Rename Plane to Plane3 for consistency with other types
This commit is contained in:
Brendan Zabarauskas
parent
2ca90cb750
commit
5c3197a7fc
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@ -13,7 +13,7 @@
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// See the License for the specific language governing permissions and
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// limitations under the License.
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pub use self::plane::Plane;
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pub use self::plane::Plane3;
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pub use self::point::{Point, Point2, Point3};
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pub use self::ray::Ray3;
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@ -29,33 +29,33 @@ mod num_macros;
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/// - `n.z`: corresponds to `C` in the plane equation
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/// - `d`: the distance value, corresponding to `D` in the plane equation
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#[deriving(Clone, Eq)]
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pub struct Plane<T> {
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pub struct Plane3<T> {
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norm: Vec3<T>,
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dist: T,
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}
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impl<T:Clone + Float> Plane<T> {
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impl<T:Clone + Float> Plane3<T> {
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/// # Arguments
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///
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/// - `a`: the `x` component of the normal
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/// - `b`: the `y` component of the normal
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/// - `c`: the `z` component of the normal
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/// - `d`: the plane's distance value
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pub fn from_abcd(a: T, b: T, c: T, d: T) -> Plane<T> {
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Plane {
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pub fn from_abcd(a: T, b: T, c: T, d: T) -> Plane3<T> {
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Plane3 {
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norm: Vec3::new(a, b, c),
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dist: d,
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}
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}
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/// Construct a plane from a normal vector `n` and a distance `d`
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pub fn from_nd(norm: Vec3<T>, dist: T) -> Plane<T> {
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Plane { norm: norm, dist: dist }
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pub fn from_nd(norm: Vec3<T>, dist: T) -> Plane3<T> {
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Plane3 { norm: norm, dist: dist }
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}
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/// Construct a plane from the components of a four-dimensional vector
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pub fn from_vec4(vec: Vec4<T>) -> Plane<T> {
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Plane::from_abcd(vec.x.clone(), vec.y.clone(), vec.z.clone(), vec.w.clone())
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pub fn from_vec4(vec: Vec4<T>) -> Plane3<T> {
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Plane3::from_abcd(vec.x.clone(), vec.y.clone(), vec.z.clone(), vec.w.clone())
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}
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/// Compute the distance from the plane to the point
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@ -79,11 +79,11 @@ impl<T:Clone + Float> Plane<T> {
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}
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}
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impl<T:Clone + Float> Plane<T> {
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impl<T:Clone + Float> Plane3<T> {
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/// Constructs a plane that passes through the the three points `a`, `b` and `c`
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pub fn from_3p(a: Point3<T>,
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b: Point3<T>,
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c: Point3<T>) -> Option<Plane<T>> {
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c: Point3<T>) -> Option<Plane3<T>> {
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// create two vectors that run parallel to the plane
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let v0 = b.as_vec().sub_v(a.as_vec());
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let v1 = c.as_vec().sub_v(a.as_vec());
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@ -97,7 +97,7 @@ impl<T:Clone + Float> Plane<T> {
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norm.normalize_self();
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let dist = -a.as_vec().dot(&norm);
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Some(Plane::from_nd(norm, dist))
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Some(Plane3::from_nd(norm, dist))
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}
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}
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@ -107,7 +107,7 @@ impl<T:Clone + Float> Plane<T> {
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///
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/// - `Some(r)`: The ray `r` where the planes intersect.
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/// - `None`: No valid intersection was found. The planes are probably parallel.
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pub fn intersection_2pl(&self, other: &Plane<T>) -> Option<Ray3<T>> {
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pub fn intersection_2pl(&self, other: &Plane3<T>) -> Option<Ray3<T>> {
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let ray_dir = self.norm.cross(&other.norm);
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if ray_dir.approx_eq(&Vec3::zero::<T>()) {
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@ -115,7 +115,7 @@ impl<T:Clone + Float> Plane<T> {
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} else {
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// The end-point of the ray is at the three-plane intersection between
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// `self`, `other`, and a tempory plane positioned at the origin
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do Plane::from_nd(ray_dir.clone(), zero!(T)).intersection_3pl(self, other).map |&ray_pos| {
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do Plane3::from_nd(ray_dir.clone(), zero!(T)).intersection_3pl(self, other).map |&ray_pos| {
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Ray3 {
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pos: ray_pos.clone(),
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dir: ray_dir.clone(),
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@ -131,7 +131,7 @@ impl<T:Clone + Float> Plane<T> {
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/// - `Some(p)`: The position vector `p` where the planes intersect.
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/// - `None`: No valid intersection was found. The normals of the three
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/// planes are probably coplanar.
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pub fn intersection_3pl(&self, other_a: &Plane<T>, other_b: &Plane<T>) -> Option<Point3<T>> {
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pub fn intersection_3pl(&self, other_a: &Plane3<T>, other_b: &Plane3<T>) -> Option<Point3<T>> {
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let mx = Mat3::new(self.norm.x.clone(), other_a.norm.x.clone(), other_b.norm.x.clone(),
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self.norm.y.clone(), other_a.norm.y.clone(), other_b.norm.y.clone(),
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self.norm.z.clone(), other_a.norm.z.clone(), other_b.norm.z.clone());
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@ -145,25 +145,25 @@ impl<T:Clone + Float> Plane<T> {
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}
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}
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impl<T:Clone + Eq + ApproxEq<T>> ApproxEq<T> for Plane<T> {
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impl<T:Clone + Eq + ApproxEq<T>> ApproxEq<T> for Plane3<T> {
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#[inline]
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pub fn approx_epsilon() -> T {
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ApproxEq::approx_epsilon::<T,T>()
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}
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#[inline]
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pub fn approx_eq(&self, other: &Plane<T>) -> bool {
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pub fn approx_eq(&self, other: &Plane3<T>) -> bool {
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self.approx_eq_eps(other, &ApproxEq::approx_epsilon::<T,T>())
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}
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#[inline]
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pub fn approx_eq_eps(&self, other: &Plane<T>, epsilon: &T) -> bool {
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pub fn approx_eq_eps(&self, other: &Plane3<T>, epsilon: &T) -> bool {
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self.norm.approx_eq_eps(&other.norm, epsilon) &&
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self.dist.approx_eq_eps(&other.dist, epsilon)
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}
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}
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impl<T> ToStr for Plane<T> {
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impl<T> ToStr for Plane3<T> {
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pub fn to_str(&self) -> ~str {
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fmt!("%?x + %?y + %?z + %? = 0", self.norm.x, self.norm.y, self.norm.z, self.dist)
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}
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@ -176,26 +176,26 @@ mod tests {
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#[test]
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fn test_from_3p() {
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assert_eq!(Plane::from_3p(Point3::new(5f, 0f, 5f),
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assert_eq!(Plane3::from_3p(Point3::new(5f, 0f, 5f),
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Point3::new(5f, 5f, 5f),
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Point3::new(5f, 0f, -1f)), Some(Plane::from_abcd(-1f, 0f, 0f, 5f)));
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Point3::new(5f, 0f, -1f)), Some(Plane3::from_abcd(-1f, 0f, 0f, 5f)));
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assert_eq!(Plane::from_3p(Point3::new(0f, 5f, -5f),
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assert_eq!(Plane3::from_3p(Point3::new(0f, 5f, -5f),
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Point3::new(0f, 5f, 0f),
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Point3::new(0f, 5f, 5f)), None); // The points are parallel
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}
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#[test]
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fn test_plane_intersection_3pl() {
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let p0 = Plane::from_abcd(1.0, 0.0, 0.0, 1.0);
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let p1 = Plane::from_abcd(0.0, -1.0, 0.0, 2.0);
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let p2 = Plane::from_abcd(0.0, 0.0, 1.0, 1.0);
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let p0 = Plane3::from_abcd(1.0, 0.0, 0.0, 1.0);
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let p1 = Plane3::from_abcd(0.0, -1.0, 0.0, 2.0);
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let p2 = Plane3::from_abcd(0.0, 0.0, 1.0, 1.0);
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assert_eq!(p0.intersection_3pl(&p1, &p2), Some(Point3::new(1.0, -2.0, 1.0)));
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}
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#[test]
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fn test_to_str() {
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assert_eq!(Plane::from_abcd(1.0, 2.0, 3.0, 4.0).to_str(), ~"1x + 2y + 3z + 4 = 0");
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assert_eq!(Plane3::from_abcd(1.0, 2.0, 3.0, 4.0).to_str(), ~"1x + 2y + 3z + 4 = 0");
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}
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}
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@ -14,19 +14,19 @@
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// limitations under the License.
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use core::Mat4;
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use geom::{Plane, Point3};
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use geom::{Plane3, Point3};
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#[path = "../num_macros.rs"]
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mod num_macros;
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#[deriving(Clone, Eq)]
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pub struct Frustum<T> {
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left: Plane<T>,
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right: Plane<T>,
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bottom: Plane<T>,
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top: Plane<T>,
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near: Plane<T>,
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far: Plane<T>,
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left: Plane3<T>,
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right: Plane3<T>,
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bottom: Plane3<T>,
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top: Plane3<T>,
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near: Plane3<T>,
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far: Plane3<T>,
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}
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#[deriving(Clone, Eq)]
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@ -43,9 +43,9 @@ pub struct FrustumPoints<T> {
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impl<T:Clone + Float> Frustum<T> {
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/// Constructs a frustum
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pub fn from_planes(left: Plane<T>, right: Plane<T>,
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bottom: Plane<T>, top: Plane<T>,
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near: Plane<T>, far: Plane<T>) -> Frustum<T> {
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pub fn from_planes(left: Plane3<T>, right: Plane3<T>,
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bottom: Plane3<T>, top: Plane3<T>,
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near: Plane3<T>, far: Plane3<T>) -> Frustum<T> {
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Frustum {
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left: left,
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right: right,
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@ -59,23 +59,23 @@ impl<T:Clone + Float> Frustum<T> {
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/// Extracts frustum planes from a projection matrix
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pub fn from_matrix(mat: Mat4<T>) -> Frustum<T> {
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Frustum {
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left: Plane::from_vec4(mat.row(3).add_v(&mat.row(0)).normalize()),
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right: Plane::from_vec4(mat.row(3).sub_v(&mat.row(0)).normalize()),
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bottom: Plane::from_vec4(mat.row(3).add_v(&mat.row(1)).normalize()),
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top: Plane::from_vec4(mat.row(3).sub_v(&mat.row(1)).normalize()),
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near: Plane::from_vec4(mat.row(3).add_v(&mat.row(2)).normalize()),
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far: Plane::from_vec4(mat.row(3).sub_v(&mat.row(2)).normalize()),
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left: Plane3::from_vec4(mat.row(3).add_v(&mat.row(0)).normalize()),
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right: Plane3::from_vec4(mat.row(3).sub_v(&mat.row(0)).normalize()),
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bottom: Plane3::from_vec4(mat.row(3).add_v(&mat.row(1)).normalize()),
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top: Plane3::from_vec4(mat.row(3).sub_v(&mat.row(1)).normalize()),
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near: Plane3::from_vec4(mat.row(3).add_v(&mat.row(2)).normalize()),
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far: Plane3::from_vec4(mat.row(3).sub_v(&mat.row(2)).normalize()),
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}
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}
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pub fn base() -> Frustum<T> {
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Frustum {
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left: Plane::from_abcd( one!(T), zero!(T), zero!(T), one!(T)),
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right: Plane::from_abcd(-one!(T), zero!(T), zero!(T), one!(T)),
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bottom: Plane::from_abcd( zero!(T), one!(T), zero!(T), one!(T)),
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top: Plane::from_abcd( zero!(T), -one!(T), zero!(T), one!(T)),
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near: Plane::from_abcd( zero!(T), zero!(T), -one!(T), one!(T)),
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far: Plane::from_abcd( zero!(T), zero!(T), one!(T), one!(T)),
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left: Plane3::from_abcd( one!(T), zero!(T), zero!(T), one!(T)),
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right: Plane3::from_abcd(-one!(T), zero!(T), zero!(T), one!(T)),
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bottom: Plane3::from_abcd( zero!(T), one!(T), zero!(T), one!(T)),
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top: Plane3::from_abcd( zero!(T), -one!(T), zero!(T), one!(T)),
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near: Plane3::from_abcd( zero!(T), zero!(T), -one!(T), one!(T)),
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far: Plane3::from_abcd( zero!(T), zero!(T), one!(T), one!(T)),
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}
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}
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}
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@ -14,7 +14,7 @@
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// limitations under the License.
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use core::Mat4;
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use geom::Plane;
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use geom::Plane3;
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use world::Frustum;
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#[path = "../num_macros.rs"]
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@ -253,12 +253,12 @@ impl<T:Clone + Float> Projection<T> for Perspective<T> {
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let theta_t = (self.top / self.far).atan();
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Frustum {
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left: Plane::from_abcd(theta_l.cos(), zero!(T), theta_l.sin(), zero!(T)),
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right: Plane::from_abcd(theta_r.cos(), zero!(T), theta_r.sin(), zero!(T)),
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bottom: Plane::from_abcd(zero!(T), theta_b.cos(), theta_b.sin(), zero!(T)),
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top: Plane::from_abcd(zero!(T), theta_t.cos(), theta_t.sin(), zero!(T)),
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near: Plane::from_abcd(zero!(T), zero!(T), -one!(T), -self.near.clone()),
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far: Plane::from_abcd(zero!(T), zero!(T), one!(T), self.far.clone()),
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left: Plane3::from_abcd(theta_l.cos(), zero!(T), theta_l.sin(), zero!(T)),
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right: Plane3::from_abcd(theta_r.cos(), zero!(T), theta_r.sin(), zero!(T)),
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bottom: Plane3::from_abcd(zero!(T), theta_b.cos(), theta_b.sin(), zero!(T)),
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top: Plane3::from_abcd(zero!(T), theta_t.cos(), theta_t.sin(), zero!(T)),
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near: Plane3::from_abcd(zero!(T), zero!(T), -one!(T), -self.near.clone()),
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far: Plane3::from_abcd(zero!(T), zero!(T), one!(T), self.far.clone()),
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}
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}
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}
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@ -317,12 +317,12 @@ impl<T:Clone + Float> Projection<T> for Ortho<T> {
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pub fn to_frustum(&self) -> Result<Frustum<T>, ~str> {
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do self.if_valid {
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Frustum {
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left: Plane::from_abcd(one!(T), zero!(T), zero!(T), self.left.clone()),
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right: Plane::from_abcd(-one!(T), zero!(T), zero!(T), self.right.clone()),
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bottom: Plane::from_abcd(zero!(T), one!(T), zero!(T), self.bottom.clone()),
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top: Plane::from_abcd(zero!(T), -one!(T), zero!(T), self.top.clone()),
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near: Plane::from_abcd(zero!(T), zero!(T), -one!(T), self.near.clone()),
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far: Plane::from_abcd(zero!(T), zero!(T), one!(T),self.far.clone()),
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left: Plane3::from_abcd(one!(T), zero!(T), zero!(T), self.left.clone()),
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right: Plane3::from_abcd(-one!(T), zero!(T), zero!(T), self.right.clone()),
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bottom: Plane3::from_abcd(zero!(T), one!(T), zero!(T), self.bottom.clone()),
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top: Plane3::from_abcd(zero!(T), -one!(T), zero!(T), self.top.clone()),
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near: Plane3::from_abcd(zero!(T), zero!(T), -one!(T), self.near.clone()),
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far: Plane3::from_abcd(zero!(T), zero!(T), one!(T),self.far.clone()),
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}
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}
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}
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