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1 ------------------------------------------------------------------------------
2 -- --
3 -- GNAT RUNTIME COMPONENTS --
4 -- --
5 -- A D A . N U M E R I C S . A U X --
6 -- --
7 -- B o d y --
8 -- (Machine Version for x86) --
9 -- --
10 -- Copyright (C) 1998-2004 Free Software Foundation, Inc. --
11 -- --
12 -- GNAT is free software; you can redistribute it and/or modify it under --
13 -- terms of the GNU General Public License as published by the Free Soft- --
14 -- ware Foundation; either version 2, or (at your option) any later ver- --
15 -- sion. GNAT is distributed in the hope that it will be useful, but WITH- --
16 -- OUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY --
17 -- or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License --
18 -- for more details. You should have received a copy of the GNU General --
19 -- Public License distributed with GNAT; see file COPYING. If not, write --
20 -- to the Free Software Foundation, 59 Temple Place - Suite 330, Boston, --
21 -- MA 02111-1307, USA. --
22 -- --
23 -- As a special exception, if other files instantiate generics from this --
24 -- unit, or you link this unit with other files to produce an executable, --
25 -- this unit does not by itself cause the resulting executable to be --
26 -- covered by the GNU General Public License. This exception does not --
27 -- however invalidate any other reasons why the executable file might be --
28 -- covered by the GNU Public License. --
29 -- --
30 -- GNAT was originally developed by the GNAT team at New York University. --
31 -- Extensive contributions were provided by Ada Core Technologies Inc. --
32 -- --
33 ------------------------------------------------------------------------------
35 -- File a-numaux.adb <- 86numaux.adb
37 -- This version of Numerics.Aux is for the IEEE Double Extended floating
38 -- point format on x86.
46 -----------------------
47 -- Local subprograms --
48 -----------------------
51 -- Return True iff X is a IEEE NaN value
54 -- Implementation of X**Y using Exp and Log functions (binary base)
55 -- to calculate the exponentiation. This is used by Pow for values
56 -- for values of Y in the open interval (-0.25, 0.25)
59 -- Implements reduction of X by Pi/2. Q is the quadrant of the final
60 -- result in the range 0 .. 3. The absolute value of X is at most Pi.
65 --------------------------------
66 -- Basic Elementary Functions --
67 --------------------------------
69 -- This section implements a few elementary functions that are used to
70 -- build the more complex ones. This ordering enables better inlining.
72 ----------
73 -- Atan --
74 ----------
79 begin
86 -- The result value is NaN iff input was invalid
95 ---------
96 -- Exp --
97 ---------
101 begin
119 ------------
120 -- Is_Nan --
121 ------------
124 begin
125 -- The IEEE NaN values are the only ones that do not equal themselves
130 ---------
131 -- Log --
132 ---------
137 begin
147 ------------
148 -- Reduce --
149 ------------
165 begin
166 -- For X < 2.0**32, all products below are computed exactly.
167 -- Due to cancellation effects all subtractions are exact as well.
168 -- As no double extended floating-point number has more than 75
169 -- zeros after the binary point, the result will be the correctly
170 -- rounded result of X - K * (Pi / 2.0).
181 -- K is not a number, because X was not finite
192 ----------
193 -- Sqrt --
194 ----------
199 begin
211 --------------------------------
212 -- Other Elementary Functions --
213 --------------------------------
215 -- These are built using the previously implemented basic functions
217 ----------
218 -- Acos --
219 ----------
224 begin
227 -- The result value is NaN iff input was invalid
236 ----------
237 -- Asin --
238 ----------
243 begin
246 -- The result value is NaN iff input was invalid
255 ---------
256 -- Cos --
257 ---------
264 begin
287 else
296 ---------------------
297 -- Logarithmic_Pow --
298 ---------------------
302 begin
315 Inputs =>
321 ---------
322 -- Pow --
323 ---------
327 -- Modular type that can hold all bits of the mantissa of Double
329 -- For negative exponents, do divide at the end of the processing
334 -- During this function the following invariant is kept:
335 -- X ** (abs Y) = Base**(Exp_High + Exp_Mid + Exp_Low) * Factor
346 begin
347 -- Select algorithm for calculating Pow (integer cases fall through)
351 -- In case of Y that is IEEE infinity, just raise constraint error
357 -- Large values of Y are even integers and will stay integer
358 -- after division by two.
360 loop
361 -- Exp_Mid and Exp_Low are zero, so
362 -- X**(abs Y) = Base ** Exp_High = (Base**2) ** (Exp_High / 2)
375 -- Exp_Low now is in interval (0.0, 1.0)
376 -- Exp_Mid := Double'Floor (Exp_Low * 4.0) / 4.0;
395 -- Exp_Low now is in interval (0.0, 0.25)
397 -- This means it is safe to call Logarithmic_Pow
398 -- for the remaining part.
407 -- Exp_High is non-zero integer smaller than 2**Double'Machine_Mantissa
411 -- Standard way for processing integer powers > 0
416 -- Base**Y = Base**(Exp_Int - 1) * Exp_Int for Exp_Int > 0
421 -- Exp_Int is even and Exp_Int > 0, so
422 -- Base**Y = (Base**2)**(Exp_Int / 2)
428 -- Exp_Int = 1 or Exp_Int = 0
441 ---------
442 -- Sin --
443 ---------
450 begin
473 else
482 ---------
483 -- Tan --
484 ---------
491 begin
501 else
509 else
521 ----------
522 -- Sinh --
523 ----------
526 begin
527 -- Mathematically Sinh (x) is defined to be (Exp (X) - Exp (-X)) / 2.0
531 else
536 ----------
537 -- Cosh --
538 ----------
541 begin
542 -- Mathematically Cosh (X) is defined to be (Exp (X) + Exp (-X)) / 2.0
546 else
551 ----------
552 -- Tanh --
553 ----------
556 begin
557 -- Return the Hyperbolic Tangent of x
559 -- x -x
560 -- e - e Sinh (X)
561 -- Tanh (X) is defined to be ----------- = --------
562 -- x -x Cosh (X)
563 -- e + e