Subdividing an octahedron and normalizing the vertices afterwards gives very good results. Look here for more details. Paul Bourke has a lot of interesting stuff.

Here's some psuedo C++ code I wrote up in five minutes now:

```
/* Assume 'data' initially holds vertices for eight triangles (an octahedron) */
void GenerateSphere(float radius, std::vector<Vector3f>& data, int accum=10)
{
assert( !(data.size() % 3) );
std::vector<Vector3f> newData;
for(int i=0; i<data.size(); i+=3){
/* Tesselate each triangle into three new ones */
Vector3f centerPoint = (data[i] + data[i+1] + data[i+2]) / 3.0f;
/* triangle 1*/
newData.push_back(data[i+0]);
newData.push_back(data[i+1]);
newData.push_back(centerPoint);
/* triangle 2*/
newData.push_back(data[i+1]);
newData.push_back(data[i+2]);
newData.push_back(centerPoint);
/* triangle 3*/
newData.push_back(centerPoint);
newData.push_back(data[i+2]);
newData.push_back(data[i+0]);
}
data = newData;
if(!accum){
/* We're done. Normalize the vertices,
multiply by the radius and return. */
for(int i=0; i<data.size(); ++i){
data[i].normalize();
data[i] *= radius;
}
} else {
/* Decrease recursion counter and iterate again */
GenerateSphere(radius, data, accum-1);
}
return;
}
```

This code will work with any polyhedron made of counter-clockwise triangles, but octahedrons are best.

is(obviously) symmetric — you can look at it from any direction and get the same result. – ShreevatsaR Dec 4 '10 at 4:52