I have a line from A to B and a circle positioned at C with the radius R.

Image

What is a good algorithm to use to check whether the line intersects the circle? And at what coordinate along the circles edge it occurred?

  • 4
    Hmm. One question: are you talking about the infinite line through A and B, or the finite line segment from A to B? – Jason S Jul 2 '09 at 19:07
  • 1
    In this case, its the finite line segment. Is "line" called something else depending on if its finite or infinite? – Mizipzor Jul 3 '09 at 13:19
  • 1
    Is there a performance requirement ? Should it be a fast method ? – chmike Jul 7 '09 at 6:32
  • At this point, no, all the algorithms here that Ive tried doesnt slow the application down noticeably. – Mizipzor Jul 7 '09 at 10:53
  • 11
    @Mizipzor yes, they are called something else: line segments. If you just say "line" it's implied an infinite one. – MestreLion Aug 6 '14 at 7:59

23 Answers 23

up vote 178 down vote accepted

Taking

  1. E is the starting point of the ray,
  2. L is the end point of the ray,
  3. C is the center of sphere you're testing against
  4. r is the radius of that sphere

Compute:
d = L - E ( Direction vector of ray, from start to end )
f = E - C ( Vector from center sphere to ray start )

Then the intersection is found by..
Plugging:
P = E + t * d
This is a parametric equation:
Px = Ex + tdx
Py = Ey + tdy
into
(x - h)2 + (y - k)2 = r2
(h,k) = center of circle.

Note: We've simplified the problem to 2D here, the solution we get applies also in 3D

to get:

  1. Expand
    x2 - 2xh + h2 + y2 - 2yk + k2 - r2 = 0
  2. Plug
    x = ex + tdx
    y = ey + tdy
    ( ex + tdx )2 - 2( ex + tdx )h + h2 + ( ey + tdy )2 - 2( ey + tdy )k + k2 - r2 = 0
  3. Explode
    ex2 + 2extdx + t2dx2 - 2exh - 2tdxh + h2 + ey2 + 2eytdy + t2dy2 - 2eyk - 2tdyk + k2 - r2 = 0
  4. Group
    t2( dx2 + dy2 ) + 2t( exdx + eydy - dxh - dyk ) + ex2 + ey2 - 2exh - 2eyk + h2 + k2 - r2 = 0
  5. Finally,
    t2( _d * _d ) + 2t( _e * _d - _d * _c ) + _e * _e - 2( _e*_c ) + _c * _c - r2 = 0
    *Where _d is the vector d and * is the dot product.*
  6. And then,
    t2( _d * _d ) + 2t( _d * ( _e - _c ) ) + ( _e - _c ) * ( _e - _c ) - r2 = 0
  7. Letting _f = _e - _c
    t2( _d * _d ) + 2t( _d * _f ) + _f * _f - r2 = 0

So we get:
t2 * (d DOT d) + 2t*( f DOT d ) + ( f DOT f - r2 ) = 0
So solving the quadratic equation:

float a = d.Dot( d ) ;
float b = 2*f.Dot( d ) ;
float c = f.Dot( f ) - r*r ;

float discriminant = b*b-4*a*c;
if( discriminant < 0 )
{
  // no intersection
}
else
{
  // ray didn't totally miss sphere,
  // so there is a solution to
  // the equation.

  discriminant = sqrt( discriminant );

  // either solution may be on or off the ray so need to test both
  // t1 is always the smaller value, because BOTH discriminant and
  // a are nonnegative.
  float t1 = (-b - discriminant)/(2*a);
  float t2 = (-b + discriminant)/(2*a);

  // 3x HIT cases:
  //          -o->             --|-->  |            |  --|->
  // Impale(t1 hit,t2 hit), Poke(t1 hit,t2>1), ExitWound(t1<0, t2 hit), 

  // 3x MISS cases:
  //       ->  o                     o ->              | -> |
  // FallShort (t1>1,t2>1), Past (t1<0,t2<0), CompletelyInside(t1<0, t2>1)

  if( t1 >= 0 && t1 <= 1 )
  {
    // t1 is the intersection, and it's closer than t2
    // (since t1 uses -b - discriminant)
    // Impale, Poke
    return true ;
  }

  // here t1 didn't intersect so we are either started
  // inside the sphere or completely past it
  if( t2 >= 0 && t2 <= 1 )
  {
    // ExitWound
    return true ;
  }

  // no intn: FallShort, Past, CompletelyInside
  return false ;
}
  • 1
    Seems to work if I do straight copy and paste, but Im looking to understand it to. In (x-h)^2+(y-k)^2=r^2 what is h and k? Is k to constant by which the line/ray increases on y over x? And what is t? Looking at the code it seems you have assumed its 1 (so its just "removed"). Do these formulas have a name or something? Maybe I can look them up in detail on Wolfram. – Mizipzor Jul 6 '09 at 12:17
  • 3
    h and k are the center of the circle that you're intersecting against. t is the parameter of the line equation. In the code, t1 and t2 are the solutions. t1 and t2 tell you "how far along the ray" the intersection happened. – bobobobo Jul 6 '09 at 13:22
  • 1
    Ok, got it. The dot product is simply computed over the three elements (x,y,z) vectors. I will switch my code to this algorithm. – chmike Jul 10 '09 at 6:23
  • 14
    P = E + t * d What is t? – Derek 朕會功夫 Jun 9 '12 at 1:49
  • 3
    Not sure why, but the code doesn't seem to work for the Impale case. It does when I add if t1 <= 0 && t1 >= -1 && t2 <= 0 && t2 >= -1 as true condition, but then it also gives a false positive on one side of the finite line, when the circle is on the "infinite" part. I don't understand the math yet, but copy/pasters, beware. – Nicolas Mommaerts Apr 3 '13 at 22:54

No one seems to consider projection, am I completely off track here?

Project the vector AC onto AB. The projected vector, AD, gives the new point D.
If the distance between D and C is smaller than (or equal to) R we have an intersection.

Like this:
Image by SchoolBoy

  • 4
    I was writing my answer based on that just as you posted this answer :) You are correct, this is a good way to check whether intersection exists. – Juozas Kontvainis Jul 3 '09 at 14:01
  • 8
    There are many details to take into consideration: does D lie between AB? Is C perpendicular distance to the line larger than the radius? All of these involve magnitude of vector, i.e. square root. – ADB Sep 1 '10 at 14:42
  • 13
    Good idea, but how do you then compute the two intersection points? – Ben Feb 29 '12 at 15:39
  • 4
    @Spider it doesn't matter. In general, since this is a variant of sphere-line intersection problem, Mizipzor's strategy is perfectly valid. CD is a projection, it is perpendicular by definition. – vaxquis Dec 7 '14 at 0:03
  • 2
    It's an old question, but there's a good resource on this and related algorithms at this website: paulbourke.net/geometry/pointlineplane – Andrew Jan 10 '15 at 11:00

I would use the algorithm to compute the distance between a point (circle center) and a line (line AB). This can then be used to determine the intersection points of the line with the circle.

Let say we have the points A, B, C. Ax and Ay are the x and y components of the A points. Same for B and C. The scalar R is the circle radius.

This algorithm requires that A, B and C are distinct points and that R is not 0.

Here is the algorithm

// compute the euclidean distance between A and B
LAB = sqrt( (Bx-Ax)²+(By-Ay)² )

// compute the direction vector D from A to B
Dx = (Bx-Ax)/LAB
Dy = (By-Ay)/LAB

// the equation of the line AB is x = Dx*t + Ax, y = Dy*t + Ay with 0 <= t <= LAB.

// compute the distance between the points A and E, where
// E is the point of AB closest the circle center (Cx, Cy)
t = Dx*(Cx-Ax) + Dy*(Cy-Ay)    

// compute the coordinates of the point E
Ex = t*Dx+Ax
Ey = t*Dy+Ay

// compute the euclidean distance between E and C
LEC = sqrt((Ex-Cx)²+(Ey-Cy)²)

// test if the line intersects the circle
if( LEC < R )
{
    // compute distance from t to circle intersection point
    dt = sqrt( R² - LEC²)

    // compute first intersection point
    Fx = (t-dt)*Dx + Ax
    Fy = (t-dt)*Dy + Ay

    // compute second intersection point
    Gx = (t+dt)*Dx + Ax
    Gy = (t+dt)*Dy + Ay
}

// else test if the line is tangent to circle
else if( LEC == R )
    // tangent point to circle is E

else
    // line doesn't touch circle
  • Thanks chmike for awesome answer – Aqib Mumtaz Nov 24 '14 at 13:32
  • if any line that is not intersecting the circle and its both point p1 and p2 are inside circle. in this case how your algorithm work?? – Prashant Dec 12 '14 at 10:33
  • 1
    You have to test t-dt and t+dt. If t-dt < 0, than p1 is inside the circle. If t+dt > 1, than p2 is inside the circle. This is true if LEC < R of course. – chmike Dec 14 '14 at 13:13
  • 2
    Because the intersection point with the circle are at "distance" t+dt and t-dt on the line. t is the point on the line closest to the center of the circle. The intersection points with the circle are at a symmetric distance from t. The intersection points are at "distances" t-dt and t+dt. I quoted distance because it it's not the euclidian distance. To get the euclidian distance from A where t=0, you have to multiply the value by LAB. – chmike May 27 '15 at 15:57
  • 1
    @Matt W You mean "How to determine if the intersection occurs outside the end points of the line section AB"? Just think about t as a measure of distance along the line. Point A is at t=0. Point B at t=LAB. When both intersection points (t1=t-td and t2=t+td) have negative values than intersections are outside the section (behind point A looking from the section side of the point). When t1 and t2 are bigger than LAB then they are outside too (this time behind B point). Intersection t1 (or t2) occurs between A and B only when t1 (or t2) it is between 0 and LAB. – Marconius Dec 8 '15 at 18:59

Okay, I won't give you code, but since you have tagged this , I don't think that will matter to you. First, you have to get a vector perpendicular to the line.

You will have an unknown variable in y = ax + c ( c will be unknown )
To solve for that, Calculate it's value when the line passes through the center of the circle.

That is,
Plug in the location of the circle center to the line equation and solve for c.
Then calculate the intersection point of the original line and its normal.

This will give you the closest point on the line to the circle.
Calculate the distance between this point and the circle center (using the magnitude of the vector).
If this is less than the radius of the circle - voila, we have an intersection!

  • 2
    That was, in fact, what I wanted. I want the theory, a google search of line-circle collision algorithm turns up only code as far as I can see. – Mizipzor Jul 2 '09 at 9:25
  • cool, glad to be of help – a_m0d Jul 2 '09 at 9:27
  • 1
    Oh, sorry - I am using the simple equation of a line with a gradient and offset (the cartesian equation). I assumed that you were storing the line as such an equation - in which case you use the negative of the gradient for k. If you don't have the line stored like this, you could calculate k as (y2-y1)/(x2-x1) – a_m0d Jul 3 '09 at 21:22
  • 1
    We don't assume that m is zero; we calculate the gradient first (so that the equation of the line then looks like y=2x+m as an example), and then once we have the gradient we can solve for m by plugging in the center of the circle for y and x. – a_m0d Jul 3 '09 at 21:24
  • 1
    +1 Awesome explanation! But I think this assumes a line, not a line segment. So, if the nearest point on this line to the circle's center wasn't between points A and B, it would still be counted. – Hassan Jun 1 '12 at 22:01

Another method uses the triangle ABC area formula. The intersection test is simpler and more efficient than the projection method, but finding the coordinates of the intersection point requires more work. At least it will be delayed to the point it is required.

The formula to compute the triangle area is : area = bh/2

where b is the base length and h is the height. We chose the segment AB to be the base so that h is the shortest distance from C, the circle center, to the line.

Since the triangle area can also be computed by a vector dot product we can determine h.

// compute the triangle area times 2 (area = area2/2)
area2 = abs( (Bx-Ax)*(Cy-Ay) - (Cx-Ax)(By-Ay) )

// compute the AB segment length
LAB = sqrt( (Bx-Ax)² + (By-Ay)² )

// compute the triangle height
h = area2/LAB

// if the line intersects the circle
if( h < R )
{
    ...
}        

UPDATE 1 :

You could optimize the code by using the fast inverse square root computation described here to get a good approximation of 1/LAB.

Computing the intersection point is not that difficult. Here it goes

// compute the line AB direction vector components
Dx = (Bx-Ax)/LAB
Dy = (By-Ay)/LAB

// compute the distance from A toward B of closest point to C
t = Dx*(Cx-Ax) + Dy*(Cy-Ay)

// t should be equal to sqrt( (Cx-Ax)² + (Cy-Ay)² - h² )

// compute the intersection point distance from t
dt = sqrt( R² - h² )

// compute first intersection point coordinate
Ex = Ax + (t-dt)*Dx
Ey = Ay + (t-dt)*Dy

// compute second intersection point coordinate
Fx = Ax + (t+dt)*Dx
Fy = Ay + (t+dt)*Dy

If h = R then the line AB is tangent to the circle and the value dt = 0 and E = F. The point coordinates are those of E and F.

You should check that A is different of B and the segment length is not null if this may happen in your application.

  • 2
    I like the simplicity in this method. Maybe I could adapt some of the surrounding code to not need the actual collision point itself, Ill see what happens if I use A or B rather than the calculated point in between. – Mizipzor Jul 7 '09 at 11:00
  • 1
    t = Dx*(Cx-Ax) + Dy*(Cy-Ax) should read t = Dx*(Cx-Ax) + Dy*(Cy-Ay) – Stonetip Jun 21 '12 at 15:02
  • This is right. Thank you for pointing it out. I corrected it in the post. – chmike Jun 22 '12 at 16:17
  • just edited -- first line calculates triangle area using a cross product, not a dot product. verified with code here: stackoverflow.com/questions/2533011/… – ericsoco Jun 1 '13 at 15:26
  • 2
    note also, the first half of this answer tests for intersection with a line, not a line segment (as asked in the question). – ericsoco Jun 21 '13 at 18:40

I wrote a small script to test intersection by projecting circle's center point on to line.

vector distVector = centerPoint - projectedPoint;
if(distVector.length() < circle.radius)
{
    double distance = circle.radius - distVector.length();
    vector moveVector = distVector.normalize() * distance;
    circle.move(moveVector);
}

http://jsfiddle.net/ercang/ornh3594/1/

If you need to check the collision with the segment, you also need to consider circle center's distance to start and end points.

vector distVector = centerPoint - startPoint;
if(distVector.length() < circle.radius)
{
    double distance = circle.radius - distVector.length();
    vector moveVector = distVector.normalize() * distance;
    circle.move(moveVector);
}

https://jsfiddle.net/ercang/menp0991/

  • Life saver. Im a mathematical moron and was having so much trouble turning any of the above answers into JS. – user5536767 Mar 4 '17 at 1:30

This solution I found seemed a little easier to follow then some of the other ones.

Taking:

p1 and p2 as the points for the line, and
c as the center point for the circle and r for the radius

I would solve for the equation of the line in slope-intercept form. However, I didn't want to have to deal with difficult equations with c as a point, so I just shifted the coordinate system over so that the circle is at 0,0

p3 = p1 - c
p4 = p2 - c

By the way, whenever I subtract points from each other I am subtracting the x's and then subtracting the y's, and putting them into a new point, just in case someone didn't know.

Anyway, I now solve for the equation of the line with p3 and p4:

m = (p4_y - p3_y) / (p4_x - p3) (the underscore is an attempt at subscript)
y = mx + b
y - mx = b (just put in a point for x and y, and insert the m we found)

Ok. Now I need to set these equations equal. First I need to solve the circle's equation for x

x^2 + y^2 = r^2
y^2 = r^2 - x^2
y = sqrt(r^2 - x^2)

Then I set them equal:

mx + b = sqrt(r^2 - x^2)

And solve for the quadratic equation (0 = ax^2 + bx + c):

(mx + b)^2 = r^2 - x^2
(mx)^2 + 2mbx + b^2 = r^2 - x^2
0 = m^2 * x^2 + x^2 + 2mbx + b^2 - r^2
0 = (m^2 + 1) * x^2 + 2mbx + b^2 - r^2

Now I have my a, b, and c.

a = m^2 + 1
b = 2mb
c = b^2 - r^2

So I put this into the quadratic formula:

(-b ± sqrt(b^2 - 4ac)) / 2a

And substitute in by values then simplify as much as possible:

(-2mb ± sqrt(b^2 - 4ac)) / 2a
(-2mb ± sqrt((-2mb)^2 - 4(m^2 + 1)(b^2 - r^2))) / 2(m^2 + 1)
(-2mb ± sqrt(4m^2 * b^2 - 4(m^2 * b^2 - m^2 * r^2 + b^2 - r^2))) / 2m^2 + 2
(-2mb ± sqrt(4 * (m^2 * b^2 - (m^2 * b^2 - m^2 * r^2 + b^2 - r^2))))/ 2m^2 + 2
(-2mb ± sqrt(4 * (m^2 * b^2 - m^2 * b^2 + m^2 * r^2 - b^2 + r^2)))/ 2m^2 + 2
(-2mb ± sqrt(4 * (m^2 * r^2 - b^2 + r^2)))/ 2m^2 + 2
(-2mb ± sqrt(4) * sqrt(m^2 * r^2 - b^2 + r^2))/ 2m^2 + 2
(-2mb ± 2 * sqrt(m^2 * r^2 - b^2 + r^2))/ 2m^2 + 2
(-2mb ± 2 * sqrt(m^2 * r^2 + r^2 - b^2))/ 2m^2 + 2
(-2mb ± 2 * sqrt(r^2 * (m^2 + 1) - b^2))/ 2m^2 + 2

This is almost as far as it will simplify. Finally, separate out to equations with the ±:

(-2mb + 2 * sqrt(r^2 * (m^2 + 1) - b^2))/ 2m^2 + 2 or     
(-2mb - 2 * sqrt(r^2 * (m^2 + 1) - b^2))/ 2m^2 + 2 

Then simply plug the result of both of those equations into the x in mx + b. For clarity, I wrote some JavaScript code to show how to use this:

function interceptOnCircle(p1,p2,c,r){
    //p1 is the first line point
    //p2 is the second line point
    //c is the circle's center
    //r is the circle's radius

    var p3 = {x:p1.x - c.x, y:p1.y - c.y} //shifted line points
    var p4 = {x:p2.x - c.x, y:p2.y - c.y}

    var m = (p4.y - p3.y) / (p4.x - p3.x); //slope of the line
    var b = p3.y - m * p3.x; //y-intercept of line

    var underRadical = Math.pow((Math.pow(r,2)*(Math.pow(m,2)+1)),2)-Math.pow(b,2)); //the value under the square root sign 

    if (underRadical < 0){
    //line completely missed
        return false;
    } else {
        var t1 = (-2*m*b+2*Math.sqrt(underRadical))/(2 * Math.pow(m,2) + 2); //one of the intercept x's
        var t2 = (-2*m*b-2*Math.sqrt(underRadical))/(2 * Math.pow(m,2) + 2); //other intercept's x
        var i1 = {x:t1,y:m*t1+b} //intercept point 1
        var i2 = {x:t2,y:m*t2+b} //intercept point 2
        return [i1,i2];
    }
}

I hope this helps!

P.S. If anyone finds any errors or has any suggestions, please comment. I am very new and welcome all help/suggestions.

  • If possible, also post with some sample values so that we can quickly grasp the flow. – prabindh Mar 1 '14 at 5:01
  • With underRadical extra ')' – byJeevan Feb 25 '16 at 6:54
  • This doesn't actually work, see the answer by @Duq – mclaassen Jul 6 '16 at 22:00

You can find a point on a infinite line that is nearest to circle center by projecting vector AC onto vector AB. Calculate the distance between that point and circle center. If it is greater that R, there is no intersection. If the distance is equal to R, line is a tangent of the circle and the point nearest to circle center is actually the intersection point. If distance less that R, then there are 2 intersection points. They lie at the same distance from the point nearest to circle center. That distance can easily be calculated using Pythagorean theorem. Here's algorithm in pseudocode:

{
dX = bX - aX;
dY = bY - aY;
if ((dX == 0) && (dY == 0))
  {
  // A and B are the same points, no way to calculate intersection
  return;
  }

dl = (dX * dX + dY * dY);
t = ((cX - aX) * dX + (cY - aY) * dY) / dl;

// point on a line nearest to circle center
nearestX = aX + t * dX;
nearestY = aY + t * dY;

dist = point_dist(nearestX, nearestY, cX, cY);

if (dist == R)
  {
  // line segment touches circle; one intersection point
  iX = nearestX;
  iY = nearestY;

  if (t < 0 || t > 1)
    {
    // intersection point is not actually within line segment
    }
  }
else if (dist < R)
  {
  // two possible intersection points

  dt = sqrt(R * R - dist * dist) / sqrt(dl);

  // intersection point nearest to A
  t1 = t - dt;
  i1X = aX + t1 * dX;
  i1Y = aY + t1 * dY;
  if (t1 < 0 || t1 > 1)
    {
    // intersection point is not actually within line segment
    }

  // intersection point farthest from A
  t2 = t + dt;
  i2X = aX + t2 * dX;
  i2Y = aY + t2 * dY;
  if (t2 < 0 || t2 > 1)
    {
    // intersection point is not actually within line segment
    }
  }
else
  {
  // no intersection
  }
}

EDIT: added code to check whether found intersection points actually are within line segment.

  • You missed one case since we are talking about a line segment: when the segment ends in the circle. – ADB Sep 1 '10 at 14:47
  • @ADB actually my algorithm only works for infinite lines only, not line segments. There are many cases that it does not handle with line segments. – Juozas Kontvainis Sep 2 '10 at 6:52
  • The original question was about line-segments, not circle-line intersection, which is a much easier problem. – msumme Jan 13 '17 at 18:35

Weirdly I can answer but not comment... I liked Multitaskpro's approach of shifting everything to make the centre of the circle fall on the origin. Unfortunately there are two problems in his code. First in the under-the-square-root part you need to remove the double power. So not:

var underRadical = Math.pow((Math.pow(r,2)*(Math.pow(m,2)+1)),2)-Math.pow(b,2));

but:

var underRadical = Math.pow(r,2)*(Math.pow(m,2)+1)) - Math.pow(b,2);

In the final coordinates he forgets to shift the solution back. So not:

var i1 = {x:t1,y:m*t1+b}

but:

var i1 = {x:t1+c.x, y:m*t1+b+c.y};

The whole function then becomes:

function interceptOnCircle(p1, p2, c, r) {
    //p1 is the first line point
    //p2 is the second line point
    //c is the circle's center
    //r is the circle's radius

    var p3 = {x:p1.x - c.x, y:p1.y - c.y}; //shifted line points
    var p4 = {x:p2.x - c.x, y:p2.y - c.y};

    var m = (p4.y - p3.y) / (p4.x - p3.x); //slope of the line
    var b = p3.y - m * p3.x; //y-intercept of line

    var underRadical = Math.pow(r,2)*Math.pow(m,2) + Math.pow(r,2) - Math.pow(b,2); //the value under the square root sign 

    if (underRadical < 0) {
        //line completely missed
        return false;
    } else {
        var t1 = (-m*b + Math.sqrt(underRadical))/(Math.pow(m,2) + 1); //one of the intercept x's
        var t2 = (-m*b - Math.sqrt(underRadical))/(Math.pow(m,2) + 1); //other intercept's x
        var i1 = {x:t1+c.x, y:m*t1+b+c.y}; //intercept point 1
        var i2 = {x:t2+c.x, y:m*t2+b+c.y}; //intercept point 2
        return [i1, i2];
    }
}
  • suggestions: First, have it handle the case where line segment is vertical (i.e. has infinite slope). Secondly, have it only return those points that actually fall within the range of the original line segment -- i believe it's happily returning all points that fall on the infinite line, even if those points lie outside of the line segment. – Gino Jan 12 '16 at 18:05
  • 1
    Copy pasted into js, works. +1 – mclaassen Jul 6 '16 at 22:02

You'll need some math here:

Suppose A = (Xa, Ya), B = (Xb, Yb) and C = (Xc, Yc). Any point on the line from A to B has coordinates (alpha*Xa + (1-alpha)Xb, alphaYa + (1-alpha)*Yb) = P

If the point P has distance R to C, it must be on the circle. What you want is to solve

distance(P, C) = R

that is

(alpha*Xa + (1-alpha)*Xb)^2 + (alpha*Ya + (1-alpha)*Yb)^2 = R^2
alpha^2*Xa^2 + alpha^2*Xb^2 - 2*alpha*Xb^2 + Xb^2 + alpha^2*Ya^2 + alpha^2*Yb^2 - 2*alpha*Yb^2 + Yb^2=R^2
(Xa^2 + Xb^2 + Ya^2 + Yb^2)*alpha^2 - 2*(Xb^2 + Yb^2)*alpha + (Xb^2 + Yb^2 - R^2) = 0

if you apply the ABC-formula to this equation to solve it for alpha, and compute the coordinates of P using the solution(s) for alpha, you get the intersection points, if any exist.

If you find the distance between the center of the sphere (since it's 3D I assume you mean sphere and not circle) and the line, then check if that distance is less than the radius that will do the trick.

The collision point is obviously the closest point between the line and the sphere (which will be calculated when you're calculating the distance between the sphere and the line)

Distance between a point and a line:
http://mathworld.wolfram.com/Point-LineDistance3-Dimensional.html

  • 1
    It's in 2D, not 3D; as you say, this doesn't really matter – Martijn Jul 2 '09 at 9:21
  • I'm no mathematician so I thought I'd be better outlining a general approach and leaving it to others to figure out specific maths (although I does look rather trivial) – Martin Jul 2 '09 at 9:30
  • 2
    +1 with a strong upvote. (though I would have linked to another site, the pbourke site looks confusing) All the other answers so far are overcomplicated. Although your comment "That point is also the intersection point on the line" is incorrect, there is no point that has been constructed in the computation process. – Jason S Jul 2 '09 at 19:03
  • 2
  • I explained a little better about the closest point, and linked to mathworld instead of pbourke :) – Martin Jul 2 '09 at 21:19

Here's an implementation in Javascript. My approach is to first convert the line segment into an infinite line then find the intersection point(s). From there I check if the point(s) found are on the line segment. The code is well documented, you should be able to follow along.

You can try out the code here on this live demo. The code was taken from my algorithms repo.

enter image description here

// Small epsilon value
var EPS = 0.0000001;

// point (x, y)
function Point(x, y) {
  this.x = x;
  this.y = y;
}

// Circle with center at (x,y) and radius r
function Circle(x, y, r) {
  this.x = x;
  this.y = y;
  this.r = r;
}

// A line segment (x1, y1), (x2, y2)
function LineSegment(x1, y1, x2, y2) {
  var d = Math.sqrt( (x1-x2)*(x1-x2) + (y1-y2)*(y1-y2) );
  if (d < EPS) throw 'A point is not a line segment';
  this.x1 = x1; this.y1 = y1;
  this.x2 = x2; this.y2 = y2;
}

// An infinite line defined as: ax + by = c
function Line(a, b, c) {
  this.a = a; this.b = b; this.c = c;
  // Normalize line for good measure
  if (Math.abs(b) < EPS) {
    c /= a; a = 1; b = 0;
  } else { 
    a = (Math.abs(a) < EPS) ? 0 : a / b;
    c /= b; b = 1; 
  }
}

// Given a line in standard form: ax + by = c and a circle with 
// a center at (x,y) with radius r this method finds the intersection
// of the line and the circle (if any). 
function circleLineIntersection(circle, line) {

  var a = line.a, b = line.b, c = line.c;
  var x = circle.x, y = circle.y, r = circle.r;

  // Solve for the variable x with the formulas: ax + by = c (equation of line)
  // and (x-X)^2 + (y-Y)^2 = r^2 (equation of circle where X,Y are known) and expand to obtain quadratic:
  // (a^2 + b^2)x^2 + (2abY - 2ac + - 2b^2X)x + (b^2X^2 + b^2Y^2 - 2bcY + c^2 - b^2r^2) = 0
  // Then use quadratic formula X = (-b +- sqrt(a^2 - 4ac))/2a to find the 
  // roots of the equation (if they exist) and this will tell us the intersection points

  // In general a quadratic is written as: Ax^2 + Bx + C = 0
  // (a^2 + b^2)x^2 + (2abY - 2ac + - 2b^2X)x + (b^2X^2 + b^2Y^2 - 2bcY + c^2 - b^2r^2) = 0
  var A = a*a + b*b;
  var B = 2*a*b*y - 2*a*c - 2*b*b*x;
  var C = b*b*x*x + b*b*y*y - 2*b*c*y + c*c - b*b*r*r;

  // Use quadratic formula x = (-b +- sqrt(a^2 - 4ac))/2a to find the 
  // roots of the equation (if they exist).

  var D = B*B - 4*A*C;
  var x1,y1,x2,y2;

  // Handle vertical line case with b = 0
  if (Math.abs(b) < EPS) {

    // Line equation is ax + by = c, but b = 0, so x = c/a
    x1 = c/a;

    // No intersection
    if (Math.abs(x-x1) > r) return [];

    // Vertical line is tangent to circle
    if (Math.abs((x1-r)-x) < EPS || Math.abs((x1+r)-x) < EPS)
      return [new Point(x1, y)];

    var dx = Math.abs(x1 - x);
    var dy = Math.sqrt(r*r-dx*dx);

    // Vertical line cuts through circle
    return [
      new Point(x1,y+dy),
      new Point(x1,y-dy)
    ];

  // Line is tangent to circle
  } else if (Math.abs(D) < EPS) {

    x1 = -B/(2*A);
    y1 = (c - a*x1)/b;

    return [new Point(x1,y1)];

  // No intersection
  } else if (D < 0) {

    return [];

  } else {

    D = Math.sqrt(D);

    x1 = (-B+D)/(2*A);
    y1 = (c - a*x1)/b;

    x2 = (-B-D)/(2*A);
    y2 = (c - a*x2)/b;

    return [
      new Point(x1, y1),
      new Point(x2, y2)
    ];

  }

}

// Converts a line segment to a line in general form
function segmentToGeneralForm(x1,y1,x2,y2) {
  var a = y1 - y2;
  var b = x2 - x1;
  var c = x2*y1 - x1*y2;
  return new Line(a,b,c);
}

// Checks if a point 'pt' is inside the rect defined by (x1,y1), (x2,y2)
function pointInRectangle(pt,x1,y1,x2,y2) {
  var x = Math.min(x1,x2), X = Math.max(x1,x2);
  var y = Math.min(y1,y2), Y = Math.max(y1,y2);
  return x - EPS <= pt.x && pt.x <= X + EPS &&
         y - EPS <= pt.y && pt.y <= Y + EPS;
}

// Finds the intersection(s) of a line segment and a circle
function lineSegmentCircleIntersection(segment, circle) {

  var x1 = segment.x1, y1 = segment.y1, x2 = segment.x2, y2 = segment.y2;
  var line = segmentToGeneralForm(x1,y1,x2,y2);
  var pts = circleLineIntersection(circle, line);

  // No intersection
  if (pts.length === 0) return [];

  var pt1 = pts[0];
  var includePt1 = pointInRectangle(pt1,x1,y1,x2,y2);

  // Check for unique intersection
  if (pts.length === 1) {
    if (includePt1) return [pt1];
    return [];
  }

  var pt2 = pts[1];
  var includePt2 = pointInRectangle(pt2,x1,y1,x2,y2);

  // Check for remaining intersections
  if (includePt1 && includePt2) return [pt1, pt2];
  if (includePt1) return [pt1];
  if (includePt2) return [pt2];
  return [];

}

In this post circle line collision will be checked by checking distance between circle center and point on line segment (Ipoint) that represent intersection point between normal N (Image 2) from circle center to line segment.

(https://i.stack.imgur.com/3o6do.png)Image 1. Finding vectors E and D

On image 1 one circle and one line are shown, vector A point to line start point, vector B point to line end point, vector C point to circle center. Now we must find vector E (from line start point to circle center) and vector D (from line start point to line end point) this calculation is shown on image 1.

(https://i.stack.imgur.com/7098a.png)Image 2. Finding vector X

At image 2 we can see that vector E is projected on Vector D by "dot product" of vector E and unit vector D, result of dot product is scalar Xp that represent the distance between line start point and point of intersection (Ipoint) of vector N and vector D. Next vector X is found by multiplying unit vector D and scalar Xp.

Now we need to find vector Z (vector to Ipoint), its easy its simple vector addition of vector A (start point on line) and vector X. Next we need to deal with special cases we must check is Ipoint on line segment, if its not we must find out is it left of it or right of it, we will use vector closest to determine which point is closest to circle.

(https://i.stack.imgur.com/p9WIr.png)Image 3. Finding closest point

When projection Xp is negative Ipoint is left of line segment, vector closest is equal to vector of line start point, when projection Xp is greater then magnitude of vector D then Ipoint is right of line segment then closest vector is equal to vector of line end point in any other case closest vector is equal to vector Z.

Now when we have closest vector , we need to find vector from circle center to Ipoint (dist vector), its simple we just need to subtract closest vector from center vector. Next just check if vector dist magnitude is less then circle radius if it is then they collide, if its not there is no collision.

(https://i.stack.imgur.com/QJ63q.png)Image 4. Checking for collision

For end, we can return some values for resolving collision , easiest way is to return overlap of collision (subtract radius from vector dist magnitude) and return axis of collision, its vector D. Also intersection point is vector Z if needed.

  • 2
    Welcome to Stack Overflow! Unfortunately, by including your contact details in your post, you've tripped some of the community's spam filters, hence the downvotes. We're working on getting them retracted. – Glorfindel Mar 17 at 13:13
  • I apologize, my intention was not of commercial nature . – FunDeveloper89 Mar 17 at 13:18
  • Yeah, no worries. You can leave them in your profile, that's the designated place for them. – Glorfindel Mar 17 at 13:18

If the line's coordinates are A.x, A.y and B.x, B.y and the circles center is C.x, C.y then the lines formulae are:

x = A.x * t + B.x * (1 - t)

y = A.y * t + B.y * (1 - t)

where 0<=t<=1

and the circle is

(C.x - x)^2 + (C.y - y)^2 = R^2

if you substitute x and y formulae of the line into the circles formula you get a second order equation of t and its solutions are the intersection points (if there are any). If you get a t which is smaller than 0 or greater than 1 then its not a solution but it shows that the line is 'pointing' to the direction of the circle.

Just an addition to this thread... Below is a version of the code posted by pahlevan, but for C#/XNA and tidied up a little:

    /// <summary>
    /// Intersects a line and a circle.
    /// </summary>
    /// <param name="location">the location of the circle</param>
    /// <param name="radius">the radius of the circle</param>
    /// <param name="lineFrom">the starting point of the line</param>
    /// <param name="lineTo">the ending point of the line</param>
    /// <returns>true if the line and circle intersect each other</returns>
    public static bool IntersectLineCircle(Vector2 location, float radius, Vector2 lineFrom, Vector2 lineTo)
    {
        float ab2, acab, h2;
        Vector2 ac = location - lineFrom;
        Vector2 ab = lineTo - lineFrom;
        Vector2.Dot(ref ab, ref ab, out ab2);
        Vector2.Dot(ref ac, ref ab, out acab);
        float t = acab / ab2;

        if (t < 0)
            t = 0;
        else if (t > 1)
            t = 1;

        Vector2 h = ((ab * t) + lineFrom) - location;
        Vector2.Dot(ref h, ref h, out h2);

        return (h2 <= (radius * radius));
    }

enter image description here

' VB.NET - Code

Function CheckLineSegmentCircleIntersection(x1 As Double, y1 As Double, x2 As Double, y2 As Double, xc As Double, yc As Double, r As Double) As Boolean
    Static xd As Double = 0.0F
    Static yd As Double = 0.0F
    Static t As Double = 0.0F
    Static d As Double = 0.0F
    Static dx_2_1 As Double = 0.0F
    Static dy_2_1 As Double = 0.0F

    dx_2_1 = x2 - x1
    dy_2_1 = y2 - y1

    t = ((yc - y1) * dy_2_1 + (xc - x1) * dx_2_1) / (dy_2_1 * dy_2_1 + dx_2_1 * dx_2_1)

    If 0 <= t And t <= 1 Then
        xd = x1 + t * dx_2_1
        yd = y1 + t * dy_2_1

        d = Math.Sqrt((xd - xc) * (xd - xc) + (yd - yc) * (yd - yc))
        Return d <= r
    Else
        d = Math.Sqrt((xc - x1) * (xc - x1) + (yc - y1) * (yc - y1))
        If d <= r Then
            Return True
        Else
            d = Math.Sqrt((xc - x2) * (xc - x2) + (yc - y2) * (yc - y2))
            If d <= r Then
                Return True
            Else
                Return False
            End If
        End If
    End If
End Function
  • works great! I tried it on google coordinates :) – M. Usman Khan Jan 3 at 4:11

I have created this function for iOS following the answer given by chmike

+ (NSArray *)intersectionPointsOfCircleWithCenter:(CGPoint)center withRadius:(float)radius toLinePoint1:(CGPoint)p1 andLinePoint2:(CGPoint)p2
{
    NSMutableArray *intersectionPoints = [NSMutableArray array];

    float Ax = p1.x;
    float Ay = p1.y;
    float Bx = p2.x;
    float By = p2.y;
    float Cx = center.x;
    float Cy = center.y;
    float R = radius;


    // compute the euclidean distance between A and B
    float LAB = sqrt( pow(Bx-Ax, 2)+pow(By-Ay, 2) );

    // compute the direction vector D from A to B
    float Dx = (Bx-Ax)/LAB;
    float Dy = (By-Ay)/LAB;

    // Now the line equation is x = Dx*t + Ax, y = Dy*t + Ay with 0 <= t <= 1.

    // compute the value t of the closest point to the circle center (Cx, Cy)
    float t = Dx*(Cx-Ax) + Dy*(Cy-Ay);

    // This is the projection of C on the line from A to B.

    // compute the coordinates of the point E on line and closest to C
    float Ex = t*Dx+Ax;
    float Ey = t*Dy+Ay;

    // compute the euclidean distance from E to C
    float LEC = sqrt( pow(Ex-Cx, 2)+ pow(Ey-Cy, 2) );

    // test if the line intersects the circle
    if( LEC < R )
    {
        // compute distance from t to circle intersection point
        float dt = sqrt( pow(R, 2) - pow(LEC,2) );

        // compute first intersection point
        float Fx = (t-dt)*Dx + Ax;
        float Fy = (t-dt)*Dy + Ay;

        // compute second intersection point
        float Gx = (t+dt)*Dx + Ax;
        float Gy = (t+dt)*Dy + Ay;

        [intersectionPoints addObject:[NSValue valueWithCGPoint:CGPointMake(Fx, Fy)]];
        [intersectionPoints addObject:[NSValue valueWithCGPoint:CGPointMake(Gx, Gy)]];
    }

    // else test if the line is tangent to circle
    else if( LEC == R ) {
        // tangent point to circle is E
        [intersectionPoints addObject:[NSValue valueWithCGPoint:CGPointMake(Ex, Ey)]];
    }
    else {
        // line doesn't touch circle
    }

    return intersectionPoints;
}

This Java Function returns a DVec2 Object. It takes a DVec2 for the center of the circle, the radius of the circle, and a Line.

public static DVec2 CircLine(DVec2 C, double r, Line line)
{
    DVec2 A = line.p1;
    DVec2 B = line.p2;
    DVec2 P;
    DVec2 AC = new DVec2( C );
    AC.sub(A);
    DVec2 AB = new DVec2( B );
    AB.sub(A);
    double ab2 = AB.dot(AB);
    double acab = AC.dot(AB);
    double t = acab / ab2;

    if (t < 0.0) 
        t = 0.0;
    else if (t > 1.0) 
        t = 1.0;

    //P = A + t * AB;
    P = new DVec2( AB );
    P.mul( t );
    P.add( A );

    DVec2 H = new DVec2( P );
    H.sub( C );
    double h2 = H.dot(H);
    double r2 = r * r;

    if(h2 > r2) 
        return null;
    else
        return P;
}

Another one in c# (partial Circle class). Tested and works like a charm.

public class Circle : IEquatable<Circle>
{
    // ******************************************************************
    // The center of a circle
    private Point _center;
    // The radius of a circle
    private double _radius;

   // ******************************************************************
    /// <summary>
    /// Find all intersections (0, 1, 2) of the circle with a line defined by its 2 points.
    /// Using: http://math.stackexchange.com/questions/228841/how-do-i-calculate-the-intersections-of-a-straight-line-and-a-circle
    /// Note: p is the Center.X and q is Center.Y
    /// </summary>
    /// <param name="linePoint1"></param>
    /// <param name="linePoint2"></param>
    /// <returns></returns>
    public List<Point> GetIntersections(Point linePoint1, Point linePoint2)
    {
        List<Point> intersections = new List<Point>();

        double dx = linePoint2.X - linePoint1.X;

        if (dx.AboutEquals(0)) // Straight vertical line
        {
            if (linePoint1.X.AboutEquals(Center.X - Radius) || linePoint1.X.AboutEquals(Center.X + Radius))
            {
                Point pt = new Point(linePoint1.X, Center.Y);
                intersections.Add(pt);
            }
            else if (linePoint1.X > Center.X - Radius && linePoint1.X < Center.X + Radius)
            {
                double x = linePoint1.X - Center.X;

                Point pt = new Point(linePoint1.X, Center.Y + Math.Sqrt(Radius * Radius - (x * x)));
                intersections.Add(pt);

                pt = new Point(linePoint1.X, Center.Y - Math.Sqrt(Radius * Radius - (x * x)));
                intersections.Add(pt);
            }

            return intersections;
        }

        // Line function (y = mx + b)
        double dy = linePoint2.Y - linePoint1.Y;
        double m = dy / dx;
        double b = linePoint1.Y - m * linePoint1.X;

        double A = m * m + 1;
        double B = 2 * (m * b - m * _center.Y - Center.X);
        double C = Center.X * Center.X + Center.Y * Center.Y - Radius * Radius - 2 * b * Center.Y + b * b;

        double discriminant = B * B - 4 * A * C;

        if (discriminant < 0)
        {
            return intersections; // there is no intersections
        }

        if (discriminant.AboutEquals(0)) // Tangeante (touch on 1 point only)
        {
            double x = -B / (2 * A);
            double y = m * x + b;

            intersections.Add(new Point(x, y));
        }
        else // Secant (touch on 2 points)
        {
            double x = (-B + Math.Sqrt(discriminant)) / (2 * A);
            double y = m * x + b;
            intersections.Add(new Point(x, y));

            x = (-B - Math.Sqrt(discriminant)) / (2 * A);
            y = m * x + b;
            intersections.Add(new Point(x, y));
        }

        return intersections;
    }

    // ******************************************************************
    // Get the center
    [XmlElement("Center")]
    public Point Center
    {
        get { return _center; }
        set
        {
            _center = value;
        }
    }

    // ******************************************************************
    // Get the radius
    [XmlElement]
    public double Radius
    {
        get { return _radius; }
        set { _radius = value; }
    }

    //// ******************************************************************
    //[XmlArrayItemAttribute("DoublePoint")]
    //public List<Point> Coordinates
    //{
    //    get { return _coordinates; }
    //}

    // ******************************************************************
    // Construct a circle without any specification
    public Circle()
    {
        _center.X = 0;
        _center.Y = 0;
        _radius = 0;
    }

    // ******************************************************************
    // Construct a circle without any specification
    public Circle(double radius)
    {
        _center.X = 0;
        _center.Y = 0;
        _radius = radius;
    }

    // ******************************************************************
    // Construct a circle with the specified circle
    public Circle(Circle circle)
    {
        _center = circle._center;
        _radius = circle._radius;
    }

    // ******************************************************************
    // Construct a circle with the specified center and radius
    public Circle(Point center, double radius)
    {
        _center = center;
        _radius = radius;
    }

    // ******************************************************************
    // Construct a circle based on one point
    public Circle(Point center)
    {
        _center = center;
        _radius = 0;
    }

    // ******************************************************************
    // Construct a circle based on two points
    public Circle(Point p1, Point p2)
    {
        Circle2Points(p1, p2);
    }

Required:

using System;

namespace Mathematic
{
    public static class DoubleExtension
    {
        // ******************************************************************
        // Base on Hans Passant Answer on:
        // http://stackoverflow.com/questions/2411392/double-epsilon-for-equality-greater-than-less-than-less-than-or-equal-to-gre

        /// <summary>
        /// Compare two double taking in account the double precision potential error.
        /// Take care: truncation errors accumulate on calculation. More you do, more you should increase the epsilon.
        public static bool AboutEquals(this double value1, double value2)
        {
            if (double.IsPositiveInfinity(value1))
                return double.IsPositiveInfinity(value2);

            if (double.IsNegativeInfinity(value1))
                return double.IsNegativeInfinity(value2);

            if (double.IsNaN(value1))
                return double.IsNaN(value2);

            double epsilon = Math.Max(Math.Abs(value1), Math.Abs(value2)) * 1E-15;
            return Math.Abs(value1 - value2) <= epsilon;
        }

        // ******************************************************************
        // Base on Hans Passant Answer on:
        // http://stackoverflow.com/questions/2411392/double-epsilon-for-equality-greater-than-less-than-less-than-or-equal-to-gre

        /// <summary>
        /// Compare two double taking in account the double precision potential error.
        /// Take care: truncation errors accumulate on calculation. More you do, more you should increase the epsilon.
        /// You get really better performance when you can determine the contextual epsilon first.
        /// </summary>
        /// <param name="value1"></param>
        /// <param name="value2"></param>
        /// <param name="precalculatedContextualEpsilon"></param>
        /// <returns></returns>
        public static bool AboutEquals(this double value1, double value2, double precalculatedContextualEpsilon)
        {
            if (double.IsPositiveInfinity(value1))
                return double.IsPositiveInfinity(value2);

            if (double.IsNegativeInfinity(value1))
                return double.IsNegativeInfinity(value2);

            if (double.IsNaN(value1))
                return double.IsNaN(value2);

            return Math.Abs(value1 - value2) <= precalculatedContextualEpsilon;
        }

        // ******************************************************************
        public static double GetContextualEpsilon(this double biggestPossibleContextualValue)
        {
            return biggestPossibleContextualValue * 1E-15;
        }

        // ******************************************************************
        /// <summary>
        /// Mathlab equivalent
        /// </summary>
        /// <param name="dividend"></param>
        /// <param name="divisor"></param>
        /// <returns></returns>
        public static double Mod(this double dividend, double divisor)
        {
            return dividend - System.Math.Floor(dividend / divisor) * divisor;
        }

        // ******************************************************************
    }
}

Here is good solution in JavaScript (with all required mathematics and live illustration) https://bl.ocks.org/milkbread/11000965

Though is_on function in that solution needs modifications:

function is_on(a, b, c) {
    return Math.abs(distance(a,c) + distance(c,b) - distance(a,b))<0.000001;
}

  • Thanks and FWIW I haven't downvoted. – Bugs Jun 8 '17 at 11:19

Circle is really a bad guy :) So a good way is to avoid true circle, if you can. If you are doing collision check for games you can go with some simplifications and have just 3 dot products, and a few comparisons.

I call this "fat point" or "thin circle". its kind of a ellipse with zero radius in a direction parallel to a segment. but full radius in a direction perpendicular to a segment

First, i would consider renaming and switching coordinate system to avoid excessive data:

s0s1 = B-A;
s0qp = C-A;
rSqr = r*r;

Second, index h in hvec2f means than vector must favor horisontal operations, like dot()/det(). Which means its components are to be placed in a separate xmm registers, to avoid shuffling/hadd'ing/hsub'ing. And here we go, with most performant version of simpliest collision detection for 2D game:

bool fat_point_collides_segment(const hvec2f& s0qp, const hvec2f& s0s1, const float& rSqr) {
    auto a = dot(s0s1, s0s1);
    //if( a != 0 ) // if you haven't zero-length segments omit this, as it would save you 1 _mm_comineq_ss() instruction and 1 memory fetch
    {
        auto b = dot(s0s1, s0qp);
        auto t = b / a; // length of projection of s0qp onto s0s1
        //std::cout << "t = " << t << "\n";
        if ((t >= 0) && (t <= 1)) // 
        {
            auto c = dot(s0qp, s0qp);
            auto r2 = c - a * t * t;
            return (r2 <= rSqr); // true if collides
        }
    }   
    return false;
}

I doubt you can optimize it any further. I am using it for neural-network driven car racing collision detection, to process millions of millions iteration steps.

Here is a solution written in golang. The method is similar to some other answers posted here, but not quite the same. It is easy to implement, and has been tested. Here are the steps:

  1. Translate coordinates so that the circle is at the origin.
  2. Express the line segment as parametrized functions of t for both the x and y coordinates. If t is 0, the function's values are one end point of the segment, and if t is 1, the function's values are the other end point.
  3. Solve, if possible, the quadratic equation resulting from constraining values of t that produce x, y coordinates with distances from the origin equal to the circle's radius.
  4. Throw out solutions where t is < 0 or > 1 ( <= 0 or >= 1 for an open segment). Those points are not contained in the segment.
  5. Translate back to original coordinates.

The values for A, B, and C for the quadratic are derived here, where (n-et) and (m-dt) are the equations for the line's x and y coordinates, respectively. r is the radius of the circle.

(n-et)(n-et) + (m-dt)(m-dt) = rr
nn - 2etn + etet + mm - 2mdt + dtdt = rr
(ee+dd)tt - 2(en + dm)t + nn + mm - rr = 0

Therefore A = ee+dd, B = - 2(en + dm), and C = nn + mm - rr.

Here is the golang code for the function:

package geom

import (
    "math"
)

// SegmentCircleIntersection return points of intersection between a circle and
// a line segment. The Boolean intersects returns true if one or
// more solutions exist. If only one solution exists, 
// x1 == x2 and y1 == y2.
// s1x and s1y are coordinates for one end point of the segment, and
// s2x and s2y are coordinates for the other end of the segment.
// cx and cy are the coordinates of the center of the circle and
// r is the radius of the circle.
func SegmentCircleIntersection(s1x, s1y, s2x, s2y, cx, cy, r float64) (x1, y1, x2, y2 float64, intersects bool) {
    // (n-et) and (m-dt) are expressions for the x and y coordinates
    // of a parameterized line in coordinates whose origin is the
    // center of the circle.
    // When t = 0, (n-et) == s1x - cx and (m-dt) == s1y - cy
    // When t = 1, (n-et) == s2x - cx and (m-dt) == s2y - cy.
    n := s2x - cx
    m := s2y - cy

    e := s2x - s1x
    d := s2y - s1y

    // lineFunc checks if the  t parameter is in the segment and if so
    // calculates the line point in the unshifted coordinates (adds back
    // cx and cy.
    lineFunc := func(t float64) (x, y float64, inBounds bool) {
        inBounds = t >= 0 && t <= 1 // Check bounds on closed segment
        // To check bounds for an open segment use t > 0 && t < 1
        if inBounds { // Calc coords for point in segment
            x = n - e*t + cx
            y = m - d*t + cy
        }
        return
    }

    // Since we want the points on the line distance r from the origin,
    // (n-et)(n-et) + (m-dt)(m-dt) = rr.
    // Expanding and collecting terms yeilds the following quadratic equation:
    A, B, C := e*e+d*d, -2*(e*n+m*d), n*n+m*m-r*r

    D := B*B - 4*A*C // discriminant of quadratic
    if D < 0 {
        return // No solution
    }
    D = math.Sqrt(D)

    var p1In, p2In bool
    x1, y1, p1In = lineFunc((-B + D) / (2 * A)) // First root
    if D == 0.0 {
        intersects = p1In
        x2, y2 = x1, y1
        return // Only possible solution, quadratic has one root.
    }

    x2, y2, p2In = lineFunc((-B - D) / (2 * A)) // Second root

    intersects = p1In || p2In
    if p1In == false { // Only x2, y2 may be valid solutions
        x1, y1 = x2, y2
    } else if p2In == false { // Only x1, y1 are valid solutions
        x2, y2 = x1, y1
    }
    return
}

I tested it with this function, which confirms that solution points are within the line segment and on the circle. It makes a test segment and sweeps it around the given circle:

package geom_test

import (
    "testing"

    . "**put your package path here**"
)

func CheckEpsilon(t *testing.T, v, epsilon float64, message string) {
    if v > epsilon || v < -epsilon {
        t.Error(message, v, epsilon)
        t.FailNow()
    }
}

func TestSegmentCircleIntersection(t *testing.T) {
    epsilon := 1e-10      // Something smallish
    x1, y1 := 5.0, 2.0    // segment end point 1
    x2, y2 := 50.0, 30.0  // segment end point 2
    cx, cy := 100.0, 90.0 // center of circle
    r := 80.0

    segx, segy := x2-x1, y2-y1

    testCntr, solutionCntr := 0, 0

    for i := -100; i < 100; i++ {
        for j := -100; j < 100; j++ {
            testCntr++
            s1x, s2x := x1+float64(i), x2+float64(i)
            s1y, s2y := y1+float64(j), y2+float64(j)

            sc1x, sc1y := s1x-cx, s1y-cy
            seg1Inside := sc1x*sc1x+sc1y*sc1y < r*r
            sc2x, sc2y := s2x-cx, s2y-cy
            seg2Inside := sc2x*sc2x+sc2y*sc2y < r*r

            p1x, p1y, p2x, p2y, intersects := SegmentCircleIntersection(s1x, s1y, s2x, s2y, cx, cy, r)

            if intersects {
                solutionCntr++
                //Check if points are on circle
                c1x, c1y := p1x-cx, p1y-cy
                deltaLen1 := (c1x*c1x + c1y*c1y) - r*r
                CheckEpsilon(t, deltaLen1, epsilon, "p1 not on circle")

                c2x, c2y := p2x-cx, p2y-cy
                deltaLen2 := (c2x*c2x + c2y*c2y) - r*r
                CheckEpsilon(t, deltaLen2, epsilon, "p2 not on circle")

                // Check if points are on the line through the line segment
                // "cross product" of vector from a segment point to the point
                // and the vector for the segment should be near zero
                vp1x, vp1y := p1x-s1x, p1y-s1y
                crossProd1 := vp1x*segy - vp1y*segx
                CheckEpsilon(t, crossProd1, epsilon, "p1 not on line ")

                vp2x, vp2y := p2x-s1x, p2y-s1y
                crossProd2 := vp2x*segy - vp2y*segx
                CheckEpsilon(t, crossProd2, epsilon, "p2 not on line ")

                // Check if point is between points s1 and s2 on line
                // This means the sign of the dot prod of the segment vector
                // and point to segment end point vectors are opposite for
                // either end.
                wp1x, wp1y := p1x-s2x, p1y-s2y
                dp1v := vp1x*segx + vp1y*segy
                dp1w := wp1x*segx + wp1y*segy
                if (dp1v < 0 && dp1w < 0) || (dp1v > 0 && dp1w > 0) {
                    t.Error("point not contained in segment ", dp1v, dp1w)
                    t.FailNow()
                }

                wp2x, wp2y := p2x-s2x, p2y-s2y
                dp2v := vp2x*segx + vp2y*segy
                dp2w := wp2x*segx + wp2y*segy
                if (dp2v < 0 && dp2w < 0) || (dp2v > 0 && dp2w > 0) {
                    t.Error("point not contained in segment ", dp2v, dp2w)
                    t.FailNow()
                }

                if s1x == s2x && s2y == s1y { //Only one solution
                    // Test that one end of the segment is withing the radius of the circle
                    // and one is not
                    if seg1Inside && seg2Inside {
                        t.Error("Only one solution but both line segment ends inside")
                        t.FailNow()
                    }
                    if !seg1Inside && !seg2Inside {
                        t.Error("Only one solution but both line segment ends outside")
                        t.FailNow()
                    }

                }
            } else { // No intersection, check if both points outside or inside
                if (seg1Inside && !seg2Inside) || (!seg1Inside && seg2Inside) {
                    t.Error("No solution but only one point in radius of circle")
                    t.FailNow()
                }
            }
        }
    }
    t.Log("Tested ", testCntr, " examples and found ", solutionCntr, " solutions.")
}

Here is the output of the test:

=== RUN   TestSegmentCircleIntersection
--- PASS: TestSegmentCircleIntersection (0.00s)
    geom_test.go:105: Tested  40000  examples and found  7343  solutions.

Finally, the method is easily extendable to the case of a ray starting at one point, going through the other and extending to infinity, by only testing if t > 0 or t < 1 but not both.

I just needed that, so I came up with this solution. The language is maxscript, but it should be easily translated to any other language. sideA, sideB and CircleRadius are scalars, the rest of the variables are points as [x,y,z]. I'm assuming z=0 to solve on the plane XY

fn projectPoint p1 p2 p3 = --project  p1 perpendicular to the line p2-p3
(
    local v= normalize (p3-p2)
    local p= (p1-p2)
    p2+((dot v p)*v)
)
fn findIntersectionLineCircle CircleCenter CircleRadius LineP1 LineP2=
(
    pp=projectPoint CircleCenter LineP1 LineP2
    sideA=distance pp CircleCenter
    --use pythagoras to solve the third side
    sideB=sqrt(CircleRadius^2-sideA^2) -- this will return NaN if they don't intersect
    IntersectV=normalize (pp-CircleCenter)
    perpV=[IntersectV.y,-IntersectV.x,IntersectV.z]
    --project the point to both sides to find the solutions
    solution1=pp+(sideB*perpV)
    solution2=pp-(sideB*perpV)
    return #(solution1,solution2)
)

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