Write a recursive method numOnes() that takes a nonnegative integer n as input and returns the number of 1s in the binary representation of n. Use the fact that this is equal to the number of 1s in the representation of n//2 (integer division), plus 1 if n is odd.

```
>>> numOnes(0)
0
>>> numOnes(1)
1
>>> numOnes(14)
3
```