Rationals: Set of Rational Numbers

Description

The mathematical set of rational numbers, defined as the set of numbers that can be written as a fraction of two integers. i.e. $$\\{\frac{p}{q} \ : \ p,q \ \in \ Z, \ q \ne 0 \\}$$ where $Z$ is the set of integers.

Arguments

Super classes

set6::Set -> set6::Interval -> set6::SpecialSet -> Rationals

Methods

Public methods

Method `new()`

Create a new Rationals object.

Usage

Rationals$new(lower = -Inf, upper = Inf, type = "()")

Arguments

lower: numeric. Where to start the set. Advised to ignore, used by child-classes.

upper

numeric. Where to end the set. Advised to ignore, used by child-classes.

type

character Set closure type. Advised to ignore, used by child-classes.

Returns

A new Rationals object.

Method `contains()`

Method not possible for Rationals.

Usage

Rationals$contains(...)

Arguments

...: Ignored

Method `isSubset()`

Method not possible for Rationals.

Usage

Rationals$isSubset(...)

Arguments

...: Ignored

Method `equals()`

Method not possible for Rationals.

Usage

Rationals$equals(...)

Arguments

...: Ignored

Method `clone()`

The objects of this class are cloneable with this method.

Usage

Rationals$clone(deep = FALSE)

Arguments

deep: Whether to make a deep clone.

Details

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.

Description

Arguments

Super classes

Methods

Public methods

Method new()

Usage

Arguments

Returns

Method contains()

Usage

Arguments

Method isSubset()

Usage

Arguments

Method equals()

Usage

Arguments

Method clone()

Usage

Arguments

Details

See Also

Method `new()`

Method `contains()`

Method `isSubset()`

Method `equals()`

Method `clone()`