The mathematical set of negative rational numbers, defined as the set of numbers that can be written as a fraction of two integers and are non-positive. i.e. $$\\{\frac{p}{q} \ : \ p,q \ \in \ Z, \ p/q \le 0, \ q \ne 0\\}$$ where \(Z\) is the set of integers.
The $contains
method does not work for the set of Rationals as it is notoriously
difficult/impossible to find an algorithm for determining if any given number is rational or not.
Furthermore, computers must truncate all irrational numbers to rational numbers.
Other special sets:
Complex
,
ExtendedReals
,
Integers
,
Logicals
,
Naturals
,
NegIntegers
,
NegReals
,
PosIntegers
,
PosNaturals
,
PosRationals
,
PosReals
,
Rationals
,
Reals
,
Universal
set6::Set
-> set6::Interval
-> set6::SpecialSet
-> set6::Rationals
-> NegRationals
new()
Create a new NegRationals
object.
NegRationals$new(zero = FALSE)
zero
logical. If TRUE, zero is included in the set.
A new NegRationals
object.
clone()
The objects of this class are cloneable with this method.
NegRationals$clone(deep = FALSE)
deep
Whether to make a deep clone.