I was looking at the canonical bad fibonacci algorithm the other day:

```
public static int fib(int n)
{
// Base Case
if (n < 2)
return 1;
else
return fib(n-1) + fib(n-2);
}
```

I made the interesting observation. When you call fib(n), then for k between 1 and n fib(k) is called precisely fib(n-k+1) times (or fib(n-k) depending on your definition of fib(0) ). Also, fib(0) is called fib(n-k-1) times. This then allows me to find that in fib(100) there are exactly 708449696358523830149 calls to the fib function.

Are there other interesting observations on this function you know of?

Additional note: I know all the cool stuff about memoization etc... I am NOT asking on how to optimize it.