Is (a,a) a Better Notation for Representing an Empty Set Than [a,a]?

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The notation [a,a] is generally accepted to represent the set containing the single element {a}, while (a,a) is interpreted as the empty set. The discussion highlights that using (a,a) raises questions about its appropriateness, particularly since it suggests a lack of elements. The context of intervals is important, as [a,b] is typically used to indicate a range where b can equal a. The argument is made that (a,a) could be preferred over {} to denote emptiness in certain mathematical contexts. Ultimately, the choice of notation can influence interpretation and clarity in mathematical expressions.
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Is the closed interval [a,a] considered a legitimate notation for the set {a}? Would (a,a) denote the empty set?
 
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[a,a] is used- usually in something like [a,b] where you want to consider the possibility that b= a.

If I came across reference to an interval like (a,a), I probably would interpret it as the empty set- although I would wonder why they picked a!
 
A={x : f(x)<0 on [a,x]}
Is a in A? It is if f(x)<0 on [a,a]. And since [a,a] has only one number, it suffices to show that f(a)<0.

A={x : f(x)<0 on (a,x)}
Is a in A? It is if f(x)<0 on (a,a). But this is kind of nonsense. There is nothing in (a,a). You make the call.

So anyway, I just wanted to point this out to show why you might write (a,a) rather than {}.
 

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