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[/] [openrisc/] [trunk/] [gnu-old/] [newlib-1.17.0/] [newlib/] [libm/] [math/] [w_gamma.c] - Rev 825
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/* @(#)w_gamma.c 5.1 93/09/24 */ /* * ==================================================== * Copyright (C) 1993 by Sun Microsystems, Inc. All rights reserved. * * Developed at SunPro, a Sun Microsystems, Inc. business. * Permission to use, copy, modify, and distribute this * software is freely granted, provided that this notice * is preserved. * ==================================================== * */ /* FUNCTION <<gamma>>, <<gammaf>>, <<lgamma>>, <<lgammaf>>, <<gamma_r>>, <<gammaf_r>>, <<lgamma_r>>, <<lgammaf_r>>---logarithmic gamma function INDEX gamma INDEX gammaf INDEX lgamma INDEX lgammaf INDEX gamma_r INDEX gammaf_r INDEX lgamma_r INDEX lgammaf_r ANSI_SYNOPSIS #include <math.h> double gamma(double <[x]>); float gammaf(float <[x]>); double lgamma(double <[x]>); float lgammaf(float <[x]>); double gamma_r(double <[x]>, int *<[signgamp]>); float gammaf_r(float <[x]>, int *<[signgamp]>); double lgamma_r(double <[x]>, int *<[signgamp]>); float lgammaf_r(float <[x]>, int *<[signgamp]>); TRAD_SYNOPSIS #include <math.h> double gamma(<[x]>) double <[x]>; float gammaf(<[x]>) float <[x]>; double lgamma(<[x]>) double <[x]>; float lgammaf(<[x]>) float <[x]>; double gamma_r(<[x]>, <[signgamp]>) double <[x]>; int <[signgamp]>; float gammaf_r(<[x]>, <[signgamp]>) float <[x]>; int <[signgamp]>; double lgamma_r(<[x]>, <[signgamp]>) double <[x]>; int <[signgamp]>; float lgammaf_r(<[x]>, <[signgamp]>) float <[x]>; int <[signgamp]>; DESCRIPTION <<gamma>> calculates @tex $\mit ln\bigl(\Gamma(x)\bigr)$, @end tex the natural logarithm of the gamma function of <[x]>. The gamma function (<<exp(gamma(<[x]>))>>) is a generalization of factorial, and retains the property that @ifnottex <<exp(gamma(N))>> is equivalent to <<N*exp(gamma(N-1))>>. @end ifnottex @tex $\mit \Gamma(N)\equiv N\times\Gamma(N-1)$. @end tex Accordingly, the results of the gamma function itself grow very quickly. <<gamma>> is defined as @tex $\mit ln\bigl(\Gamma(x)\bigr)$ rather than simply $\mit \Gamma(x)$ @end tex @ifnottex the natural log of the gamma function, rather than the gamma function itself, @end ifnottex to extend the useful range of results representable. The sign of the result is returned in the global variable <<signgam>>, which is declared in math.h. <<gammaf>> performs the same calculation as <<gamma>>, but uses and returns <<float>> values. <<lgamma>> and <<lgammaf>> are alternate names for <<gamma>> and <<gammaf>>. The use of <<lgamma>> instead of <<gamma>> is a reminder that these functions compute the log of the gamma function, rather than the gamma function itself. The functions <<gamma_r>>, <<gammaf_r>>, <<lgamma_r>>, and <<lgammaf_r>> are just like <<gamma>>, <<gammaf>>, <<lgamma>>, and <<lgammaf>>, respectively, but take an additional argument. This additional argument is a pointer to an integer. This additional argument is used to return the sign of the result, and the global variable <<signgam>> is not used. These functions may be used for reentrant calls (but they will still set the global variable <<errno>> if an error occurs). RETURNS Normally, the computed result is returned. When <[x]> is a nonpositive integer, <<gamma>> returns <<HUGE_VAL>> and <<errno>> is set to <<EDOM>>. If the result overflows, <<gamma>> returns <<HUGE_VAL>> and <<errno>> is set to <<ERANGE>>. You can modify this error treatment using <<matherr>>. PORTABILITY Neither <<gamma>> nor <<gammaf>> is ANSI C. */ /* double gamma(double x) * Return the logarithm of the Gamma function of x. * * Method: call gamma_r */ #include "fdlibm.h" #include <reent.h> #include <errno.h> #ifndef _DOUBLE_IS_32BITS #ifdef __STDC__ double gamma(double x) #else double gamma(x) double x; #endif { #ifdef _IEEE_LIBM return __ieee754_gamma_r(x,&(_REENT_SIGNGAM(_REENT))); #else double y; struct exception exc; y = __ieee754_gamma_r(x,&(_REENT_SIGNGAM(_REENT))); if(_LIB_VERSION == _IEEE_) return y; if(!finite(y)&&finite(x)) { #ifndef HUGE_VAL #define HUGE_VAL inf double inf = 0.0; SET_HIGH_WORD(inf,0x7ff00000); /* set inf to infinite */ #endif exc.name = "gamma"; exc.err = 0; exc.arg1 = exc.arg2 = x; if (_LIB_VERSION == _SVID_) exc.retval = HUGE; else exc.retval = HUGE_VAL; if(floor(x)==x&&x<=0.0) { /* gamma(-integer) or gamma(0) */ exc.type = SING; if (_LIB_VERSION == _POSIX_) errno = EDOM; else if (!matherr(&exc)) { errno = EDOM; } } else { /* gamma(finite) overflow */ exc.type = OVERFLOW; if (_LIB_VERSION == _POSIX_) errno = ERANGE; else if (!matherr(&exc)) { errno = ERANGE; } } if (exc.err != 0) errno = exc.err; return exc.retval; } else return y; #endif } #endif /* defined(_DOUBLE_IS_32BITS) */
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