/* $XConsortium: cmsTrig.c,v 1.7 95/06/08 23:20:39 gildea Exp $" */ /* * Code and supporting documentation (c) Copyright 1990 1991 Tektronix, Inc. * All Rights Reserved * * This file is a component of an X Window System-specific implementation * of Xcms based on the TekColor Color Management System. Permission is * hereby granted to use, copy, modify, sell, and otherwise distribute this * software and its documentation for any purpose and without fee, provided * that this copyright, permission, and disclaimer notice is reproduced in * all copies of this software and in supporting documentation. TekColor * is a trademark of Tektronix, Inc. * * Tektronix makes no representation about the suitability of this software * for any purpose. It is provided "as is" and with all faults. * * TEKTRONIX DISCLAIMS ALL WARRANTIES APPLICABLE TO THIS SOFTWARE, * INCLUDING THE IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A * PARTICULAR PURPOSE. IN NO EVENT SHALL TEKTRONIX BE LIABLE FOR ANY * SPECIAL, INDIRECT OR CONSEQUENTIAL DAMAGES OR ANY DAMAGES WHATSOEVER * RESULTING FROM LOSS OF USE, DATA, OR PROFITS, WHETHER IN AN ACTION OF * CONTRACT, NEGLIGENCE, OR OTHER TORTIOUS ACTION, ARISING OUT OF OR IN * CONNECTION WITH THE USE OR THE PERFORMANCE OF THIS SOFTWARE. */ /* $XFree86: xc/lib/X11/cmsTrig.c,v 3.3 1999/05/09 10:50:30 dawes Exp $ */ /* * It should be pointed out that for simplicity's sake, the * environment parameters are defined as floating point constants, * rather than octal or hexadecimal initializations of allocated * storage areas. This means that the range of allowed numbers * may not exactly match the hardware's capabilities. For example, * if the maximum positive double precision floating point number * is EXACTLY 1.11...E100 and the constant "MAXDOUBLE is * defined to be 1.11E100 then the numbers between 1.11E100 and * 1.11...E100 are considered to be undefined. For most * applications, this will cause no problems. * * An alternate method is to allocate a global static "double" variable, * say "maxdouble", and use a union declaration and initialization * to initialize it with the proper bits for the EXACT maximum value. * This was not done because the only compilers available to the * author did not fully support union initialization features. * */ /* * EXTERNS */ extern double _XcmsSquareRoot(); /* * FORWARD DECLARATIONS */ double _XcmsCosine(); static double _XcmsModulo(); static double _XcmsModuloF(); static double _XcmsPolynomial(); double _XcmsSine(); double _XcmsArcTangent(); /* * DEFINES */ #ifdef __STDC__ #define Const const #else #define Const /**/ #endif #define XCMS_MAXERROR 0.000001 #define XCMS_MAXITER 10000 #define XCMS_PI 3.14159265358979323846264338327950 #define XCMS_TWOPI 6.28318530717958620 #define XCMS_HALFPI 1.57079632679489660 #define XCMS_FOURTHPI 0.785398163397448280 #define XCMS_SIXTHPI 0.523598775598298820 #define XCMS_RADIANS(d) ((d) * XCMS_PI / 180.0) #define XCMS_DEGREES(r) ((r) * 180.0 / XCMS_PI) #define XCMS_X6_UNDERFLOWS (4.209340e-52) /* X**6 almost underflows */ #define XCMS_X16_UNDERFLOWS (5.421010e-20) /* X**16 almost underflows*/ #define XCMS_CHAR_BIT 8 #define XCMS_LONG_MAX 0x7FFFFFFF #define XCMS_DEXPLEN 11 #define XCMS_NBITS(type) (XCMS_CHAR_BIT * (int)sizeof(type)) #define XCMS_FABS(x) ((x) < 0.0 ? -(x) : (x)) /* XCMS_DMAXPOWTWO - largest power of two exactly representable as a double */ #ifdef _CRAY #define XCMS_DMAXPOWTWO ((double)(1 < 47)) #else #ifdef __alpha__ #define XCMS_DMAXPOWTWO ((double)(XCMS_LONG_MAX) * \ (1L << ((XCMS_NBITS(double)-XCMS_DEXPLEN) - XCMS_NBITS(int) + 1))) #else #define XCMS_DMAXPOWTWO ((double)(XCMS_LONG_MAX) * \ (1L << ((XCMS_NBITS(double)-XCMS_DEXPLEN) - XCMS_NBITS(long) + 1))) #endif #endif /* * LOCAL VARIABLES */ static double Const cos_pcoeffs[] = { 0.12905394659037374438e7, -0.37456703915723204710e6, 0.13432300986539084285e5, -0.11231450823340933092e3 }; static double Const cos_qcoeffs[] = { 0.12905394659037373590e7, 0.23467773107245835052e5, 0.20969518196726306286e3, 1.0 }; static double Const sin_pcoeffs[] = { 0.20664343336995858240e7, -0.18160398797407332550e6, 0.35999306949636188317e4, -0.20107483294588615719e2 }; static double Const sin_qcoeffs[] = { 0.26310659102647698963e7, 0.39270242774649000308e5, 0.27811919481083844087e3, 1.0 }; /* * * FUNCTION * * _XcmsCosine double precision cosine * * KEY WORDS * * cos * machine independent routines * trigonometric functions * math libraries * * DESCRIPTION * * Returns double precision cosine of double precision * floating point argument. * * USAGE * * double _XcmsCosine (x) * double x; * * REFERENCES * * Computer Approximations, J.F. Hart et al, John Wiley & Sons, * 1968, pp. 112-120. * * RESTRICTIONS * * The sin and cos routines are interactive in the sense that * in the process of reducing the argument to the range -PI/4 * to PI/4, each may call the other. Ultimately one or the * other uses a polynomial approximation on the reduced * argument. The sin approximation has a maximum relative error * of 10**(-17.59) and the cos approximation has a maximum * relative error of 10**(-16.18). * * These error bounds assume exact arithmetic * in the polynomial evaluation. Additional rounding and * truncation errors may occur as the argument is reduced * to the range over which the polynomial approximation * is valid, and as the polynomial is evaluated using * finite-precision arithmetic. * * PROGRAMMER * * Fred Fish * * INTERNALS * * Computes cos(x) from: * * (1) Reduce argument x to range -PI to PI. * * (2) If x > PI/2 then call cos recursively * using relation cos(x) = -cos(x - PI). * * (3) If x < -PI/2 then call cos recursively * using relation cos(x) = -cos(x + PI). * * (4) If x > PI/4 then call sin using * relation cos(x) = sin(PI/2 - x). * * (5) If x < -PI/4 then call cos using * relation cos(x) = sin(PI/2 + x). * * (6) If x would cause underflow in approx * evaluation arithmetic then return * sqrt(1.0 - x**2). * * (7) By now x has been reduced to range * -PI/4 to PI/4 and the approximation * from HART pg. 119 can be used: * * cos(x) = ( p(y) / q(y) ) * Where: * * y = x * (4/PI) * * p(y) = SUM [ Pj * (y**(2*j)) ] * over j = {0,1,2,3} * * q(y) = SUM [ Qj * (y**(2*j)) ] * over j = {0,1,2,3} * * P0 = 0.12905394659037374438571854e+7 * P1 = -0.3745670391572320471032359e+6 * P2 = 0.134323009865390842853673e+5 * P3 = -0.112314508233409330923e+3 * Q0 = 0.12905394659037373590295914e+7 * Q1 = 0.234677731072458350524124e+5 * Q2 = 0.2096951819672630628621e+3 * Q3 = 1.0000... * (coefficients from HART table #3843 pg 244) * * * **** NOTE **** The range reduction relations used in * this routine depend on the final approximation being valid * over the negative argument range in addition to the positive * argument range. The particular approximation chosen from * HART satisfies this requirement, although not explicitly * stated in the text. This may not be true of other * approximations given in the reference. * */ double _XcmsCosine (x) double x; { auto double y; auto double yt2; double retval; if (x < -XCMS_PI || x > XCMS_PI) { x = _XcmsModulo (x, XCMS_TWOPI); if (x > XCMS_PI) { x = x - XCMS_TWOPI; } else if (x < -XCMS_PI) { x = x + XCMS_TWOPI; } } if (x > XCMS_HALFPI) { retval = -(_XcmsCosine (x - XCMS_PI)); } else if (x < -XCMS_HALFPI) { retval = -(_XcmsCosine (x + XCMS_PI)); } else if (x > XCMS_FOURTHPI) { retval = _XcmsSine (XCMS_HALFPI - x); } else if (x < -XCMS_FOURTHPI) { retval = _XcmsSine (XCMS_HALFPI + x); } else if (x < XCMS_X6_UNDERFLOWS && x > -XCMS_X6_UNDERFLOWS) { retval = _XcmsSquareRoot (1.0 - (x * x)); } else { y = x / XCMS_FOURTHPI; yt2 = y * y; retval = _XcmsPolynomial (3, cos_pcoeffs, yt2) / _XcmsPolynomial (3, cos_qcoeffs, yt2); } return (retval); } /* * FUNCTION * * _XcmsModulo double precision modulo * * KEY WORDS * * _XcmsModulo * machine independent routines * math libraries * * DESCRIPTION * * Returns double precision modulo of two double * precision arguments. * * USAGE * * double _XcmsModulo (value, base) * double value; * double base; * * PROGRAMMER * * Fred Fish * */ static double _XcmsModulo (value, base) double value; double base; { auto double intpart; value /= base; value = _XcmsModuloF (value, &intpart); value *= base; return(value); } /* * frac = (double) _XcmsModuloF(double val, double *dp) * return fractional part of 'val' * set *dp to integer part of 'val' * * Note -> only compiled for the CA or KA. For the KB/MC, * "math.c" instantiates a copy of the inline function * defined in "math.h". */ static double _XcmsModuloF(val, dp) double val; register double *dp; { register double abs; /* * Don't use a register for this. The extra precision this results * in on some systems causes problems. */ double ip; /* should check for illegal values here - nan, inf, etc */ abs = XCMS_FABS(val); if (abs >= XCMS_DMAXPOWTWO) { ip = val; } else { ip = abs + XCMS_DMAXPOWTWO; /* dump fraction */ ip -= XCMS_DMAXPOWTWO; /* restore w/o frac */ if (ip > abs) /* if it rounds up */ ip -= 1.0; /* fix it */ ip = XCMS_FABS(ip); } *dp = ip; return (val - ip); /* signed fractional part */ } /* * FUNCTION * * _XcmsPolynomial double precision polynomial evaluation * * KEY WORDS * * poly * machine independent routines * math libraries * * DESCRIPTION * * Evaluates a polynomial and returns double precision * result. Is passed a the order of the polynomial, * a pointer to an array of double precision polynomial * coefficients (in ascending order), and the independent * variable. * * USAGE * * double _XcmsPolynomial (order, coeffs, x) * int order; * double *coeffs; * double x; * * PROGRAMMER * * Fred Fish * * INTERNALS * * Evalates the polynomial using recursion and the form: * * P(x) = P0 + x(P1 + x(P2 +...x(Pn))) * */ static double _XcmsPolynomial (order, coeffs, x) register int order; double Const *coeffs; double x; { auto double rtn_value; #if 0 auto double curr_coeff; if (order <= 0) { rtn_value = *coeffs; } else { curr_coeff = *coeffs; /* Bug in Unisoft's compiler. Does not */ coeffs++; /* generate good code for *coeffs++ */ rtn_value = curr_coeff + x * _XcmsPolynomial (--order, coeffs, x); } #else /* ++jrb -- removed tail recursion */ coeffs += order; rtn_value = *coeffs--; while(order-- > 0) rtn_value = *coeffs-- + (x * rtn_value); #endif return(rtn_value); } /* * FUNCTION * * _XcmsSine double precision sine * * KEY WORDS * * sin * machine independent routines * trigonometric functions * math libraries * * DESCRIPTION * * Returns double precision sine of double precision * floating point argument. * * USAGE * * double _XcmsSine (x) * double x; * * REFERENCES * * Computer Approximations, J.F. Hart et al, John Wiley & Sons, * 1968, pp. 112-120. * * RESTRICTIONS * * The sin and cos routines are interactive in the sense that * in the process of reducing the argument to the range -PI/4 * to PI/4, each may call the other. Ultimately one or the * other uses a polynomial approximation on the reduced * argument. The sin approximation has a maximum relative error * of 10**(-17.59) and the cos approximation has a maximum * relative error of 10**(-16.18). * * These error bounds assume exact arithmetic * in the polynomial evaluation. Additional rounding and * truncation errors may occur as the argument is reduced * to the range over which the polynomial approximation * is valid, and as the polynomial is evaluated using * finite-precision arithmetic. * * PROGRAMMER * * Fred Fish * * INTERNALS * * Computes sin(x) from: * * (1) Reduce argument x to range -PI to PI. * * (2) If x > PI/2 then call sin recursively * using relation sin(x) = -sin(x - PI). * * (3) If x < -PI/2 then call sin recursively * using relation sin(x) = -sin(x + PI). * * (4) If x > PI/4 then call cos using * relation sin(x) = cos(PI/2 - x). * * (5) If x < -PI/4 then call cos using * relation sin(x) = -cos(PI/2 + x). * * (6) If x is small enough that polynomial * evaluation would cause underflow * then return x, since sin(x) * approaches x as x approaches zero. * * (7) By now x has been reduced to range * -PI/4 to PI/4 and the approximation * from HART pg. 118 can be used: * * sin(x) = y * ( p(y) / q(y) ) * Where: * * y = x * (4/PI) * * p(y) = SUM [ Pj * (y**(2*j)) ] * over j = {0,1,2,3} * * q(y) = SUM [ Qj * (y**(2*j)) ] * over j = {0,1,2,3} * * P0 = 0.206643433369958582409167054e+7 * P1 = -0.18160398797407332550219213e+6 * P2 = 0.359993069496361883172836e+4 * P3 = -0.2010748329458861571949e+2 * Q0 = 0.263106591026476989637710307e+7 * Q1 = 0.3927024277464900030883986e+5 * Q2 = 0.27811919481083844087953e+3 * Q3 = 1.0000... * (coefficients from HART table #3063 pg 234) * * * **** NOTE **** The range reduction relations used in * this routine depend on the final approximation being valid * over the negative argument range in addition to the positive * argument range. The particular approximation chosen from * HART satisfies this requirement, although not explicitly * stated in the text. This may not be true of other * approximations given in the reference. * */ double _XcmsSine (x) double x; { double y; double yt2; double retval; if (x < -XCMS_PI || x > XCMS_PI) { x = _XcmsModulo (x, XCMS_TWOPI); if (x > XCMS_PI) { x = x - XCMS_TWOPI; } else if (x < -XCMS_PI) { x = x + XCMS_TWOPI; } } if (x > XCMS_HALFPI) { retval = -(_XcmsSine (x - XCMS_PI)); } else if (x < -XCMS_HALFPI) { retval = -(_XcmsSine (x + XCMS_PI)); } else if (x > XCMS_FOURTHPI) { retval = _XcmsCosine (XCMS_HALFPI - x); } else if (x < -XCMS_FOURTHPI) { retval = -(_XcmsCosine (XCMS_HALFPI + x)); } else if (x < XCMS_X6_UNDERFLOWS && x > -XCMS_X6_UNDERFLOWS) { retval = x; } else { y = x / XCMS_FOURTHPI; yt2 = y * y; retval = y * (_XcmsPolynomial (3, sin_pcoeffs, yt2) / _XcmsPolynomial(3, sin_qcoeffs, yt2)); } return(retval); } /* * NAME * _XcmsArcTangent * * SYNOPSIS */ double _XcmsArcTangent(x) double x; /* * DESCRIPTION * Computes the arctangent. * This is an implementation of the Gauss algorithm as * described in: * Forman S. Acton, Numerical Methods That Work, * New York, NY, Harper & Row, 1970. * * RETURNS * Returns the arctangent */ { double ai, a1, bi, b1, l, d; double maxerror; int i; if (x == 0.0) { return (0.0); } if (x < 1.0) { maxerror = x * XCMS_MAXERROR; } else { maxerror = XCMS_MAXERROR; } ai = _XcmsSquareRoot( 1.0 / (1.0 + (x * x)) ); bi = 1.0; for (i = 0; i < XCMS_MAXITER; i++) { a1 = (ai + bi) / 2.0; b1 = _XcmsSquareRoot((a1 * bi)); if (a1 == b1) break; d = XCMS_FABS(a1 - b1); if (d < maxerror) break; ai = a1; bi = b1; } l = ((a1 > b1) ? b1 : a1); a1 = _XcmsSquareRoot(1 + (x * x)); return (x / (a1 * l)); }