Prove G is Cyclic: Prime p Order Group

catherinenanc · Mar 15, 2012

1. Let p be a prime and G a group whose order is p. Prove that G is cyclic.

2. I know that if p is prime, then the only possible subgroups of G are {e} and G itself. But, how to use this fact to show that G is cyclic?

Dick · Mar 15, 2012

Pick an element g of G that is not e and consider the subgroup generated by g.

Karamata · Mar 15, 2012

HINT: Lagrange

catherinenanc · Mar 15, 2012

Dick said:

Pick an element g of G that is not e and consider the subgroup generated by g.

Ok, this may sound stupid, but, how do I know that <g>=G?

catherinenanc · Mar 15, 2012

catherinenanc said:

Ok, this may sound stupid, but, how do I know that <g>=G?

Oh, wait, there are only two subgroups,so it has to be.

Thanks!

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