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I have a bit of code:

(defun divisor (x)
  (loop for i from 2 to x do
       (if (= x i) (return x) 
           (if (not (mod x i))
               (return (append i (divisor (/ x i))))))))

that should return a list of the prime factors of x. However, the code just returns x.

The defun evaluates with no errors. I've attempted to trace every function in the defun, and none is ever evaluated. Loop is a macro, so I can't trace it, but if I clear out the inside of the loop and replace with

(format t "~d " i)

it counts from 2 to x, like I would expect.

I assume I've done something wrong, but I can't figure it out.

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3 Answers 3

up vote 6 down vote accepted

One problem is that you are using (not (mod x i)) to determine if the mod evaluation is 0, which is wrong.

Another problem is that you are appending atoms to lists and I don't think it is exactly what you want to do.

Here is a revised version that seems to work:

(defun divisor (x)
  (loop for i from 2 to x do
       (if (= x i) (return (list x))
           (if (= (mod x i) 0)
               (return (append (list i) (divisor (/ x i))))))))
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3  
The reason that (not (mod x i)) doesn't work is that anything but nil is true in common lisp (including 0). Also, (cons i (divisor (/ x i)) might be a bit more concise and closer to Albertus' intent. –  Daan Nov 6 '11 at 14:26
    
Thanks, I did not realize that 0 is not nil. Also, append obviously needs lists, not atoms. @Daan you're right, cons is definitely what I was searching for. Thank you! –  Albertus Nov 9 '11 at 14:49

In your loop, i eventually reaches x. So then you return x, discarding any other return value you might have returned from the sub-recursions.

I think you've improperly combined a loop with recursion. You only need to do one of them.

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    (defun divisor (x) 
      (loop for i from 2 to x when (eql 0 (mod x i)) collect i))
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The OP seems to want prime factorization (e.g., 12 -> 2, 2, 3), while this function returns all distinct factors (12 -> 2, 3, 4, 6); quite different. –  huaiyuan Nov 8 '11 at 13:27

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