Safe Haskell	None
Language	Haskell98

Algebra.Transcendental

Contents

Transcendental laws, will only hold approximately on floating point numbers
Trigonometric laws, addition theorems

Synopsis

class C a => C a where
(^?) :: C a => a -> a -> a
propExpLog :: (Eq a, C a) => a -> Bool
propLogExp :: (Eq a, C a) => a -> Bool
propExpNeg :: (Eq a, C a) => a -> Bool
propLogRecip :: (Eq a, C a) => a -> Bool
propExpProduct :: (Eq a, C a) => a -> a -> Bool
propExpLogPower :: (Eq a, C a) => a -> a -> Bool
propLogSum :: (Eq a, C a) => a -> a -> Bool
propPowerCascade :: (Eq a, C a) => a -> a -> a -> Bool
propPowerProduct :: (Eq a, C a) => a -> a -> a -> Bool
propPowerDistributive :: (Eq a, C a) => a -> a -> a -> Bool
propTrigonometricPythagoras :: (Eq a, C a) => a -> Bool
propSinPeriod :: (Eq a, C a) => a -> Bool
propCosPeriod :: (Eq a, C a) => a -> Bool
propTanPeriod :: (Eq a, C a) => a -> Bool
propSinAngleSum :: (Eq a, C a) => a -> a -> Bool
propCosAngleSum :: (Eq a, C a) => a -> a -> Bool
propSinDoubleAngle :: (Eq a, C a) => a -> Bool
propCosDoubleAngle :: (Eq a, C a) => a -> Bool
propSinSquare :: (Eq a, C a) => a -> Bool
propCosSquare :: (Eq a, C a) => a -> Bool

Documentation

class C a => C a where Source #

Transcendental is the type of numbers supporting the elementary transcendental functions. Examples include real numbers, complex numbers, and computable reals represented as a lazy list of rational approximations.

Note the default declaration for a superclass. See the comments below, under "Instance declaractions for superclasses".

The semantics of these operations are rather ill-defined because of branch cuts, etc.

Minimal complete definition: pi, exp, (log or logBase), sin, cos, atan

Minimal complete definition

pi, exp, (log | logBase), sin, cos, atan

Methods

pi :: a Source #

exp :: a -> a Source #

log :: a -> a Source #

logBase :: a -> a -> a Source #

(**) :: a -> a -> a infixr 8 Source #

sin :: a -> a Source #

cos :: a -> a Source #

tan :: a -> a Source #

asin :: a -> a Source #

acos :: a -> a Source #

atan :: a -> a Source #

sinh :: a -> a Source #

cosh :: a -> a Source #

tanh :: a -> a Source #

asinh :: a -> a Source #

acosh :: a -> a Source #

atanh :: a -> a Source #

Instances

C Double Source #
Instance details Defined in Algebra.Transcendental Methods pi :: Double Source # exp :: Double -> Double Source # log :: Double -> Double Source # logBase :: Double -> Double -> Double Source # (**) :: Double -> Double -> Double Source # sin :: Double -> Double Source # cos :: Double -> Double Source # tan :: Double -> Double Source # asin :: Double -> Double Source # acos :: Double -> Double Source # atan :: Double -> Double Source # sinh :: Double -> Double Source # cosh :: Double -> Double Source # tanh :: Double -> Double Source # asinh :: Double -> Double Source # acosh :: Double -> Double Source # atanh :: Double -> Double Source #
C Float Source #
Instance details Defined in Algebra.Transcendental Methods pi :: Float Source # exp :: Float -> Float Source # log :: Float -> Float Source # logBase :: Float -> Float -> Float Source # (**) :: Float -> Float -> Float Source # sin :: Float -> Float Source # cos :: Float -> Float Source # tan :: Float -> Float Source # asin :: Float -> Float Source # acos :: Float -> Float Source # atan :: Float -> Float Source # sinh :: Float -> Float Source # cosh :: Float -> Float Source # tanh :: Float -> Float Source # asinh :: Float -> Float Source # acosh :: Float -> Float Source # atanh :: Float -> Float Source #
C T Source #
Instance details Defined in Number.FixedPoint.Check Methods pi :: T Source # exp :: T -> T Source # log :: T -> T Source # logBase :: T -> T -> T Source # (**) :: T -> T -> T Source # sin :: T -> T Source # cos :: T -> T Source # tan :: T -> T Source # asin :: T -> T Source # acos :: T -> T Source # atan :: T -> T Source # sinh :: T -> T Source # cosh :: T -> T Source # tanh :: T -> T Source # asinh :: T -> T Source # acosh :: T -> T Source # atanh :: T -> T Source #
C T Source #
Instance details Defined in Number.Positional.Check Methods pi :: T Source # exp :: T -> T Source # log :: T -> T Source # logBase :: T -> T -> T Source # (**) :: T -> T -> T Source # sin :: T -> T Source # cos :: T -> T Source # tan :: T -> T Source # asin :: T -> T Source # acos :: T -> T Source # atan :: T -> T Source # sinh :: T -> T Source # cosh :: T -> T Source # tanh :: T -> T Source # asinh :: T -> T Source # acosh :: T -> T Source # atanh :: T -> T Source #
(Ord a, C a) => C (T a) Source #
Instance details Defined in Number.NonNegative Methods pi :: T a Source # exp :: T a -> T a Source # log :: T a -> T a Source # logBase :: T a -> T a -> T a Source # (**) :: T a -> T a -> T a Source # sin :: T a -> T a Source # cos :: T a -> T a Source # tan :: T a -> T a Source # asin :: T a -> T a Source # acos :: T a -> T a Source # atan :: T a -> T a Source # sinh :: T a -> T a Source # cosh :: T a -> T a Source # tanh :: T a -> T a Source # asinh :: T a -> T a Source # acosh :: T a -> T a Source # atanh :: T a -> T a Source #
Floating a => C (T a) Source #
Instance details Defined in MathObj.Wrapper.Haskell98 Methods pi :: T a Source # exp :: T a -> T a Source # log :: T a -> T a Source # logBase :: T a -> T a -> T a Source # (**) :: T a -> T a -> T a Source # sin :: T a -> T a Source # cos :: T a -> T a Source # tan :: T a -> T a Source # asin :: T a -> T a Source # acos :: T a -> T a Source # atan :: T a -> T a Source # sinh :: T a -> T a Source # cosh :: T a -> T a Source # tanh :: T a -> T a Source # asinh :: T a -> T a Source # acosh :: T a -> T a Source # atanh :: T a -> T a Source #
(C a, Eq a) => C (T a) Source #
Instance details Defined in Number.PartiallyTranscendental Methods pi :: T a Source # exp :: T a -> T a Source # log :: T a -> T a Source # logBase :: T a -> T a -> T a Source # (**) :: T a -> T a -> T a Source # sin :: T a -> T a Source # cos :: T a -> T a Source # tan :: T a -> T a Source # asin :: T a -> T a Source # acos :: T a -> T a Source # atan :: T a -> T a Source # sinh :: T a -> T a Source # cosh :: T a -> T a Source # tanh :: T a -> T a Source # asinh :: T a -> T a Source # acosh :: T a -> T a Source # atanh :: T a -> T a Source #
C a => C (T a) Source #
Instance details Defined in MathObj.PowerSeries Methods pi :: T a Source # exp :: T a -> T a Source # log :: T a -> T a Source # logBase :: T a -> T a -> T a Source # (**) :: T a -> T a -> T a Source # sin :: T a -> T a Source # cos :: T a -> T a Source # tan :: T a -> T a Source # asin :: T a -> T a Source # acos :: T a -> T a Source # atan :: T a -> T a Source # sinh :: T a -> T a Source # cosh :: T a -> T a Source # tanh :: T a -> T a Source # asinh :: T a -> T a Source # acosh :: T a -> T a Source # atanh :: T a -> T a Source #
(C a, C a, C a, Power a) => C (T a) Source #
Instance details Defined in Number.Complex Methods pi :: T a Source # exp :: T a -> T a Source # log :: T a -> T a Source # logBase :: T a -> T a -> T a Source # (**) :: T a -> T a -> T a Source # sin :: T a -> T a Source # cos :: T a -> T a Source # tan :: T a -> T a Source # asin :: T a -> T a Source # acos :: T a -> T a Source # atan :: T a -> T a Source # sinh :: T a -> T a Source # cosh :: T a -> T a Source # tanh :: T a -> T a Source # asinh :: T a -> T a Source # acosh :: T a -> T a Source # atanh :: T a -> T a Source #
C a => C (T a) Source #
Instance details Defined in MathObj.Wrapper.NumericPrelude Methods pi :: T a Source # exp :: T a -> T a Source # log :: T a -> T a Source # logBase :: T a -> T a -> T a Source # (**) :: T a -> T a -> T a Source # sin :: T a -> T a Source # cos :: T a -> T a Source # tan :: T a -> T a Source # asin :: T a -> T a Source # acos :: T a -> T a Source # atan :: T a -> T a Source # sinh :: T a -> T a Source # cosh :: T a -> T a Source # tanh :: T a -> T a Source # asinh :: T a -> T a Source # acosh :: T a -> T a Source # atanh :: T a -> T a Source #
(C a, C v, Show v, C a v) => C (T a v) Source #
Instance details Defined in Number.OccasionallyScalarExpression Methods pi :: T a v Source # exp :: T a v -> T a v Source # log :: T a v -> T a v Source # logBase :: T a v -> T a v -> T a v Source # (**) :: T a v -> T a v -> T a v Source # sin :: T a v -> T a v Source # cos :: T a v -> T a v Source # tan :: T a v -> T a v Source # asin :: T a v -> T a v Source # acos :: T a v -> T a v Source # atan :: T a v -> T a v Source # sinh :: T a v -> T a v Source # cosh :: T a v -> T a v Source # tanh :: T a v -> T a v Source # asinh :: T a v -> T a v Source # acosh :: T a v -> T a v Source # atanh :: T a v -> T a v Source #
(Ord i, C a) => C (T i a) Source #
Instance details Defined in Number.Physical Methods pi :: T i a Source # exp :: T i a -> T i a Source # log :: T i a -> T i a Source # logBase :: T i a -> T i a -> T i a Source # (**) :: T i a -> T i a -> T i a Source # sin :: T i a -> T i a Source # cos :: T i a -> T i a Source # tan :: T i a -> T i a Source # asin :: T i a -> T i a Source # acos :: T i a -> T i a Source # atan :: T i a -> T i a Source # sinh :: T i a -> T i a Source # cosh :: T i a -> T i a Source # tanh :: T i a -> T i a Source # asinh :: T i a -> T i a Source # acosh :: T i a -> T i a Source # atanh :: T i a -> T i a Source #
C v => C (T a v) Source #
Instance details Defined in Number.SI Methods pi :: T a v Source # exp :: T a v -> T a v Source # log :: T a v -> T a v Source # logBase :: T a v -> T a v -> T a v Source # (**) :: T a v -> T a v -> T a v Source # sin :: T a v -> T a v Source # cos :: T a v -> T a v Source # tan :: T a v -> T a v Source # asin :: T a v -> T a v Source # acos :: T a v -> T a v Source # atan :: T a v -> T a v Source # sinh :: T a v -> T a v Source # cosh :: T a v -> T a v Source # tanh :: T a v -> T a v Source # asinh :: T a v -> T a v Source # acosh :: T a v -> T a v Source # atanh :: T a v -> T a v Source #