1.Let R1R_1R1 and R2R_2R2 be two relations defined on R\mathbb{R}R by a R1 b ⟺ ab≥0a\,R_1\,b \iff ab \ge 0aR1b⟺ab≥0 and a R2 b ⟺ a>ba\,R_2\,b \iff a > baR2b⟺a>b, thena.R1R_1R1 is an equivalence relation but not R2R_2R2b.R2R_2R2 is an equivalence relation but not R1R_1R1c.both R1R_1R1 and R2R_2R2 are equivalence relationsd.neither R1R_1R1 nor R2R_2R2 is an equivalence relationLogin to continueOnly logged in users canattempt or see the solution.