# Calculating the position of points in a circle

I'm having a bit of a mind blank on this at the moment. I've got a problem where I need to calculate the position of points around a central point, assuming they're all equidistant from the center and from each other.

The number of points is variable so it's `DrawCirclePoints(int x)` I'm sure there's a simple solution, but for the life of me, I just can't see it :)

• Everyone gave great answers, crazy quick, so I gave the tick to the first response :) They were all great :) Mar 14, 2011 at 16:03

Given a radius length r and an angle t in radians and a circle's center (h,k), you can calculate the coordinates of a point on the circumference as follows (this is pseudo-code, you'll have to adapt it to your language):

``````float x = r*cos(t) + h;
float y = r*sin(t) + k;
``````

A point at angle theta on the circle whose centre is `(x0,y0)` and whose radius is `r` is `(x0 + r cos theta, y0 + r sin theta)`. Now choose `theta` values evenly spaced between 0 and 2pi.

• The classic question- is value of pi 3.14 or 180? (i.e is the angle in deg or radian?) Jan 13, 2017 at 10:25
• Definitely radians. If you use degrees you need angles between 0 and 360 instead. Jan 13, 2017 at 10:35
• (The value of pi is 3.14ish regardless of how you prefer to write angles, of course. It is what it is.) Jan 13, 2017 at 10:36

Here's a solution using C#:

``````void DrawCirclePoints(int points, double radius, Point center)
{
double slice = 2 * Math.PI / points;
for (int i = 0; i < points; i++)
{
double angle = slice * i;
int newX = (int)(center.X + radius * Math.Cos(angle));
int newY = (int)(center.Y + radius * Math.Sin(angle));
Point p = new Point(newX, newY);
Console.WriteLine(p);
}
}
``````

Sample output from `DrawCirclePoints(8, 10, new Point(0,0));`:

``````{X=10,Y=0}
{X=7,Y=7}
{X=0,Y=10}
{X=-7,Y=7}
{X=-10,Y=0}
{X=-7,Y=-7}
{X=0,Y=-10}
{X=7,Y=-7}
``````

Good luck!

• Excellent! Worked great for me, I already translated it to php-cairo and works great! Mar 5, 2013 at 13:56
• am looking to do the same kind of task, however mine is depedent on the Triggertrap/SeekArc · GitHub , when a user moves the thumb , i want to place an image to indicate that selected progress of the person....all i have tried give me the points a bit off and the not a perfec Nov 8, 2015 at 19:47
• Perfect, thanks! Just what I was looking for. Dec 2, 2020 at 11:23

Placing a number in a circular path

``````// variable

let number = 12; // how many number to be placed
let size = 260; // size of circle i.e. w = h = 260
let cx= size/2; // center of x(in a circle)
let cy = size/2; // center of y(in a circle)
let r = size/2; // radius of a circle

for(let i=1; i<=number; i++) {
let ang = i*(Math.PI/(number/2));
let left = cx + (r*Math.cos(ang));
let top = cy + (r*Math.sin(ang));
console.log("top: ", top, ", left: ", left);
}
``````

Using one of the above answers as a base, here's the Java/Android example:

``````protected void onDraw(Canvas canvas) {
super.onDraw(canvas);

RectF bounds = new RectF(canvas.getClipBounds());
float centerX = bounds.centerX();
float centerY = bounds.centerY();

float angleDeg = 90f;

//draw my point at xPos/yPos
}
``````

For the sake of completion, what you describe as "position of points around a central point(assuming they're all equidistant from the center)" is nothing but "Polar Coordinates". And you are asking for way to Convert between polar and Cartesian coordinates which is given as `x = r*cos(t)`, `y = r*sin(t)`.

PHP Solution:

``````class point{
private \$x = 0;
private \$y = 0;
public function setX(\$xpos){
\$this->x = \$xpos;
}
public function setY(\$ypos){
\$this->y = \$ypos;
}
public function getX(){
return \$this->x;
}
public function getY(){
return \$this->y;
}
public function printX(){
echo \$this->x;
}
public function printY(){
echo \$this->y;
}
}
``````
``````function drawCirclePoints(\$points, \$radius, &\$center){
\$pointarray = array();
\$slice = (2*pi())/\$points;
for(\$i=0;\$i<\$points;\$i++){
\$angle = \$slice*\$i;
\$newx = (int)(\$center->getX() + (\$radius * cos(\$angle)));
\$newy = (int)(\$center->getY() + (\$radius * sin(\$angle)));
\$point = new point();
\$point->setX(\$newx);
\$point->setY(\$newy);
array_push(\$pointarray,\$point);
}
return \$pointarray;
}
``````
• I believe the parenthesis is incorrect for `\$newx` and `\$newy`, putting the coordinates way outside the circle radius. Try `\$newx = (int)(\$center->getX() + (\$radius * cos(\$angle)));` and similar for `\$newy`. Jan 16, 2017 at 17:16

Here is how I found out a point on a circle with javascript, calculating the angle (degree) from the top of the circle.

``````  const centreX = 50; // centre x of circle
const centreY = 50; // centre y of circle
const r = 20; // radius
const angleDeg = 45; // degree in angle from top
const radians = angleDeg * (Math.PI/180);
const pointY = centreY - (Math.cos(radians) * r); // specific point y on the circle for the angle
const pointX = centreX + (Math.sin(radians) * r); // specific point x on the circle for the angle
``````

I had to do this on the web, so here's a coffeescript version of @scottyab's answer above:

``````points = 8
center = {x: 0, y: 0}

drawCirclePoints = (points, radius, center) ->
slice = 2 * Math.PI / points
for i in [0...points]
angle = slice * i
newX = center.x + radius * Math.cos(angle)
newY = center.y + radius * Math.sin(angle)
point = {x: newX, y: newY}
console.log point

``````

Here is an `R` version based on the @Pirijan answer above.

``````points <- 8
center_x <- 5
center_y <- 5

drawCirclePoints <- function(points, radius, center_x, center_y) {
slice <- 2 * pi / points
angle <- slice * seq(0, points, by = 1)

newX <- center_x + radius * cos(angle)
newY <- center_y + radius * sin(angle)

plot(newX, newY)
}

``````

The angle between each of your points is going to be `2Pi/x` so you can say that for points `n= 0 to x-1` the angle from a defined 0 point is `2nPi/x`.

Assuming your first point is at `(r,0)` (where r is the distance from the centre point) then the positions relative to the central point will be:

``````rCos(2nPi/x),rSin(2nPi/x)
``````

Working Solution in Java:

``````import java.awt.event.*;
import java.awt.Robot;

public class CircleMouse {

/* circle stuff */
final static int RADIUS = 100;
final static int XSTART = 500;
final static int YSTART = 500;
final static int DELAYMS = 1;
final static int ROUNDS = 5;

public static void main(String args[]) {

long startT = System.currentTimeMillis();
Robot bot = null;

try {
bot = new Robot();
} catch (Exception failed) {
System.err.println("Failed instantiating Robot: " + failed);
}

int howMany = 360 * ROUNDS;
while (howMany > 0) {
int x = getX(howMany);
int y = getY(howMany);
bot.mouseMove(x, y);
bot.delay(DELAYMS);
System.out.println("x:" + x + " y:" + y);
howMany--;
}

long endT = System.currentTimeMillis();
System.out.println("Duration: " + (endT - startT));

}

/**
*
* @param angle
*            in degree
* @return
*/
private static int getX(int angle) {
int result = x.intValue();

return result;
}

/**
*
* @param angle
*            in degree
* @return
*/
private static int getY(int angle) {
int result = y.intValue();

return result;
}
}
``````

Based on the answer above from Daniel, here's my take using Python3.

``````import numpy

shape = []
slice = 2 * 3.14 / points
for i in range(points):
angle = slice * i