Exercises
[24K]Prerequisites:[23X],[1Y5],[224]. Given two relations \(a≤ b\) and \(a{\lt} b\) for \(a,b\in A\) show that these are equivalent:
\(a≤ b\) is a total order relation and
\[ a{\lt}b = (a≤ b\land a\neq b)\quad , \]\(a{\lt} b\) is an irreflexive, trichotomous and transitive relations and
\[ a≤ b = (a{\lt} b\lor a= b)\quad . \]