Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I am trying to teach myself scheme and the concept I am struggling with the most is space and time complexity. I was doing some of the exercises at the end of the chapter and I have not been able to figure out the following two. I am trying to figure out an asymptotic time complexity (tight bound) for each of the functions.

;; Finds the largest number below 1000000000 which is divisible by both 3 and 5.

(define (largest-div-3-or-5)
  (define (div-3-and-5? n)
    (and (= (remainder n 3) 0) (= (remainder n 5) 0)))
  (define (iter n r)
    (cond ((= n 1000000000) r)
          ((div-3-and-5? n) (iter (+ n 1) n))
          (else (iter (+ n 1) r))))
  (iter 1 0))

For this I thought the asymptotic time complexity was O(n) because we are calling the iterative function once everytime unless the stop condition is satisfied.

The second function is given by:

(define (sum-of-cubes-2-different-ways max-n)
  (define (cube n) (* n n n))
  (define (iter n1 n2 n3 n4 results)
    (cond ((> n1 max-n) results)
          ((> n2 max-n) (iter (+ n1 1) 1 1 1 results))
          ((> n3 max-n) (iter n1 (+ n2 1) 1 1 results))
          ((> n4 max-n) (iter n1 n2 (+ n3 1) 1 results))
          ; make sure n1,n2 are distinct from n3,n4:
          ((or (= n1 n3) (= n1 n4) (= n2 n3) (= n2 n4)) 
           (iter n1 n2 n3 (+ n4 1) results))
          ((= (+ (cube n1) (cube n2)) (+ (cube n3) (cube n4)))
           (iter n1 n2 n3 (+ n4 1) (cons (list n1 n2 n3 n4) results)))
          (else (iter n1 n2 n3 (+ n4 1) results))))
  (iter 1 1 1 1 (list)))

This seemed to me that it was O(n^2). It is difficult to explain why I think so I am just eyeballing it really.

share|improve this question
    
Dan, have you accepted anyone's answers yet? See stackoverflow.com/faq#howtoask for instructions on how to accept answers that you think have answered your questions. And if you feel the answers are missing something, say so as well. –  dyoo Feb 21 '12 at 2:55
add comment

1 Answer

up vote 1 down vote accepted

The first one's time complexity is O(n), because you are performing a constant number of operations per element in the list.

The second one's time complexity is O(n^4). You are iterating over every possible combination of 4 integers picked from the range [0,n). There are n choices for the first number, n choices for the second number, n choices for the third number, and n choices for the fourth number. Therefore, there are n^4 possible combinations of the four numbers, and you perform a constant number of operations per combination, which means that the overall complexity is O(n^4).

share|improve this answer
add comment

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.