Answer to Question #203256 in Abstract Algebra for Anand

Taking into account that "r" is a reflection, we conclude that "r^2=e," where "e" is the identity of the dihedral group "D_{10}," and hence "\\langle r\\rangle=\\{e,r\\}." Let "s" be a 72 degree rotation counterclockwise in "D_{10}". Then two distinct cosets of "\\langle r\\rangle" are "e\\langle r\\rangle=\\{e,r\\}" and "s\\langle r\\rangle=s\\{e,r\\}=\\{s,sr\\}."