ((first fs) (apply-all (rest fs) x))))
  (λ (x) (apply-all fs x)))

Notice that a single lambda needs to be returned at the end, and it's inside that lambda (which captures the x parameter and the fs list) that happens the actual application of all the functions - using the apply-all helper procedure. Also notice that (apply f x) can be expressed more succinctly as (f x).

If higher-order procedures are allowed, an even shorter solution can be expressed in terms of foldr and a bit of syntactic sugar for returning a curried function:

(define ((compose-all-rec fs) x)
  (foldr (λ (f a) (f a)) x fs))

Either way the proposed solutions work as expected:

((compose-all-rec (list abs inc)) -2)
=> 1
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How can i change it to get fN(fN-1(...(f0(x))...)) ? –  user2075220 May 14 at 18:07
    
@user2075220 reverse the input list –  Óscar López May 14 at 19:11
    
Can i do this inside function? –  user2075220 May 14 at 19:13
    
@user2075220 why don't you try it? you can check it by yourself. –  Óscar López May 14 at 19:27
    
ok, thank you, i didnt know where to place reverse but i already got it –  user2075220 May 14 at 19:31

Post check-mark, but what the heck:

(define (compose-all fns)
  (assert (not (null? fns)))
  (let ((fn (car fns)))
    (if (null? (cdr fns))
        fn
        (let ((fnr (compose-all (cdr fns))))
          (lambda (x) (fn (fnr x)))))))
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