Îõ³h& ÿ š      Safe-Inferred p fractionizerÊCharacterizes the impact of the absolute error sign on the approximation.  fractionizerRounding to thousandth. fractionizerÙAllows to take into account the sign of the absolute error of the aproximation. If the œ parameter is equal to 0 , then absolute error can be of any sign, if it is equal to -1 - the absolute error can be only negative, otherwise - only positive fractionizerÍPartially defined function, if there is no solutions then returns a tuple of . Beter to use  fractionizerÙAllows to take into account the sign of the absolute error of the aproximation. If the œ parameter is equal to 0 , then absolute error can be of any sign, if it is equal to -1 - the absolute error can be only negative, otherwise - only positive fractionizer)The preferable range of the argument for  and × functions. For arguments in this range the functions always have informative results.  fractionizerÙAllows to take into account the sign of the absolute error of the aproximation. If the œ parameter is equal to 0 , then absolute error can be of any sign, if it is equal to -1 - the absolute error can be only negative, otherwise - only positive  fractionizerÙAllows to take into account the sign of the absolute error of the aproximation. If the œ parameter is equal to 0 , then absolute error can be of any sign, if it is equal to -1 - the absolute error can be only negative, otherwise - only positive  fractionizerÙAllows to take into account the sign of the absolute error of the aproximation. If the œ parameter is equal to 0 , then absolute error can be of any sign, if it is equal to -1 - the absolute error can be only negative, otherwise - only positive  fractionizerÙAllows to take into account the sign of the absolute error of the aproximation. If the œ parameter is equal to 0 , then absolute error can be of any sign, if it is equal to -1 - the absolute error can be only negative, otherwise - only positive  fractionizerÙAllows to take into account the sign of the absolute error of the aproximation. If the œ parameter is equal to 0 , then absolute error can be of any sign, if it is equal to -1 - the absolute error can be only negative, otherwise - only positive fractionizeròTries to approximate the fraction by just one unit fraction. Can be used for the numbers between 0.005 and 0.501. fractionizer¨Function to find the less by absolute value error approximation. One of the denominators is taken from the range [2..10]. The two others are taken from the appropriate  applicattion. fractionizerExtended version of the ÷ with the first denominator being taken not - only from the [2..10], but also from the custom user provided list. -  fractionizerµReturns a list of denominators for fraction decomposition using also those ones from the the list provided as the first argument. Searches for the least error from the checked ones.       fractionizer-0.9.0.0-inplaceUnitFractionsDecomposition2 ErrorImpact threeDigitsKsetOfSolutionsGsetOfSolutions suitable2 suitable21G suitable21isRangeN isRangeNPrefcheck1FracDecompGcheck3FracDecompPartialGcheck3FracDecompPartialPGlessErrSimpleDecompPGlessErrDenomsPGcheck1FracDecompcheck3FracDecompPartialcheck3FracDecompPartialPlessErrSimpleDecompPlessErrDenomsPbaseGHC.Err undefined