Math, asked by arslanamjad876, 3 months ago

ablien group is a cyclic group in nature??????

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Answered by gargs4720

0

Answer:

The fundamental theorem of abelian groups states that every finitely generated abelian group is a finite direct product of primary cyclic and infinite cyclic groups. Because a cyclic group is abelian, each of its conjugacy classes consists of a single element.

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