/usr/include/eclib/rat.h is in libec-dev 2013-01-01-1.
This file is owned by root:root, with mode 0o644.
The actual contents of the file can be viewed below.
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//////////////////////////////////////////////////////////////////////////
//
// Copyright 1990-2012 John Cremona
//
// This file is part of the mwrank package.
//
// mwrank is free software; you can redistribute it and/or modify it
// under the terms of the GNU General Public License as published by the
// Free Software Foundation; either version 2 of the License, or (at your
// option) any later version.
//
// mwrank 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 General Public License
// for more details.
//
// You should have received a copy of the GNU General Public License
// along with mwrank; if not, write to the Free Software Foundation,
// Inc., 51 Franklin St, Fifth Floor, Boston, MA 02110-1301, USA
//
//////////////////////////////////////////////////////////////////////////
#if !defined(_RATIONAL_H)
#define _RATIONAL_H 1 //flags that this file has been included
#include "arith.h"
class rational {
friend class bigrational;
public:
// constructors
rational(long num_val=0, long den_val=1);
rational(const rational& q);
void operator=(const rational& q);
// rational manipulations
void cancel(); // cancel *this in situ
friend long num(const rational&); // the numerator
friend long den(const rational&); // the denominator
friend rational recip(const rational&); // reciprocal
friend long round(const rational&); // nearest integer
// Binary Operator Functions
friend rational operator+(const rational&, const rational&);
friend rational operator+(long, const rational&);
friend rational operator+(const rational&, long);
friend rational operator-(const rational&, const rational&);
friend rational operator-(long, const rational&);
friend rational operator-(const rational&, long);
friend rational operator*(const rational&, const rational&);
friend rational operator*(const rational&, long);
friend rational operator*(long, const rational&);
friend rational operator/(const rational&, const rational&);
friend rational operator/(const rational&, long);
friend rational operator/(long, const rational&);
friend int operator==(const rational&, const rational&);
friend int operator!=(const rational&, const rational&);
friend ostream& operator<< (ostream&s, const rational&);
friend istream& operator>> (istream& is, rational& r);
rational& operator+=(const rational&);
rational& operator+=(long);
rational& operator-=(const rational&);
rational& operator-=(long);
rational& operator*=(const rational&);
rational& operator*=(long);
rational& operator/=(const rational&);
rational& operator/=(long);
rational operator+() const;
rational operator-() const;
friend long floor(const rational& r);
friend long ceil(const rational& r);
operator double(); // conversion operator
operator bigfloat(); // conversion operator
// Implementation
private:
long n, d;
};
// Inline rational functions
inline void rational::cancel() // cancel *this in situ
{
long g = ::gcd(n,d);
if (g>1) {n/=g; d/=g;}
if (d<0) {n=-n; d=-d;}
}
inline rational::rational(long num_val, long den_val)
{
n=num_val; d=den_val;
(*this).cancel();
}
inline rational::rational(const rational& q) :n(q.n), d(q.d) {;}
inline void rational::operator=(const rational& q) {n=q.n; d=q.d;}
inline rational rational::operator+() const
{
return *this;
}
inline rational rational::operator-() const
{
return rational(-n, d);
}
// Definitions of compound-assignment operator member functions
inline rational& rational::operator+=(const rational& q2)
{
n = n*q2.d+d*q2.n;
d *= q2.d;
(*this).cancel();
return *this;
}
inline rational& rational::operator+=(long num_val2)
{
n += d*num_val2;
return *this;
}
inline rational& rational::operator-=(const rational& q2)
{
n = n*q2.d-d*q2.n;
d *= q2.d;
(*this).cancel();
return *this;
}
inline rational& rational::operator-=(long num_val2)
{
n -= d*num_val2;
return *this;
}
inline rational& rational::operator*=(long num_val2)
{
n*=num_val2;
(*this).cancel();
return *this;
}
inline rational& rational::operator/=(long num_val2)
{
d*=num_val2;
(*this).cancel();
return *this;
}
inline rational::operator double() {return double(n)/double(d);}
inline rational::operator bigfloat() {return to_bigfloat(n)/to_bigfloat(d);}
// Definitions of non-member rational functions
inline long num(const rational& q)
{
return q.n;
}
inline long den(const rational& q)
{
return q.d;
}
inline rational recip(const rational& q)
{
return rational(q.d, q.n);
}
inline long round(const rational& q)
{
return q.n / q.d; //provisional -- should fix rounding direction.
}
// Definitions of non-member binary operator functions
inline rational operator+(const rational& q1, const rational& q2)
{
return rational(q1.n*q2.d + q2.n*q1.d, q1.d * q2.d);
}
inline rational operator+(long num_val1, const rational& q2)
{
return rational(num_val1*q2.d + q2.n, q2.d);
}
inline rational operator+(const rational& q1, long num_val2)
{
return rational(q1.n + num_val2*q1.d, q1.d);
}
inline rational operator-(const rational& q1, const rational& q2)
{
return rational(q1.n*q2.d - q2.n*q1.d, q1.d * q2.d);
}
inline rational operator-(long num_val1, const rational& q2)
{
return rational(num_val1*q2.d - q2.n, q2.d);
}
inline rational operator-(const rational& q1, long num_val2)
{
return rational(q1.n - num_val2*q1.d, q1.d);
}
inline rational operator*(const rational& q1, long num_val2)
{
return rational(q1.n*num_val2, q1.d);
}
inline rational operator*(long num_val1, const rational& q2)
{
return rational(q2.n*num_val1, q2.d);
}
inline rational operator*(const rational& q1, const rational& q2)
{
return rational(q1.n*q2.n, q1.d*q2.d);
}
inline rational operator/(const rational& q1, long num_val2)
{
return rational(q1.n, q1.d*num_val2);
}
inline rational operator/(const rational& q1, const rational& q2)
{
return rational(q1.n*q2.d, q1.d*q2.n);
}
inline rational operator/(long num_val1, const rational& q2)
{
return rational(q2.d*num_val1, q2.n);
}
inline int operator==(const rational& q1, const rational& q2)
{
return q1.n*q2.d == q2.n*q1.d;
}
inline int operator!=(const rational& q1, const rational& q2)
{
return q1.n*q2.d != q2.n*q1.d;
}
inline ostream& operator<<(ostream& s, const rational& q)
{
if(q.d==0) s<<"oo";
else
{
s << q.n;
if (q.d!=1) {s << "/" << q.d;}
}
return s;
}
inline istream& operator>> (istream& is, rational& r)
{
char c;
long n,d=1;
is>>n;
if(!is.eof())
{
is.get(c);
if(c=='/')
{
is>>d;
}
else
{
is.putback(c);
}
}
r=rational(n,d);
return is;
}
// NB gcd(n,d)=1 and d>0:
inline long floor(const rational& r)
{
return (r.n-(r.n%r.d))/r.d;
}
inline long ceil(const rational& r)
{
if(r.d==1) return r.n;
return 1 + (r.n-(r.n%r.d))/r.d;
}
#endif
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