new Plane(normal, distance)
A plane in Hessian Normal Form defined by
ax + by + cz + d = 0where (a, b, c) is the plane's
normal
, d is the signed
distance
to the plane, and (x, y, z) is any point on
the plane.
Name | Type | Description |
---|---|---|
normal |
Cartesian3 | The plane's normal (normalized). |
distance |
Number |
The shortest distance from the origin to the plane. The sign of
distance determines which side of the plane the origin
is on. If distance is positive, the origin is in the half-space
in the direction of the normal; if negative, the origin is in the half-space
opposite to the normal; if zero, the plane passes through the origin. |
Example:
// The plane x=0
var plane = new Cesium.Plane(Cesium.Cartesian3.UNIT_X, 0.0);
Source:
Core/Plane.js, line 35
Members
-
distance :Number
-
The shortest distance from the origin to the plane. The sign of
distance
determines which side of the plane the origin is on. Ifdistance
is positive, the origin is in the half-space in the direction of the normal; if negative, the origin is in the half-space opposite to the normal; if zero, the plane passes through the origin.Source: Core/Plane.js, line 61 -
normal :Cartesian3
-
The plane's normal.Source: Core/Plane.js, line 50
Methods
-
staticPlane.fromPointNormal(point, normal, result) → Plane
-
Creates a plane from a normal and a point on the plane.
Name Type Description point
Cartesian3 The point on the plane. normal
Cartesian3 The plane's normal (normalized). result
Plane optional The object onto which to store the result. Returns:
A new plane instance or the modified result parameter.Example:
var point = Cesium.Cartesian3.fromDegrees(-72.0, 40.0); var normal = ellipsoid.geodeticSurfaceNormal(point); var tangentPlane = Cesium.Plane.fromPointNormal(point, normal);
Source: Core/Plane.js, line 78 -
staticPlane.getPointDistance(plane, point) → Number
-
Computes the signed shortest distance of a point to a plane. The sign of the distance determines which side of the plane the point is on. If the distance is positive, the point is in the half-space in the direction of the normal; if negative, the point is in the half-space opposite to the normal; if zero, the plane passes through the point.
Name Type Description plane
Plane The plane. point
Cartesian3 The point. Returns:
The signed shortest distance of the point to the plane.Source: Core/Plane.js, line 111