Let $A =\left\{a = q + \frac{1}{q }/ q \in Q^*,q > 0 \right\}$, $A + A = \{a + b |a,b \in A\}$,$A \cdot A =\{a \cdot b | a, b \in A\}$. Prove that: i) $A + A \ne A \cdot A$ ii) $(A + A) \cap N = (A \cdot A) \cap N$. Vasile Pop
Source: 2018 Romania JBMO TST 3.3
Tags: Sets, algebra
Let $A =\left\{a = q + \frac{1}{q }/ q \in Q^*,q > 0 \right\}$, $A + A = \{a + b |a,b \in A\}$,$A \cdot A =\{a \cdot b | a, b \in A\}$. Prove that: i) $A + A \ne A \cdot A$ ii) $(A + A) \cap N = (A \cdot A) \cap N$. Vasile Pop