The mathematical set of real numbers, defined as the union of the set of rationals and irrationals. i.e. $$I \cup Q$$ where \(I\) is the set of irrationals and \(Q\) is the set of rationals.
set6::Set -> set6::Interval -> set6::SpecialSet -> Reals
new()Create a new Reals object.
Reals$new(lower = -Inf, upper = Inf, type = "()")
lowernumeric. Where to start the set. Advised to ignore, used by child-classes.
uppernumeric. Where to end the set. Advised to ignore, used by child-classes.
typecharacter Set closure type. Advised to ignore, used by child-classes.
A new Reals object.
clone()The objects of this class are cloneable with this method.
Reals$clone(deep = FALSE)
deepWhether to make a deep clone.
Other special sets:
Complex,
ExtendedReals,
Integers,
Logicals,
Naturals,
NegIntegers,
NegRationals,
NegReals,
PosIntegers,
PosNaturals,
PosRationals,
PosReals,
Rationals,
Universal