CGAL 6.1 - 2D and 3D Linear Geometry Kernel
|
AdaptableBinaryFunction
CGAL::bisector()
Operations | |
A model of this concept must provide: | |
Kernel::Plane_3 | operator() (const Kernel::Point_3 &p, const Kernel::Point_3 &q) |
constructs the bisector plane of p and q . | |
Kernel::Plane_3 | operator() (const Kernel::Plane_3 &h1, const Kernel::Plane_3 &h2) |
constructs the bisector of the two planes h1 and h2 . | |
Kernel::Plane_3 Kernel::ConstructBisector_3::operator() | ( | const Kernel::Plane_3 & | h1, |
const Kernel::Plane_3 & | h2 | ||
) |
constructs the bisector of the two planes h1
and h2
.
In the general case, the bisector has a normal vector which has the same direction as the sum of the normalized normal vectors of the two planes, and passes through the intersection of h1
and h2
. If h1
and h2
are parallel, then the bisector is defined as the plane which has the same oriented normal vector as h1
, and which is at the same distance from h1
and h2
.
Kernel::Plane_3 Kernel::ConstructBisector_3::operator() | ( | const Kernel::Point_3 & | p, |
const Kernel::Point_3 & | q | ||
) |
constructs the bisector plane of p
and q
.
The bisector is oriented in such a way that p
lies on its positive side.
p != q
.