{-# LANGUAGE NoImplicitPrelude #-} module NumericPrelude.Numeric ( {- Additive -} (+), (-), negate, zero, subtract, sum, sum1, {- ZeroTestable -} isZero, {- Ring -} (*), one, fromInteger, (^), ringPower, sqr, product, product1, {- IntegralDomain -} div, mod, divMod, divides, even, odd, {- Field -} (/), recip, fromRational', (^-), fieldPower, fromRational, {- Algebraic -} (^/), sqrt, {- Transcendental -} pi, exp, log, logBase, (**), (^?), sin, cos, tan, asin, acos, atan, sinh, cosh, tanh, asinh, acosh, atanh, {- Absolute -} abs, signum, {- RealIntegral -} quot, rem, quotRem, {- RealFrac -} splitFraction, fraction, truncate, round, ceiling, floor, approxRational, {- RealTrans -} atan2, {- ToRational -} toRational, {- ToInteger -} toInteger, fromIntegral, {- Units -} isUnit, stdAssociate, stdUnit, stdUnitInv, {- PID -} extendedGCD, gcd, lcm, euclid, extendedEuclid, {- Ratio -} Rational, (%), numerator, denominator, Integer, Int, Float, Double, {- Module -} (*>) ) where import Number.Ratio (Rational, (%), numerator, denominator) import Algebra.Module((*>)) import Algebra.RealTranscendental(atan2) import Algebra.Transcendental import Algebra.Algebraic((^/), sqrt) import Algebra.RealRing(splitFraction, fraction, truncate, round, ceiling, floor, approxRational, ) import Algebra.Field((/), (^-), recip, fromRational', fromRational, ) import Algebra.PrincipalIdealDomain (extendedGCD, gcd, lcm, euclid, extendedEuclid) import Algebra.Units (isUnit, stdAssociate, stdUnit, stdUnitInv) import Algebra.RealIntegral (quot, rem, quotRem, ) import Algebra.IntegralDomain (div, mod, divMod, divides, even, odd) import Algebra.Absolute (abs, signum, ) import Algebra.Ring (one, fromInteger, (*), (^), sqr, product, product1) import Algebra.Additive (zero, (+), (-), negate, subtract, sum, sum1) import Algebra.ZeroTestable (isZero) import Algebra.ToInteger (ringPower, fieldPower, toInteger, fromIntegral, ) import Algebra.ToRational (toRational, ) import Prelude (Int, Integer, Float, Double)