Answer to Question #160328 in Abstract Algebra for Geek

We denote by "D_{2n}" the dihedral group of order "2n".

"D_{2n}" is nilpotent if n a power of 2: "n=2^m" with "m\\geq0". In fact,

Suppose "D_{2 n}" is nilpotent. Let "p" be prime number which divides "n" . Then "r^{n \/ p}" is an element of "D_{2 n}" order "p", so "r^{n \/ p} \\neq r^{-n \/ p}" . Let "|s|=2" and "|r^{n \/ p}|=p" are relatively prime, so that, "s r^{n \/ p}=r^{n \/ p} s" ; a contradiction. Thus no primes divide "n" , and we have "n=2^{k}".

reciprocally, we proceed by induction on "k" where "n=2^{k}".

For "k=0", "D_{2.2^{0}} \\cong Z_{2}" is abelian, hence nilpotent.

Suppose "D_{2.2^{k}}" is nilpotent. We have "Z\\left(D_{2 \\cdot 2^{k+1}}\\right)=\\left\\langle r^{2^{k}}\\right\\rangle," and so, "D_{2 \\cdot 2^{k+1}} \/ Z\\left(D_{2 \\cdot 2^{k+1}}\\right) \\cong D_{2 \\cdot 2^{k}}" is nilpotent. Thus, "D_{2 \\cdot 2^{k+1}}" is nilpotent.