Let a relation R1 on the set R of real n...

Let a relation `R_1` on the set `R` of real numbers be defined as `(a ,\ b) in R_1<=>1+a b >0` for all `a ,\ b in R` . Show that `R_1` is reflexive and symmetric but not transitive.

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Let a relation `R_1` on the set `R` of real numbers be defined as `(a ,\ b) in R_1<=>1+a b >0` for all `a ,\ b in R` . Show that `R_1` is reflexive and symmetric but not transitive.

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