# Recursion on Fibonacci Sequence

I need some help in understanding the processing that happens here, so let´s say I call `fib(5)` I want the fibonacci 5, which is 8. But my brain in trying to understand the algorithm says it´s not. This is how i (wrongly) think:

``````return fib(4) + fib(3) // Stack frame 1
return fib(3) + fib(1) // Stack frame 2
``````

now cause x is 1 `fib(1)`, the conditional statement `if x == 0 or x == 1:` causes the recursion to end. Which according to my logic would become 3+1+4+3. Please correct my faulty logic.

``````def fib(x):
"""assumes x an int >= 0
returns Fibonacci of x"""
assert type(x) == int and x >= 0
if x == 0 or x == 1:
return 1
else:
return fib(x-1) + fib(x-2)
``````
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Just write down on a paper the first call and replace each recursive calls of the function with the valid return statement. What you probably don't understand is that `return fib(x - 1) + fib( x - 2)` calls twice your fib function, one with parameter x = current x decremented once, and the other decremented twice. You should also probably look into function arguments again, since this is a typical misunderstanding when using functions (at first). –  Jean-Marie Comets Dec 1 '12 at 10:36
Just put some print statement in your function and run it to see what it's doing. –  martineau Dec 1 '12 at 10:38

Here is the full expansion of what happens:

``````fib(5) expands to fib(4)+fib(3)
fib(4) expands to fib(3)+fib(2)
fib(3) expands to fib(2)+fib(1)
fib(2) expands to fib(1)+fib(0)
fib(1) evaluates to 1
fib(0) evaluates to 1
fib(1) evaluates to 1
fib(2) expands to fib(1)+fib(0)
fib(1) evaluates to 1
fib(0) evaluates to 1
fib(3) expands to fib(2)+fib(1)
fib(2) expands to fib(1)+fib(0)
fib(1) evaluates to 1
fib(0) evaluates to 1
fib(1) evaluates to 1
``````

If you count the ones, you get 8 as the answer.

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For all `x` greater than 1, the `fib` function calls itself twice:
1. `fib(5)` becomes `fib(4) + fib(3)`
2. and expands to `(fib(3) + fib(2)) + (fib(2) + fib(1))`
3. and expands to `((fib(2) + fib(1)) + (fib(1) + fib(0))) + ((fib(1) + fib(0)) + 1)`
4. expands to `(((fib(1) + fib(0)) + 1) + (1 + 1)) + ((1 + 1) + 1)`
5. expands to `(((1 + 1) + 1) + (1 + 1)) + ((1 + 1) + 1)`
which sums up to `8`.