Sunday, November 17, 2024
Google search engine
HomeData Modelling & AIMid-Point Circle Drawing Algorithm

Mid-Point Circle Drawing Algorithm

The mid-point circle drawing algorithm is an algorithm used to determine the points needed for rasterizing a circle. 
 

We use the mid-point algorithm to calculate all the perimeter points of the circle in the first octant and then print them along with their mirror points in the other octants. This will work because a circle is symmetric about its centre.

 

Circle octants

 

The algorithm is very similar to the Mid-Point Line Generation Algorithm. Here, only the boundary condition is different.

 

For any given pixel (x, y), the next pixel to be plotted is either (x, y+1) or (x-1, y+1). This can be decided by following the steps below.

 

  1. Find the mid-point p of the two possible pixels i.e (x-0.5, y+1)
  2. If p lies inside or on the circle perimeter, we plot the pixel (x, y+1), otherwise if it’s outside we plot the pixel (x-1, y+1)

Boundary Condition : Whether the mid-point lies inside or outside the circle can be decided by using the formula:- 
 

Given a circle centered at (0,0) and radius r and a point p(x,y) 
F(p) = x2 + y2 – r2 
if F(p)<0, the point is inside the circle
F(p)=0, the point is on the perimeter
F(p)>0, the point is outside the circle 
 

 

example

In our program, we denote F(p) with P. The value of P is calculated at the mid-point of the two contending pixels i.e. (x-0.5, y+1). Each pixel is described with a subscript k.
 

Pk = (Xk — 0.5)2 + (yk + 1)2 – r2 
Now, 
xk+1 = xk or xk-1 , yk+1= yk +1
∴ Pk+1 = (xk+1 – 0.5)2 + (yk+1 +1)2 – r2 
= (xk+1 – 0.5)2 + [(yk +1) + 1]2 – r2 
= (xk+1 – 0.5)2 + (yk +1)2 + 2(yk + 1) + 1 – r2 
= (xk+1 – 0.5)2 + [ – (xk – 0.5)2 +(xk – 0.5)2 ] + (yk + 1)2 – r2 + 2(yk + 1) + 1
= Pk + (xk+1 – 0.5)2 – (xk – 0.5)2 + 2(yk + 1) + 1 
= Pk + (x2k+1 – x2k) – (xk+1 – xk) + 2(yk + 1) + 1 
= Pk + 2(yk +1) + 1, when Pk <=0 i.e the midpoint is inside the circle 
(xk+1 = xk
Pk + 2(yk +1) – 2(xk – 1) + 1, when Pk>0 I.e the mid point is outside the circle(xk+1 = xk-1) 
 

The first point to be plotted is (r, 0) on the x-axis. The initial value of P is calculated as follows:-
 

P1 = (r – 0.5)2 + (0+1)2 – r2 
= 1.25 – r 
= 1 -r (When rounded off)
 

Examples: 
 

Input : Centre -> (0, 0), Radius -> 3
Output : (3, 0) (3, 0) (0, 3) (0, 3)
         (3, 1) (-3, 1) (3, -1) (-3, -1)
         (1, 3) (-1, 3) (1, -3) (-1, -3)
         (2, 2) (-2, 2) (2, -2) (-2, -2)

first point to be plotted

 
Input : Centre -> (4, 4), Radius -> 2
Output : (6, 4) (6, 4) (4, 6) (4, 6)
         (6, 5) (2, 5) (6, 3) (2, 3)
         (5, 6) (3, 6) (5, 2) (3, 2)

CPP




// C++ program for implementing
// Mid-Point Circle Drawing Algorithm
#include<iostream>
using namespace std;
 
// Implementing Mid-Point Circle Drawing Algorithm
void midPointCircleDraw(int x_centre, int y_centre, int r)
{
    int x = r, y = 0;
     
    // Printing the initial point on the axes
    // after translation
    cout << "(" << x + x_centre << ", " << y + y_centre << ") ";
     
    // When radius is zero only a single
    // point will be printed
    if (r > 0)
    {
        cout << "(" << x + x_centre << ", " << -y + y_centre << ") ";
        cout << "(" << y + x_centre << ", " << x + y_centre << ") ";
        cout << "(" << -y + x_centre << ", " << x + y_centre << ")\n";
    }
     
    // Initialising the value of P
    int P = 1 - r;
    while (x > y)
    {
        y++;
         
        // Mid-point is inside or on the perimeter
        if (P <= 0)
            P = P + 2*y + 1;
        // Mid-point is outside the perimeter
        else
        {
            x--;
            P = P + 2*y - 2*x + 1;
        }
         
        // All the perimeter points have already been printed
        if (x < y)
            break;
         
        // Printing the generated point and its reflection
        // in the other octants after translation
        cout << "(" << x + x_centre << ", " << y + y_centre << ") ";
        cout << "(" << -x + x_centre << ", " << y + y_centre << ") ";
        cout << "(" << x + x_centre << ", " << -y + y_centre << ") ";
        cout << "(" << -x + x_centre << ", " << -y + y_centre << ")\n";
         
        // If the generated point is on the line x = y then
        // the perimeter points have already been printed
        if (x != y)
        {
            cout << "(" << y + x_centre << ", " << x + y_centre << ") ";
            cout << "(" << -y + x_centre << ", " << x + y_centre << ") ";
            cout << "(" << y + x_centre << ", " << -x + y_centre << ") ";
            cout << "(" << -y + x_centre << ", " << -x + y_centre << ")\n";
        }
    }
}
 
// Driver code
int main()
{
    // To draw a circle of radius 3 centered at (0, 0)
    midPointCircleDraw(0, 0, 3);
    return 0;
}


C




// C program for implementing
// Mid-Point Circle Drawing Algorithm
#include<stdio.h>
 
// Implementing Mid-Point Circle Drawing Algorithm
void midPointCircleDraw(int x_centre, int y_centre, int r)
{
    int x = r, y = 0;
     
    // Printing the initial point on the axes
    // after translation
    printf("(%d, %d) ", x + x_centre, y + y_centre);
     
    // When radius is zero only a single
    // point will be printed
    if (r > 0)
    {
        printf("(%d, %d) ", x + x_centre, -y + y_centre);
        printf("(%d, %d) ", y + x_centre, x + y_centre);
        printf("(%d, %d)\n", -y + x_centre, x + y_centre);
    }
     
    // Initialising the value of P
    int P = 1 - r;
    while (x > y)
    {
        y++;
         
        // Mid-point is inside or on the perimeter
        if (P <= 0)
            P = P + 2*y + 1;
             
        // Mid-point is outside the perimeter
        else
        {
            x--;
            P = P + 2*y - 2*x + 1;
        }
         
        // All the perimeter points have already been printed
        if (x < y)
            break;
         
        // Printing the generated point and its reflection
        // in the other octants after translation
        printf("(%d, %d) ", x + x_centre, y + y_centre);
        printf("(%d, %d) ", -x + x_centre, y + y_centre);
        printf("(%d, %d) ", x + x_centre, -y + y_centre);
        printf("(%d, %d)\n", -x + x_centre, -y + y_centre);
         
        // If the generated point is on the line x = y then
        // the perimeter points have already been printed
        if (x != y)
        {
            printf("(%d, %d) ", y + x_centre, x + y_centre);
            printf("(%d, %d) ", -y + x_centre, x + y_centre);
            printf("(%d, %d) ", y + x_centre, -x + y_centre);
            printf("(%d, %d)\n", -y + x_centre, -x + y_centre);
        }
    }
}
 
// Driver code
int main()
{
    // To draw a circle of radius 3 centered at (0, 0)
    midPointCircleDraw(0, 0, 3);
    return 0;
}


Java




// Java program for implementing
// Mid-Point Circle Drawing Algorithm
class GFG {
     
    // Implementing Mid-Point Circle
    // Drawing Algorithm
    static void midPointCircleDraw(int x_centre,
                            int y_centre, int r)
    {
         
        int x = r, y = 0;
     
        // Printing the initial point
        // on the axes after translation
        System.out.print("(" + (x + x_centre)
                + ", " + (y + y_centre) + ")");
     
        // When radius is zero only a single
        // point will be printed
        if (r > 0) {
             
            System.out.print("(" + (x + x_centre)
                + ", " + (-y + y_centre) + ")");
                 
            System.out.print("(" + (y + x_centre)
                 + ", " + (x + y_centre) + ")");
                  
            System.out.println("(" + (-y + x_centre)
                   + ", " + (x + y_centre) + ")");
        }
     
        // Initialising the value of P
        int P = 1 - r;
        while (x > y) {
             
            y++;
         
            // Mid-point is inside or on the perimeter
            if (P <= 0)
                P = P + 2 * y + 1;
         
            // Mid-point is outside the perimeter
            else {
                x--;
                P = P + 2 * y - 2 * x + 1;
            }
         
            // All the perimeter points have already
            // been printed
            if (x < y)
                break;
         
            // Printing the generated point and its
            // reflection in the other octants after
            // translation
            System.out.print("(" + (x + x_centre)
                    + ", " + (y + y_centre) + ")");
                     
            System.out.print("(" + (-x + x_centre)
                    + ", " + (y + y_centre) + ")");
                     
            System.out.print("(" + (x + x_centre) +
                    ", " + (-y + y_centre) + ")");
                     
            System.out.println("(" + (-x + x_centre)
                    + ", " + (-y + y_centre) + ")");
         
            // If the generated point is on the
            // line x = y then the perimeter points
            // have already been printed
            if (x != y) {
                 
                System.out.print("(" + (y + x_centre)
                      + ", " + (x + y_centre) + ")");
                       
                System.out.print("(" + (-y + x_centre)
                      + ", " + (x + y_centre) + ")");
                       
                System.out.print("(" + (y + x_centre)
                      + ", " + (-x + y_centre) + ")");
                       
                System.out.println("(" + (-y + x_centre)
                    + ", " + (-x + y_centre) +")");
            }
        }
    }
     
    // Driver code
    public static void main(String[] args) {
         
        // To draw a circle of radius
        // 3 centered at (0, 0)
        midPointCircleDraw(0, 0, 3);
    }
}
 
// This code is contributed by Anant Agarwal.


Python3




# Python3 program for implementing
# Mid-Point Circle Drawing Algorithm
 
def midPointCircleDraw(x_centre, y_centre, r):
    x = r
    y = 0
     
    # Printing the initial point the
    # axes after translation
    print("(", x + x_centre, ", ",
               y + y_centre, ")",
               sep = "", end = "")
     
    # When radius is zero only a single
    # point be printed
    if (r > 0) :
     
        print("(", x + x_centre, ", ",
                  -y + y_centre, ")",
                  sep = "", end = "")
        print("(", y + x_centre, ", ",
                   x + y_centre, ")",
                   sep = "", end = "")
        print("(", -y + x_centre, ", ",
                    x + y_centre, ")", sep = "")
     
    # Initialising the value of P
    P = 1 - r
 
    while x > y:
     
        y += 1
         
        # Mid-point inside or on the perimeter
        if P <= 0:
            P = P + 2 * y + 1
             
        # Mid-point outside the perimeter
        else:        
            x -= 1
            P = P + 2 * y - 2 * x + 1
         
        # All the perimeter points have
        # already been printed
        if (x < y):
            break
         
        # Printing the generated point its reflection
        # in the other octants after translation
        print("(", x + x_centre, ", ", y + y_centre,
                            ")", sep = "", end = "")
        print("(", -x + x_centre, ", ", y + y_centre,
                             ")", sep = "", end = "")
        print("(", x + x_centre, ", ", -y + y_centre,
                             ")", sep = "", end = "")
        print("(", -x + x_centre, ", ", -y + y_centre,
                                        ")", sep = "")
         
        # If the generated point on the line x = y then
        # the perimeter points have already been printed
        if x != y:
         
            print("(", y + x_centre, ", ", x + y_centre,
                                ")", sep = "", end = "")
            print("(", -y + x_centre, ", ", x + y_centre,
                                 ")", sep = "", end = "")
            print("(", y + x_centre, ", ", -x + y_centre,
                                 ")", sep = "", end = "")
            print("(", -y + x_centre, ", ", -x + y_centre,
                                            ")", sep = "")
                             
# Driver Code
if __name__ == '__main__':
     
    # To draw a circle of radius 3
    # centered at (0, 0)
    midPointCircleDraw(0, 0, 3)
 
 
# Contributed by: SHUBHAMSINGH10
# Improved by: siddharthx_07


C#




// C# program for implementing Mid-Point
// Circle Drawing Algorithm
using System;
 
class GFG {
     
    // Implementing Mid-Point Circle
    // Drawing Algorithm
    static void midPointCircleDraw(int x_centre,
                            int y_centre, int r)
    {
         
        int x = r, y = 0;
     
        // Printing the initial point on the
        // axes after translation
        Console.Write("(" + (x + x_centre)
                + ", " + (y + y_centre) + ")");
     
        // When radius is zero only a single
        // point will be printed
        if (r > 0)
        {
             
            Console.Write("(" + (x + x_centre)
                + ", " + (-y + y_centre) + ")");
                 
            Console.Write("(" + (y + x_centre)
                + ", " + (x + y_centre) + ")");
                 
            Console.WriteLine("(" + (-y + x_centre)
                + ", " + (x + y_centre) + ")");
        }
     
        // Initialising the value of P
        int P = 1 - r;
        while (x > y)
        {
             
            y++;
         
            // Mid-point is inside or on the perimeter
            if (P <= 0)
                P = P + 2 * y + 1;
         
            // Mid-point is outside the perimeter
            else
            {
                x--;
                P = P + 2 * y - 2 * x + 1;
            }
         
            // All the perimeter points have already
            // been printed
            if (x < y)
                break;
         
            // Printing the generated point and its
            // reflection in the other octants after
            // translation
            Console.Write("(" + (x + x_centre)
                    + ", " + (y + y_centre) + ")");
                     
            Console.Write("(" + (-x + x_centre)
                    + ", " + (y + y_centre) + ")");
                     
            Console.Write("(" + (x + x_centre) +
                    ", " + (-y + y_centre) + ")");
                     
            Console.WriteLine("(" + (-x + x_centre)
                    + ", " + (-y + y_centre) + ")");
         
            // If the generated point is on the
            // line x = y then the perimeter points
            // have already been printed
            if (x != y)
            {
                Console.Write("(" + (y + x_centre)
                    + ", " + (x + y_centre) + ")");
                         
                Console.Write("(" + (-y + x_centre)
                    + ", " + (x + y_centre) + ")");
                         
                Console.Write("(" + (y + x_centre)
                    + ", " + (-x + y_centre) + ")");
                         
                Console.WriteLine("(" + (-y + x_centre)
                    + ", " + (-x + y_centre) +")");
            }
        }
    }
     
    // Driver code
    public static void Main()
    {
         
        // To draw a circle of radius
        // 3 centered at (0, 0)
        midPointCircleDraw(0, 0, 3);
    }
}
 
// This code is contributed by nitin mittal.


PHP




<?php
// PHP program for implementing
// Mid-Point Circle Drawing Algorithm
 
// Implementing Mid-Point
// Circle Drawing Algorithm
function midPointCircleDraw($x_centre,
                            $y_centre,
                            $r)
{
    $x = $r;
    $y = 0;
     
    // Printing the initial
    // point on the axes
    // after translation
    echo "(",$x + $x_centre,",", $y + $y_centre,")";
     
    // When radius is zero only a single
    // point will be printed
    if ($r > 0)
    {
        echo "(",$x + $x_centre,",", -$y + $y_centre,")";
        echo "(",$y + $x_centre,",", $x + $y_centre,")";
        echo "(",-$y + $x_centre,",", $x + $y_centre,")","\n";
    }
     
    // Initializing the value of P
    $P = 1 - $r;
    while ($x > $y)
    {
        $y++;
         
        // Mid-point is inside
        // or on the perimeter
        if ($P <= 0)
            $P = $P + 2 * $y + 1;
             
        // Mid-point is outside
        // the perimeter
        else
        {
            $x--;
            $P = $P + 2 * $y -
                  2 * $x + 1;
        }
         
        // All the perimeter points
        // have already been printed
        if ($x < $y)
            break;
         
        // Printing the generated
        // point and its reflection
        // in the other octants
        // after translation
        echo "(",$x + $x_centre,",", $y + $y_centre,")";
        echo "(",-$x + $x_centre,",", $y + $y_centre,")";
        echo "(",$x +$x_centre,",", -$y + $y_centre,")";
        echo "(",-$x + $x_centre,",", -$y + $y_centre,")","\n";
         
        // If the generated point is
        // on the line x = y then
        // the perimeter points have
        // already been printed
        if ($x != $y)
        {
            echo "(",$y + $x_centre,",", $x + $y_centre,")";
            echo "(",-$y + $x_centre,",", $x + $y_centre,")";
            echo "(",$y + $x_centre,",", -$x + $y_centre,")";
            echo "(",-$y + $x_centre,",", -$x + $y_centre,")","\n";
        }
    }
}
 
    // Driver code
    // To draw a circle of radius
    // 3 centered at (0, 0)
    midPointCircleDraw(0, 0, 3);
     
// This code is contributed by nitin mittal.
?>


Javascript




<script>
// javascript program for implementing
// Mid-Point Circle Drawing Algorithm   
// Implementing Mid-Point Circle
    // Drawing Algorithm
    function midPointCircleDraw(x_centre , y_centre , r) {
 
        var x = r, y = 0;
 
        // Printing the initial point
        // on the axes after translation
        document.write("(" + (x + x_centre) + ", " + (y + y_centre) + ")");
 
        // When radius is zero only a single
        // point will be printed
        if (r > 0) {
 
            document.write("(" + (x + x_centre) + ", " + (-y + y_centre) + ")");
 
            document.write("(" + (y + x_centre) + ", " + (x + y_centre) + ")");
 
            document.write("(" + (-y + x_centre) + ", " + (x + y_centre) + ")<br/>");
        }
 
        // Initialising the value of P
        var P = 1 - r;
        while (x > y) {
 
            y++;
 
            // Mid-point is inside or on the perimeter
            if (P <= 0)
                P = P + 2 * y + 1;
 
            // Mid-point is outside the perimeter
            else {
                x--;
                P = P + 2 * y - 2 * x + 1;
            }
 
            // All the perimeter points have already
            // been printed
            if (x < y)
                break;
 
            // Printing the generated point and its
            // reflection in the other octants after
            // translation
            document.write("(" + (x + x_centre) + ", " + (y + y_centre) + ")");
 
            document.write("(" + (-x + x_centre) + ", " + (y + y_centre) + ")");
 
            document.write("(" + (x + x_centre) + ", " + (-y + y_centre) + ")");
 
            document.write("(" + (-x + x_centre) + ", " + (-y + y_centre) + ")<br/>");
 
            // If the generated point is on the
            // line x = y then the perimeter points
            // have already been printed
            if (x != y) {
 
                document.write("(" + (y + x_centre) + ", " + (x + y_centre) + ")");
 
                document.write("(" + (-y + x_centre) + ", " + (x + y_centre) + ")");
 
                document.write("(" + (y + x_centre) + ", " + (-x + y_centre) + ")");
 
                document.write("(" + (-y + x_centre) + ", " + (-x + y_centre) + ")<br/>");
            }
        }
    }
 
    // Driver code
     
 
        // To draw a circle of radius
        // 3 centered at (0, 0)
        midPointCircleDraw(0, 0, 3);
 
// This code is contributed by umadevi9616
</script>


Output: 
 

(3, 0) (3, 0) (0, 3) (0, 3)
(3, 1) (-3, 1) (3, -1) (-3, -1)
(1, 3) (-1, 3) (1, -3) (-1, -3)
(2, 2) (-2, 2) (2, -2) (-2, -2)

Time Complexity: O(x – y)
Auxiliary Space: O(1) 
References : Midpoint Circle Algorithm 
Image References : Octants of a circle, Rasterised Circle, the other images were created for this article by the geek
Thanks Tuhina Singh and Teva Zanker for improving this article. 
This article is contributed by Nabaneet Roy. If you like neveropen and would like to contribute, you can also write an article using write.geeksforgeeks.org or mail your article to review-team@geeksforgeeks.org. See your article appearing on the neveropen main page and help other Geeks.
Please write comments if you find anything incorrect, or you want to share more information about the topic discussed above.
 

Feeling lost in the world of random DSA topics, wasting time without progress? It’s time for a change! Join our DSA course, where we’ll guide you on an exciting journey to master DSA efficiently and on schedule.
Ready to dive in? Explore our Free Demo Content and join our DSA course, trusted by over 100,000 neveropen!

RELATED ARTICLES

Most Popular

Recent Comments