* timevar.c (validate_phases): Use size_t for memory.
[official-gcc.git] / libquadmath / math / atanq.c
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1 /* s_atanl.c
3 * Inverse circular tangent for 128-bit __float128 precision
4 * (arctangent)
8 * SYNOPSIS:
10 * __float128 x, y, atanl();
12 * y = atanl( x );
16 * DESCRIPTION:
18 * Returns radian angle between -pi/2 and +pi/2 whose tangent is x.
20 * The function uses a rational approximation of the form
21 * t + t^3 P(t^2)/Q(t^2), optimized for |t| < 0.09375.
23 * The argument is reduced using the identity
24 * arctan x - arctan u = arctan ((x-u)/(1 + ux))
25 * and an 83-entry lookup table for arctan u, with u = 0, 1/8, ..., 10.25.
26 * Use of the table improves the execution speed of the routine.
30 * ACCURACY:
32 * Relative error:
33 * arithmetic domain # trials peak rms
34 * IEEE -19, 19 4e5 1.7e-34 5.4e-35
37 * WARNING:
39 * This program uses integer operations on bit fields of floating-point
40 * numbers. It does not work with data structures other than the
41 * structure assumed.
45 /* Copyright 2001 by Stephen L. Moshier <moshier@na-net.ornl.gov>
47 This library is free software; you can redistribute it and/or
48 modify it under the terms of the GNU Lesser General Public
49 License as published by the Free Software Foundation; either
50 version 2.1 of the License, or (at your option) any later version.
52 This library is distributed in the hope that it will be useful,
53 but WITHOUT ANY WARRANTY; without even the implied warranty of
54 MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
55 Lesser General Public License for more details.
57 You should have received a copy of the GNU Lesser General Public
58 License along with this library; if not, write to the Free Software
59 Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA */
62 #include "quadmath-imp.h"
64 /* arctan(k/8), k = 0, ..., 82 */
65 static const __float128 atantbl[84] = {
66 0.0000000000000000000000000000000000000000E0Q,
67 1.2435499454676143503135484916387102557317E-1Q, /* arctan(0.125) */
68 2.4497866312686415417208248121127581091414E-1Q,
69 3.5877067027057222039592006392646049977698E-1Q,
70 4.6364760900080611621425623146121440202854E-1Q,
71 5.5859931534356243597150821640166127034645E-1Q,
72 6.4350110879328438680280922871732263804151E-1Q,
73 7.1882999962162450541701415152590465395142E-1Q,
74 7.8539816339744830961566084581987572104929E-1Q,
75 8.4415398611317100251784414827164750652594E-1Q,
76 8.9605538457134395617480071802993782702458E-1Q,
77 9.4200004037946366473793717053459358607166E-1Q,
78 9.8279372324732906798571061101466601449688E-1Q,
79 1.0191413442663497346383429170230636487744E0Q,
80 1.0516502125483736674598673120862998296302E0Q,
81 1.0808390005411683108871567292171998202703E0Q,
82 1.1071487177940905030170654601785370400700E0Q,
83 1.1309537439791604464709335155363278047493E0Q,
84 1.1525719972156675180401498626127513797495E0Q,
85 1.1722738811284763866005949441337046149712E0Q,
86 1.1902899496825317329277337748293183376012E0Q,
87 1.2068173702852525303955115800565576303133E0Q,
88 1.2220253232109896370417417439225704908830E0Q,
89 1.2360594894780819419094519711090786987027E0Q,
90 1.2490457723982544258299170772810901230778E0Q,
91 1.2610933822524404193139408812473357720101E0Q,
92 1.2722973952087173412961937498224804940684E0Q,
93 1.2827408797442707473628852511364955306249E0Q,
94 1.2924966677897852679030914214070816845853E0Q,
95 1.3016288340091961438047858503666855921414E0Q,
96 1.3101939350475556342564376891719053122733E0Q,
97 1.3182420510168370498593302023271362531155E0Q,
98 1.3258176636680324650592392104284756311844E0Q,
99 1.3329603993374458675538498697331558093700E0Q,
100 1.3397056595989995393283037525895557411039E0Q,
101 1.3460851583802539310489409282517796256512E0Q,
102 1.3521273809209546571891479413898128509842E0Q,
103 1.3578579772154994751124898859640585287459E0Q,
104 1.3633001003596939542892985278250991189943E0Q,
105 1.3684746984165928776366381936948529556191E0Q,
106 1.3734007669450158608612719264449611486510E0Q,
107 1.3780955681325110444536609641291551522494E0Q,
108 1.3825748214901258580599674177685685125566E0Q,
109 1.3868528702577214543289381097042486034883E0Q,
110 1.3909428270024183486427686943836432060856E0Q,
111 1.3948567013423687823948122092044222644895E0Q,
112 1.3986055122719575950126700816114282335732E0Q,
113 1.4021993871854670105330304794336492676944E0Q,
114 1.4056476493802697809521934019958079881002E0Q,
115 1.4089588955564736949699075250792569287156E0Q,
116 1.4121410646084952153676136718584891599630E0Q,
117 1.4152014988178669079462550975833894394929E0Q,
118 1.4181469983996314594038603039700989523716E0Q,
119 1.4209838702219992566633046424614466661176E0Q,
120 1.4237179714064941189018190466107297503086E0Q,
121 1.4263547484202526397918060597281265695725E0Q,
122 1.4288992721907326964184700745371983590908E0Q,
123 1.4313562697035588982240194668401779312122E0Q,
124 1.4337301524847089866404719096698873648610E0Q,
125 1.4360250423171655234964275337155008780675E0Q,
126 1.4382447944982225979614042479354815855386E0Q,
127 1.4403930189057632173997301031392126865694E0Q,
128 1.4424730991091018200252920599377292525125E0Q,
129 1.4444882097316563655148453598508037025938E0Q,
130 1.4464413322481351841999668424758804165254E0Q,
131 1.4483352693775551917970437843145232637695E0Q,
132 1.4501726582147939000905940595923466567576E0Q,
133 1.4519559822271314199339700039142990228105E0Q,
134 1.4536875822280323362423034480994649820285E0Q,
135 1.4553696664279718992423082296859928222270E0Q,
136 1.4570043196511885530074841089245667532358E0Q,
137 1.4585935117976422128825857356750737658039E0Q,
138 1.4601391056210009726721818194296893361233E0Q,
139 1.4616428638860188872060496086383008594310E0Q,
140 1.4631064559620759326975975316301202111560E0Q,
141 1.4645314639038178118428450961503371619177E0Q,
142 1.4659193880646627234129855241049975398470E0Q,
143 1.4672716522843522691530527207287398276197E0Q,
144 1.4685896086876430842559640450619880951144E0Q,
145 1.4698745421276027686510391411132998919794E0Q,
146 1.4711276743037345918528755717617308518553E0Q,
147 1.4723501675822635384916444186631899205983E0Q,
148 1.4735431285433308455179928682541563973416E0Q, /* arctan(10.25) */
149 1.5707963267948966192313216916397514420986E0Q /* pi/2 */
153 /* arctan t = t + t^3 p(t^2) / q(t^2)
154 |t| <= 0.09375
155 peak relative error 5.3e-37 */
157 static const __float128
158 p0 = -4.283708356338736809269381409828726405572E1Q,
159 p1 = -8.636132499244548540964557273544599863825E1Q,
160 p2 = -5.713554848244551350855604111031839613216E1Q,
161 p3 = -1.371405711877433266573835355036413750118E1Q,
162 p4 = -8.638214309119210906997318946650189640184E-1Q,
163 q0 = 1.285112506901621042780814422948906537959E2Q,
164 q1 = 3.361907253914337187957855834229672347089E2Q,
165 q2 = 3.180448303864130128268191635189365331680E2Q,
166 q3 = 1.307244136980865800160844625025280344686E2Q,
167 q4 = 2.173623741810414221251136181221172551416E1Q;
168 /* q5 = 1.000000000000000000000000000000000000000E0 */
170 static const long double huge = 1.0e4930Q;
172 __float128
173 atanq (__float128 x)
175 int k, sign;
176 __float128 t, u, p, q;
177 ieee854_float128 s;
179 s.value = x;
180 k = s.words32.w0;
181 if (k & 0x80000000)
182 sign = 1;
183 else
184 sign = 0;
186 /* Check for IEEE special cases. */
187 k &= 0x7fffffff;
188 if (k >= 0x7fff0000)
190 /* NaN. */
191 if ((k & 0xffff) | s.words32.w1 | s.words32.w2 | s.words32.w3)
192 return (x + x);
194 /* Infinity. */
195 if (sign)
196 return -atantbl[83];
197 else
198 return atantbl[83];
201 if (k <= 0x3fc50000) /* |x| < 2**-58 */
203 /* Raise inexact. */
204 if (huge + x > 0.0)
205 return x;
208 if (k >= 0x40720000) /* |x| > 2**115 */
210 /* Saturate result to {-,+}pi/2 */
211 if (sign)
212 return -atantbl[83];
213 else
214 return atantbl[83];
217 if (sign)
218 x = -x;
220 if (k >= 0x40024800) /* 10.25 */
222 k = 83;
223 t = -1.0/x;
225 else
227 /* Index of nearest table element.
228 Roundoff to integer is asymmetrical to avoid cancellation when t < 0
229 (cf. fdlibm). */
230 k = 8.0Q * x + 0.25Q;
231 u = 0.125Q * k;
232 /* Small arctan argument. */
233 t = (x - u) / (1.0 + x * u);
236 /* Arctan of small argument t. */
237 u = t * t;
238 p = ((((p4 * u) + p3) * u + p2) * u + p1) * u + p0;
239 q = ((((u + q4) * u + q3) * u + q2) * u + q1) * u + q0;
240 u = t * u * p / q + t;
242 /* arctan x = arctan u + arctan t */
243 u = atantbl[k] + u;
244 if (sign)
245 return (-u);
246 else
247 return u;