digit-0.4.0: A data-type representing digits 0-9 and other combinations
Data.Digit.Digit0
newtype Digit0 a Source #
Constructors
Instances
Methods
(>>=) :: Digit0 a -> (a -> Digit0 b) -> Digit0 b #
(>>) :: Digit0 a -> Digit0 b -> Digit0 b #
return :: a -> Digit0 a #
fail :: String -> Digit0 a #
fmap :: (a -> b) -> Digit0 a -> Digit0 b #
(<$) :: a -> Digit0 b -> Digit0 a #
pure :: a -> Digit0 a #
(<*>) :: Digit0 (a -> b) -> Digit0 a -> Digit0 b #
(*>) :: Digit0 a -> Digit0 b -> Digit0 b #
(<*) :: Digit0 a -> Digit0 b -> Digit0 a #
fold :: Monoid m => Digit0 m -> m #
foldMap :: Monoid m => (a -> m) -> Digit0 a -> m #
foldr :: (a -> b -> b) -> b -> Digit0 a -> b #
foldr' :: (a -> b -> b) -> b -> Digit0 a -> b #
foldl :: (b -> a -> b) -> b -> Digit0 a -> b #
foldl' :: (b -> a -> b) -> b -> Digit0 a -> b #
foldr1 :: (a -> a -> a) -> Digit0 a -> a #
foldl1 :: (a -> a -> a) -> Digit0 a -> a #
toList :: Digit0 a -> [a] #
null :: Digit0 a -> Bool #
length :: Digit0 a -> Int #
elem :: Eq a => a -> Digit0 a -> Bool #
maximum :: Ord a => Digit0 a -> a #
minimum :: Ord a => Digit0 a -> a #
sum :: Num a => Digit0 a -> a #
product :: Num a => Digit0 a -> a #
traverse :: Applicative f => (a -> f b) -> Digit0 a -> f (Digit0 b) #
sequenceA :: Applicative f => Digit0 (f a) -> f (Digit0 a) #
mapM :: Monad m => (a -> m b) -> Digit0 a -> m (Digit0 b) #
sequence :: Monad m => Digit0 (m a) -> m (Digit0 a) #
traverse1 :: Apply f => (a -> f b) -> Digit0 a -> f (Digit0 b) #
sequence1 :: Apply f => Digit0 (f b) -> f (Digit0 b) #
fold1 :: Semigroup m => Digit0 m -> m #
foldMap1 :: Semigroup m => (a -> m) -> Digit0 a -> m #
toNonEmpty :: Digit0 a -> NonEmpty a #
(>>-) :: Digit0 a -> (a -> Digit0 b) -> Digit0 b #
join :: Digit0 (Digit0 a) -> Digit0 a #
(<.>) :: Digit0 (a -> b) -> Digit0 a -> Digit0 b #
(.>) :: Digit0 a -> Digit0 b -> Digit0 b #
(<.) :: Digit0 a -> Digit0 b -> Digit0 a #
imap :: (() -> a -> b) -> Digit0 a -> Digit0 b #
imapped :: (Indexable () p, Settable f) => p a (f b) -> Digit0 a -> f (Digit0 b) #
ifoldMap :: Monoid m => (() -> a -> m) -> Digit0 a -> m #
ifolded :: (Indexable () p, Contravariant f, Applicative f) => p a (f a) -> Digit0 a -> f (Digit0 a) #
ifoldr :: (() -> a -> b -> b) -> b -> Digit0 a -> b #
ifoldl :: (() -> b -> a -> b) -> b -> Digit0 a -> b #
ifoldr' :: (() -> a -> b -> b) -> b -> Digit0 a -> b #
ifoldl' :: (() -> b -> a -> b) -> b -> Digit0 a -> b #
itraverse :: Applicative f => (() -> a -> f b) -> Digit0 a -> f (Digit0 b) #
itraversed :: (Indexable () p, Applicative f) => p a (f b) -> Digit0 a -> f (Digit0 b) #
minBound :: Digit0 a #
maxBound :: Digit0 a #
succ :: Digit0 a -> Digit0 a #
pred :: Digit0 a -> Digit0 a #
toEnum :: Int -> Digit0 a #
fromEnum :: Digit0 a -> Int #
enumFrom :: Digit0 a -> [Digit0 a] #
enumFromThen :: Digit0 a -> Digit0 a -> [Digit0 a] #
enumFromTo :: Digit0 a -> Digit0 a -> [Digit0 a] #
enumFromThenTo :: Digit0 a -> Digit0 a -> Digit0 a -> [Digit0 a] #
(==) :: Digit0 a -> Digit0 a -> Bool #
(/=) :: Digit0 a -> Digit0 a -> Bool #
pi :: Digit0 a #
exp :: Digit0 a -> Digit0 a #
log :: Digit0 a -> Digit0 a #
sqrt :: Digit0 a -> Digit0 a #
(**) :: Digit0 a -> Digit0 a -> Digit0 a #
logBase :: Digit0 a -> Digit0 a -> Digit0 a #
sin :: Digit0 a -> Digit0 a #
cos :: Digit0 a -> Digit0 a #
tan :: Digit0 a -> Digit0 a #
asin :: Digit0 a -> Digit0 a #
acos :: Digit0 a -> Digit0 a #
atan :: Digit0 a -> Digit0 a #
sinh :: Digit0 a -> Digit0 a #
cosh :: Digit0 a -> Digit0 a #
tanh :: Digit0 a -> Digit0 a #
asinh :: Digit0 a -> Digit0 a #
acosh :: Digit0 a -> Digit0 a #
atanh :: Digit0 a -> Digit0 a #
log1p :: Digit0 a -> Digit0 a #
expm1 :: Digit0 a -> Digit0 a #
log1pexp :: Digit0 a -> Digit0 a #
log1mexp :: Digit0 a -> Digit0 a #
(/) :: Digit0 a -> Digit0 a -> Digit0 a #
recip :: Digit0 a -> Digit0 a #
fromRational :: Rational -> Digit0 a #
quot :: Digit0 a -> Digit0 a -> Digit0 a #
rem :: Digit0 a -> Digit0 a -> Digit0 a #
div :: Digit0 a -> Digit0 a -> Digit0 a #
mod :: Digit0 a -> Digit0 a -> Digit0 a #
quotRem :: Digit0 a -> Digit0 a -> (Digit0 a, Digit0 a) #
divMod :: Digit0 a -> Digit0 a -> (Digit0 a, Digit0 a) #
toInteger :: Digit0 a -> Integer #
(+) :: Digit0 a -> Digit0 a -> Digit0 a #
(-) :: Digit0 a -> Digit0 a -> Digit0 a #
(*) :: Digit0 a -> Digit0 a -> Digit0 a #
negate :: Digit0 a -> Digit0 a #
abs :: Digit0 a -> Digit0 a #
signum :: Digit0 a -> Digit0 a #
fromInteger :: Integer -> Digit0 a #
compare :: Digit0 a -> Digit0 a -> Ordering #
(<) :: Digit0 a -> Digit0 a -> Bool #
(<=) :: Digit0 a -> Digit0 a -> Bool #
(>) :: Digit0 a -> Digit0 a -> Bool #
(>=) :: Digit0 a -> Digit0 a -> Bool #
max :: Digit0 a -> Digit0 a -> Digit0 a #
min :: Digit0 a -> Digit0 a -> Digit0 a #
toRational :: Digit0 a -> Rational #
floatRadix :: Digit0 a -> Integer #
floatDigits :: Digit0 a -> Int #
floatRange :: Digit0 a -> (Int, Int) #
decodeFloat :: Digit0 a -> (Integer, Int) #
encodeFloat :: Integer -> Int -> Digit0 a #
exponent :: Digit0 a -> Int #
significand :: Digit0 a -> Digit0 a #
scaleFloat :: Int -> Digit0 a -> Digit0 a #
isNaN :: Digit0 a -> Bool #
isInfinite :: Digit0 a -> Bool #
isDenormalized :: Digit0 a -> Bool #
isNegativeZero :: Digit0 a -> Bool #
isIEEE :: Digit0 a -> Bool #
atan2 :: Digit0 a -> Digit0 a -> Digit0 a #
properFraction :: Integral b => Digit0 a -> (b, Digit0 a) #
truncate :: Integral b => Digit0 a -> b #
round :: Integral b => Digit0 a -> b #
ceiling :: Integral b => Digit0 a -> b #
floor :: Integral b => Digit0 a -> b #
showsPrec :: Int -> Digit0 a -> ShowS #
show :: Digit0 a -> String #
showList :: [Digit0 a] -> ShowS #
(<>) :: Digit0 a -> Digit0 a -> Digit0 a #
sconcat :: NonEmpty (Digit0 a) -> Digit0 a #
stimes :: Integral b => b -> Digit0 a -> Digit0 a #
mempty :: Digit0 a #
mappend :: Digit0 a -> Digit0 a -> Digit0 a #
mconcat :: [Digit0 a] -> Digit0 a #
ix :: Index (Digit0 a) -> Traversal' (Digit0 a) (IxValue (Digit0 a)) #
Associated Types
type Unwrapped (Digit0 a0) :: * #
_Wrapped' :: Iso' (Digit0 a0) (Unwrapped (Digit0 a0)) #
d0 :: Prism' (Digit0 a) () Source #
x0 :: Digit0 a Source #
each :: Traversal (Digit0 a) (Digit0 b) a b #
_1 :: Lens (Digit0 a) (Digit0 b) a b #