# Counting the character recursively

def count_m_recursive(sentence):
s = len(sentence)
if s == 0:
return 0
elif sentence[0] == 'm':
return 1
else:
return count_m_recursive(sentence[1:s-1]

This is my code. So if count_m_recursive('my oh my') I should get 2

What is wrong with the code ?

-
How on earth do you expect that code to return 2? I mean.... there is not even a sum there! That function always and only returns 0 or 1. –  Bakuriu Apr 9 at 16:16

Two things are wrong:

1. You are cutting off the last character on each recursive call:

return count_m_recursive(sentence[1:s-1])

Don't limit the call to s-1, the end index is not included.

2. You don't want to ignore the rest of the text when you find an m at the start; your version returns 1 and ignores the rest of the string.

elif sentence[0] == 'm':
return 1 + count_m_recursive(sentence[1:])
else:
return count_m_recursive(sentence[1:])

or, simplified:

def count_m_recursive(sentence):
if not sentence:  # an empty string tests false
return 0
return (1 if sentence[0] == 'm' else 0) + count_m_recursive(sentence[1:])

or even use the fact that bool is a subclass of int and True is 1, False is 0:

def count_m_recursive(sentence):
if not sentence:  # an empty string tests false
return 0
return (sentence[0] == 'm') + count_m_recursive(sentence[1:])

Demo:

>>> def count_m_recursive(sentence):
...     if not sentence:  # an empty string tests false
...         return 0
...     return (sentence[0] == 'm') + count_m_recursive(sentence[1:])
...
>>> count_m_recursive('my oh my')
2
-
I'd love to hear what is not helpful or wrong about my answer, to deserve a downvote. That way I can improve my answer! –  Martijn Pieters Apr 9 at 9:34

For the fun, you can write the entire thing as an anonymous lambda expression as follows:

def make_funny_func():
# wrapped the code with return clause to emphasize that it is
# anonymous ;)
return (
# Y combinator
(lambda f: (lambda x: x(x))(lambda y: f(lambda a: y(y)(a))))
# our function wrapped
(lambda count:
lambda s:
# return 1 + f(s[1:]) if the first character is 'm'
# 0 + f(s[1:]) otherwise.
(s[0] == 'm') + count(s[1:])
# but do the thing before only if s is non-empty string
if s
# else return 0
else 0
)
)

count_m_recursive = make_funny_func()
print(count_m_recursive('mmmkay'))

Peer pessure badge, here we come ;-)

-
My oh my indeed.. –  Martijn Pieters Apr 9 at 10:31
+1 for providing new style. –  tuxuday Apr 9 at 10:32
interesting, Can you explain (lambda x: x(x))(lambda y: f(lambda a: y(y)(a))) form me. (lambda x: x(x))( and y(y)(a)) parts are very complex to me :( –  Grijesh Chauhan Apr 9 at 11:32
@GrijeshChauhan Read about lambda-calculus in particular about fixed-points (Y is just a possible fixed-point operator). –  Bakuriu Apr 9 at 16:19
By the way: an other fixed-point operator is the following: U = λ a b c d e f g i m n o p x t. t (i a m a f i x e d p o i n t); Y = U U U U U U U U U U U U U which is quite funny... –  Bakuriu Apr 9 at 16:35
def count_m_recursive(sentence): #mmmm
if not sentence:
return 0
m_first = 1 if sentence[0] == 'm' else 0
return m_first + count_m_recursive(sentence[1:])

To outline some issues in current implementation:

1. No need to calculate length of a string to check if it's empty. Empty strings are equivivalent to False in boolean "context" (e.g. not s is true if s is empty or None)
2. You don't sum up occurences of the m in a string, so there should be some count_so_far + recursive_call(). In your case, since you examine string char by char count_so_far is 1 if current char is m, 0 otherwise.
3. Proper slicing to get the all the string except first N chars would be string[N:]. There's a good explanation of slicing on SO

Also, this is a perfect example of tail recursive algorithm. Such kinds of algorithms can be expressed as a loop with advantage of executing in one call stack frame. Note that a lot of compilers optimize tail recursion to loop anyway (but that's not true for python interpreter).

-
Python does not optimize tail recursion; you'd explicitly use a loop instead. The dynamic nature of Python prevents optimization (the code could self-alter in more ways than I could count). –  Martijn Pieters Apr 9 at 9:46
But in my experience this is homework; the OP is asked to write a recursive function to learn about recursive programming, not to optimize away the recursion, at least not yet. :-) –  Martijn Pieters Apr 9 at 9:48
@MartijnPieters I'm not familiar with intrinsics of CPython to confidently state anything about optimizations it can or can't do, but I think I can trust your word on it. And I think I put this note on the wrong list, it shouldn't be seen as "issue", it's more of a general fact. –  J0HN Apr 9 at 10:25

Problem is with

1. elif sentence[0] == 'm':
2. slicing off last char with sentence[1:-1]

// Note Boolean is derived class of integer class

def count_m_recursive(sentence):
return (sentence or 0 ) and ((sentence[0] == 'm') + count_m_recursive(sentence[1:]))
-
right, thanks @MartijnPieters –  Aro Apr 9 at 9:48