419 lines
12 KiB
C++
419 lines
12 KiB
C++
/*
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* This program source code file is part of KiCad, a free EDA CAD application.
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*
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* Copyright (C) 2018 KiCad Developers, see CHANGELOG.TXT for contributors.
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*
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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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*
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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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*
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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, you may find one here:
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* http://www.gnu.org/licenses/old-licenses/gpl-2.0.html
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* or you may search the http://www.gnu.org website for the version 2 license,
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* or you may write to the Free Software Foundation, Inc.,
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* 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301, USA
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*/
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#include <geometry/shape_arc.h>
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#include <geometry/shape_line_chain.h>
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#include <unit_test_utils/geometry.h>
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#include <unit_test_utils/numeric.h>
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#include <unit_test_utils/unit_test_utils.h>
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#include "geom_test_utils.h"
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BOOST_AUTO_TEST_SUITE( ShapeArc )
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/**
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* All properties of an arc (depending on how it's constructed, some of these
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* might be the same as the constructor params)
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*/
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struct ARC_PROPERTIES
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{
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VECTOR2I m_center_point;
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VECTOR2I m_start_point;
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VECTOR2I m_end_point;
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double m_center_angle;
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double m_start_angle;
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double m_end_angle;
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int m_radius;
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BOX2I m_bbox;
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};
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/**
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* Check a #SHAPE_ARC against a given set of geometric properties
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*/
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static void CheckArcGeom( const SHAPE_ARC& aArc, const ARC_PROPERTIES& aProps )
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{
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// Angular error - not this can get quite large for very small arcs,
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// as the integral position rounding has a relatively greater effect
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const double angle_tol_deg = 0.01;
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// Position error - rounding to nearest integer
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const int pos_tol = 1;
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BOOST_CHECK_PREDICATE( KI_TEST::IsVecWithinTol<VECTOR2I>,
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( aProps.m_start_point )( aProps.m_start_point )( pos_tol ) );
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BOOST_CHECK_PREDICATE(
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KI_TEST::IsVecWithinTol<VECTOR2I>, ( aArc.GetP1() )( aProps.m_end_point )( pos_tol ) );
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BOOST_CHECK_PREDICATE( KI_TEST::IsVecWithinTol<VECTOR2I>,
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( aArc.GetCenter() )( aProps.m_center_point )( pos_tol ) );
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BOOST_CHECK_PREDICATE( KI_TEST::IsWithin<double>,
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( aArc.GetCentralAngle() )( aProps.m_center_angle )( angle_tol_deg ) );
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BOOST_CHECK_PREDICATE( KI_TEST::IsWithin<double>,
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( aArc.GetStartAngle() )( aProps.m_start_angle )( angle_tol_deg ) );
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BOOST_CHECK_PREDICATE( KI_TEST::IsWithin<double>,
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( aArc.GetEndAngle() )( aProps.m_end_angle )( angle_tol_deg ) );
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BOOST_CHECK_PREDICATE(
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KI_TEST::IsWithin<double>, ( aArc.GetRadius() )( aProps.m_radius )( pos_tol ) );
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/// Check the chord agrees
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const auto chord = aArc.GetChord();
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BOOST_CHECK_PREDICATE(
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KI_TEST::IsVecWithinTol<VECTOR2I>, ( chord.A )( aProps.m_start_point )( pos_tol ) );
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BOOST_CHECK_PREDICATE(
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KI_TEST::IsVecWithinTol<VECTOR2I>, ( chord.B )( aProps.m_end_point )( pos_tol ) );
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/// All arcs are solid
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BOOST_CHECK_EQUAL( aArc.IsSolid(), true );
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BOOST_CHECK_PREDICATE(
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KI_TEST::IsBoxWithinTol<BOX2I>, ( aArc.BBox() )( aProps.m_bbox )( pos_tol ) );
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/// Collisions will be checked elsewhere.
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}
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/**
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* Check an arcs geometry and other class functions
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*/
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static void CheckArc( const SHAPE_ARC& aArc, const ARC_PROPERTIES& aProps )
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{
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// Check the original arc
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CheckArcGeom( aArc, aProps );
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// Test the Clone function (also tests copy-ctor)
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std::unique_ptr<SHAPE> new_shape{ aArc.Clone() };
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BOOST_CHECK_EQUAL( new_shape->Type(), SH_ARC );
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SHAPE_ARC* new_arc = dynamic_cast<SHAPE_ARC*>( new_shape.get() );
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BOOST_REQUIRE( new_arc != nullptr );
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/// Should have identical geom props
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CheckArcGeom( *new_arc, aProps );
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}
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/**
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* Check correct handling of filter strings (as used by WX)
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*/
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BOOST_AUTO_TEST_CASE( NullCtor )
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{
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auto arc = SHAPE_ARC();
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BOOST_CHECK_EQUAL( arc.GetWidth(), 0 );
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static ARC_PROPERTIES null_props{
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{ 0, 0 },
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{ 0, 0 },
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{ 0, 0 },
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0,
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0,
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0,
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0,
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};
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CheckArc( arc, null_props );
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}
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/**
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* Info to set up an arc by centre, start point and angle
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*
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* In future there may be more ways to set this up, so keep it separate
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*/
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struct ARC_CENTRE_PT_ANGLE
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{
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VECTOR2I m_center_point;
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VECTOR2I m_start_point;
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double m_center_angle;
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};
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struct ARC_CPA_CASE
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{
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/// The text context name
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std::string m_ctx_name;
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/// Geom of the arc
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ARC_CENTRE_PT_ANGLE m_geom;
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/// Arc line width
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int m_width;
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/// Expected properties
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ARC_PROPERTIES m_properties;
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};
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static const std::vector<ARC_CPA_CASE> arc_cases = {
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{
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"C(0,0) 180 + 90 degree",
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{
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{ 0, 0 },
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{ -100, 0 },
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90,
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},
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0,
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{
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{ 0, 0 },
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{ -100, 0 },
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{ 0, -100 },
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90,
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180,
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270,
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100,
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{ { -100, -100 }, { 100, 100 } },
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},
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},
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{
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"C(100,200) 0 - 30 degree",
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{
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{ 100, 200 },
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{ 300, 200 },
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-30,
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},
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0,
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{
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{ 100, 200 },
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{ 300, 200 },
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{ 273, 100 }, // 200 * sin(30) = 100, 200* cos(30) = 173
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-30,
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0,
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330,
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200,
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{ { 100, 100 }, { 200, 100 } },
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},
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},
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{
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// This is a "fan shape" which includes the top quadrant point,
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// so it exercises the bounding box code (centre and end points
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// do not contain the top quadrant)
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"C(0,0) 30 + 120 degree",
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{
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{ 0, 0 },
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{ 17320, 10000 },
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120,
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},
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0,
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{
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{ 0, 0 },
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{ 17320, 10000 },
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{ -17320, 10000 }, // 200 * sin(30) = 100, 200* cos(30) = 173
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120,
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30,
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150,
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20000,
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// bbox defined by: centre, top quadrant point, two endpoints
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{ { -17320, 0 }, { 17320 * 2, 20000 } },
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},
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},
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{
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// An arc that covers three quadrant points (L/R, bottom)
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"C(0,0) 150 + 240 degree",
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{
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{ 0, 0 },
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{ -17320, 10000 },
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240,
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},
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0,
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{
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{ 0, 0 },
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{ -17320, 10000 },
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{ 17320, 10000 },
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240,
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150,
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30,
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20000,
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// bbox defined by: L/R quads, bottom quad and start/end
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{ { -20000, -20000 }, { 40000, 30000 } },
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},
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},
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{
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// Same as above but reverse direction
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"C(0,0) 30 - 300 degree",
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{
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{ 0, 0 },
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{ 17320, 10000 },
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-240,
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},
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0,
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{
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{ 0, 0 },
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{ 17320, 10000 },
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{ -17320, 10000 },
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-240,
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30,
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150,
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20000,
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// bbox defined by: L/R quads, bottom quad and start/end
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{ { -20000, -20000 }, { 40000, 30000 } },
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},
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},
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};
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BOOST_AUTO_TEST_CASE( BasicCPAGeom )
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{
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for( const auto& c : arc_cases )
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{
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BOOST_TEST_CONTEXT( c.m_ctx_name )
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{
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const auto this_arc = SHAPE_ARC{ c.m_geom.m_center_point, c.m_geom.m_start_point,
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c.m_geom.m_center_angle, c.m_width };
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CheckArc( this_arc, c.m_properties );
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}
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}
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}
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struct ARC_TO_POLYLINE_CASE
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{
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std::string m_ctx_name;
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ARC_CENTRE_PT_ANGLE m_geom;
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};
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/**
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* Predicate for checking a polyline has all the points on (near) a circle of
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* given centre and radius
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* @param aPolyline the polyline to check
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* @param aCentre the circle centre
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* @param aRad the circle radius
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* @param aTolEnds the tolerance for the endpoint-centre distance
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* @return true if predicate met
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*/
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bool ArePolylineEndPointsNearCircle(
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const SHAPE_LINE_CHAIN& aPolyline, const VECTOR2I& aCentre, int aRad, int aTolEnds )
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{
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std::vector<VECTOR2I> points;
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for( int i = 0; i < aPolyline.PointCount(); ++i )
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{
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points.push_back( aPolyline.CPoint( i ) );
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}
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return GEOM_TEST::ArePointsNearCircle( points, aCentre, aRad, aTolEnds );
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}
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/**
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* Predicate for checking a polyline has all the segment mid points on
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* (near) a circle of given centre and radius
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* @param aPolyline the polyline to check
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* @param aCentre the circle centre
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* @param aRad the circle radius
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* @param aTolEnds the tolerance for the midpoint-centre distance
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* @return true if predicate met
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*/
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bool ArePolylineMidPointsNearCircle(
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const SHAPE_LINE_CHAIN& aPolyline, const VECTOR2I& aCentre, int aRad, int aTolMidPts )
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{
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std::vector<VECTOR2I> points;
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for( int i = 0; i < aPolyline.PointCount() - 1; ++i )
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{
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const VECTOR2I mid_pt = ( aPolyline.CPoint( i ) + aPolyline.CPoint( i + 1 ) ) / 2;
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points.push_back( mid_pt );
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}
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return GEOM_TEST::ArePointsNearCircle( points, aCentre, aRad, aTolMidPts );
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}
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BOOST_AUTO_TEST_CASE( ArcToPolyline )
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{
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const std::vector<ARC_TO_POLYLINE_CASE> cases = {
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{
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"Zero rad",
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{
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{ 0, 0 },
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{ 0, 0 },
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180,
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},
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},
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{
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"Semicircle",
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{
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{ 0, 0 },
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{ -10, 0 },
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180,
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},
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},
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{
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// check larger sizes still have required precisions
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// and that reverse angles work too
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"Larger semicircle",
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{
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{ 0, 0 },
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{ -10000, 0 },
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-180,
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},
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},
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{
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// Make sure it doesn't only work for "easy" angles
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"Non-round geometry",
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{
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{ 0, 0 },
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{ -1234, 0 },
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42.22,
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},
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},
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};
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const int width = 0;
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const double accuracy = 1.0;
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for( const auto& c : cases )
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{
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BOOST_TEST_CONTEXT( c.m_ctx_name )
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{
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const SHAPE_ARC this_arc{ c.m_geom.m_center_point, c.m_geom.m_start_point,
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c.m_geom.m_center_angle, width };
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const SHAPE_LINE_CHAIN chain = this_arc.ConvertToPolyline( accuracy );
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BOOST_TEST_MESSAGE( "Polyline has " << chain.PointCount() << " points" );
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const int pt_tol = 1;
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// Start point where expected
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BOOST_CHECK_EQUAL( chain.CPoint( 0 ), c.m_geom.m_start_point );
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// End point where expected
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BOOST_CHECK_PREDICATE( KI_TEST::IsVecWithinTol<VECTOR2I>,
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( chain.CPoint( -1 ) )( this_arc.GetP1() )( pt_tol ) );
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const int radius = ( c.m_geom.m_center_point - c.m_geom.m_start_point ).EuclideanNorm();
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const int ep_tol = 2;
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BOOST_CHECK_PREDICATE( ArePolylineEndPointsNearCircle,
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( chain )( c.m_geom.m_center_point )( radius )( ep_tol ) );
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const int mp_tol = 3;
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BOOST_CHECK_PREDICATE( ArePolylineMidPointsNearCircle,
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( chain )( c.m_geom.m_center_point )( radius )( mp_tol ) );
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}
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}
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}
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BOOST_AUTO_TEST_SUITE_END()
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