# Rational data type

Some programming languages provide a built-in (primitive) **rational data type** to represent rational numbers like 1/3 and -11/17 without rounding, and to do arithmetic on them. Examples are the `ratio`

type of Common Lisp, and analogous types provided by most languages for algebraic computation, such as Mathematica and Maple. Many languages that do not have a built-in rational type still provide it as a library-defined type.

## Contents

## Representation

A variable or value of that type is usually represented as a fraction *m*/*n* where *m* and *n* are two integer numbers, either with a fixed or arbitrary precision. Depending on the language, the denominator *n* may be constrained to be non-zero, and the two numbers may be kept in reduced form (without any common divisors except 1).

Languages that support a rational data type usually provide special syntax for building such values, and also extend the basic arithmetic operations ('+', '−', '×', '/', integer powers) and comparisons ('=', '<', '>', '≤') to act on them — either natively or through operator overloading facilities provided by the language. These operations may be translated by the compiler into a sequence of integer machine instructions, or into library calls. Support may also extend to other operations, such as formatting, rounding to an integer or floating point value, etc.. As in mathematics, those languages often interpret an integer value as equivalent to a rational value with a unit denominator.

## Language support

**Built-in or core library**:

- C++ has included support for compile-time rational arithmetic in the form of the contents of its standard library's
`<ratio>`

header since its 2011 revision. - Clojure can perform arithmetic on rational numbers and offers a literal form to represent them.
- Go provides rational numbers in the standard library, in the
`math/big`

package. - J provides rational numbers in the base language. For example,
`1r3`

is one-third. Rationals in J use arbitrary precision integers for both the numerator and denominator, allowing arbitrary precision non-integers. For instance,`12683021339465478347804472r7322545784478161858100577`

represents the square root of three to 50 decimal digits.^{[1]} - Julia provides rational numbers with the rational operator,
`//`

. For example,`6//9 == 2//3 && typeof(-4//9) == Rational{Int64}`

.^{[2]} - Haskell provides a
`Rational`

type, which is really an alias for`Ratio Integer`

(`Ratio`

being a polymorphic type implementing rational numbers for any`Integral`

type of numerators and denominators). The fraction is constructed using the % operator.^{[3]} - OCaml's Num library implements arbitrary-precision rational numbers.
- Perl:
`Math::BigRat`

core module implements arbitrary-precision rational numbers. The`bigrat`

pragma can be used to turn on transparent BigRat support. - Raku: use by default
`Rat`

^{[4]}type (Rational numbers with limited-precision).`FatRat`

^{[5]}data type implements arbitrary-precision rational numbers. - Python 2.6+: Python's standard library includes a
`Fraction`

class in the module`fractions`

.^{[6]} - Ruby 2.1 or newer: native support using special syntax.
- Ruby pre 2.1: via standard library includes a
`Rational`

class in the module`rational`

. - Smalltalk represents rational numbers using a
`Fraction`

class in the form`p/q`

where`p`

and`q`

are arbitrary size integers. Applying the arithmetic operations`*`

,`+`

,`-`

,`/`

, to fractions returns a reduced fraction.

**With external libraries**:

- For C & C++ there are projects like the GNU Multiple Precision Arithmetic Library.
- The Apache Commons Math library provides rational numbers for Java with its
`Fraction`

class.

### Common Lisp

Common Lisp provides a numeric data type for arbitrarily sized rational numbers: RATIO.^{[7]}

1/3 ⇒ 1/3

The type of a rational number is `RATIO`

:

(type-of 1/3) ⇒ RATIO

Dividing two integers may return a rational number and the multiplication of a rational number may return an integer number:

(/ 6 8) ⇒ 3/4 (* 3/4 16) ⇒ 12

The numerator and denominator may be obtained using the homonymous functions, that reduce a rational to canonical form and compute the numerator or denominator of that form respectively:^{[8]}

(numerator 12/16) ⇒ 3 (denominator 12/16) ⇒ 4

Computing with large integers returning a large rational number:

(/ (1- (expt 2 200)) (1- (expt 2 43))) ⇒ 1606938044258990275541962092341162602522202993782792835301375/8796093022207

### Clojure

(print (+ 1/10 2/10)) ⇒ 3/10

### Julia

julia> 1//10 + 2//10 3//10

### Haskell

In module Data.Ratio

(1 % 10) + (2 % 10) ⇒ 3 % 10

### Racket (PLT Scheme)

> (+ 1/10 2/10) 3/10

### Raku

Raku provides `Rat`

type by default.

my $v = 0.2; say "{$v} is {$v.^name} and has numerator {$v.numerator} and denominator {$v.denominator}"; # ⇒ 0.2 is Rat and has numerator 1 and denominator 5

say 0.1 + 0.2 # ⇒ 0.3

say (0.1 + 0.2 - 0.3).fmt("%.17f") # ⇒ 0.00000000000000000

say 1 / (0.1 + 0.2 - 0.3) # ⇒ Attempt to divide by zero when coercing Rational to Str

### Ruby

Using special syntax in 2.1 or newer:

irb(main):001:0> puts 1/10r + 2/10r 3/10 => nil

## References

- ↑ http://www.jsoftware.com/jwiki/Vocabulary/NumericPrecisions
- ↑ http://docs.julialang.org/en/latest/manual/complex-and-rational-numbers/#rational-numbers
- ↑ https://www.haskell.org/onlinereport/ratio.html
- ↑ https://docs.raku.org/type/Rat
- ↑ https://docs.raku.org/type/FatRat
- ↑ https://docs.python.org/3/library/fractions.html
- ↑ Common Lisp HyperSpec: RATIO
- ↑ Function NUMERATOR, DENOMINATOR at the Common Lisp HyperSpec

- Donald Knuth,
*The Art of Computer Programming*, vol. 2. Addison-Wesley.

Original source: https://en.wikipedia.org/wiki/ Rational data type.
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