# In the Fibonacci sequence, is fib(0) 0 or 1 ?

I'm doing a task in a subject were fib(0) is defined to = 1. But that can't be right? fib(0) is 0?

``````Program with fib(0) = 1; spits out fib(4) = 5
Program with fib(0) = 0; spits out fib(3) = 3
``````

What is the correct definition?

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ever heard of wikipedia: en.wikipedia.org/wiki/Fibonacci_number –  Christoph Sep 20 '09 at 14:41
Fib 0 = 0 is correct. But for some people, the earth is flat and Fib 0 = 1. –  Daniel Fischer May 22 '12 at 15:32
Is this related to project euler? –  oɔɯǝɹ Jan 23 '13 at 22:06

You're correct. The Fibonacci sequence is defined with seed values `fib(0) = 0` and `fib(1) = 1`. This is a requirement for the rest of the sequence to be correct.

The only condition under which `fib(0) = 1` could work is if you defined a "-1 based counting system" (as opposed to the usual conventions of 0-based and 1-based). This would be pretty wacky however, I'm sure you agree.

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In other words, his sequence is offset by one index. –  Markus Sep 20 '09 at 14:56
@Markus: Yes, offset in a very strange way. It could just be that whoever assigned the task got it wrong, however (more likely?). –  Noldorin Sep 20 '09 at 15:00
It's not a requirement, see the answer of Dale Gerdemann. –  Sjoerd May 8 '11 at 11:57
@Sjoerd: I've done enough mathematics to know it's simply non-standard. –  Noldorin May 8 '11 at 13:13
The funny thing is that the project euler fibonacci puzzles work on the premise of `fib(0) = 1`. –  oɔɯǝɹ Jan 23 '13 at 22:04

From the Fibonacci number entry on Wikipedia:

In mathematics, the Fibonacci numbers are the following sequence of numbers:

By definition, the first two Fibonacci numbers are 0 and 1, and each remaining number is the sum of the previous two. Some sources omit the initial 0, instead beginning the sequence with two 1s.

In mathematical terms, the sequence Fn of Fibonacci numbers is defined by the recurrence relation

with seed values

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With a nice little emphasis on: "Some sources omit the initial 0, instead beginning the sequence with two 1s" –  NomeN Sep 20 '09 at 15:41

Based on the definition of the Fibonacci sequence, you can generate a closed form for defining the nth element:

``````F(n) = ( f^n - (1-f)^n ) / sqrt(5),
where f = (1 + sqrt(5)) / 2 [the golden ratio]
``````

For n = 0 it is clearly 0:

``````F(0) = (1 - 1) / sqrt(5) = 0.
``````
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That's an explanation, albeit a roundabout one. It's really the seed that defines it in the first place. –  Noldorin Sep 20 '09 at 15:01
True, this is inside-out... –  Zed Sep 20 '09 at 15:09
Anyway, there's certainly no debate on the closed form, so this gives an unquestionable answer to the question =) –  Zed Sep 20 '09 at 15:12
@Noldorin Of course you could define the seed differently, but then a lot of nice theorems would become false, like this one. BTW, my favorite is gcd(F_m, F_n) = F_gcd(m,n). –  starblue Sep 20 '09 at 16:05

The definition with Fib(0) = 1 is known as the combinatorial definition, and Fib(0) = 0 is the classical definition. Both are used in the Fibonacci Quarterly, though authors that use the combinatorial definition need to add a sentence of explanation. Benjamin and Quinn in Proofs that Really Count use f_n for the nth combinatorial Fibonacci number and F_n for the nth classical Fibonacci number. The combinatorial definition is good, not surprisingly for counting questions like "How many ways are there to walk up a flight of n steps, taking either one or two steps at a time?" When n is 0, there's one way to do it, not zero ways.

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The `Fibonacci Quarterly`? i must get a subscription! :-) –  oɔɯǝɹ Jan 23 '13 at 22:09
``````fib 0 = 0
fib 1 = 1
``````

That is the seed value definition.

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source? Or any other backup for your claim? Just stating that something is so, doesn't make it so. –  Sjoerd May 8 '11 at 11:58