# a iterative algorithm for fibonacci numbers

I am interested in a iterative algorithm for Fibonacci numbers, so I found the formula on wiki...it looks straight forward so I tried it in Python...it doesn't have a problem compiling and formula looks right...not sure why its giving the wrong output...did I not implement it right ?

``````def fib (n):
if( n == 0):
return 0
else:
x = 0
y = 1
for i in range(1,n):
z = (x + y)
x = y
y = z
return y

for i in range(10):
print (fib(i))
``````

output

``````0
None
1
1
1
1
1
1
1
1
1
1
``````
-

The problem is that your `return y` is within the loop of your function. So after the first iteration, it will already stop and return the first value: 1. Except when `n` is 0, in which case the function is made to return `0` itself, and in case `n` is 1, when the for loop will not iterate even once, and no `return` is being execute (hence the `None` return value).

To fix this, just move the `return y` outside of the loop.

### Alternative implementation

Following KebertX’s example, here is a solution I would personally make in Python. Of course, if you were to process many Fibonacci values, you might even want to combine those two solutions and create a cache for the numbers.

``````def f(n):
a, b = 0, 1
for i in range(0, n):
a, b = b, a + b
return a
``````
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thanks very much! that explains it now –  Ris Feb 23 '13 at 23:59
beautiful and elegant –  rbp Mar 11 at 17:06

Assuming these values for the fibonacci sequence:

F(0) = 0;

F(1) = 1;

F(2) = 1;

F(3) = 2

For values of N > 2 we'll calculate the fibonacci value with this formula:

F(N) = F(N-1) + F(N-2)

One iterative approach we can take on this is calculating fibonacci from N = 0 to N = Target_N, as we do so we can keep track of the previous results of fibonacci for N-1 and N-2

``````public int Fibonacci(int N)
{
// If N is zero return zero
if(N == 0)
{
return 0;
}

// If the value of N is one or two return 1
if( N == 1 || N == 2)
{
return 1;
}

// Keep track of the fibonacci values for N-1 and N-2
int N_1 = 1;
int N_2 = 1;

// From the bottom-up calculate all the fibonacci values until you
// reach the N-1 and N-2 values of the target Fibonacci(N)
for(int i =3; i < N; i++)
{
int temp = N_2;
N_2 = N_2 + N_1;
N_1 = temp;
}

return N_1 + N_2;
}
``````
-

You are returning a value within a loop, so the function is exiting before the value of y ever gets to be any more than 1.

If I may suggest something shorter, and much more pythonful:

``````def fibs(n):
fibs = [0, 1, 1]
for f in range(2, n):
fibs.append(fibs[-1] + fibs[-2])
return fibs[n]
``````

This will do exactly the same thing as your algorithm, but instead of creating three temporary variables, it just adds them into a list, and returns the nth fibonacci number by index.

-
This will take much more memory though as it needs to keep them all in the list (you’d notice it for very large `n`). Also I don’t think this is the best pythonic solution for this. I think using tuple (un)packing in a simple for loop (see edit to my answer) would be even nicer. –  poke Feb 24 '13 at 0:57
When you're right you're right! That's much nicer. –  KebertX Feb 24 '13 at 1:46
i would go one step further and say that although this solution is iterative, it has the same drawback as the recursive solution in the sense that it doesn't run in constant space. you've just replaced the stackframes with list elements. –  rbp Mar 11 at 17:06

On fib(0), you're returning 0 because:

``````if (n == 0) {
return 0;
}
``````

On fib(1), you're returning 1 because:

``````y = 1
return y
``````

On fig(2), you're returning 1 because:

``````y = 1
return y
``````

...and so on. As long as `return y` is inside your loop, the function is ending on the first iteration of your for loop every time.

Here's a good solution that another user came up with: How to write the Fibonacci Sequence in Python

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(wherever those curly braces came from… `from __future__ import braces`? :P) –  poke Feb 24 '13 at 0:13
Haha! Oops. I'm not even going to edit that out. :d –  John Hornsby Feb 24 '13 at 0:22