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// Copyright (C) 2003 Dominique Devriese <devriese@kde.org>
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// This program is free software; you can redistribute it and/or
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// modify it under the terms of the GNU General Public License
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// as published by the Free Software Foundation; either version 2
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// of the License, or (at your option) any later version.
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// This program is distributed in the hope that it will be useful,
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// but WITHOUT ANY WARRANTY; without even the implied warranty of
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// MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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// GNU General Public License for more details.
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// You should have received a copy of the GNU General Public License
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// along with this program; if not, write to the Free Software
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// Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA
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// 02110-1301, USA.
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#include "cubic_imp.h"
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#include "bogus_imp.h"
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#include "../misc/kigpainter.h"
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#include "../misc/screeninfo.h"
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#include "../misc/kignumerics.h"
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#include "../misc/common.h"
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#include "../kig/kig_view.h"
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#include <math.h>
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#include <tdelocale.h>
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CubicImp::CubicImp( const CubicCartesianData& data )
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: CurveImp(), mdata( data )
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{
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}
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CubicImp::~CubicImp()
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{
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}
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ObjectImp* CubicImp::transform( const Transformation& t ) const
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{
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bool valid = true;
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CubicCartesianData d = calcCubicTransformation( data(), t, valid );
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if ( valid ) return new CubicImp( d );
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else return new InvalidImp;
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}
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void CubicImp::draw( KigPainter& p ) const
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{
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p.drawCurve( this );
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}
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bool CubicImp::contains( const Coordinate& o, int width, const KigWidget& w ) const
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{
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return internalContainsPoint( o, w.screenInfo().normalMiss( width ) );
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}
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bool CubicImp::inRect( const Rect&, int, const KigWidget& ) const
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{
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// TODO ?
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return false;
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}
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CubicImp* CubicImp::copy() const
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{
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return new CubicImp( mdata );
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}
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double CubicImp::getParam( const Coordinate& p, const KigDocument& ) const
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{
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double x = p.x;
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double y = p.y;
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double t;
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double a000 = mdata.coeffs[0];
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double a001 = mdata.coeffs[1];
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double a002 = mdata.coeffs[2];
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double a011 = mdata.coeffs[3];
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double a012 = mdata.coeffs[4];
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double a022 = mdata.coeffs[5];
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double a111 = mdata.coeffs[6];
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double a112 = mdata.coeffs[7];
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double a122 = mdata.coeffs[8];
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double a222 = mdata.coeffs[9];
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/*
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* first project p onto the cubic. This is done by computing the
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* line through p in the direction of the gradient
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*/
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double f = a000 + a001*x + a002*y + a011*x*x + a012*x*y + a022*y*y +
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a111*x*x*x + a112*x*x*y + a122*x*y*y + a222*y*y*y;
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if ( f != 0 )
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{
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double fx = a001 + 2*a011*x + a012*y + 3*a111*x*x + 2*a112*x*y + a122*y*y;
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double fy = a002 + 2*a022*y + a012*x + 3*a222*y*y + 2*a122*x*y + a112*x*x;
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Coordinate v = Coordinate (fx, fy);
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if ( f < 0 ) v = -v; // the line points away from the intersection
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double a, b, c, d;
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calcCubicLineRestriction ( mdata, p, v, a, b, c, d );
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if ( a < 0 )
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{
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a *= -1;
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b *= -1;
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c *= -1;
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d *= -1;
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}
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// computing the coefficients of the Sturm sequence
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double p1a = 2*b*b - 6*a*c;
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double p1b = b*c - 9*a*d;
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double p0a = c*p1a*p1a + p1b*(3*a*p1b - 2*b*p1a);
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// compute the number of roots for negative lambda
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int variations = calcCubicVariations ( 0, a, b, c, d, p1a, p1b, p0a );
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bool valid;
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int numroots;
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double lambda = calcCubicRoot ( -1e10, 1e10, a, b, c, d, variations, valid,
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numroots );
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if ( valid )
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{
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Coordinate pnew = p + lambda*v;
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x = pnew.x;
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y = pnew.y;
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}
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}
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if (x > 0) t = x/(1+x);
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else t = x/(1-x);
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t = 0.5*(t + 1);
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t /= 3;
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Coordinate p1 = getPoint ( t );
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Coordinate p2 = getPoint ( t + 1.0/3.0 );
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Coordinate p3 = getPoint ( t + 2.0/3.0 );
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double mint = t;
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double mindist = p1.valid() ? fabs ( y - p1.y ) : double_inf;
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if ( p2.valid() && fabs ( y - p2.y ) < mindist )
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{
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mint = t + 1.0/3.0;
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mindist = fabs ( y - p2.y );
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}
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if ( p3.valid() && fabs ( y - p3.y ) < mindist )
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{
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mint = t + 2.0/3.0;
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}
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return mint;
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}
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const Coordinate CubicImp::getPoint( double p, const KigDocument& ) const
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{
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return getPoint( p );
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}
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const Coordinate CubicImp::getPoint( double p ) const
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{
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/*
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* this isn't really elegant...
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* the magnitude of p tells which one of the maximum 3 intersections
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* of the vertical line with the cubic to take.
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*/
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p *= 3;
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int root = (int) p;
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assert ( root >= 0 );
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assert ( root <= 3 );
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if ( root == 3 ) root = 2;
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p -= root;
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assert ( 0 <= p && p <= 1 );
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if ( p <= 0. ) p = 1e-6;
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if ( p >= 1. ) p = 1 - 1e-6;
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root++;
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p = 2*p - 1;
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double x;
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if (p > 0) x = p/(1 - p);
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else x = p/(1 + p);
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// calc the third degree polynomial:
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// compute the third degree polinomial:
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// double a000 = mdata.coeffs[0];
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// double a001 = mdata.coeffs[1];
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// double a002 = mdata.coeffs[2];
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// double a011 = mdata.coeffs[3];
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// double a012 = mdata.coeffs[4];
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// double a022 = mdata.coeffs[5];
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// double a111 = mdata.coeffs[6];
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// double a112 = mdata.coeffs[7];
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// double a122 = mdata.coeffs[8];
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// double a222 = mdata.coeffs[9];
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//
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// // first the y^3 coefficient, it coming only from a222:
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// double a = a222;
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// // next the y^2 coefficient (from a122 and a022):
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// double b = a122*x + a022;
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// // next the y coefficient (from a112, a012 and a002):
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// double c = a112*x*x + a012*x + a002;
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// // finally the constant coefficient (from a111, a011, a001 and a000):
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// double d = a111*x*x*x + a011*x*x + a001*x + a000;
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// commented out, since the bound is already computed when passing a huge
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// interval; the normalization is not needed also
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// renormalize: positive a
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// if ( a < 0 )
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// {
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// a *= -1;
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// b *= -1;
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// c *= -1;
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// d *= -1;
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// }
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//
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// const double small = 1e-7;
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// int degree = 3;
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// if ( fabs(a) < small*fabs(b) ||
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// fabs(a) < small*fabs(c) ||
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// fabs(a) < small*fabs(d) )
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// {
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// degree = 2;
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// if ( fabs(b) < small*fabs(c) ||
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// fabs(b) < small*fabs(d) )
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// {
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// degree = 1;
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// }
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// }
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// and a bound for all the real roots:
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// double bound;
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// switch (degree)
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// {
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// case 3:
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// bound = fabs(d/a);
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// if ( fabs(c/a) + 1 > bound ) bound = fabs(c/a) + 1;
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// if ( fabs(b/a) + 1 > bound ) bound = fabs(b/a) + 1;
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// break;
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//
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// case 2:
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// bound = fabs(d/b);
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// if ( fabs(c/b) + 1 > bound ) bound = fabs(c/b) + 1;
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// break;
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//
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// case 1:
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// default:
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// bound = fabs(d/c) + 1;
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// break;
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// }
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int numroots;
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bool valid = true;
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double y = calcCubicYvalue ( x, -double_inf, double_inf, root, mdata, valid,
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numroots );
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if ( ! valid ) return Coordinate::invalidCoord();
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else return Coordinate(x,y);
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// if ( valid ) return Coordinate(x,y);
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// root--; if ( root <= 0) root += 3;
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// y = calcCubicYvalue ( x, -bound, bound, root, mdata, valid,
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// numroots );
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// if ( valid ) return Coordinate(x,y);
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// root--; if ( root <= 0) root += 3;
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// y = calcCubicYvalue ( x, -bound, bound, root, mdata, valid,
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// numroots );
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// assert ( valid );
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// return Coordinate(x,y);
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}
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const uint CubicImp::numberOfProperties() const
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{
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return Parent::numberOfProperties() + 1;
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}
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const QCStringList CubicImp::propertiesInternalNames() const
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{
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QCStringList l = Parent::propertiesInternalNames();
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l << "cartesian-equation";
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assert( l.size() == CubicImp::numberOfProperties() );
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return l;
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}
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/*
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* cartesian equation property contributed by Carlo Sardi
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*/
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const QCStringList CubicImp::properties() const
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{
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QCStringList l = Parent::properties();
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l << I18N_NOOP( "Cartesian Equation" );
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assert( l.size() == CubicImp::numberOfProperties() );
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return l;
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}
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const ObjectImpType* CubicImp::impRequirementForProperty( uint which ) const
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{
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if ( which < Parent::numberOfProperties() )
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return Parent::impRequirementForProperty( which );
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else return CubicImp::stype();
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}
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const char* CubicImp::iconForProperty( uint which ) const
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{
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int pnum = 0;
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if ( which < Parent::numberOfProperties() )
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return Parent::iconForProperty( which );
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if ( which == Parent::numberOfProperties() + pnum++ )
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return "kig_text"; // cartesian equation string
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else
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assert( false );
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return "";
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}
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ObjectImp* CubicImp::property( uint which, const KigDocument& w ) const
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{
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int pnum = 0;
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if ( which < Parent::numberOfProperties() )
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return Parent::property( which, w );
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if ( which == Parent::numberOfProperties() + pnum++ )
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return new StringImp( cartesianEquationString( w ) );
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else
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assert( false );
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return new InvalidImp;
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}
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const CubicCartesianData CubicImp::data() const
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{
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return mdata;
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}
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void CubicImp::visit( ObjectImpVisitor* vtor ) const
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{
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vtor->visit( this );
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}
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bool CubicImp::equals( const ObjectImp& rhs ) const
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{
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return rhs.inherits( CubicImp::stype() ) &&
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static_cast<const CubicImp&>( rhs ).data() == data();
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}
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const ObjectImpType* CubicImp::type() const
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{
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return CubicImp::stype();
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}
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const ObjectImpType* CubicImp::stype()
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{
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static const ObjectImpType t(
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Parent::stype(), "cubic",
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I18N_NOOP( "cubic curve" ),
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I18N_NOOP( "Select this cubic curve" ),
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I18N_NOOP( "Select cubic curve %1" ),
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I18N_NOOP( "Remove a Cubic Curve" ),
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I18N_NOOP( "Add a Cubic Curve" ),
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I18N_NOOP( "Move a Cubic Curve" ),
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I18N_NOOP( "Attach to this cubic curve" ),
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I18N_NOOP( "Show a Cubic Curve" ),
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I18N_NOOP( "Hide a Cubic Curve" )
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);
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return &t;
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}
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bool CubicImp::containsPoint( const Coordinate& p, const KigDocument& ) const
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{
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return internalContainsPoint( p, test_threshold );
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}
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bool CubicImp::internalContainsPoint( const Coordinate& p, double threshold ) const
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{
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double a000 = mdata.coeffs[0];
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double a001 = mdata.coeffs[1];
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double a002 = mdata.coeffs[2];
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double a011 = mdata.coeffs[3];
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double a012 = mdata.coeffs[4];
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double a022 = mdata.coeffs[5];
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double a111 = mdata.coeffs[6];
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double a112 = mdata.coeffs[7];
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double a122 = mdata.coeffs[8];
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double a222 = mdata.coeffs[9];
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double x = p.x;
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double y = p.y;
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double f = a000 + a001*x + a002*y + a011*x*x + a012*x*y + a022*y*y +
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a111*x*x*x + a112*x*x*y + a122*x*y*y + a222*y*y*y;
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double fx = a001 + 2*a011*x + a012*y + 3*a111*x*x + 2*a112*x*y + a122*y*y;
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double fy = a002 + a012*x + 2*a022*y + a112*x*x + 2*a122*x*y + 3*a222*y*y;
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double dist = fabs(f)/(fabs(fx) + fabs(fy));
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return dist <= threshold;
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}
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bool CubicImp::isPropertyDefinedOnOrThroughThisImp( uint which ) const
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{
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return Parent::isPropertyDefinedOnOrThroughThisImp( which );
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}
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Rect CubicImp::surroundingRect() const
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{
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// it's probably possible to calculate this if it exists, but for
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// now we don't.
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return Rect::invalidRect();
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}
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TQString CubicImp::cartesianEquationString( const KigDocument& ) const
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{
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/*
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* unfortunately TQStrings.arg method is limited to %1, %9, so we cannot
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* treat all 10 arguments! Let's split the equation in two parts...
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* Now this ends up also in the translation machinery, is this really
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* necessary? Otherwise we could do a little bit of tidy up on the
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* the equation (removal of zeros, avoid " ... + -1234 x ", etc.)
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*/
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TQString ret = i18n( "%6 x³ + %9 y³ + %7 x²y + %8 xy² + %5 y² + %3 x² + %4 xy + %1 x + %2 y" );
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ret = ret.arg( mdata.coeffs[1], 0, 'g', 3 );
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ret = ret.arg( mdata.coeffs[2], 0, 'g', 3 );
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ret = ret.arg( mdata.coeffs[3], 0, 'g', 3 );
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ret = ret.arg( mdata.coeffs[4], 0, 'g', 3 );
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ret = ret.arg( mdata.coeffs[5], 0, 'g', 3 );
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ret = ret.arg( mdata.coeffs[6], 0, 'g', 3 );
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ret = ret.arg( mdata.coeffs[7], 0, 'g', 3 );
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ret = ret.arg( mdata.coeffs[8], 0, 'g', 3 );
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ret = ret.arg( mdata.coeffs[9], 0, 'g', 3 );
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ret.append( i18n( " + %1 = 0" ) );
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ret = ret.arg( mdata.coeffs[0], 0, 'g', 3 );
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// we should find a common place to do this...
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ret.replace( "+ -", "- " );
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ret.replace( "+-", "-" );
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return ret;
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}
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