 | NumericPrelude-0.0: An experimental alternative hierarchy of numeric type classes | Contents | Index |
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| MathObj.PowerSeries.Example |
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| Synopsis |
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| Default implementations.
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| recip :: C a => [a] |
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| exp :: C a => [a] |
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| sin :: C a => [a] |
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| cos :: C a => [a] |
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| log :: C a => [a] |
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| asin :: C a => [a] |
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| atan :: C a => [a] |
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| sqrt :: C a => [a] |
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| acos :: C a => [a] |
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| tan :: (C a, C a) => [a] |
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| sinh :: C a => [a] |
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| cosh :: C a => [a] |
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| atanh :: C a => [a] |
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| pow :: C a => a -> [a] |
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| Generate Taylor series explicitly.
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| recipExpl :: C a => [a] |
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| expExpl :: C a => [a] |
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| sinExpl :: C a => [a] |
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| cosExpl :: C a => [a] |
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| tanExpl :: (C a, C a) => [a] |
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| tanExplSieve :: (C a, C a) => [a] |
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| logExpl :: C a => [a] |
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| atanExpl :: C a => [a] |
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| sqrtExpl :: C a => [a] |
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| sinhExpl :: C a => [a] |
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| coshExpl :: C a => [a] |
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| atanhExpl :: C a => [a] |
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| Power series of (1+x)^expon using the binomial series.
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| powExpl :: C a => a -> [a] |
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| erf :: C a => [a] |
| Power series of error function (almost).
More precisely erf = 2 / sqrt pi * integrate (x -> exp (-x^2)) ,
with erf 0 = 0.
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| Generate Taylor series from differential equations.
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| expODE :: C a => [a] |
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| sinODE :: C a => [a] |
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| cosODE :: C a => [a] |
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| tanODE :: C a => [a] |
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| tanODESieve :: C a => [a] |
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| logODE :: C a => [a] |
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| recipCircle :: C a => [a] |
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| asinODE :: C a => [a] |
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| atanODE :: C a => [a] |
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| sqrtODE :: C a => [a] |
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| acosODE :: C a => [a] |
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| sinhODE :: C a => [a] |
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| coshODE :: C a => [a] |
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| atanhODE :: C a => [a] |
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| powODE :: C a => a -> [a] |
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| Produced by Haddock version 0.7 |