{-# OPTIONS_GHC -Wall #-} {-# LANGUAGE Safe #-} {- | Module : Data.Number.RealCyclotomic Copyright : (c) Scott N. Walck 2012-2017 License : GPL-3 (see LICENSE) Maintainer : Scott N. Walck <walck@lvc.edu> Stability : experimental The real cyclotomic numbers are a subset of the real numbers with the following properties: 1. The real cyclotomic numbers are represented exactly, enabling exact computations and equality comparisons. 2. The real cyclotomic numbers contain the rationals. As a consequence, the real cyclotomic numbers are a dense subset of the real numbers. 3. The real cyclotomic numbers contain the square roots of all nonnegative rational numbers. 4. The real cyclotomic numbers form a field: they are closed under addition, subtraction, multiplication, and division. 5. The real cyclotomic numbers contain the sine and cosine of all rational multiples of pi (equivalently, the sine and cosine of any rational number of degrees or any rational number of revolutions). Floating point numbers do not do well with equality comparison: >(sqrt 2 + sqrt 3)^2 == 5 + 2 * sqrt 6 > -> False "Data.Number.RealCyclotomic" represents these numbers exactly, allowing equality comparison: >(sqrtRat 2 + sqrtRat 3)^2 == 5 + 2 * sqrtRat 6 > -> True 'RealCyclotomic's can be exported as inexact real numbers using the 'toReal' function: >sqrtRat 2 > -> e(8) - e(8)^3 >toReal $ sqrtRat 2 > -> 1.414213562373095 This module is based on the module 'Data.Complex.Cyclotomic'. Usually you would only import one of the modules 'Data.Number.RealCyclotomic' or 'Data.Complex.Cyclotomic', depending on whether you wanted only real numbers (this module) or complex numbers (the other). Functions such as @sqrtRat@, @sinDeg@, @cosDeg@ are defined in both modules, with different type signatures, so their names will conflict if both modules are imported. -} module Data.Number.RealCyclotomic ( RealCyclotomic , sqrtRat , sinDeg , cosDeg , sinRev , cosRev , isRat , toRat , toReal , goldenRatio , heron ) where import qualified Data.Complex.Cyclotomic as Cyc import Data.Complex ( realPart ) -- | A real cyclotomic number. newtype RealCyclotomic = RealCyclotomic Cyc.Cyclotomic deriving (Eq) -- | @abs@ and @signum@ are undefined. instance Num RealCyclotomic where RealCyclotomic x + RealCyclotomic y = RealCyclotomic (x + y) RealCyclotomic x - RealCyclotomic y = RealCyclotomic (x - y) RealCyclotomic x * RealCyclotomic y = RealCyclotomic (x * y) negate (RealCyclotomic x) = RealCyclotomic (negate x) fromInteger n = RealCyclotomic (fromInteger n) abs = undefined signum = undefined instance Fractional RealCyclotomic where recip (RealCyclotomic x) = RealCyclotomic (recip x) fromRational r = RealCyclotomic (fromRational r) instance Show RealCyclotomic where show (RealCyclotomic x) = show x -- I need to do Ord first. -- A Real instance would make realToFrac work. -- instance Real RealCyclotomic where -- toRational c = toRational (toReal c) -- | The square root of a 'Rational' number. sqrtRat :: Rational -> RealCyclotomic sqrtRat r | r >= 0 = RealCyclotomic (Cyc.sqrtRat r) | otherwise = error "sqrtRational needs a nonnegative argument" -- | Sine function with argument in degrees. sinDeg :: Rational -> RealCyclotomic sinDeg r = RealCyclotomic (Cyc.sinDeg r) -- | Cosine function with argument in degrees. cosDeg :: Rational -> RealCyclotomic cosDeg r = RealCyclotomic (Cyc.cosDeg r) -- | Sine function with argument in revolutions. sinRev :: Rational -> RealCyclotomic sinRev r = RealCyclotomic (Cyc.sinRev r) -- | Cosine function with argument in revolutions. cosRev :: Rational -> RealCyclotomic cosRev r = RealCyclotomic (Cyc.cosRev r) -- | Is the cyclotomic a rational? isRat :: RealCyclotomic -> Bool isRat (RealCyclotomic r) = Cyc.isRat r -- | Return an exact rational number if possible. toRat :: RealCyclotomic -> Maybe Rational toRat (RealCyclotomic r) = Cyc.toRat r -- | Export as an inexact real number. toReal :: RealFloat a => RealCyclotomic -> a toReal (RealCyclotomic r) = realPart (Cyc.toComplex r) -- | The golden ratio, @(1 + √5)/2@. goldenRatio :: RealCyclotomic goldenRatio = (1 + sqrtRat 5) / 2 -- | Heron's formula for the area of a triangle with -- side lengths a, b, c. heron :: Rational -- ^ a -> Rational -- ^ b -> Rational -- ^ c -> RealCyclotomic -- ^ area of triangle heron a b c = sqrtRat (s * (s-a) * (s-b) * (s-c)) where s = (a + b + c) / 2