# fibonacci sequence going from point a to point b?

``````m = 2
n =20
a,b = m,0
fib = [m]
while a <= n:
fib.append(a)
a,b = a+b, a
``````

So given two variables from `m` to `n (and m < n)`, I need to create a list containing all the numbers of the Fibonacci sequence between `m` and `n` inclusive (but cannot exceed) ex: if `m = 2` and `n = 20` then `fib` should be `[2,3,5,8,13]`.

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Please try it yourself first. –  ChristonianCoder Jul 25 '13 at 1:43
I did.....hence showing my code that i've been toying with –  user2612750 Jul 25 '13 at 21:06

I do not know how to start the fibonnaci sequence midway, so the best I can think of is to filter the results afterwards.

``````def f(low, high):
fib = [0]
a, b = 1, 0
while a <= n:
fib.append(a)
a,b = a+b, a
return filter(lambda x: x >= low and x =< high, fib)
``````

The fibonacci code is trivial, the new thing you might be seeing here is `filter`, which takes a function `f` and an iterable `x`, and returns a new iterable with all of the elements from `x` such that `f(x)` is true.

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``````def fib(m,n):
a,b = 1,1
while a < m:
a,b = b, a+b

while b < n:
a,b = b, a+b

In [2040]: fib(2,20)
Out[2040]: [2, 3, 5, 8, 13]
``````
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nevermind, I'm an idiot, this is clever and avoids if statements, +1 –  seth Jul 25 '13 at 5:29
``````m  = int(raw_input("Enter the start number : "))
n = int(raw_input("Enter the end number : "))
def fib(i):
if i == 0: return 0
elif i == 1: return 1
else: return f(i-1)+f(i-2)
print map(fib, range(m, n))
``````

I hope this is what you need.

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This is O(2^n). Additionally, it does not meet the function's criteria (start point and end point). It is not what he needs. –  Matt Bryant Jul 25 '13 at 2:27

I thanks it's simple and clear to calculate the Fibonacci number recursively or by put all the number in a list. But if the number is too large, it not a good idea. Here is code ,BTW

``````def main():
print fibo(100,600)
def fibo(m,n):
f0=2
f1=3
while f1<m:
tmp=f1
f1=f0+f1
f0=tmp
res=[f0]
while f1<n:
res.append(f1)
f1=res[-2]+res[-1]
return res[1:];

if __name__ == '__main__':
main()
``````
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I googled and find the n-th term formula of fibonacci here

so the codes could be:

``````def fibn(n):
Phi = (1+math.sqrt(5))/2
phi = (1-math.sqrt(5))/2
return round((math.pow(Phi, n) - math.pow(phi, n))/math.sqrt(5))

>>> fibn(0)
0.0
>>> fibn(1)
1.0
>>> fibn(2)
1.0
>>> fibn(3)
2.0
>>> fibn(4)
3.0
>>> fibn(5)
5.0
>>> fibn(6)
8.0
>>> fibn(7)
13.0
>>> fibn(8)
21.0
>>> fibn(9)
34.0
>>> fibn(10)
55.0
``````
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@seth could you give me a link about it? I checked 2 pages for references and they both use Phi and phi. –  hago Jul 25 '13 at 5:38
no, because I am an idiot and can't correctly interpret different unicode characters into their proper greek letters. –  seth Jul 25 '13 at 5:50

You could do something like:

``````def fibs(low,high):
a, b = 0, 1
while 1:
a, b = b, a+b
if low <= a:
if a <= high:
yield a
else:
break
``````

you can use it like

``````>>> for num in fibs(2,15):
...     print num
...
2
3
5
8
13
``````

But without resorting to the formula for the `nth` Fibonacci number and relying on proper rounding there isn't a way of getting the `nth` number without computing the first `n-1` numbers.

So, if you don't want to use the formula it would probably be best to just keep a list of the Fibonacci numbers around and use that, if it turns out you need numbers between `low` and `high` where `high > fib_nums[-1]` then you can always use `fib_nums[-1]` and `fib_nums[-2]` as `b` and `a` to compute the values you're missing.

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There are a few subproblems to consider for getting a log order solution, assuming (n-m) is relatively small. If (n-m) can be relatively large its best to precompute all reults and simply do a binary search.

1. Can we find i th fibonacci number in log time?
2. Can we find the number j such that fib(j) >= m ?

For first problem we can find i th fibonacci using (http://en.wikipedia.org/wiki/Fibonacci_number#Matrix_form).

And the second problem can be solved using a binary search and uses first method to find the fibonacci number >= m. Once we know j we can find j+1 th fibonacci number in log time, and simply generate all other numbers <=n using these.

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Using Generator :

``````import os,sys

def fib(num):
a=0
b=1
while 1:
a,b =b, b+a
yield a

low=2
high=200
for i in fib(range(1)):
if i <= high and i >= low :
print i
elif i > high:
break
``````

O/P 2 3 5 8 13 21 34 55 89 144

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