h&$     (c) OleksandrZhabenko 2022-2023MIToleksandr.zhabenko@yahoo.com Experimental Safe-Inferred quantizerSimple arithmetic mean. Is vulnerable to floating point rounding error so if possible use just for double-precision values.  quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is when the square of the third paremeter is equal to the product of the second one and the fourth one.  quantizerThis one should lie between the other two similar parameters @ the one before and the one after it. quantizerThe numeric value (in ? case) can be equal just to the one of the two first arguments. quantizerIf  then the function rounds the result in the ambiguous situation to the greater value.  quantizerIf  then the function rounds the result in the ambiguous situation to the greater value.  quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument. quantizerThe a value (in 5 case) can be equal just to the one of the two first a arguments. quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument. quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument. quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument. quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument.  quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument.   (c) OleksandrZhabenko 2023MIToleksandr.zhabenko@yahoo.com Experimental Safe-Inferred v  quantizerA better suited variant for  for lists.   quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument. quantizerThe a value (in 5 case) can be equal just to the one of the two first a arguments.  quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument.  quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument.  quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument.  (c) OleksandrZhabenko 2022-2023MIToleksandr.zhabenko@yahoo.com Experimental Safe-Inferred quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument. quantizerThe a value (in 5 case) can be equal just to the one of the two first a arguments. quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument. quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument. quantizerIf  then the function rounds the result in the ambiguous situation to the greater value. The ambigous situation is defined by the second argument.      (quantizer-0.2.1.1-7EhFczShHZI5dlGo47wUFz TwoQuantizer ListQuantizerFoldableQuantizerround2Ground2round2L twoQuantizerround2GL twoQuantizerGround2GM round2GLMmeanF2twoQuantizerGMfoldableQuantizerGL round2GMLfoldableQuantizerGMLfoldableQuantizerGfoldableQuantizerGMghc-prim GHC.TypesTruebase GHC.MaybeJust