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252 lines
6.1 KiB
252 lines
6.1 KiB
//-----------------------------------------------------------------------------
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// Package Title ratpak
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// File fact.c
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// Author Timothy David Corrie Jr. ([email protected])
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// Copyright (C) 1995-96 Microsoft
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// Date 01-16-95
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//
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//
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// Description
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//
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// Contains fact(orial) and supporting _gamma functions.
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//
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//-----------------------------------------------------------------------------
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#include <stdio.h>
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#include <stdlib.h>
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#include <string.h>
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#if defined( DOS )
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#include <dosstub.h>
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#else
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#include <windows.h>
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#endif
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#include <ratpak.h>
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#define ABSRAT(x) (((x)->pp->sign=1),((x)->pq->sign=1))
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#define NEGATE(x) ((x)->pp->sign *= -1)
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//-----------------------------------------------------------------------------
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//
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// FUNCTION: factrat, _gamma, gamma
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//
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// ARGUMENTS: x PRAT representation of number to take the sine of
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//
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// RETURN: factorial of x in PRAT form.
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//
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// EXPLANATION: This uses Taylor series
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//
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// n
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// ___ 2j
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// n \ ] A 1 A
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// A \ -----[ ---- - ---------------]
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// / (2j)! n+2j (n+2j+1)(2j+1)
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// /__]
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// j=0
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//
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// / oo
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// | n-1 -x __
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// This was derived from | x e dx = |
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// | | (n) { = (n-1)! for +integers}
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// / 0
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//
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// GregSte showed the above series to be within precision if A was chosen
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// big enough.
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// A n precision
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// Based on the relation ne = A 10 A was chosen as
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//
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// precision
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// A = ln(Base /n)+1
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// A += n*ln(A) This is close enough for precision > base and n < 1.5
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//
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//
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//-----------------------------------------------------------------------------
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void _gamma( PRAT *pn )
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{
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PRAT factorial=NULL;
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PNUMBER count=NULL;
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PRAT tmp=NULL;
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PRAT one_pt_five=NULL;
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PRAT a=NULL;
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PRAT a2=NULL;
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PRAT term=NULL;
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PRAT sum=NULL;
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PRAT err=NULL;
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PRAT mpy=NULL;
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PRAT ratprec = NULL;
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PRAT ratRadix = NULL;
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long oldprec;
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// Set up constants and initial conditions
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oldprec = maxout;
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ratprec = longtorat( oldprec );
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// Find the best 'A' for convergence to the required precision.
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a=longtorat( nRadix );
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lograt(&a);
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mulrat(&a,ratprec);
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// Really is -ln(n)+1, but -ln(n) will be < 1
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// if we scale n between 0.5 and 1.5
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addrat(&a,rat_two);
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DUPRAT(tmp,a);
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lograt(&tmp);
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mulrat(&tmp,*pn);
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addrat(&a,tmp);
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addrat(&a,rat_one);
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// Calculate the necessary bump in precision and up the precision.
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// The following code is equivalent to
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// maxout += ln(exp(a)*pow(a,n+1.5))-ln(nRadix));
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DUPRAT(tmp,*pn);
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one_pt_five=longtorat( 3L );
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divrat( &one_pt_five, rat_two );
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addrat( &tmp, one_pt_five );
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DUPRAT(term,a);
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powrat( &term, tmp );
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DUPRAT( tmp, a );
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exprat( &tmp );
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mulrat( &term, tmp );
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lograt( &term );
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ratRadix = longtorat( nRadix );
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DUPRAT(tmp,ratRadix);
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lograt( &tmp );
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subrat( &term, tmp );
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maxout += rattolong( term );
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// Set up initial terms for series, refer to series in above comment block.
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DUPRAT(factorial,rat_one); // Start factorial out with one
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count = longtonum( 0L, BASEX );
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DUPRAT(mpy,a);
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powrat(&mpy,*pn);
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// a2=a^2
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DUPRAT(a2,a);
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mulrat(&a2,a);
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// sum=(1/n)-(a/(n+1))
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DUPRAT(sum,rat_one);
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divrat(&sum,*pn);
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DUPRAT(tmp,*pn);
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addrat(&tmp,rat_one);
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DUPRAT(term,a);
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divrat(&term,tmp);
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subrat(&sum,term);
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DUPRAT(err,ratRadix);
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NEGATE(ratprec);
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powrat(&err,ratprec);
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divrat(&err,ratRadix);
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// Just get something not tiny in term
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DUPRAT(term, rat_two );
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// Loop until precision is reached, or asked to halt.
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while ( !zerrat( term ) && rat_gt( term, err) && !fhalt )
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{
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addrat(pn,rat_two);
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// WARNING: mixing numbers and rationals here.
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// for speed and efficiency.
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INC(count);
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mulnumx(&(factorial->pp),count);
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INC(count)
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mulnumx(&(factorial->pp),count);
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divrat(&factorial,a2);
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DUPRAT(tmp,*pn);
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addrat( &tmp, rat_one );
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destroyrat(term);
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createrat(term);
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DUPNUM(term->pp,count);
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DUPNUM(term->pq,num_one);
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addrat( &term, rat_one );
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mulrat( &term, tmp );
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DUPRAT(tmp,a);
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divrat( &tmp, term );
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DUPRAT(term,rat_one);
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divrat( &term, *pn);
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subrat( &term, tmp);
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divrat (&term, factorial);
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addrat( &sum, term);
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ABSRAT(term);
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}
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// Multiply by factor.
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mulrat( &sum, mpy );
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// And cleanup
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maxout = oldprec;
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destroyrat(ratprec);
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destroyrat(err);
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destroyrat(term);
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destroyrat(a);
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destroyrat(a2);
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destroyrat(tmp);
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destroyrat(one_pt_five);
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destroynum(count);
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destroyrat(factorial);
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destroyrat(*pn);
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DUPRAT(*pn,sum);
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destroyrat(sum);
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}
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void factrat( PRAT *px )
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{
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PRAT fact = NULL;
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PRAT frac = NULL;
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PRAT neg_rat_one = NULL;
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DUPRAT(fact,rat_one);
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DUPRAT(neg_rat_one,rat_one);
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neg_rat_one->pp->sign *= -1;
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DUPRAT( frac, *px );
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fracrat( &frac );
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// Check for negative integers and throw an error.
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if ( ( zerrat(frac) || ( LOGRATRADIX(frac) <= -maxout ) ) &&
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( (*px)->pp->sign * (*px)->pq->sign == -1 ) )
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{
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throw CALC_E_DOMAIN;
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}
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while ( rat_gt( *px, rat_zero ) && !fhalt &&
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( LOGRATRADIX(*px) > -maxout ) )
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{
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mulrat( &fact, *px );
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subrat( px, rat_one );
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}
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// Added to make numbers 'close enough' to integers use integer factorial.
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if ( LOGRATRADIX(*px) <= -maxout )
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{
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DUPRAT((*px),rat_zero);
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intrat(&fact);
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}
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while ( rat_lt( *px, neg_rat_one ) && !fhalt )
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{
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addrat( px, rat_one );
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divrat( &fact, *px );
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}
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if ( rat_neq( *px, rat_zero ) )
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{
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addrat( px, rat_one );
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_gamma( px );
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mulrat( px, fact );
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}
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else
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{
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DUPRAT(*px,fact);
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}
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}
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