Subgroup of finite cyclic group

Definition
A subgroup of a group is termed a subgroup of finite cyclic group if the whole group is a finite cyclic group.

Weaker properties

 * Stronger than::Variety-containing subgroup of finite group
 * Stronger than::Homomorph-containing subgroup of finite group
 * Stronger than::Quotient-variety-containing subgroup of finite group
 * Stronger than::Quotient-homomorph-containing subgroup of finite group
 * Stronger than::Prehomomorph-contained subgroup of finite group
 * Stronger than::Isomorph-free subgroup of finite group
 * Stronger than::Fully invariant subgroup of finite group
 * Stronger than::Characteristic subgroup of finite group
 * Stronger than::Normal subgroup of finite group
 * Stronger than::Subgroup of finite abelian group
 * Stronger than::Subgroup of abelian group
 * Stronger than::Subgroup of finite nilpotent group
 * Stronger than::Subgroup of nilpotent group