I'm wondering what is the time complexity of `size()`

for portion view of TreeSet.

Let say I'm adding random numbers to set (and I do not care about duplicities):

```
final TreeSet<Integer> tree = new TreeSet<Integer>();
final Random r = new Random();
final int N = 1000;
for ( int i = 0; i < N; i++ ) {
tree.add( r.nextInt() );
}
```

and now I'm wodering what is complexity for `size()`

calls as:

```
final int M = 100;
for ( int i = 0; i < M; i++ ) {
final int f = r.nextInt();
final int t = r.nextInt();
System.out.println( tree.headSet( t ).size() );
System.out.println( tree.tailSet( f ).size() );
if ( f > t ) {
System.out.println( tree.subSet( t, f ).size() );
} else {
System.out.println( tree.subSet( f, t ).size() );
}
}
```

AFAIK complexity of `tree.headSet( t )`

, `tree.tailSet( f )`

and `tree.subSet( f, t )`

are O(lg N), `set.size()`

is O(1), but what about `size()`

methods above? I have such a bad feeling that it's O(K) where K is size of selected subset.

Maybe if there is some workaround to find index of some element in set it would be enough, because if I can get `ti = indexOf(f)`

, in let say O(lg N) than it is exactly what I need.