aiken/math/rational
This module implements operations between rational numbers. Internally, rational aren’t automatically reduced as this is only done on-demand.
Thus, for example:
rational.new(2, 3) != rational.new(4, 6)
Comparing rational values should, therefore, only happen after reduction (see reduce) or via the compare method.
Types
Opaque type used to ensure the sign of the Rational is managed strictly in the numerator.
Functions
abs(self: Rational) -> Rational
Absolute value of a Rational.
expect Some(x) = rational.new(3, 2)
expect Some(y) = rational.new(-3, 2)
rational.abs(x) == x
rational.abs(y) == x
add(left: Rational, right: Rational) -> Rational
Addition: sum of two rational values
expect Some(x) = rational.new(2, 3)
expect Some(y) = rational.new(3, 4)
Some(rational.add(x, y)) == rational.new(17, 12)
arithmetic_mean(self: List<Rational>) -> Option<Rational>
Calculate the arithmetic mean between two Rational values.
let x = rational.from_int(0)
let y = rational.from_int(1)
let z = rational.from_int(2)
expect Some(result) = rational.arithmetic_mean([x, y, z])
rational.compare(result, y) == Equal
ceil(self: Rational) -> Int
Returns the smallest Int not less than a given Rational
expect Some(x) = rational.new(2, 3)
rational.ceil(x) == 1
expect Some(y) = rational.new(44, 14)
rational.ceil(y) == 4
expect Some(z) = rational.new(-14, 3)
rational.ceil(z) == -4
compare(left: Rational, right: Rational) -> Ordering
Compare two rationals for an ordering. This is safe to use even for non-reduced rationals.
expect Some(x) = rational.new(2, 3)
expect Some(y) = rational.new(3, 4)
expect Some(z) = rational.new(4, 6)
compare(x, y) == Less
compare(y, x) == Greater
compare(x, x) == Equal
compare(x, z) == Equal
compare_with(
left: Rational,
with: fn(Int, Int) -> Bool,
right: Rational,
) -> Bool
Comparison of two rational values using a chosen heuristic. For example:
expect Some(x) = rational.new(2, 3)
expect Some(y) = rational.new(3, 4)
rational.compare_with(x, >, y) == False
rational.compare_with(y, >, x) == True
rational.compare_with(x, >, x) == False
rational.compare_with(x, >=, x) == True
rational.compare_with(x, ==, x) == True
rational.compare_with(x, ==, y) == False
denominator(self: Rational) -> Int
Get the denominator of a rational value.
expect Some(x) = rational.new(2, 3)
rational.denominator(x) == 3
div(left: Rational, right: Rational) -> Option<Rational>
Division: quotient of two rational values. Returns None when the second
value is null.
expect Some(x) = rational.new(2, 3)
expect Some(y) = rational.new(3, 4)
rational.div(x, y) == rational.new(8, 9)
floor(self: Rational) -> Int
Returns the greatest Int no greater than a given Rational
expect Some(x) = rational.new(2, 3)
rational.floor(x) == 0
expect Some(y) = rational.new(44, 14)
rational.floor(y) == 3
expect Some(z) = rational.new(-14, 3)
rational.floor(z) == -5
from_int(numerator: Int) -> Rational
Create a new Rational from an Int.
Some(rational.from_int(14)) == rational.new(14, 1)
Some(rational.from_int(-5)) == rational.new(-5, 1)
Some(rational.from_int(0)) == rational.new(0, 1)
geometric_mean(left: Rational, right: Rational) -> Option<Rational>
Calculate the geometric mean between two Rational values. This returns
either the exact result or the smallest integer nearest to the square root
for the numerator and denominator.
expect Some(x) = rational.new(1, 3)
expect Some(y) = rational.new(1, 6)
rational.geometric_mean(x, y) == rational.new(1, 4)
mul(left: Rational, right: Rational) -> Rational
Multiplication: the product of two rational values.
expect Some(x) = rational.new(2, 3)
expect Some(y) = rational.new(3, 4)
Some(rational.mul(x, y)) == rational.new(6, 12)
negate(a: Rational) -> Rational
Change the sign of a Rational.
expect Some(x) = rational.new(3, 2)
expect Some(y) = rational.new(-3, 2)
rational.negate(x) == y
rational.negate(y) == x
new(numerator: Int, denominator: Int) -> Option<Rational>
Make a Rational number from the ratio of two integers.
Returns None when the denominator is null.
rational.new(14, 42) == Some(r)
rational.new(14, 0) == None
numerator(self: Rational) -> Int
Get the numerator of a rational value.
expect Some(x) = rational.new(2, 3)
rational.numerator(x) == 2
proper_fraction(self: Rational) -> (Int, Rational)
Returns the proper fraction of a given Rational r. That is, a pair of
an Int and Rational (n, f) such that:
r = n + f;nandfhave the same sign asr;fhas an absolute value less than 1.
reciprocal(self: Rational) -> Option<Rational>
Reciprocal of a Rational number. That is, a new Rational where the
numerator and denominator have been swapped.
expect Some(x) = rational.new(2, 5)
rational.reciprocal(x) == rational.new(5, 2)
let y = rational.zero()
rational.reciprocal(y) == None
reduce(self: Rational) -> Rational
Reduce a rational to its irreducible form. This operation makes the numerator and denominator coprime.
expect Some(x) = rational.new(80, 200)
Some(rational.reduce(x)) == rational.new(2, 5)
round(self: Rational) -> Int
Round the argument to the nearest whole number. If the argument is equidistant between two values, the greater value is returned (it rounds half towards positive infinity).
expect Some(x) = rational.new(2, 3)
rational.round(x) == 1
expect Some(y) = rational.new(3, 2)
rational.round(y) == 2
expect Some(z) = rational.new(-3, 2)
rational.round(z) == -1
⚠️ This behaves differently than Haskell. If you’re coming from
PlutusTx, beware that in Haskell, rounding on equidistant values depends on the
whole number being odd or even. If you need this behaviour, use round_even.
round_even(self: Rational) -> Int
Round the argument to the nearest whole number. If the argument is equidistant between two values, it returns the value that is even (it rounds half to even, also known as ‘banker’s rounding’).
expect Some(w) = rational.new(2, 3)
rational.round_even(w) == 1
expect Some(x) = rational.new(3, 2)
rational.round_even(x) == 2
expect Some(y) = rational.new(5, 2)
rational.round_even(y) == 2
expect Some(y) = rational.new(-3, 2)
rational.round_even(y) == -2
sub(left: Rational, right: Rational) -> Rational
Subtraction: difference of two rational values
expect Some(x) = rational.new(2, 3)
expect Some(y) = rational.new(3, 4)
Some(rational.sub(x, y)) == rational.new(-1, 12)
truncate(self: Rational) -> Int
Returns the nearest Int between zero and a given Rational.
expect Some(x) = rational.new(2, 3)
rational.truncate(x) == 0
expect Some(y) = rational.new(44, 14)
rational.truncate(y) == 3
expect Some(z) = rational.new(-14, 3)
rational.truncate(z) == -4
zero() -> Rational
A null Rational.