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471 lines
15 KiB
471 lines
15 KiB
/*
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OneLoneCoder.com - Programming Balls! #2 Circle Vs Edge Collisions
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"...totally overkill for pong..." - @Javidx9
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License
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~~~~~~~
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One Lone Coder Console Game Engine Copyright (C) 2018 Javidx9
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This program comes with ABSOLUTELY NO WARRANTY.
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This is free software, and you are welcome to redistribute it
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under certain conditions; See license for details.
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Original works located at:
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https://www.github.com/onelonecoder
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https://www.onelonecoder.com
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https://www.youtube.com/javidx9
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GNU GPLv3
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https://github.com/OneLoneCoder/videos/blob/master/LICENSE
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From Javidx9 :)
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~~~~~~~~~~~~~~~
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Hello! Ultimately I don't care what you use this for. It's intended to be
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educational, and perhaps to the oddly minded - a little bit of fun.
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Please hack this, change it and use it in any way you see fit. You acknowledge
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that I am not responsible for anything bad that happens as a result of
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your actions. However this code is protected by GNU GPLv3, see the license in the
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github repo. This means you must attribute me if you use it. You can view this
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license here: https://github.com/OneLoneCoder/videos/blob/master/LICENSE
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Cheers!
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Background
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~~~~~~~~~~
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Collision detection engines can get quite complicated. This program shows the interactions
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between circular objects of different sizes and masses. Use Left mouse button to select
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and drag a ball to examin static collisions, and use Right mouse button to apply velocity
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to the balls as if using a pool/snooker/billiards cue.
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Author
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~~~~~~
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Twitter: @javidx9
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Blog: www.onelonecoder.com
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Twitch: https://www.twitch.tv/javidx9
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Discord: https://discord.gg/WhwHUMV
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Video:
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~~~~~~
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Part #1 https://youtu.be/LPzyNOHY3A4
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Part #2 https://youtu.be/ebq7L2Wtbl4
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Last Updated: 18/02/2017
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*/
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#include <iostream>
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#include <string>
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using namespace std;
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#include "olcConsoleGameEngine.h"
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struct sBall
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{
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float px, py;
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float vx, vy;
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float ax, ay;
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float ox, oy;
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float radius;
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float mass;
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float friction;
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int score;
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int id;
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float fSimTimeRemaining;
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};
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struct sLineSegment
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{
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float sx, sy;
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float ex, ey;
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float radius;
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};
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class CirclePhysics : public olcConsoleGameEngine
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{
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public:
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CirclePhysics()
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{
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m_sAppName = L"Circles V Edges";
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}
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private:
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vector<sBall> vecBalls;
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vector<sLineSegment> vecLines;
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vector<pair<float, float>> modelCircle;
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sBall* pSelectedBall = nullptr;
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olcSprite *spriteBalls = nullptr;
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sLineSegment* pSelectedLine = nullptr;
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bool bSelectedLineStart = false;
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void AddBall(float x, float y, float r = 5.0f, int s = 0)
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{
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sBall b;
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b.px = x; b.py = y;
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b.vx = 0; b.vy = 0;
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b.ax = 0; b.ay = 0;
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b.ox = 0; b.oy = 0;
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b.radius = r;
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b.mass = r * 10.0f;
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b.friction = 0.0f;
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b.score = s;
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b.fSimTimeRemaining = 0.0f;
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b.id = vecBalls.size();
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vecBalls.emplace_back(b);
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}
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public:
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bool OnUserCreate()
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{
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float fBallRadius = 4.0f;
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for (int i = 0; i <100; i++)
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AddBall(((float)rand()/(float)RAND_MAX) * ScreenWidth(), ((float)rand() / (float)RAND_MAX) * ScreenHeight(), fBallRadius);
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AddBall(28.0f, 33.0, fBallRadius * 3);
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AddBall(28.0f, 35.0, fBallRadius * 2);
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float fLineRadius = 4.0f;
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vecLines.push_back({ 12.0f, 4.0f, 64.0f, 4.0f, fLineRadius });
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vecLines.push_back({ 76.0f, 4.0f, 132.0f, 4.0f, fLineRadius });
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vecLines.push_back({ 12.0f, 68.0f, 64.0f, 68.0f, fLineRadius });
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vecLines.push_back({ 76.0f, 68.0f, 132.0f, 68.0f, fLineRadius });
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vecLines.push_back({ 4.0f, 12.0f, 4.0f, 60.0f, fLineRadius });
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vecLines.push_back({ 140.0f, 12.0f, 140.0f, 60.0f, fLineRadius });
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return true;
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}
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bool OnUserUpdate(float fElapsedTime)
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{
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auto DoCirclesOverlap = [](float x1, float y1, float r1, float x2, float y2, float r2)
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{
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return fabs((x1 - x2)*(x1 - x2) + (y1 - y2)*(y1 - y2)) <= ((r1 + r2) * (r1 + r2));
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};
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auto IsPointInCircle = [](float x1, float y1, float r1, float px, float py)
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{
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return fabs((x1 - px)*(x1 - px) + (y1 - py)*(y1 - py)) < (r1 * r1);
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};
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if (m_mouse[0].bPressed)
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{
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// Check for selected ball
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pSelectedBall = nullptr;
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for (auto &ball : vecBalls)
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{
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if (IsPointInCircle(ball.px, ball.py, ball.radius, m_mousePosX, m_mousePosY))
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{
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pSelectedBall = &ball;
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break;
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}
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}
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// Check for selected line segment end
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pSelectedLine = nullptr;
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for (auto &line : vecLines)
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{
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if (IsPointInCircle(line.sx, line.sy, line.radius, m_mousePosX, m_mousePosY))
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{
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pSelectedLine = &line;
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bSelectedLineStart = true;
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break;
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}
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if (IsPointInCircle(line.ex, line.ey, line.radius, m_mousePosX, m_mousePosY))
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{
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pSelectedLine = &line;
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bSelectedLineStart = false;
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break;
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}
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}
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}
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if (m_mouse[0].bHeld)
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{
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if (pSelectedLine != nullptr)
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{
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if (bSelectedLineStart)
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{
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pSelectedLine->sx = GetMouseX();
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pSelectedLine->sy = GetMouseY();
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}
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else
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{
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pSelectedLine->ex = GetMouseX();
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pSelectedLine->ey = GetMouseY();
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}
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}
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}
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if (m_mouse[0].bReleased)
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{
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if (pSelectedBall != nullptr)
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{
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// Apply velocity
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pSelectedBall->vx = 5.0f * ((pSelectedBall->px) - m_mousePosX);
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pSelectedBall->vy = 5.0f * ((pSelectedBall->py) - m_mousePosY);
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}
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pSelectedBall = nullptr;
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pSelectedLine = nullptr;
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}
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if (m_mouse[1].bHeld)
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{
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for (auto &ball : vecBalls)
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{
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ball.vx += (m_mousePosX - ball.px) * 0.01f;
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ball.vy += (m_mousePosY - ball.py) * 0.01f;
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}
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}
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vector<pair<sBall*, sBall*>> vecCollidingPairs;
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vector<sBall*> vecFakeBalls;
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// Threshold indicating stability of object
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float fStable = 0.05f;
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// Multiple simulation updates with small time steps permit more accurate physics
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// and realistic results at the expense of CPU time of course
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int nSimulationUpdates = 4;
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// Multiple collision trees require more steps to resolve. Normally we would
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// continue simulation until the object has no simulation time left for this
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// epoch, however this is risky as the system may never find stability, so we
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// can clamp it here
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int nMaxSimulationSteps = 15;
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// Break up the frame elapsed time into smaller deltas for each simulation update
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float fSimElapsedTime = fElapsedTime / (float)nSimulationUpdates;
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// Main simulation loop
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for (int i = 0; i < nSimulationUpdates; i++)
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{
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// Set all balls time to maximum for this epoch
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for (auto &ball : vecBalls)
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ball.fSimTimeRemaining = fSimElapsedTime;
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// Erode simulation time on a per objec tbasis, depending upon what happens
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// to it during its journey through this epoch
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for (int j = 0; j < nMaxSimulationSteps; j++)
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{
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// Update Ball Positions
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for (auto &ball : vecBalls)
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{
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if (ball.fSimTimeRemaining > 0.0f)
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{
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ball.ox = ball.px; // Store original position this epoch
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ball.oy = ball.py;
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ball.ax = -ball.vx * 0.8f; // Apply drag and gravity
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ball.ay = -ball.vy * 0.8f + 100.0f;
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ball.vx += ball.ax * ball.fSimTimeRemaining; // Update Velocity
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ball.vy += ball.ay * ball.fSimTimeRemaining;
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ball.px += ball.vx * ball.fSimTimeRemaining; // Update position
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ball.py += ball.vy * ball.fSimTimeRemaining;
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// Crudely wrap balls to screen - note this cause issues when collisions occur on screen boundaries
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if (ball.px < 0) ball.px += (float)ScreenWidth();
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if (ball.px >= ScreenWidth()) ball.px -= (float)ScreenWidth();
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if (ball.py < 0) ball.py += (float)ScreenHeight();
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if (ball.py >= ScreenHeight()) ball.py -= (float)ScreenHeight();
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// Stop ball when velocity is neglible
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if (fabs(ball.vx*ball.vx + ball.vy*ball.vy) < fStable)
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{
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ball.vx = 0;
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ball.vy = 0;
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}
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}
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}
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// Work out static collisions with walls and displace balls so no overlaps
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for (auto &ball : vecBalls)
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{
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float fDeltaTime = ball.fSimTimeRemaining;
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// Against Edges
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for (auto &edge : vecLines)
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{
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// Check that line formed by velocity vector, intersects with line segment
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float fLineX1 = edge.ex - edge.sx;
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float fLineY1 = edge.ey - edge.sy;
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float fLineX2 = ball.px - edge.sx;
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float fLineY2 = ball.py - edge.sy;
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float fEdgeLength = fLineX1 * fLineX1 + fLineY1 * fLineY1;
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// This is nifty - It uses the DP of the line segment vs the line to the object, to work out
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// how much of the segment is in the "shadow" of the object vector. The min and max clamp
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// this to lie between 0 and the line segment length, which is then normalised. We can
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// use this to calculate the closest point on the line segment
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float t = max(0, min(fEdgeLength, (fLineX1 * fLineX2 + fLineY1 * fLineY2))) / fEdgeLength;
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// Which we do here
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float fClosestPointX = edge.sx + t * fLineX1;
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float fClosestPointY = edge.sy + t * fLineY1;
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// And once we know the closest point, we can check if the ball has collided with the segment in the
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// same way we check if two balls have collided
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float fDistance = sqrtf((ball.px - fClosestPointX)*(ball.px - fClosestPointX) + (ball.py - fClosestPointY)*(ball.py - fClosestPointY));
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if (fDistance <= (ball.radius + edge.radius))
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{
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// Collision has occurred - treat collision point as a ball that cannot move. To make this
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// compatible with the dynamic resolution code below, we add a fake ball with an infinite mass
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// so it behaves like a solid object when the momentum calculations are performed
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sBall *fakeball = new sBall();
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fakeball->radius = edge.radius;
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fakeball->mass = ball.mass * 0.8f;
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fakeball->px = fClosestPointX;
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fakeball->py = fClosestPointY;
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fakeball->vx = -ball.vx; // We will use these later to allow the lines to impart energy into ball
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fakeball->vy = -ball.vy; // if the lines are moving, i.e. like pinball flippers
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// Store Fake Ball
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vecFakeBalls.push_back(fakeball);
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// Add collision to vector of collisions for dynamic resolution
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vecCollidingPairs.push_back({ &ball, fakeball });
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// Calculate displacement required
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float fOverlap = 1.0f * (fDistance - ball.radius - fakeball->radius);
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// Displace Current Ball away from collision
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ball.px -= fOverlap * (ball.px - fakeball->px) / fDistance;
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ball.py -= fOverlap * (ball.py - fakeball->py) / fDistance;
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}
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}
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// Against other balls
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for (auto &target : vecBalls)
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{
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if (ball.id != target.id) // Do not check against self
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{
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if (DoCirclesOverlap(ball.px, ball.py, ball.radius, target.px, target.py, target.radius))
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{
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// Collision has occured
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vecCollidingPairs.push_back({ &ball, &target });
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// Distance between ball centers
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float fDistance = sqrtf((ball.px - target.px)*(ball.px - target.px) + (ball.py - target.py)*(ball.py - target.py));
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// Calculate displacement required
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float fOverlap = 0.5f * (fDistance - ball.radius - target.radius);
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// Displace Current Ball away from collision
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ball.px -= fOverlap * (ball.px - target.px) / fDistance;
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ball.py -= fOverlap * (ball.py - target.py) / fDistance;
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// Displace Target Ball away from collision - Note, this should affect the timing of the target ball
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// and it does, but this is absorbed by the target ball calculating its own time delta later on
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target.px += fOverlap * (ball.px - target.px) / fDistance;
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target.py += fOverlap * (ball.py - target.py) / fDistance;
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}
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}
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}
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// Time displacement - we knew the velocity of the ball, so we can estimate the distance it should have covered
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// however due to collisions it could not do the full distance, so we look at the actual distance to the collision
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// point and calculate how much time that journey would have taken using the speed of the object. Therefore
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// we can now work out how much time remains in that timestep.
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float fIntendedSpeed = sqrtf(ball.vx * ball.vx + ball.vy * ball.vy);
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float fIntendedDistance = fIntendedSpeed * ball.fSimTimeRemaining;
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float fActualDistance = sqrtf((ball.px - ball.ox)*(ball.px - ball.ox) + (ball.py - ball.oy)*(ball.py - ball.oy));
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float fActualTime = fActualDistance / fIntendedSpeed;
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// After static resolution, there may be some time still left for this epoch, so allow simulation to continue
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ball.fSimTimeRemaining = ball.fSimTimeRemaining - fActualTime;
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}
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// Now work out dynamic collisions
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float fEfficiency = 1.00f;
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for (auto c : vecCollidingPairs)
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{
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sBall *b1 = c.first, *b2 = c.second;
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// Distance between balls
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float fDistance = sqrtf((b1->px - b2->px)*(b1->px - b2->px) + (b1->py - b2->py)*(b1->py - b2->py));
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// Normal
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float nx = (b2->px - b1->px) / fDistance;
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float ny = (b2->py - b1->py) / fDistance;
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// Tangent
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float tx = -ny;
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float ty = nx;
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// Dot Product Tangent
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float dpTan1 = b1->vx * tx + b1->vy * ty;
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float dpTan2 = b2->vx * tx + b2->vy * ty;
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// Dot Product Normal
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float dpNorm1 = b1->vx * nx + b1->vy * ny;
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float dpNorm2 = b2->vx * nx + b2->vy * ny;
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// Conservation of momentum in 1D
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float m1 = fEfficiency * (dpNorm1 * (b1->mass - b2->mass) + 2.0f * b2->mass * dpNorm2) / (b1->mass + b2->mass);
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float m2 = fEfficiency * (dpNorm2 * (b2->mass - b1->mass) + 2.0f * b1->mass * dpNorm1) / (b1->mass + b2->mass);
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// Update ball velocities
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b1->vx = tx * dpTan1 + nx * m1;
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b1->vy = ty * dpTan1 + ny * m1;
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b2->vx = tx * dpTan2 + nx * m2;
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b2->vy = ty * dpTan2 + ny * m2;
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}
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// Remove collisions
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vecCollidingPairs.clear();
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// Remove fake balls
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for (auto &b : vecFakeBalls) delete b;
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vecFakeBalls.clear();
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}
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}
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// Clear Screen
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Fill(0, 0, ScreenWidth(), ScreenHeight(), ' ');
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// Draw Lines
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for (auto line : vecLines)
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{
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FillCircle(line.sx, line.sy, line.radius, PIXEL_HALF, FG_WHITE);
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FillCircle(line.ex, line.ey, line.radius, PIXEL_HALF, FG_WHITE);
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float nx = -(line.ey - line.sy);
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float ny = (line.ex - line.sx);
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float d = sqrt(nx*nx + ny * ny);
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nx /= d;
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ny /= d;
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DrawLine((line.sx + nx * line.radius), (line.sy + ny * line.radius), (line.ex + nx * line.radius), (line.ey + ny * line.radius));
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DrawLine((line.sx - nx * line.radius), (line.sy - ny * line.radius), (line.ex - nx * line.radius), (line.ey - ny * line.radius));
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}
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// Draw Balls
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for (auto ball : vecBalls)
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FillCircle(ball.px, ball.py, ball.radius, PIXEL_SOLID, FG_RED);
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// Draw Cue
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if (pSelectedBall != nullptr)
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DrawLine(pSelectedBall->px, pSelectedBall->py, m_mousePosX, m_mousePosY, PIXEL_SOLID, FG_BLUE);
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return true;
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}
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};
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int main()
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{
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CirclePhysics game;
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if (game.ConstructConsole(320, 240, 4, 4))
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game.Start();
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else
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wcout << L"Could not construct console" << endl;
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return 0;
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};
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