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'm trying to do a problem in my book but I have no idea how. The question is, Write function geometric() that takes a list of integers as input and returns True if the integers in the list form a geometric sequence. A sequence a0,a1,a2,a3,a4,...,an-2,an-1 is a geometric sequence if the ratios a1/a0,a2/a1,a3/a2,a4/a3,...,an-1/an-2 are all equal.

def geometric(l):
for i in l:
    if i*1==i*0:
        return True
else:
    return False

I honestly have no idea how to start this and I'm completely drawing a blank. Any help would be appreciated.

Thanks!

For example:

geometric([2,4,8,16,32,64,128,256]) True

geometric([2,4,6,8]) False

share|improve this question

4 Answers 4

This should efficiently handle all iterable objects.

from itertools import izip, islice, tee

def geometric(obj):
    obj1, obj2 = tee(obj)
    it1, it2 = tee(float(x) / y for x, y in izip(obj1, islice(obj2, 1, None)))
    return all(x == y for x, y in izip(it1, islice(it2, 1, None)))

assert geometric([2,4,8,16,32,64,128,256])
assert not geometric([2,4,6,8])

Check out itertools - http://docs.python.org/2/library/itertools.html

share|improve this answer
    
Yes! I like it. –  Ric Feb 25 '13 at 7:35
    
But you loose shortcircuiting in the all() right? You've had to calculate all the ratios. –  Ric Feb 25 '13 at 7:41
    
Nope, all should take care of short-circuiting. Try out geometric(xrange(1,1000000000)) ... runs in no time. –  pyrospade Feb 25 '13 at 7:53
    
Oh yeah, it is a generator. Never mind. +1 –  Ric Feb 25 '13 at 7:57
1  
Interesting. Would you not have to do that for obj as well? –  Ric Feb 25 '13 at 8:06

One easy method would be like this:

def is_geometric(a):
    r = a[1]/float(a[0])
    return all(a[i]/float(a[i-1]) == r for i in xrange(2,len(a)))

Basically, it calculates the ratio between the first two, and uses all to determine if all members of the generator are true. Each member of the generator is a boolean value representing whether the ratio between two numbers is equal to the ratio between the first two numbers.

share|improve this answer

Here's my solution. It's essentially the same as pyrospade's itertools code, but with the generators disassembled. As a bonus, I can stick to purely integer math by avoid doing any division (which might, in theory, lead to floating point rounding issues):

def geometric(iterable):
    it = iter(iterable)
    try:
        a = next(it)
        b = next(it)
        if a == 0 or b == 0:
            return False
        c = next(it)
        while True:
            if a*c != b*b: # <=> a/b != b/c, but uses only int values
                return False
            a, b, c = b, c, next(it)
    except StopIteration:
        return True

Some test results:

>>> geometric([2,4,8,16,32])
True
>>> geometric([2,4,6,8,10])
False
>>> geometric([3,6,12,24])
True
>>> geometric(range(1, 1000000000)) # only iterates up to 3 before exiting
False
>>> geometric(1000**n for n in range(1000)) # very big numbers are supported
True
>>> geometric([0,0,0]) # this one will probably break every other code
False
share|improve this answer
    
You should note that this is Python 3 code (since in Python 2.x range does not return an iterator). This is a really great solution. Genius idea to algebraically rearrange a/b != b/c to a*c != b*b. I am jealous! –  pyrospade Feb 25 '13 at 15:56
    
The only problem is that geometric([0,0,0]) probably should not be True since geometric sequences are defined using division - en.wikipedia.org/wiki/Geometric_series –  pyrospade Feb 25 '13 at 16:13
    
@pyrospade: Regarding [0,0,0], you may be right. It depends a bit on how you define things. The Wikipedia page on Geometric progression gives a definition that an all-zero sequence meets (0, 0*r, 0*r**2, ... for any r), but the question does have a definition that requires division. In any case, my algebraic manipulation of the ratios is not allowed if b or c is zero, so I suppose it's calculating incorrectly anyway. –  Blckknght Feb 26 '13 at 0:49
    
May be a good question for math.stackexchange. Either way, excellent solution. Easy enough to add in a check for zero and return False or throw an error. –  pyrospade Feb 26 '13 at 2:11
    
@pyrospade: good idea. I've added a check for a or b being zero at the start, and any zero that comes later will make the inequality false. –  Blckknght Feb 26 '13 at 4:04

Like this

def is_geometric(l):
    if len(l) <= 1: # Edge case for small lists
        return True
    ratio = l[1]/float(l[0]) # Calculate ratio
    for i in range(1, len(l)): # Check that all remaining have the same ratio
        if l[i]/float(l[i-1]) != ratio: # Return False if not
            return False
    return True # Return True if all did

And for the more adventurous

def is_geometric(l):
    if len(l) <= 1:
        return True
    r = l[1]/float(l[0])
    # Check if all the following ratios for each
    # element divided the previous are equal to r
    # Note that i is 0 to n-1 while e is l[1] to l[n-1]
    return all(True if e/float(l[i]) == r else False for (i, e) in enumerate(l[1:]))
share|improve this answer

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.