We classify C-orderable groups admitting only finitely many C-orderings.
We show that if a C-orderable group has infinitely many C-orderings, then
it actually has uncountably many C-orderings, and none of these is isolated
in the space of C-orderings. As a relevant example, we carefully study the
case of Baumslag-Solitar's group B(1,2). We show that B(1,2) has four
C-orderings, each of which is bi-invariant, but its space of left-orderings
is homeomorphic to the Cantor set