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We need to write a currying method that does the same like the procedure below.

; Signature: c-bc(n)
; Type: [Number -> [Number -> Number]]
; Purpose: A naive Currying for binomial coefficient (n, k).
; Pre-conditions: n is a natural number
; Tests: ((c-bc 5) 3) => 10, ((c-bc 6) 2) => 15,
; ((c-bc 0) 0) => 1

(define c-bc
  (lambda (n)
    (lambda (k)
      (/ (fact n)
         (* (fact k)
            (fact (- n k)))))))

My solution:

(define c-bc
  (lambda (n)
    (let ((fact-n (fact n)))
      (lambda (k)
        (/ fact-n (* (fact k) (fact (- n k))))))))

Is it right? And how can I explain that this is currying?

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The original function is already currying. I'm not sure what your version is supposed to do differently. –  Chris Jester-Young Apr 11 '14 at 10:51
    
the first version is currying, but a naive one that compute (fact n) more times than the second solution. we expected to achieve partial evaluation goals. (as part from uni' course.) –  user2922951 Apr 11 '14 at 13:12
    
can someone help? –  user2922951 Apr 12 '14 at 10:40

1 Answer 1

Yes, it is right. Explain it as: "The binomial coefficient function takes two arguments, n and k. I've produced a curried function of n returning a function of r that computs the coefficient. The function of r is 'optimized' because a computation involving only n is lexically bound."

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