/* Pythagorean addition using floats Copyright (C) 2011 Free Software Foundation, Inc. This file is part of the GNU C Library. Contributed by Adhemerval Zanella , 2011 The GNU C Library is free software; you can redistribute it and/or modify it under the terms of the GNU Library General Public License as published by the Free Software Foundation; either version 2 of the License, or (at your option) any later version. The GNU C Library 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 Library General Public License for more details. You should have received a copy of the GNU Library General Public License along with the GNU C Library; see the file COPYING.LIB. If not, see . */ #include #include static const float two30 = 1.0737418e09; static const float two50 = 1.1259000e15; static const float two60 = 1.1529221e18; static const float two126 = 8.5070592e+37; static const float twoM50 = 8.8817842e-16; static const float twoM60 = 6.7762644e-21; static const float pdnum = 1.1754939e-38; /* __ieee754_hypotf(x,y) * * This a FP only version without any FP->INT conversion. * It is similar to default C version, making appropriates * overflow and underflows checks as well scaling when it * is needed. */ #ifdef _ARCH_PWR7 /* POWER7 isinf and isnan optimizations are fast. */ # define TEST_INF_NAN(x, y) \ if (isinff(x) || isinff(y)) \ return INFINITY; \ if (isnanf(x) || isnanf(y)) \ return NAN; # else /* For POWER6 and below isinf/isnan triggers LHS and PLT calls are * costly (especially for POWER6). */ # define GET_TWO_FLOAT_WORD(f1,f2,i1,i2) \ do { \ ieee_float_shape_type gf_u1; \ ieee_float_shape_type gf_u2; \ gf_u1.value = (f1); \ gf_u2.value = (f2); \ (i1) = gf_u1.word; \ (i2) = gf_u2.word; \ } while (0) # define TEST_INF_NAN(x, y) \ do { \ int32_t hx, hy; \ GET_TWO_FLOAT_WORD(x, y, hx, hy); \ if (hy > hx) { \ uint32_t ht = hx; hx = hy; hy = ht; \ } \ if (hx >= 0x7f800000) { \ if (hx == 0x7f800000 || hy == 0x7f800000) \ return INFINITY; \ return NAN; \ } \ } while (0) #endif float __ieee754_hypotf (float x, float y) { x = fabsf (x); y = fabsf (y); TEST_INF_NAN (x, y); if (y > x) { float t = y; y = x; x = t; } if (y == 0.0 || (x / y) > two30) { return x + y; } if (x > two50) { x *= twoM60; y *= twoM60; return __ieee754_sqrtf (x * x + y * y) / twoM60; } if (y < twoM50) { if (y <= pdnum) { x *= two126; y *= two126; return __ieee754_sqrtf (x * x + y * y) / two126; } else { x *= two60; y *= two60; return __ieee754_sqrtf (x * x + y * y) / two60; } } return __ieee754_sqrtf (x * x + y * y); } strong_alias (__ieee754_hypotf, __hypotf_finite)