Possible Duplicate:
The Klein 4-group vs. the integers modulo 4
Prove that the cyclic group of order $4$ and the Klein four-group are not isomorphic.
Can someone explain what Klein four-group is and how to do this question?
Possible Duplicate:
The Klein 4-group vs. the integers modulo 4
Prove that the cyclic group of order $4$ and the Klein four-group are not isomorphic.
Can someone explain what Klein four-group is and how to do this question?
The Klein four group is $$\Bbb Z_2\times\Bbb Z_2,$$ where $\Bbb Z_2$ is the cyclic group of $2$ elements. In this group, every element has order at most $2$, while in a cyclic group of order $4$, two elements have order $4$, hence they cannot be isomorphic.
Klein four group is $\mathbb{Z}_2 \times \mathbb{Z}_2$, and every elements satisfy the equation $2x=0$, but for $\mathbb{Z}_4$, it's not true. ($1+1 \neq 0$) so they can't be isomorphic.
Klein four group, which will lead you quickly to a reference such as Wikipedia. – Jonas Meyer Jan 20 '13 at 08:36