Question 1: If $a$ has order $12$, find the subgroups $\langle a^{3}\rangle$ and $\langle a^{5}\rangle$. Also is $\langle a^{2}\rangle$ a subgroup of $\langle a^{4}\rangle$ ?
Question 1b:If $\langle b^{r}\rangle$ is a subgroup of $\langle b^{s}\rangle$, how are $r$ and $s$ related?
Here is my attempt on question 1:
$\langle a^{3}\rangle =\langle e, a^{3},a^{6},a^{9} \rangle$
$\langle a^{5}\rangle=\langle e,a^{5},a^{10},a^{3},a^{8},a,a^{6},a^{11},a^{4},a^{9},a^{2},a^{7} \rangle$ note: I did not put them order because my professor said not to so he can follow along when he check it. Basically, I am doing it as I go along
Here is the other part to question 1:
$\langle a^{2} \rangle$=$\langle e,a^{4},a^{6},a^{8},a^{10} \rangle$
$\langle a^{4} \rangle$=$\langle e,a^{4},a^{8} \rangle$
Is $\langle a^{2}\rangle$ a subgroup of $\langle a^{4}\rangle$? I said No
Here is my attempt to question 1b:
$r$ and $s$ are related because of their order. I am not sure how to correctly answer this question though.
If somebody can check this for me and see where did I go wrong with this problem please let me know.If I am wrong correct me if you can
