newlib/winsup/mingw/mingwex/math/powif.c

/*							powi.c
 *
 *	Real raised to integer power
 *
 *
 *
 * SYNOPSIS:
 *
 * float x, y, __powif();
 * int n;
 *
 * y = powi( x, n );
 *
 *
 *
 * DESCRIPTION:
 *
 * Returns argument x raised to the nth power.
 * The routine efficiently decomposes n as a sum of powers of
 * two. The desired power is a product of two-to-the-kth
 * powers of x.  Thus to compute the 32767 power of x requires
 * 28 multiplications instead of 32767 multiplications.
 *
 *
 *
 * ACCURACY:
 *
 *
 *                      Relative error:
 * arithmetic   x domain   n domain  # trials      peak         rms
 *    DEC       .04,26     -26,26    100000       2.7e-16     4.3e-17
 *    IEEE      .04,26     -26,26     50000       2.0e-15     3.8e-16
 *    IEEE        1,2    -1022,1023   50000       8.6e-14     1.6e-14
 *
 * Returns MAXNUM on overflow, zero on underflow.
 *
 */

/*							powi.c	*/

/*
Cephes Math Library Release 2.8:  June, 2000
Copyright 1984, 1995, 2000 by Stephen L. Moshier
*/

/*
Modified for float from powi.c and adapted to mingw
2002-10-01 Danny Smith <dannysmith@users.sourceforge.net>
*/

#ifdef __MINGW32__
#include "cephes_mconf.h"
#else
#include "mconf.h"
#ifdef ANSIPROT
extern float logf ( float );
extern float frexpf ( float, int * );
extern int signbitf ( float );
#else
float logf(), frexpf();
int signbitf();
#endif
extern float NEGZEROF, INFINITYF, MAXNUMF, MAXLOGF, MINLOGF, LOGE2F;
#endif /* __MINGW32__ */

#ifndef _SET_ERRNO
#define _SET_ERRNO(x)
#endif

float __powif( float x, int nn )
{
int n, e, sign, asign, lx;
float w, y, s;

/* See pow.c for these tests.  */
if( x == 0.0F )
	{
	if( nn == 0 )
		return( 1.0F );
	else if( nn < 0 )
	    return( INFINITYF );
	else
	  {
	    if( nn & 1 )
	      return( x );
	    else
	      return( 0.0 );
	  }
	}

if( nn == 0 )
	return( 1.0 );

if( nn == -1 )
	return( 1.0/x );

if( x < 0.0 )
	{
	asign = -1;
	x = -x;
	}
else
	asign = 0;


if( nn < 0 )
	{
	sign = -1;
	n = -nn;
	}
else
	{
	sign = 1;
	n = nn;
	}

/* Even power will be positive. */
if( (n & 1) == 0 )
	asign = 0;

/* Overflow detection */

/* Calculate approximate logarithm of answer */
s = frexpf( x, &lx );
e = (lx - 1)*n;
if( (e == 0) || (e > 64) || (e < -64) )
	{
	s = (s - 7.0710678118654752e-1) / (s +  7.0710678118654752e-1);
	s = (2.9142135623730950 * s - 0.5 + lx) * nn * LOGE2F;
	}
else
	{
	s = LOGE2F * e;
	}

if( s > MAXLOGF )
	{
	mtherr( "__powif", OVERFLOW );
	_SET_ERRNO(ERANGE);
	y = INFINITYF;
	goto done;
	}

#if DENORMAL
if( s < MINLOGF )
	{
	y = 0.0;
	goto done;
	}

/* Handle tiny denormal answer, but with less accuracy
 * since roundoff error in 1.0/x will be amplified.
 * The precise demarcation should be the gradual underflow threshold.
 */
if( (s < (-MAXLOGF+2.0)) && (sign < 0) )
	{
	x = 1.0/x;
	sign = -sign;
	}
#else
/* do not produce denormal answer */
if( s < -MAXLOGF )
	return(0.0);
#endif


/* First bit of the power */
if( n & 1 )
	y = x;
		
else
	y = 1.0;

w = x;
n >>= 1;
while( n )
	{
	w = w * w;	/* arg to the 2-to-the-kth power */
	if( n & 1 )	/* if that bit is set, then include in product */
		y *= w;
	n >>= 1;
	}

if( sign < 0 )
	y = 1.0/y;

done:

if( asign )
	{
	/* odd power of negative number */
	if( y == 0.0 )
		y = NEGZEROF;
	else
		y = -y;
	}
return(y);
}