I have set P of point (3D) which are vertices of convex hull (every one). I looking for method for checking if given point p0 is NOT outside of this convex hull.
I'll have to repeat the checking it several times (for different p0). So if is possible to reuse part of computation it would be great.
On stackoverflow pages i found this: Find if a point is inside a convex hull for a set of points without computing the hull itself There are 2 aproche: First based on convex hull property - set of linear equations. Secound based on observation: "The point lies outside of the convex hull of the other points if and only if the direction of all the vectors from it to those other points are on less than one half of a circle/sphere/hypersphere around it."
Unfortunately I don't know how exactly can do it. First give me insoluble system of equations - 3 equation with n unknown (n>3). How can I sovle it? Did I do some mistake? In second approach I don't know how check this assumption.