# How to generate a set of points that are equidistant from each other and lie on a circle

I am trying to generate an array of n points that are equidistant from each other and lie on a circle in C. Basically, I need to be able to pass a function the number of points that I would like to generate and get back an array of points.

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It's been a really long time since I've done C/C++, so I've had a stab at this more to see how I got on with it, but here's some code that will calculate the points for you. (It's a VS2010 console application)

``````// CirclePoints.cpp : Defines the entry point for the console application.
//

#include "stdafx.h"
#include "stdio.h"
#include "math.h"

int _tmain()
{
int points = 8;

double step = ((3.14159265 * 2) / points);
double x, y, current = 0;
for (int i = 0; i < points; i++)
{

printf("point: %d x:%lf y:%lf\n", i, x, y);

current += step;
}

return 0;
}
``````
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I'm choosing this as the accepted answer because you showed me how to get the x and the y of the points, which I needed for my project. Can I have an explanation of the math? I'm only 13, so please try to keep your explanation as simple as you can. –  Shane M. Pelletier May 7 '11 at 23:43

Try something like this:

``````void make_circle(float *output, size_t num, float radius)
{
size_t i;

for(i = 0; i < num; i++)
{
const float angle = 2 * M_PI * i / num;
}
}
``````

This is untested, there might be an off-by-one hiding in the angle step calculation but it should be close.

This assumes I understood the question correctly, of course.

UPDATE: Redid the angle computation to not be incrementing, to reduce float precision loss due to repeated addition.

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Repeated additions will cause errors to accumulate - you're better off using `angle = i * 2 * M_PI / num;` in the loop. –  caf Apr 20 '11 at 12:58
Alternatively, if you don't care about minor error accumulation, you can get by computing `cos` and `sin` just once, then loop to take the powers of the complex value `cos(angle)+i*sin(angle)`. It will be a lot faster this way. –  R.. Apr 20 '11 at 13:01
@caf: Good point, fixed. –  unwind Apr 20 '11 at 13:02

Here's a solution, somewhat optimized, untested. Error can accumulate, but using `double` rather than `float` probably more than makes up for it except with extremely large values of `n`.

``````void make_circle(double *dest, size_t n, double r)
{
double x0 = cos(2*M_PI/n), y0 = sin(2*M_PI/n), x=x0, y=y0, tmp;
for (;;) {
*dest++ = r*x;
*dest++ = r*y;
if (!--n) break;
tmp = x*x0 - y*y0;
y = x*y0 + y*x0;
x = tmp;
}
}
``````
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To be really picky, for large n you will lose a little accuracy by updating x and y that way because x0 will be close to 1. You lose less accuracy by using d0 = cos(2pi/n)-1 = -2*sin(pi/n)*sin(pi/n) and then the update is tmp = xd0-yy0; y += xd0 + yx0; x += tmp; –  dmuir Apr 21 '11 at 10:57
To be fair I said you'd accumulate error for large `n`, but thanks for the improvement. :-) –  R.. Apr 21 '11 at 12:16

You have to solve this in c language:

In an x-y Cartesian coordinate system, the circle with centre coordinates (a, b) and radius r is the set of all points (x, y) such that

(x - a)^2 + (y - b)^2 = r^2

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Looks like tag homework, that's why I didn't want to write code.... –  cacho Apr 20 '11 at 12:59
That's why I write fancy solutions and challenge the OP to explain it to their professor if they go copying it verbatim... ;-) –  R.. Apr 20 '11 at 13:10

Here's a javascript implementation that also takes an optional center point.

``````function circlePoints (radius, numPoints, centerX, centerY) {
centerX = centerX || 0;
centerY = centerY || 0;

var
step = (Math.PI * 2) / numPoints,
current = 0,
i = 0,
results = [],
x, y;

for (; i < numPoints; i += 1) {
x = centerX + Math.sin(current) * radius;
y = centerY + Math.cos(current) * radius;

results.push([x,y]);

console.log('point %d @ x:%d, y:%d', i, x, y);

current += step;
}

return results;
}
``````
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Hi, and welcome to Stack Overflow. While this should be trivial to translate to C, please adhere to the tags in future answers. This is a C-question, and should be given C- answers. –  user13500 Mar 4 '14 at 2:01