# collatz conjecture using recursion and multiple arguments in python 2.7

I am required to write python code for the collatz conjecture using recursion in which the user is prompted for a positive integer and that number is either divided by 2 if even of multiplied by 3 and added to 1 if odd and this sequence continues until the value is equal to one. I must also prompt the user to choose how the sequence will be displayed, either the standard way in which it is calculated, reversed, or as a palindrome(forward and backward ie 86324895159842368) Below is currently what I have. I have no problem calculating the sequence itself, but I'm not sure how to implement the second argument. any time I attempt to define the direction as either F, B, or P, I get a bunch of errors. Any help in where I need to be going with this would be much appreciated

``````## CollatzRecursion

###
# define your RECURSIVE version of Collatz below this comment so that it runs
# correctly when called from below.

def Collatz(m):
seq = [m]
if m < 1:
return []
while m > 1:
if m % 2 == 0:
m = m / 2
else:
m = 3 * m + 1
seq.append(m)
if displaymode (F) :
return seq
if displaymode  (B) :
seq = seq[::-1]
return seq
if displaymode (P) :

#
# REQUIREMENTS:
#  a) The correct sequence must be printed, all the values on one line.
#  b) Your Collatz function must use recursion.
#  c) Aside from two arguments accepting a positive integer value and the letter
#     F, B, or P; your Collatz function MAY NOT use any other internal variables.
#  d) Your Collatz function may accept only the two arguments described in (c).
#  e) If the second argument is 'F', the sequence should b printed in its
#       naturally generated order.
#     If the second argument is 'B', the sequence should be printed in reverse.
#     If the second argument is 'P', then a palindrome of the sequence values should
#       be printed (see http://en.wikipedia.org/wiki/Palindrome).  In this case
#       it doesn't matter if your function prints the first value as 1 or the
#       value provided by the user.
###

###
# Do NOT alter Python code below this line
###
m = input( "Enter a positive integer value: " )
displaymode = ''  # initialize to anything not F, B, P
while displaymode not in ['F', 'B', 'P'] :
displaymode = raw_input( "Choose a display mode:  F=forward, B=backward,         P=palindrome: " )

Collatz( m, displaymode )
print
``````
• forward: `''.join(str(x) for x in Collatz(m))`, backward: `''.join(str(x) for x in reversed(Collatz(m)))`, palindrome: `a = ''.join(str(x) for x in Collatz(m)) \n print a + reversed(a)`\ – njzk2 Apr 23 '14 at 18:18
• If you have errors, you should provide the traceback – jonrsharpe Apr 23 '14 at 20:32

## 1 Answer

First of all, your current approach is not recursive as solicited.

I personally would do something like this (complying with the need for recursion and the lack of additional variables):

``````def collatz(acc, mode):
if isinstance(acc, int):
acc = [acc]
if acc[-1] == 1:
if mode not in 'FBP':
raise Exception('Unsupported display type')
if mode == 'F':
print ''.join(map(str, acc))
elif mode == 'B':
print ''.join(map(str, acc[::-1]))
else:
print ''.join(map(str, acc + acc[::-1]))
return
collatz(acc + [acc[-1] * 3 + 1 if acc[-1] % 2 else acc[-1] / 2], mode)
``````

Sample usage:

``````>>> collatz(11, 'F')
1134175226134020105168421
>>> collatz(11, 'B')
1248165102040132652173411
>>> collatz(11, 'P')
11341752261340201051684211248165102040132652173411
``````