It turns out that it is indeed possible to do this with no loops. It is fastest to precompute the (at least) 8 bit version of this problem. Of course, these tables use up cache space, but there should still be a net speedup in virtually all modern pc scenarios. In this code, n=0 returns the least set bit, n=1 is second-to-least, etc.

**Solution with __popcnt**

There is a solution using the __popcnt intrinsic (you need __popcnt to be extremely fast or any perf gains over a simple loop solution will be moot. Fortunately most SSE4+ era processors support it).

```
// lookup table for sub-problem: 8-bit v
byte PRECOMP[256][8] = { .... } // PRECOMP[v][n] for v < 256 and n < 8
ulong nthSetBit(ulong v, ulong n) {
ulong p = __popcnt(v & 0xFFFF);
ulong shift = 0;
if (p <= n) {
v >>= 16;
shift += 16;
n -= p;
}
p = __popcnt(v & 0xFF);
if (p <= n) {
shift += 8;
v >>= 8;
n -= p;
}
if (n >= 8) return 0; // optional safety, in case n > # of set bits
return PRECOMP[v & 0xFF][n] << shift;
}
```

This illustrates how the divide and conquer approach works.

**General Solution**

There is also a solution for "general" architectures- without __popcnt. It can be done by processing in 8-bit chunks. You need one more lookup table that tells you the popcnt of a byte:

```
byte PRECOMP[256][8] = { .... } // PRECOMP[v][n] for v<256 and n < 8
byte POPCNT[256] = { ... } // POPCNT[v] is the number of set bits in v. (v < 256)
ulong nthSetBit(ulong v, ulong n) {
ulong p = POPCNT[v & 0xFF];
ulong shift = 0;
if (p <= n) {
n -= p;
v >>= 8;
shift += 8;
p = POPCNT[v & 0xFF];
if (p <= n) {
n -= p;
shift += 8;
v >>= 8;
p = POPCNT[v & 0xFF];
if (p <= n) {
n -= p;
shift += 8;
v >>= 8;
}
}
}
if (n >= 8) return 0; // optional safety, in case n > # of set bits
return PRECOMP[v & 0xFF][n] << shift;
}
```

This could, of course, be done with a loop, but the unrolled form is faster and the unusual form of the loop would make it unlikely that the compiler could automatically unroll it for you.