Answer to Question #203304 in Abstract Algebra for Raghav

Let us check whether "H=\\{x\\in R^*\\ |\\ x =1\\text{ or }x\\text{ is irrational }\\}" is a subgroup of "(R^*,\\cdot)". Since "\\sqrt{2}\\in H" and "\\sqrt{2}\\cdot\\sqrt{2}=2\\notin H", we conclude that "H" is not a subgroup of "(R^*,\\cdot)".

Let us check whether "K=\\{x\\in R^*\\ |\\ x \u22651\\}" is a subgroups of "(R^*,\\cdot)". Taking onto account that for "x=2\\in K" the inverse "x^{-1}=\\frac{1}{2}\\notin K," we conclude that "K" is not a subgroup of "(R^*,\\cdot)".