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I am doing a Project Euler question for programming practice in order to self-teach myself. I know perfectly well how to do the question mathematically, as well as how to do it programmatically.

However, I have to have come up with some insane code to do it; 100 nested loops and Python hilariously raises this error, and probably rightfully so, on 100 levels of indentation:

IndentationError: too many levels of indentation

tally = 0
ceiling = 100
for integer_1 in range(0, 100, 1):
    for integer_2 in range(0, 100 - integer_1, 2):
        for integer_3 in range(0, 100 - integer_1 - integer_2, 3):
            for integer_4 ....
                for integer_5 ....
                            all the way to integer_100

I have looked through google for solutions but this issue is so rare it has almost no literature on the subject and I could only find this other stack overflow question ( Python IndentationError: too many levels of indentation ) which I could not find much useful in for my question.

My question is - is there a way to take my solution and find some workaround or refactor it in a way that has it work? I am truly stumped.


Thanks to nneonneo's answer, I was able to solve the question. My code is here just for future reference of people looking for ways to properly refactor their code.

from time import time
t = time()
count_rec_dict = {}

# for finding ways to sum to 100
def count_rec(cursum, level):
    global count_rec_dict

    # 99 is the last integer that we could be using,
    # so prevent the algorithm from going further. 
    if level == 99:
        if cursum == 100:
            return 1
            return 0

    res = 0

    for i in xrange(0, 101-cursum, level+1):

        # fetch branch value from the dictionary
        if (cursum+i, level+1) in count_rec_dict:
            res += count_rec_dict[(cursum+i, level+1)]

        # add branch value to the dictionary
            count_rec_dict[(cursum+i, level+1)] = count_rec(cursum+i, level+1)
            res += count_rec_dict[(cursum+i, level+1)]        

    return res}

print count_rec(0, 0)
print time() - t

which runs in an astonishing 0.041 seconds on my computer. WOW!!!!! I learned some new things today!

share|improve this question
Shoot - sorry guys I had a mistake in the ranges. Fixed now –  nebffa Sep 26 '12 at 0:10
hah just have to say, if you have 100 nested loops, there's gotta be a better way... –  Claudiu Sep 26 '12 at 0:11
this looks brute-forcey, and whichever euler question it is, i'll bet there is a smarter way to do it. a lot of those questions are based more around mathematical insights. –  wim Sep 26 '12 at 0:12
Hahahaha thats what I thought too. But this is the only thing that occurred to me. Once I solve the question I have access to other peoples' solutions and can see what I don't know. –  nebffa Sep 26 '12 at 0:12
There HAS to be a better way to do this. What is the actual problem you are trying to solve? –  inspectorG4dget Sep 26 '12 at 0:16

4 Answers 4

up vote 5 down vote accepted

A recursive solution should do nicely, though I'm certain there is an entirely different solution to the problem that doesn't require this kind of manipulation.

def count_rec(cursum, level):
    if level == 100:
        return 1
    res = 0
    for i in xrange(0, 100-cursum, level+1):
        res += count_rec(cursum+i, level+1)
    return res

print count_rec(0, 0)

Interestingly enough, if you memoize this function, it will actually have a reasonable running time (such is the power of dynamic programming). Have fun!

share|improve this answer
An example: for integer_5 in range(0, 100 - integer_1 - integer_2 - integer_3 - integer_4, 5). All loops follow this pattern. –  nebffa Sep 26 '12 at 0:11
But what's inside the innermost loop? –  nneonneo Sep 26 '12 at 0:13
a simple "tally += 1". That's all - just to count how many times the entire system ticks over. –  nebffa Sep 26 '12 at 0:15
right, so there's definitely a better way :) –  nneonneo Sep 26 '12 at 0:15
Not only an excellent answer but nneonneo's comments and suggestions helped me learn: recursion, memoization, global variables and dictionaries. Thankyou very much nneonneo, I have posted my code in the original answer (your code was slightly incorrect in that it counted a few too many cases, but without it I would never have been on the correct path nor learned what I needed to know). –  nebffa Sep 26 '12 at 5:41

One way to avoid the indentation error is to put the loops in separate functions, each one nested only one level deep.

Alternatively, you could use recursion to call a function over and over again, each time with a smaller range and higher nesting level.

That being said, your algorithm will have an impossibly long running time no matter how you code it. You need a better algorithm :-)

share|improve this answer
I'm not too sure how long it will actually take to run - I've adjusted the upper bounds on the ranges to reduce a long run time. You may be right, perhaps, and I may need to find another method :- ). However, I don't see how you would use recursion in this case without still having the problem with masive indentation. Can you provide a brief pseudocode example? –  nebffa Sep 26 '12 at 0:17
Fun fact: as a recursive, memoized function, it actually doesn't have an impossibly long running time, thanks to (implicit) dynamic programming. –  nneonneo Sep 26 '12 at 0:28

To do this using exactly your algorithm (restricting each next number to one that can possibly fit in the required sum), you really do need recursion - but the true brute force method can be a one-liner:

sum(sum(i) == 100 for i in itertools.product(xrange(100), repeat=100))

Naturally, this will be a fair bit slower than a true refactoring of your algorithm (in fact, as mentioned in the comments, it turns out to be intractable).

share|improve this answer
This would take longer than the age of the universe to run - that's why I can't do the brute force method. –  nebffa Sep 26 '12 at 0:44
@nebffa I don't think "longer than the age of the universe" is quite right; shouldn't take more than, say, a few weeks. –  lvc Sep 26 '12 at 0:46
@lvc: No, 100**100 picoseconds is a lot longer than the current age of the universe -- that's the number of iterations you are doing here. –  nneonneo Sep 26 '12 at 0:55
@nneonneo Ah. Point taken. –  lvc Sep 27 '12 at 0:38

The most effective solution is based on the idea of arithmetic carrying. You have lists of maximum values and steps, and also a list of current values. For each time you want to update those 100 variables, you do this:

inc_index = -1
currentvalue[inc_index] += stepval[inc_index]
# I use >= rather than > here to replicate range()s behaviour that range(0,100) generates numbers from 0 to 99.
while currentvalue[inc_index] >= maxval[inc_index]:
    currentvalue[inc_index] = 0
    inc_index -= 1
    currentvalue[inc_index] += stepval[inc_index]
# now regenerate maxes for all subordinate indices
while inc_index < -1:
    maxval[inc_index + 1] = 100 - sum (currentvalue[:inc_index])
    inc_index += 1

When an IndexError is raised, you've finished looping (run out of 'digits' to carry into.)

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