Portability  Nonportable (GHC extensions) 

Stability  experimental 
Maintainer  Anders Kaseorg <andersk@mit.edu> 
Safe Haskell  None 
The constructible reals, Construct
, are the subset of the real
numbers that can be represented exactly using field operations
(addition, subtraction, multiplication, division) and positive square
roots. They support exact computations, equality comparisons, and
ordering.
>>>
[((1 + sqrt 5)/2)^n  ((1  sqrt 5)/2)^n :: Construct  n < [1..10]]
[sqrt 5,sqrt 5,2*sqrt 5,3*sqrt 5,5*sqrt 5,8*sqrt 5,13*sqrt 5,21*sqrt 5,34*sqrt 5,55*sqrt 5]
>>>
let f (a, b, t, p) = ((a + b)/2, sqrt (a*b), t  p*((a  b)/2)^2, 2*p)
>>>
let (a, b, t, p) = f . f . f . f $ (1, 1/sqrt 2, 1/4, 1 :: Construct)
>>>
floor $ ((a + b)^2/(4*t))*10**40
31415926535897932384626433832795028841971
>>>
let qf (p, q) = ((p + sqrt (p^2  4*q))/2, (p  sqrt (p^2  4*q))/2 :: Construct)
>>>
let [(v, w), (x, _), (y, _), (z, _)] = map qf [(1, 4), (v, 1), (w, 1), (x, y)]
>>>
z/2
1/16 + 1/16*sqrt 17 + 1/8*sqrt (17/2  1/2*sqrt 17) + 1/4*sqrt (17/4 + 3/4*sqrt 17  (3/4 + 1/4*sqrt 17)*sqrt (17/2  1/2*sqrt 17))
Constructible complex numbers may be built from constructible reals
using Complex
from the complexgeneric library.
>>>
(z/2 :+ sqrt (1  (z/2)^2))^17
1 :+ 0
 data Construct
 deconstruct :: Construct > Either Rational (Construct, Construct, Construct)
 fromConstruct :: Floating a => Construct > a
 data ConstructException
Documentation
The type of constructible real numbers.
Enum Construct  
Eq Construct  
Floating Construct  This partial 
Fractional Construct  
Num Construct  
Ord Construct  
Read Construct  
Real Construct  This 
RealFrac Construct  
Show Construct  
Floating (Complex Construct)  
Fractional (Complex Construct)  
Num (Complex Construct)  
ComplexRect (Complex Construct) Construct  
ComplexPolar (Complex Construct) Construct 
deconstruct :: Construct > Either Rational (Construct, Construct, Construct)Source
Deconstruct a constructible number as either a Rational
, or a triple
(a, b, r)
of simpler constructible numbers representing a + b*sqrt
r
(with b /= 0
and r > 0
). Recursively calling deconstruct
on
all triples will yield a finite tree that terminates in Rational
leaves. Note that two constructible numbers that compare as equal may
deconstruct in different ways.
fromConstruct :: Floating a => Construct > aSource
Evaluate a floatingpoint approximation for a constructible number.
To improve numerical stability, addition of numbers with different signs is avoided using quadratic conjugation.
data ConstructException Source
The type of exceptions thrown by impossible Construct
operations.
ConstructIrrational 

ConstructSqrtNegative 

Unconstructible String 
