I am having hard time understanding how a decorated recursive function works. For the following snippet:

```
def dec(f):
def wrapper(*argv):
print(argv, 'Decorated!')
return(f(*argv))
return(wrapper)
def f(n):
print(n, 'Original!')
if n == 1: return(1)
else: return(f(n - 1) + n)
print(f(5))
print
dec_f = dec(f)
print(dec_f(5))
print
f = dec(f)
print(f(5))
```

The output is:

```
(5, 'Original!')
(4, 'Original!')
(3, 'Original!')
(2, 'Original!')
(1, 'Original!')
15
((5,), 'Decorated!')
(5, 'Original!')
(4, 'Original!')
(3, 'Original!')
(2, 'Original!')
(1, 'Original!')
15
((5,), 'Decorated!')
(5, 'Original!')
((4,), 'Decorated!')
(4, 'Original!')
((3,), 'Decorated!')
(3, 'Original!')
((2,), 'Decorated!')
(2, 'Original!')
((1,), 'Decorated!')
(1, 'Original!')
15
```

The first one prints f(n) so naturally it prints 'Original' every time f(n) is called recursively.

The second one prints def_f(n), so when n is passed to wrapper it calls f(n) recursively. But the wrapper itself is not recursive so only one 'Decorated' is printed.

The third one puzzles me, which is the same as using decorator @dec. Why does decorated f(n) calls the wrapper five times also? It looks to me that def_f=dec(f) and f=dec(f) are just two keywords bound to two identical function objects. Is there something else going on when the decorated function is given the same name as the undecorated one?

Thanks!

`f`

function still exists, thus that one is called. When you do`f = dec(f)`

, you will always call the new function. And the new function will call the original. – JBernardo May 25 '12 at 16:13`decorator`

might not be the right term to use here, as you never actually apply a decorator to the function. Your last test of`f = dec(f)`

is almost (if not exactly) the same as`@dec def f`

– Haldean Brown May 25 '12 at 17:33