Two characteristic properties of a cyclic group are given: 1~0A group G is cyclic if and only every subgroup of G is G^mwhere G^m={X^n|X∈G}and m is a integer. See,[1] 2~0 A group G is cyclic if and only if the index of every subgroupof G is finite and for every positive integer k,in G at most thereexists a subgroup H having index k. See,[2]
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