I have a number of spheres in 3d space which the user should be able to select with a mouse click. Now I've seen some examples around using gluUnProject so I gave it a shot. So I have (please correct me every step of the way if I'm wrong because I'm not 100% sure of any part of it):
def compute_pos(x, y, z): ''' Compute the 3d opengl coordinates for 3 coordinates. @param x,y: coordinates from canvas taken with mouse position @param z: coordinate for z-axis @return; (gl_x, gl_y, gl_z) tuple corresponding to coordinates in OpenGL context ''' modelview = numpy.matrix(glGetDoublev(GL_MODELVIEW_MATRIX)) projection = numpy.matrix(glGetDoublev(GL_PROJECTION_MATRIX)) viewport = glGetIntegerv(GL_VIEWPORT) winX = float(x) winY = float(viewport - float(y)) winZ = z return gluUnProject(winX, winY, winZ, modelview, projection, viewport)
Then, having the x and y of a mouse click and the position of the center of the sphere:
def is_picking(x, y, point): ray_start = compute_pos(x, y, -1) ray_end = compute_pos(x, y, 1) d = _compute_2d_distance( (ray_start, ray_start), (ray_end, ray_end), (point, point)) if d > CUBE_SIZE: return False d = _compute_2d_distance( (ray_start, ray_start), (ray_end, ray_end), (point, point)) if d > CUBE_SIZE: return False d = _compute_2d_distance( (ray_start, ray_start), (ray_end, ray_end), (point, point)) if d > CUBE_SIZE: return False return True
So because my 3d geometry is not good at all, I compute two points as a ray start and end point, the go into 2d 3 times eliminating one dimension at a time and compute the distance there between my line and the center of the sphere. If any of those distances are bigger than my sphere ray the it's not clicked. I think the formula for the distance is correct but just in case:
def _compute_2d_distance(p1, p2, target): ''' Compute the distance between the line defined by two points and a target point. @param p1: first point that defines the line @param p2: second point that defines the line @param target: the point to which distance needs to be computed @return: distance from point to line ''' if p2 != p1: if p2 == p1: return abs(p2 - p1) a = (p2 - p1)/(p2 - p1) b = -1 c = p1 + p1 * (p2 - p1) / (p2 - p1) d = abs(a * target + b * target + c) / math.sqrt(a * a + b * b) return d if p2 == p1: d = abs(p2 - p1) return d return None
Now the code seems to work fine in the start position. But after you use to mouse and rotate the screen even for a little bit, nothing works as expected anymore.