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Diffstat (limited to 'sysdeps/ieee754/dbl-64/e_atan2.c')
-rw-r--r-- | sysdeps/ieee754/dbl-64/e_atan2.c | 620 |
1 files changed, 0 insertions, 620 deletions
diff --git a/sysdeps/ieee754/dbl-64/e_atan2.c b/sysdeps/ieee754/dbl-64/e_atan2.c deleted file mode 100644 index 3c9d964b9b..0000000000 --- a/sysdeps/ieee754/dbl-64/e_atan2.c +++ /dev/null @@ -1,620 +0,0 @@ -/* - * IBM Accurate Mathematical Library - * written by International Business Machines Corp. - * Copyright (C) 2001-2017 Free Software Foundation, Inc. - * - * This program is free software; you can redistribute it and/or modify - * it under the terms of the GNU Lesser General Public License as published by - * the Free Software Foundation; either version 2.1 of the License, or - * (at your option) any later version. - * - * This program is distributed in the hope that it will be useful, - * but WITHOUT ANY WARRANTY; without even the implied warranty of - * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the - * GNU Lesser General Public License for more details. - * - * You should have received a copy of the GNU Lesser General Public License - * along with this program; if not, see <http://www.gnu.org/licenses/>. - */ -/************************************************************************/ -/* MODULE_NAME: atnat2.c */ -/* */ -/* FUNCTIONS: uatan2 */ -/* atan2Mp */ -/* signArctan2 */ -/* normalized */ -/* */ -/* FILES NEEDED: dla.h endian.h mpa.h mydefs.h atnat2.h */ -/* mpatan.c mpatan2.c mpsqrt.c */ -/* uatan.tbl */ -/* */ -/* An ultimate atan2() routine. Given two IEEE double machine numbers y,*/ -/* x it computes the correctly rounded (to nearest) value of atan2(y,x).*/ -/* */ -/* Assumption: Machine arithmetic operations are performed in */ -/* round to nearest mode of IEEE 754 standard. */ -/* */ -/************************************************************************/ - -#include <dla.h> -#include "mpa.h" -#include "MathLib.h" -#include "uatan.tbl" -#include "atnat2.h" -#include <fenv.h> -#include <float.h> -#include <math.h> -#include <math_private.h> -#include <stap-probe.h> - -#ifndef SECTION -# define SECTION -#endif - -/************************************************************************/ -/* An ultimate atan2 routine. Given two IEEE double machine numbers y,x */ -/* it computes the correctly rounded (to nearest) value of atan2(y,x). */ -/* Assumption: Machine arithmetic operations are performed in */ -/* round to nearest mode of IEEE 754 standard. */ -/************************************************************************/ -static double atan2Mp (double, double, const int[]); - /* Fix the sign and return after stage 1 or stage 2 */ -static double -signArctan2 (double y, double z) -{ - return __copysign (z, y); -} - -static double normalized (double, double, double, double); -void __mpatan2 (mp_no *, mp_no *, mp_no *, int); - -double -SECTION -__ieee754_atan2 (double y, double x) -{ - int i, de, ux, dx, uy, dy; - static const int pr[MM] = { 6, 8, 10, 20, 32 }; - double ax, ay, u, du, u9, ua, v, vv, dv, t1, t2, t3, t7, t8, - z, zz, cor, s1, ss1, s2, ss2; -#ifndef DLA_FMS - double t4, t5, t6; -#endif - number num; - - static const int ep = 59768832, /* 57*16**5 */ - em = -59768832; /* -57*16**5 */ - - /* x=NaN or y=NaN */ - num.d = x; - ux = num.i[HIGH_HALF]; - dx = num.i[LOW_HALF]; - if ((ux & 0x7ff00000) == 0x7ff00000) - { - if (((ux & 0x000fffff) | dx) != 0x00000000) - return x + y; - } - num.d = y; - uy = num.i[HIGH_HALF]; - dy = num.i[LOW_HALF]; - if ((uy & 0x7ff00000) == 0x7ff00000) - { - if (((uy & 0x000fffff) | dy) != 0x00000000) - return y + y; - } - - /* y=+-0 */ - if (uy == 0x00000000) - { - if (dy == 0x00000000) - { - if ((ux & 0x80000000) == 0x00000000) - return 0; - else - return opi.d; - } - } - else if (uy == 0x80000000) - { - if (dy == 0x00000000) - { - if ((ux & 0x80000000) == 0x00000000) - return -0.0; - else - return mopi.d; - } - } - - /* x=+-0 */ - if (x == 0) - { - if ((uy & 0x80000000) == 0x00000000) - return hpi.d; - else - return mhpi.d; - } - - /* x=+-INF */ - if (ux == 0x7ff00000) - { - if (dx == 0x00000000) - { - if (uy == 0x7ff00000) - { - if (dy == 0x00000000) - return qpi.d; - } - else if (uy == 0xfff00000) - { - if (dy == 0x00000000) - return mqpi.d; - } - else - { - if ((uy & 0x80000000) == 0x00000000) - return 0; - else - return -0.0; - } - } - } - else if (ux == 0xfff00000) - { - if (dx == 0x00000000) - { - if (uy == 0x7ff00000) - { - if (dy == 0x00000000) - return tqpi.d; - } - else if (uy == 0xfff00000) - { - if (dy == 0x00000000) - return mtqpi.d; - } - else - { - if ((uy & 0x80000000) == 0x00000000) - return opi.d; - else - return mopi.d; - } - } - } - - /* y=+-INF */ - if (uy == 0x7ff00000) - { - if (dy == 0x00000000) - return hpi.d; - } - else if (uy == 0xfff00000) - { - if (dy == 0x00000000) - return mhpi.d; - } - - SET_RESTORE_ROUND (FE_TONEAREST); - /* either x/y or y/x is very close to zero */ - ax = (x < 0) ? -x : x; - ay = (y < 0) ? -y : y; - de = (uy & 0x7ff00000) - (ux & 0x7ff00000); - if (de >= ep) - { - return ((y > 0) ? hpi.d : mhpi.d); - } - else if (de <= em) - { - if (x > 0) - { - double ret; - if ((z = ay / ax) < TWOM1022) - ret = normalized (ax, ay, y, z); - else - ret = signArctan2 (y, z); - if (fabs (ret) < DBL_MIN) - { - double vret = ret ? ret : DBL_MIN; - double force_underflow = vret * vret; - math_force_eval (force_underflow); - } - return ret; - } - else - { - return ((y > 0) ? opi.d : mopi.d); - } - } - - /* if either x or y is extremely close to zero, scale abs(x), abs(y). */ - if (ax < twom500.d || ay < twom500.d) - { - ax *= two500.d; - ay *= two500.d; - } - - /* Likewise for large x and y. */ - if (ax > two500.d || ay > two500.d) - { - ax *= twom500.d; - ay *= twom500.d; - } - - /* x,y which are neither special nor extreme */ - if (ay < ax) - { - u = ay / ax; - EMULV (ax, u, v, vv, t1, t2, t3, t4, t5); - du = ((ay - v) - vv) / ax; - } - else - { - u = ax / ay; - EMULV (ay, u, v, vv, t1, t2, t3, t4, t5); - du = ((ax - v) - vv) / ay; - } - - if (x > 0) - { - /* (i) x>0, abs(y)< abs(x): atan(ay/ax) */ - if (ay < ax) - { - if (u < inv16.d) - { - v = u * u; - - zz = du + u * v * (d3.d - + v * (d5.d - + v * (d7.d - + v * (d9.d - + v * (d11.d - + v * d13.d))))); - - if ((z = u + (zz - u1.d * u)) == u + (zz + u1.d * u)) - return signArctan2 (y, z); - - MUL2 (u, du, u, du, v, vv, t1, t2, t3, t4, t5, t6, t7, t8); - s1 = v * (f11.d + v * (f13.d - + v * (f15.d + v * (f17.d + v * f19.d)))); - ADD2 (f9.d, ff9.d, s1, 0, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f7.d, ff7.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f5.d, ff5.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f3.d, ff3.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - MUL2 (u, du, s1, ss1, s2, ss2, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (u, du, s2, ss2, s1, ss1, t1, t2); - - if ((z = s1 + (ss1 - u5.d * s1)) == s1 + (ss1 + u5.d * s1)) - return signArctan2 (y, z); - - return atan2Mp (x, y, pr); - } - - i = (TWO52 + TWO8 * u) - TWO52; - i -= 16; - t3 = u - cij[i][0].d; - EADD (t3, du, v, dv); - t1 = cij[i][1].d; - t2 = cij[i][2].d; - zz = v * t2 + (dv * t2 - + v * v * (cij[i][3].d - + v * (cij[i][4].d - + v * (cij[i][5].d - + v * cij[i][6].d)))); - if (i < 112) - { - if (i < 48) - u9 = u91.d; /* u < 1/4 */ - else - u9 = u92.d; - } /* 1/4 <= u < 1/2 */ - else - { - if (i < 176) - u9 = u93.d; /* 1/2 <= u < 3/4 */ - else - u9 = u94.d; - } /* 3/4 <= u <= 1 */ - if ((z = t1 + (zz - u9 * t1)) == t1 + (zz + u9 * t1)) - return signArctan2 (y, z); - - t1 = u - hij[i][0].d; - EADD (t1, du, v, vv); - s1 = v * (hij[i][11].d - + v * (hij[i][12].d - + v * (hij[i][13].d - + v * (hij[i][14].d - + v * hij[i][15].d)))); - ADD2 (hij[i][9].d, hij[i][10].d, s1, 0, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][7].d, hij[i][8].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][5].d, hij[i][6].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][3].d, hij[i][4].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][1].d, hij[i][2].d, s1, ss1, s2, ss2, t1, t2); - - if ((z = s2 + (ss2 - ub.d * s2)) == s2 + (ss2 + ub.d * s2)) - return signArctan2 (y, z); - return atan2Mp (x, y, pr); - } - - /* (ii) x>0, abs(x)<=abs(y): pi/2-atan(ax/ay) */ - if (u < inv16.d) - { - v = u * u; - zz = u * v * (d3.d - + v * (d5.d - + v * (d7.d - + v * (d9.d - + v * (d11.d - + v * d13.d))))); - ESUB (hpi.d, u, t2, cor); - t3 = ((hpi1.d + cor) - du) - zz; - if ((z = t2 + (t3 - u2.d)) == t2 + (t3 + u2.d)) - return signArctan2 (y, z); - - MUL2 (u, du, u, du, v, vv, t1, t2, t3, t4, t5, t6, t7, t8); - s1 = v * (f11.d - + v * (f13.d - + v * (f15.d + v * (f17.d + v * f19.d)))); - ADD2 (f9.d, ff9.d, s1, 0, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f7.d, ff7.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f5.d, ff5.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f3.d, ff3.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - MUL2 (u, du, s1, ss1, s2, ss2, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (u, du, s2, ss2, s1, ss1, t1, t2); - SUB2 (hpi.d, hpi1.d, s1, ss1, s2, ss2, t1, t2); - - if ((z = s2 + (ss2 - u6.d)) == s2 + (ss2 + u6.d)) - return signArctan2 (y, z); - return atan2Mp (x, y, pr); - } - - i = (TWO52 + TWO8 * u) - TWO52; - i -= 16; - v = (u - cij[i][0].d) + du; - - zz = hpi1.d - v * (cij[i][2].d - + v * (cij[i][3].d - + v * (cij[i][4].d - + v * (cij[i][5].d - + v * cij[i][6].d)))); - t1 = hpi.d - cij[i][1].d; - if (i < 112) - ua = ua1.d; /* w < 1/2 */ - else - ua = ua2.d; /* w >= 1/2 */ - if ((z = t1 + (zz - ua)) == t1 + (zz + ua)) - return signArctan2 (y, z); - - t1 = u - hij[i][0].d; - EADD (t1, du, v, vv); - - s1 = v * (hij[i][11].d - + v * (hij[i][12].d - + v * (hij[i][13].d - + v * (hij[i][14].d - + v * hij[i][15].d)))); - - ADD2 (hij[i][9].d, hij[i][10].d, s1, 0, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][7].d, hij[i][8].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][5].d, hij[i][6].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][3].d, hij[i][4].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][1].d, hij[i][2].d, s1, ss1, s2, ss2, t1, t2); - SUB2 (hpi.d, hpi1.d, s2, ss2, s1, ss1, t1, t2); - - if ((z = s1 + (ss1 - uc.d)) == s1 + (ss1 + uc.d)) - return signArctan2 (y, z); - return atan2Mp (x, y, pr); - } - - /* (iii) x<0, abs(x)< abs(y): pi/2+atan(ax/ay) */ - if (ax < ay) - { - if (u < inv16.d) - { - v = u * u; - zz = u * v * (d3.d - + v * (d5.d - + v * (d7.d - + v * (d9.d - + v * (d11.d + v * d13.d))))); - EADD (hpi.d, u, t2, cor); - t3 = ((hpi1.d + cor) + du) + zz; - if ((z = t2 + (t3 - u3.d)) == t2 + (t3 + u3.d)) - return signArctan2 (y, z); - - MUL2 (u, du, u, du, v, vv, t1, t2, t3, t4, t5, t6, t7, t8); - s1 = v * (f11.d - + v * (f13.d + v * (f15.d + v * (f17.d + v * f19.d)))); - ADD2 (f9.d, ff9.d, s1, 0, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f7.d, ff7.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f5.d, ff5.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f3.d, ff3.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - MUL2 (u, du, s1, ss1, s2, ss2, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (u, du, s2, ss2, s1, ss1, t1, t2); - ADD2 (hpi.d, hpi1.d, s1, ss1, s2, ss2, t1, t2); - - if ((z = s2 + (ss2 - u7.d)) == s2 + (ss2 + u7.d)) - return signArctan2 (y, z); - return atan2Mp (x, y, pr); - } - - i = (TWO52 + TWO8 * u) - TWO52; - i -= 16; - v = (u - cij[i][0].d) + du; - zz = hpi1.d + v * (cij[i][2].d - + v * (cij[i][3].d - + v * (cij[i][4].d - + v * (cij[i][5].d - + v * cij[i][6].d)))); - t1 = hpi.d + cij[i][1].d; - if (i < 112) - ua = ua1.d; /* w < 1/2 */ - else - ua = ua2.d; /* w >= 1/2 */ - if ((z = t1 + (zz - ua)) == t1 + (zz + ua)) - return signArctan2 (y, z); - - t1 = u - hij[i][0].d; - EADD (t1, du, v, vv); - s1 = v * (hij[i][11].d - + v * (hij[i][12].d - + v * (hij[i][13].d - + v * (hij[i][14].d - + v * hij[i][15].d)))); - ADD2 (hij[i][9].d, hij[i][10].d, s1, 0, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][7].d, hij[i][8].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][5].d, hij[i][6].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][3].d, hij[i][4].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][1].d, hij[i][2].d, s1, ss1, s2, ss2, t1, t2); - ADD2 (hpi.d, hpi1.d, s2, ss2, s1, ss1, t1, t2); - - if ((z = s1 + (ss1 - uc.d)) == s1 + (ss1 + uc.d)) - return signArctan2 (y, z); - return atan2Mp (x, y, pr); - } - - /* (iv) x<0, abs(y)<=abs(x): pi-atan(ax/ay) */ - if (u < inv16.d) - { - v = u * u; - zz = u * v * (d3.d - + v * (d5.d - + v * (d7.d - + v * (d9.d + v * (d11.d + v * d13.d))))); - ESUB (opi.d, u, t2, cor); - t3 = ((opi1.d + cor) - du) - zz; - if ((z = t2 + (t3 - u4.d)) == t2 + (t3 + u4.d)) - return signArctan2 (y, z); - - MUL2 (u, du, u, du, v, vv, t1, t2, t3, t4, t5, t6, t7, t8); - s1 = v * (f11.d + v * (f13.d + v * (f15.d + v * (f17.d + v * f19.d)))); - ADD2 (f9.d, ff9.d, s1, 0, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f7.d, ff7.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f5.d, ff5.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (f3.d, ff3.d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - MUL2 (u, du, s1, ss1, s2, ss2, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (u, du, s2, ss2, s1, ss1, t1, t2); - SUB2 (opi.d, opi1.d, s1, ss1, s2, ss2, t1, t2); - - if ((z = s2 + (ss2 - u8.d)) == s2 + (ss2 + u8.d)) - return signArctan2 (y, z); - return atan2Mp (x, y, pr); - } - - i = (TWO52 + TWO8 * u) - TWO52; - i -= 16; - v = (u - cij[i][0].d) + du; - zz = opi1.d - v * (cij[i][2].d - + v * (cij[i][3].d - + v * (cij[i][4].d - + v * (cij[i][5].d + v * cij[i][6].d)))); - t1 = opi.d - cij[i][1].d; - if (i < 112) - ua = ua1.d; /* w < 1/2 */ - else - ua = ua2.d; /* w >= 1/2 */ - if ((z = t1 + (zz - ua)) == t1 + (zz + ua)) - return signArctan2 (y, z); - - t1 = u - hij[i][0].d; - - EADD (t1, du, v, vv); - - s1 = v * (hij[i][11].d - + v * (hij[i][12].d - + v * (hij[i][13].d - + v * (hij[i][14].d + v * hij[i][15].d)))); - - ADD2 (hij[i][9].d, hij[i][10].d, s1, 0, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][7].d, hij[i][8].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][5].d, hij[i][6].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][3].d, hij[i][4].d, s1, ss1, s2, ss2, t1, t2); - MUL2 (v, vv, s2, ss2, s1, ss1, t1, t2, t3, t4, t5, t6, t7, t8); - ADD2 (hij[i][1].d, hij[i][2].d, s1, ss1, s2, ss2, t1, t2); - SUB2 (opi.d, opi1.d, s2, ss2, s1, ss1, t1, t2); - - if ((z = s1 + (ss1 - uc.d)) == s1 + (ss1 + uc.d)) - return signArctan2 (y, z); - return atan2Mp (x, y, pr); -} - -#ifndef __ieee754_atan2 -strong_alias (__ieee754_atan2, __atan2_finite) -#endif - -/* Treat the Denormalized case */ -static double -SECTION -normalized (double ax, double ay, double y, double z) -{ - int p; - mp_no mpx, mpy, mpz, mperr, mpz2, mpt1; - p = 6; - __dbl_mp (ax, &mpx, p); - __dbl_mp (ay, &mpy, p); - __dvd (&mpy, &mpx, &mpz, p); - __dbl_mp (ue.d, &mpt1, p); - __mul (&mpz, &mpt1, &mperr, p); - __sub (&mpz, &mperr, &mpz2, p); - __mp_dbl (&mpz2, &z, p); - return signArctan2 (y, z); -} - -/* Stage 3: Perform a multi-Precision computation */ -static double -SECTION -atan2Mp (double x, double y, const int pr[]) -{ - double z1, z2; - int i, p; - mp_no mpx, mpy, mpz, mpz1, mpz2, mperr, mpt1; - for (i = 0; i < MM; i++) - { - p = pr[i]; - __dbl_mp (x, &mpx, p); - __dbl_mp (y, &mpy, p); - __mpatan2 (&mpy, &mpx, &mpz, p); - __dbl_mp (ud[i].d, &mpt1, p); - __mul (&mpz, &mpt1, &mperr, p); - __add (&mpz, &mperr, &mpz1, p); - __sub (&mpz, &mperr, &mpz2, p); - __mp_dbl (&mpz1, &z1, p); - __mp_dbl (&mpz2, &z2, p); - if (z1 == z2) - { - LIBC_PROBE (slowatan2, 4, &p, &x, &y, &z1); - return z1; - } - } - LIBC_PROBE (slowatan2_inexact, 4, &p, &x, &y, &z1); - return z1; /*if impossible to do exact computing */ -} |