In June 2024
Answer to Question #203320 in Abstract Algebra for Raghav
Check whether the subgroup of reflections and subgroup of rotations in D2n is normal in D2n or not. (Note that D2n is the group of symmetries of an n-gon.)
It should be obvious that the rotations form a normal subgroup of index 2: the fact that it is of index 2 is sufficient to prove normality.
Subgroups containing only reflections and the identity must have order a power of 2. Since a reflection times a reflection is a rotation, with "(r^ks)(r^ms)=r^{k\u2212m}," it should be clear that any such subgroup is in fact of order 2 (we must have k = m). These subgroups are typically NOT normal, but there is an exception for n = 2 ("D_4=V" is abelian).
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