Why does Fibonacci recursive procedure works so long?

This is in OCaml:

```
let rec fib n = if n<2 then n else fib (n-1) + fib (n-2);;
```

This is in Mathematica:

```
Fib[n_] := If[n < 2, n, Fib[n - 1] + Fib[n - 2]]
```

This is in Java:

```
public static BigInteger fib(long n) {
if( n < 2 ) {
return BigInteger.valueOf(n);
}
else {
return fib(n-1).add(fib(n-2));
}
}
```

For `n=100`

it works for a long time, because, I guess, it traces tree with `2^100`

nodes in time.

Although, there are only 100 numbers to generate, so it could consume just 100 memory registers and 100 calculation tacts.

So, execution could be optimized.

What does this task about and how is it solved? Since solution does not implemented in Mathematica it probably doesn't exist. What about research on this matter?