Consider a finite group G for which any two arbitrary subgroups H and K, either H ⊆ K or K ⊆ H. Then (a) G is a cyclic group. (b) G has only two proper subgroups. (c) G is abelian. Both (a) and (c).
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Consider a finite group G for which any two arbitrary subgroups H and K, either H ⊆ K or K ⊆ H
Then G is of order relatively prime therefore it is a cyclic group Option (a) is the answer
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