Let H be a cyclic group of order 36 under the addition operation.
a) Identify all subgroups of order 9. Explain how these groups are obtained.
b) Construct a subgroup lattice diagram for H
c) Give a group G that is isomorphic to H. Explain how to show that G is isomorphic to H.
d)Up to isomorphism, describe all finitely generated abelian groups of order 36. Then, explain why they are not isomorphic to each other
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