⟦cbfb316cf⟧

E3 Source Code



separate (Generic_Elementary_Functions)

function Tanh (X : Float_Type) return Float_Type is

-- On input, X is a floating-point value in Float_Type;
-- On output, the value of tanh(X) (the hyperbolic tangent of X) is returned.

-- The definition of tanh(Y) is sinh(Y)/cosh(Y), which is also equivalent
-- to the following three formulas.
--      1.  ( exp(Y) - exp(-Y) ) / ( exp(Y) + exp(-Y) )
--      2.  ( 1 - ( 2 / ( exp(2*Y) + 1 ) ) )
--      3.  ( exp(2*Y) - 1 ) / ( exp(2*Y) + 1 ).
-- but computationally, some formulas are better on some ranges.

   Z, Sign_Y : Common_Float;

   Y, Abs_Y : Common_Float;

   Log2 : constant Common_Float := 16#0.B17217F7D1CF79ABC9E3B39803F2F6AF40#;

   Base_Digits : constant Common_Float :=
      Common_Float (6 * Float_Type'Base'Digits);

   Log2_Times_2 : constant Common_Float := (2.0 * Log2);

   Cond : constant Common_Float := (Base_Digits * Log2);


begin

-- Filter out exceptional cases.

   if (X = 0.0) then
      return (X);
   end if;

   Y     := Common_Float (X);
   Abs_Y := abs (Y);

   if (Y >= 0.0) then
      Sign_Y := 1.0;
   else
      Sign_Y := -1.0;
   end if;


   if (Abs_Y <= (Log2_Times_2)) then
--    Formula 3 should be used in this situation to guarantee accuracy.

      Z := Kf_Em1 (2.0 * Abs_Y);
      Z := Sign_Y * (Z / (Z + 2.0));
      return (Float_Type (Z));

   elsif (Abs_Y > Cond) then
--    Formula 2 should be used in this situation to guarantee accuracy,
--    but observe that 2/(exp(2*Y) + 1) will be so small compared to 1
--    that it is negligible.

      return (Float_Type (Sign_Y));

   else
--   When ( Log2_Times_2 < Abs_Y <= Cond ), use formula 2 for best accuracy.

      Z := Kf_Em1 (2.0 * Abs_Y);
      Z := Sign_Y * (1.0 - 2.0 / (Z + 2.0));
      return (Float_Type (Z));

   end if;

end Tanh;
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Rational R1000/400

⟦cbfb316cf⟧ Ada Source

Derivation

E3 Source Code

E3 Meta Data
