# In java, how would I find the nth Fibonacci number?

Determining the Fibonacci sequence is easy enough to figure out:

``````int num = 0;
int num2 = 1;
int loop;
int fibonacci;
System.out.print(num2);
for (loop = 1; loop <= 10; loop ++)
{
fibonacci = num + num2;
num = num2;
num2 = fibonacci;
System.out.print(" " + fibonacci);
}
``````

My problem lies with trying to pinpoint the value for a specified N. As in, If I want to find the 6th element in the sequence, which is 8, how would I find that number, and only that number?

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this is most definitely homework... –  amphibient Oct 22 '12 at 22:54
What do you mean by "the 6th digit in the sequence"? Are you concatenating all the fibonacci numbers and then counting digits, as in `112358132134...`? Or do you just want the nth fibonacci number? If instead of 6th you wanted the 8th "digit", what you be expecting to get as output, `21` or `3`? –  Jim Garrison Oct 22 '12 at 23:00
In the sequence, the first digit is 1. The second is 1. The third is 2...etc..the 8th would be 21, 9th 32...If I wanted to find the 6th(which is 8), how would I find it? –  CydonPrax Oct 22 '12 at 23:03
It seems you want the nth Fibonacci number, not digit. –  madth3 Oct 22 '12 at 23:23

In your code, `num` starts as the 0th Fibonacci number, and `num1` as the 1st. So to find the nth, you have to iterate the step `n` times:

``````for (loop = 0; loop < n; loop ++)
{
fibonacci = num + num2;
num = num2;
num2 = fibonacci;
}
System.out.print(num);
``````

and only print it when you've finished.

When the loop counter `loop` has the value `k`, `num` holds the kth Fibonacci number and `num2` the (k+1)th.

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+1 but a couple of quibbles: (1) there is no zeroth Fibonacci number. (2) The Fibonacci sequence can be said to start with the sequence `0,1` or `1,1`; which definition you choose determines which is the first Fibonacci number –  Jim Garrison Oct 22 '12 at 23:32
Usually, the n-th Fibonacci number, `F(n)` if you wish, is `(p^n - (1-p)^n)/sqrt(5)` with `p = (1+sqrt(5))/2`. So `F(0)`, the zeroth Fibonacci number is 0. –  Daniel Fischer Oct 22 '12 at 23:36
As fibonacci numbers grows fast, it is better to use `BigInteger` in calculations –  stemm Oct 22 '12 at 23:37

To find the n'th digit, we need to know the length of the Fibonacci numbers. You can convert int to string using Java's `Integer.toString(int)` function. Using the string, one can then determine the length of the converted Fibonacci number.

EDIT: Removed code b/c likely hwk question

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Its not homework, but I appreciate everyone's help regardless –  CydonPrax Oct 22 '12 at 23:19

To find the nth Fibonacci number, you must first calculate the prior two...

To calculate the prior two, you must first calculate the two before that.

etc.

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Just fyi, there is technically a mathematical formula to calculate the nth fibonacci number without recursion. –  arshajii Oct 22 '12 at 22:54
@A.R.S. true, but it's not exactly an easy formula –  Alnitak Oct 22 '12 at 22:56
@A.R.S. and it uses floating point math which results in inexact results. –  Alnitak Oct 22 '12 at 23:05
Yes you're absolutely right, just pointing out a technicality. –  arshajii Oct 22 '12 at 23:08
Just to be flippant, there are quite a few ways to work out Fibonacci numbers. It's what comes from centuries of Mathematicians with too much time on their hands. I think my favourite is the one where the n+2 Fibonacci number is the number of permutations of a binary string of length n that do not have at least one consecutive pair of 1s in them. –  Dunes Oct 22 '12 at 23:14
``````import acm.program.*;

public class FibonacciToN extends ConsoleProgram {

public void run() {

println("This program will display a table of Fibonacci numbers up to value n.");
int n = readInt("Enter an integer for value n: ");
int result = sequence(n);

}

private int sequence(int n) {

int a = 0;
int b = 1;

while (a < n) {
println(a);
a = a + b;
b = a - b;
}

return a;
}
}
``````
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