module Data.Number.MPFR.Instances.Near ()
where
import qualified Data.Number.MPFR.Arithmetic as A
import qualified Data.Number.MPFR.Special as S
import Data.Number.MPFR.Misc
import Data.Number.MPFR.Assignment
import Data.Number.MPFR.Comparison
import Data.Number.MPFR.Internal
import Data.Number.MPFR.Conversion
import Data.Number.MPFR.Integer
import Data.Maybe
import Data.Ratio
#ifdef INTEGER_SIMPLE
#endif
#ifdef INTEGER_GMP
import GHC.Integer.GMP.Internals
import qualified GHC.Exts as E
#endif
instance Num MPFR where
d + d' = A.add Near (maxPrec d d') d d'
d d' = A.sub Near (maxPrec d d') d d'
d * d' = A.mul Near (maxPrec d d') d d'
negate d = A.neg Near (getPrec d) d
abs d = A.absD Near (getPrec d) d
signum = fromInt Near minPrec . fromMaybe (1) . sgn
#ifdef INTEGER_SIMPLE
fromInteger i =
fromIntegerA Near (max minPrec $ 1 + bitsInInteger i) i
#endif
#ifdef INTEGER_GMP
fromInteger (S# i) = fromInt Near minPrec (E.I# i)
fromInteger i@(J# n _) = fromIntegerA Zero (fromIntegral . abs $ E.I# n * bitsPerIntegerLimb) i
#endif
instance Real MPFR where
toRational d = n % 2 ^ e
where (n', e') = decompose d
(n, e) = if e' >= 0 then ((n' * 2 ^ e'), 0)
else (n', e')
instance Fractional MPFR where
d / d' = A.div Up (maxPrec d d') d d'
fromRational r = fromInteger n / fromInteger d
where n = numerator r
d = denominator r
recip d = one / d
instance Floating MPFR where
pi = S.pi Near 53
exp d = S.exp Near (getPrec d) d
log d = S.log Near (getPrec d) d
sqrt d = A.sqrt Near (getPrec d) d
(**) d d' = A.pow Near (maxPrec d d') d d'
logBase d d' = Prelude.log d' / Prelude.log d
sin d = S.sin Near (getPrec d) d
cos d = S.cos Near (getPrec d) d
tan d = S.tan Near (getPrec d) d
asin d = S.asin Near (getPrec d) d
acos d = S.acos Near (getPrec d) d
atan d = S.atan Near (getPrec d) d
sinh d = S.sinh Near (getPrec d) d
cosh d = S.cosh Near (getPrec d) d
tanh d = S.tanh Near (getPrec d) d
asinh d = S.asinh Near (getPrec d) d
acosh d = S.acosh Near (getPrec d) d
atanh d = S.atanh Near (getPrec d) d
instance RealFrac MPFR where
properFraction d = (fromIntegral n, f)
where r = toRational d
m = numerator r
e = denominator r
n = quot m e
f = frac Near (getPrec d) d