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The prompt is to define a procedure that returns the sum of the squares of the two largest of three numbers.

I know this isn't exactly an elegant solution, but this is what I hacked together:

(define (largest-of-two-sum-of-squares x y z)
        (cond ((and (< x y) (< x z)) (sum-of-squares y z))
              ((and (< y z) (< y x)) (sum-of-squares x z))
              ((and (< z x) (< z y)) (sum-of-squares x y)))))

What I'm wondering is why I'm getting an error.

;The object 85 is not applicable

The number that follows the word object is always the correct answer, btw. I am a scheme beginner, it must be something in my syntax?


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You have one excess closing bracket. –  sindikat Mar 10 '12 at 17:13
What happens with 6 6 6 as input? :-) –  6502 Mar 10 '12 at 17:43

3 Answers 3

As sindikat pointed out, an excess closing bracket. Sorry about that.

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Mark your answer as correct to close the question :) –  sindikat Mar 11 '12 at 10:37
It's not "correct", it fails if the three numbers are equal –  Óscar López Mar 11 '12 at 14:08
@ÓscarLópez: or if two are equal and lower than the other –  6502 Mar 11 '12 at 14:24

Here's another possible solution, this one works even in the cases where all three numbers are equal or if two are equal and lower than the other:

(define (sum-max a b c)
  (define (sum x y)
    (+ (* x x) (* y y)))
  (if (>= a b)
      (if (>= b c)
          (sum a b)
          (sum a c))
      (if (>= a c)
          (sum b a)
          (sum b c))))
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And why the downvote? my solution is correct, And he OP already found the problem in his code, I'm just pointing another alternative. –  Óscar López Mar 10 '12 at 17:40

What about

(define (largest-of-two-sum-of-squares x y z)
    (+ (square x) (square y) (square z)
       (- (square (min x y z)))))


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The above solution is of course correct, but given the point in the SICP book where the exercise 1.3 is stated, the reader is not supposed to "know" about the min procedure yet. Only conditional expressions would be allowed –  Óscar López Mar 11 '12 at 22:24

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