Lisp Koans Scoring Project: Refactor

I am going through Lisp Koans, it's a lot of fun! But I stuck at Scoring Projects (I had a bad solution). In this project we were asked to implement a simple game called `*Greed*`. The problem description is here:

``````; *Greed* is a dice game where you roll up to five dice to accumulate
; points.  The following "score" function will be used to calculate the
; score of a single roll of the dice.
;
; A greed roll is scored as follows:
; * A set of three ones is 1000 points
; * A set of three numbers (other than ones) is worth 100 times the
;   number. (e.g. three fives is 500 points).
; * A one (that is not part of a set of three) is worth 100 points.
; * A five (that is not part of a set of three) is worth 50 points.
; * Everything else is worth 0 points.
;
; Examples:
;
; (score '(1 1 1 5 1)) => 1150 points
; (score '(2 3 4 6 2)) => 0 points
; (score '(3 4 5 3 3)) => 350 points
; (score '(1 5 1 2 4)) => 250 points
;
; More scoring examples are given in the tests below:
;
; Your goal is to write the score method.
``````

My Solution is following:

WARNING! IF YOU HAVEN'T PLAY WITH THIS ONE. DO NOT SEE THIS!

I use an `occurs` function to calculate occurrences of number and represent in assoc-list. And a `formula-wrapper` function to provide correct arguments to `formula` function. The `formula` function to calculate scores. My solution is very ugly! Any advices are welcome! Thank you in advance.

``````(defun occurs (lst)
(let ((acc nil))
(dolist (obj lst)
(let ((p (assoc obj acc)))
(if p
(incf (cdr p))
(push (cons obj 1) acc))))
(sort acc  #'> :key #'cdr)))

(defun formula-wrapper (lst)
(formula (car lst) (cdr lst)))

(defun formula (number times)
(cond ((= times 0) 0)
((= times 1)
(case number
(1 100)
(5 50)
(otherwise 0)))
((= times 2)
(case number
(1 200)
(5 100)
(otherwise 0)))
((= times 3)
(case number
(1 1000)
(otherwise (* 100 number))))
((= times 4)
(case number
(1 1100)
(5 550)
(otherwise 0)))
((= times 5)
(case number
(1 1200)
(5 600)
(otherwise 0)))
(times 0)))

(defun score (dice)
(let ((rolls (occurs dice)))
(if (null rolls)
0
(apply #'+ (mapcar #'formula-wrapper rolls))))))
``````

The tests:

``````(define-test test-score-of-an-empty-list-is-zero
(assert-equal 0 (score nil)))

(define-test test-score-of-a-single-roll-of-5-is-50
(assert-equal 50 (score '(5))))

(define-test test-score-of-a-single-roll-of-1-is-100
(assert-equal 100 (score '(1))))

(define-test test-score-of-multiple-1s-and-5s-is-the-sum-of-individual-scores
(assert-equal 300 (score '(1 5 5 1))))

(define-test test-score-of-single-2s-3s-4s-and-6s-are-zero
(assert-equal 0 (score '(2 3 4 6))))

(define-test test-score-of-a-triple-1-is-1000
(assert-equal 1000  (score '(1 1 1))))

(define-test test-score-of-other-triples-is-100x
(assert-equal 200  (score '(2 2 2)))
(assert-equal 300  (score '(3 3 3)))
(assert-equal 400  (score '(4 4 4)))
(assert-equal 500  (score '(5 5 5)))
(assert-equal 600  (score '(6 6 6))))

(define-test test-score-of-mixed-is-sum
(assert-equal 250  (score '(2 5 2 2 3)))
(assert-equal 550  (score '(5 5 5 5))))
``````
-

One way to write it:

``````(defun find-set (roll)
"which number from 1 to 6 occurs at least three times in a list of five?"
(assert (= (length roll) 5))
(loop for i from 1 to 6
when (>= (count i roll) 3)
do (return i)))

(defun score-set (i)
"compute the set score for number i"
(case i
(1 1000)
(otherwise (* i 100))))

(defun score (roll &aux (s (find-set roll)) (score 0))
(when s
(setf score (score-set s)
roll (remove s roll :count 3)))
(incf score (* (count 1 roll) 100))
(incf score (* (count 5 roll) 50))
score)

(defun test ()
(assert (= (score '(1 1 1 5 1)) 1150))
(assert (= (score '(2 3 4 6 2)) 0))
(assert (= (score '(3 4 5 3 3)) 350))
(assert (= (score '(1 5 1 2 4)) 250))
t)
``````
-
Oh...The use of `&aux` is brilliant!!! Much cleaner & elegant solution. – juanitofatas Jun 2 '13 at 10:43
``````(defun score (dice)
(let ((freq (make-hash-table)))
(loop for x in dice do (incf (gethash x freq 0)))
(loop for x being the hash-key of freq using (hash-value c)
sum (if (<= 3 c)
(case x
(1 (+ 1000 (* 100 (- c 3))))
(5 (+  500 (*  50 (- c 3))))
(t (* x 100)))
(case x
(1 (* c 100))
(5 (* c  50))
(t 0))))))
``````
-

A tail-recursive version:

``````(defun score (dice)
(labels ((iter (left ans)
(if (not left) ans
(cond ((and (>= (length left) 3)