I've been reading through some of the MIT opencourseware quizes and they had a question that goes like this:
6) Consider the two functions specified below that are used to play a “guess a number game.”
def cmpGuess(guess): """Assumes that guess is an integer in range(maxVal). returns -1 if guess is < than the magic number, 0 if it is equal to the magic number and 1 if it is greater than the magic number.""" def findNumber(maxVal): """Assumes that maxVal is a positive integer. Returns a number, num, such that cmpGuess(num) == 0.""" Write a Python implementation of findNumber that guesses the magic number defined by cmpGuess. Your program should have the lowest time complexity possible. """
Here's my implementation:
def find(maxVal): ceiling = maxVal floor = 0 while 1: med = ((ceiling + floor) / 2) res = cmp(med) if res == 1: ceiling = med elif res == -1: floor = med else: return med
And here's the answer sheet implementation provided by the teacher:
def findNumber(maxVal): """ Assumes that maxVal is a positive integer. Returns a number, num, such that cmpGuess(num) == 0 """ s = range(0, maxVal) return bsearch(s, 0, len(s) -1) def bsearch(s, first, last): if (last-first) < 2: if cmp(s[first]) == 0: return first else: return last mid = first + (last -first)/2 if cmp(s[mid]) == 0: return s[mid] if cmp(s[mid]) == -1: return bsearch(s, first, mid -1) return bsearch(s, mid + 1, last)
This is the cmp function used by both our functions, according to spec:
def cmp(guess): if guess > num: return 1 elif guess < num: return -1 else: return 0
One major difference is that my solution is iterative and that of the teacher is recursive. I timed 1000 runs of both our functions with a maxVal = 1,000,000. Here's the timing snippet:
t = timeit.Timer('find(1000000)', 'from __main__ import find,cmp') t1 = timeit.Timer('findNumber(1000000)', 'from __main__ import findNumber,bsearch') print str(t.timeit(1000)) print str(t1.timeit(1000))
My run took: 0.000621605333677s
The teachers run took: 29.627s
This can't possibly be right. I timed this several times in a row, and in all instances the second function came in with ridiculous 30s results. I copy pasted the solution function straight from the document provided by MIT. Any ideas?