I'm trying to find the point of intersection between a sphere and a line but honestly, I don't have any idea of how to do so. Could anyone help me on this one ?
Express the line as an function of
When Write a formula for the distance to the center of the sphere (squared) in
Solve for
Solve You can get up to two solutions. Any solution where If you got a valid solution for I assumed you meant a line segment (two endpoints). If you instead want a full line (infinite length), then you could pick two points along the line (not too close), and use them. Also let Edit: I fixed the formula for 


I believe there is an inaccuracy in the solution by Markus Jarderot. Not sure what the problem is, but I'm pretty sure I translated it faithfully to code, and when I tried to find the intersection of a line segment known to cross into a sphere, I got a negative discriminant (no solutions). I found this: http://www.codeproject.com/Articles/19799/SimpleRayTracinginCPartIITrianglesIntersec, which gives a similar but slightly different derivation. I turned that into the following C# code and it works for me:



Don't have enough reputation to comment on M Katz answer, but his answer assumes that the line can go on infinitely in each direction. If you need only the line SEGMENT's intersection points, you need t1 and t2 to be less than one (based on the definition of a parameterized equation). Please see my answer in C# below:



Look up "ray sphere intersection"  the same test is used all of the time in raytracing and there's plenty of examples online, and even quite a few here on stackoverflow. 


Find the solution of the two equations in (x,y,z) describing the line and the sphere. There may be 0, 1 or 2 solutions.



You may use Wolfram Alpha to solve it in the coordinate system where the sphere is centered. In this system, the equations are: Sphere:
Straight line:
Then we ask Wolfram Alpha to solve for t: (Try it!) and after that you may change again to your original coordinate system (a simple translation) 


Here's a more concise formulation using inner products, less than 100 LOCs, and no external links. Also, the question was asked for a line, not a line segment. Assume that the sphere is centered at We set 


Or you can just find the formula of both: Use the symmetric equation to find relationship between x and y, and x and z. Then plug in y and z in terms of x into the equation of the sphere. If x gives you an imaginary result, that means the line and the sphere doesn't intersect. 

