This paper completes a classification of the types of orientable and non-orientable cusps that can arise in the quotients of hyperbolic knot complements. In particular,
S
2
(
2
,
4
,
4
)
S^2(2,4,4)
cannot be the cusp cross-section of any orbifold quotient of a hyperbolic knot complement. Furthermore, if a knot complement covers an orbifold with a
S
2
(
2
,
3
,
6
)
S^2(2,3,6)
cusp, it also covers an orbifold with a
S
2
(
3
,
3
,
3
)
S^2(3,3,3)
cusp. We end with a discussion that shows all cusp types arise in the quotients of link complements.