I don't get how the return statements work in any recursive function (in python). Can someone please give me a few basic examples as to what's going on, when you're returning "stuff" in a recursive function?
3 Answers
Recursion is an elegant programming style in which a function calls itself in a simpler form, until the simplest form is achieved.
This simplest form is called the 'base case' (in the following example, the base case is if n == 1: return 1
because for factorials, 1 is the simplest case you need to reach) which is a test to see whether or not the input is in its simplest possible state.
The other part of a recursive function is the 'recursive case', which is simplifying the function further (in the following example, n * factorial(n-1)
is the recursive case because it is simplifying the function using n-1
).
A simple, recursive factorial function:
def factorial(n): # only works for positive numbers
if n == 1: return 1 # base case
return n * factorial(n-1) # recursive case; only executed if the above is not
# executed because 'return' stops a function
A factorial is the multiplication of all numbers up to and including n
.
Let's break this apart:
factorial(4)
:
- Is
n
1? No, soreturn n * factorial(n-1)
4 * factorial(4-1)
=4 * factorial(3)
- Is
n
1? No, soreturn n * factorial(n-1)
3 * factorial(3-1)
=3 * factorial(2)
- Is
n
1? No, soreturn n * factorial(n-1)
2 * factorial(2-1)
=2 * factorial(1)
- Is
n
1? YES, soreturn 1
Now let's trace the calls:
Steps 1, 3, 5 are just checks, so they don't really return anything:
- Step 2:
factorial(4) = 4 * factorial(3)
- Step 4:
factorial(3) = 3 * factorial(2)
- Step 6:
factorial(2) = 2 * factorial(1)
- Step 7:
factorial(1) = 1
.
Thus, tracing the return
statements:
1 * 2 * 3 * 4 = 24, which is the factorial of 4.
When a function makes a recursive call, control passes into the called function. When a function returns, control passes out of that function to the one that called it. This is how an interactive debugger describes what is happening: step in to a function, step over each statement, step out of the function.
The usual bookkeeping for function calls is the structure called a stack. We're supposed to imagine a stack of plates that rest on a spring. Each invocation (call) of a function is one more plate "pushed" onto the "top" of the stack. Each return from a function "pops" that invocation off the stack.
Here's a simple example that uses indentation to represent the recursive calls (by measuring the depth of the stack)
>>> import inspect
>>> def factorial(n):
... print('{:{}}factorial({})'.format('', len(inspect.stack()), n))
... retval = 1 if n == 1 else n * factorial(n-1)
... print('{:{}}return {}'.format('', len(inspect.stack()), retval))
... return retval
...
>>> factorial(5)
factorial(5)
factorial(4)
factorial(3)
factorial(2)
factorial(1)
return 1
return 2
return 6
return 24
return 120
120