public class Vector3D extends Object implements Serializable, Vector<Euclidean3D>
Instance of this class are guaranteed to be immutable.
Modifier and Type | Field and Description |
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static Vector3D |
MINUS_I
Opposite of the first canonical vector (coordinates: -1, 0, 0).
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static Vector3D |
MINUS_J
Opposite of the second canonical vector (coordinates: 0, -1, 0).
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static Vector3D |
MINUS_K
Opposite of the third canonical vector (coordinates: 0, 0, -1).
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static Vector3D |
NaN
A vector with all coordinates set to NaN.
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static Vector3D |
NEGATIVE_INFINITY
A vector with all coordinates set to negative infinity.
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static Vector3D |
PLUS_I
First canonical vector (coordinates: 1, 0, 0).
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static Vector3D |
PLUS_J
Second canonical vector (coordinates: 0, 1, 0).
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static Vector3D |
PLUS_K
Third canonical vector (coordinates: 0, 0, 1).
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static Vector3D |
POSITIVE_INFINITY
A vector with all coordinates set to positive infinity.
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static Vector3D |
ZERO
Null vector (coordinates: 0, 0, 0).
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Constructor and Description |
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Vector3D(double[] v)
Simple constructor.
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Vector3D(double alpha,
double delta)
Simple constructor.
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Vector3D(double x,
double y,
double z)
Simple constructor.
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Vector3D(double a,
Vector3D u)
Multiplicative constructor
Build a vector from another one and a scale factor.
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Vector3D(double a1,
Vector3D u1,
double a2,
Vector3D u2)
Linear constructor
Build a vector from two other ones and corresponding scale factors.
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Vector3D(double a1,
Vector3D u1,
double a2,
Vector3D u2,
double a3,
Vector3D u3)
Linear constructor
Build a vector from three other ones and corresponding scale factors.
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Vector3D(double a1,
Vector3D u1,
double a2,
Vector3D u2,
double a3,
Vector3D u3,
double a4,
Vector3D u4)
Linear constructor
Build a vector from four other ones and corresponding scale factors.
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Modifier and Type | Method and Description |
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Vector3D |
add(double factor,
Vector<Euclidean3D> v)
Add a scaled vector to the instance.
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Vector3D |
add(Vector<Euclidean3D> v)
Add a vector to the instance.
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static double |
angle(Vector3D v1,
Vector3D v2)
Compute the angular separation between two vectors.
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Vector3D |
crossProduct(Vector<Euclidean3D> v)
Compute the cross-product of the instance with another vector.
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static Vector3D |
crossProduct(Vector3D v1,
Vector3D v2)
Compute the cross-product of two vectors.
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double |
distance(Point<Euclidean3D> v)
Compute the distance between the instance and another point.
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static double |
distance(Vector3D v1,
Vector3D v2)
Compute the distance between two vectors according to the L2 norm.
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double |
distance1(Vector<Euclidean3D> v)
Compute the distance between the instance and another vector according to the L1 norm.
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static double |
distance1(Vector3D v1,
Vector3D v2)
Compute the distance between two vectors according to the L1 norm.
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double |
distanceInf(Vector<Euclidean3D> v)
Compute the distance between the instance and another vector according to the L∞ norm.
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static double |
distanceInf(Vector3D v1,
Vector3D v2)
Compute the distance between two vectors according to the L∞ norm.
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double |
distanceSq(Vector<Euclidean3D> v)
Compute the square of the distance between the instance and another vector.
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static double |
distanceSq(Vector3D v1,
Vector3D v2)
Compute the square of the distance between two vectors.
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double |
dotProduct(Vector<Euclidean3D> v)
Compute the dot-product of the instance and another vector.
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static double |
dotProduct(Vector3D v1,
Vector3D v2)
Compute the dot-product of two vectors.
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boolean |
equals(Object other)
Test for the equality of two 3D vectors.
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double |
getAlpha()
Get the azimuth of the vector.
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double |
getDelta()
Get the elevation of the vector.
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double |
getNorm()
Get the L2 norm for the vector.
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double |
getNorm1()
Get the L1 norm for the vector.
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double |
getNormInf()
Get the L∞ norm for the vector.
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double |
getNormSq()
Get the square of the norm for the vector.
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Space |
getSpace()
Get the space to which the point belongs.
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double |
getX()
Get the abscissa of the vector.
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double |
getY()
Get the ordinate of the vector.
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double |
getZ()
Get the height of the vector.
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Vector3D |
getZero()
Get the null vector of the vectorial space or origin point of the affine space.
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int |
hashCode()
Get a hashCode for the 3D vector.
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boolean |
isInfinite()
Returns true if any coordinate of this vector is infinite and none are NaN;
false otherwise
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boolean |
isNaN()
Returns true if any coordinate of this point is NaN; false otherwise
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Vector3D |
negate()
Get the opposite of the instance.
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Vector3D |
normalize()
Get a normalized vector aligned with the instance.
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Vector3D |
orthogonal()
Get a vector orthogonal to the instance.
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Vector3D |
scalarMultiply(double a)
Multiply the instance by a scalar.
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Vector3D |
subtract(double factor,
Vector<Euclidean3D> v)
Subtract a scaled vector from the instance.
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Vector3D |
subtract(Vector<Euclidean3D> v)
Subtract a vector from the instance.
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double[] |
toArray()
Get the vector coordinates as a dimension 3 array.
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String |
toString()
Get a string representation of this vector.
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String |
toString(NumberFormat format)
Get a string representation of this vector.
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public static final Vector3D ZERO
public static final Vector3D PLUS_I
public static final Vector3D MINUS_I
public static final Vector3D PLUS_J
public static final Vector3D MINUS_J
public static final Vector3D PLUS_K
public static final Vector3D MINUS_K
public static final Vector3D NaN
public static final Vector3D POSITIVE_INFINITY
public static final Vector3D NEGATIVE_INFINITY
public Vector3D(double x, double y, double z)
public Vector3D(double[] v) throws MathIllegalArgumentException
v
- coordinates arrayMathIllegalArgumentException
- if array does not have 3 elementstoArray()
public Vector3D(double alpha, double delta)
alpha
- azimuth (α) around Z
(0 is +X, π/2 is +Y, π is -X and 3π/2 is -Y)delta
- elevation (δ) above (XY) plane, from -π/2 to +π/2getAlpha()
,
getDelta()
public Vector3D(double a, Vector3D u)
a
- scale factoru
- base (unscaled) vectorpublic Vector3D(double a1, Vector3D u1, double a2, Vector3D u2)
a1
- first scale factoru1
- first base (unscaled) vectora2
- second scale factoru2
- second base (unscaled) vectorpublic Vector3D(double a1, Vector3D u1, double a2, Vector3D u2, double a3, Vector3D u3)
a1
- first scale factoru1
- first base (unscaled) vectora2
- second scale factoru2
- second base (unscaled) vectora3
- third scale factoru3
- third base (unscaled) vectorpublic Vector3D(double a1, Vector3D u1, double a2, Vector3D u2, double a3, Vector3D u3, double a4, Vector3D u4)
a1
- first scale factoru1
- first base (unscaled) vectora2
- second scale factoru2
- second base (unscaled) vectora3
- third scale factoru3
- third base (unscaled) vectora4
- fourth scale factoru4
- fourth base (unscaled) vectorpublic double getX()
Vector3D(double, double, double)
public double getY()
Vector3D(double, double, double)
public double getZ()
Vector3D(double, double, double)
public double[] toArray()
Vector3D(double[])
public Space getSpace()
getSpace
in interface Point<Euclidean3D>
public Vector3D getZero()
getZero
in interface Vector<Euclidean3D>
public double getNorm1()
getNorm1
in interface Vector<Euclidean3D>
public double getNorm()
getNorm
in interface Vector<Euclidean3D>
public double getNormSq()
getNormSq
in interface Vector<Euclidean3D>
public double getNormInf()
getNormInf
in interface Vector<Euclidean3D>
public double getAlpha()
Vector3D(double, double)
public double getDelta()
Vector3D(double, double)
public Vector3D add(Vector<Euclidean3D> v)
add
in interface Vector<Euclidean3D>
v
- vector to addpublic Vector3D add(double factor, Vector<Euclidean3D> v)
add
in interface Vector<Euclidean3D>
factor
- scale factor to apply to v before adding itv
- vector to addpublic Vector3D subtract(Vector<Euclidean3D> v)
subtract
in interface Vector<Euclidean3D>
v
- vector to subtractpublic Vector3D subtract(double factor, Vector<Euclidean3D> v)
subtract
in interface Vector<Euclidean3D>
factor
- scale factor to apply to v before subtracting itv
- vector to subtractpublic Vector3D normalize() throws MathRuntimeException
normalize
in interface Vector<Euclidean3D>
MathRuntimeException
- if the norm is zeropublic Vector3D orthogonal() throws MathRuntimeException
There are an infinite number of normalized vectors orthogonal to the instance. This method picks up one of them almost arbitrarily. It is useful when one needs to compute a reference frame with one of the axes in a predefined direction. The following example shows how to build a frame having the k axis aligned with the known vector u :
Vector3D k = u.normalize();
Vector3D i = k.orthogonal();
Vector3D j = Vector3D.crossProduct(k, i);
MathRuntimeException
- if the norm of the instance is nullpublic static double angle(Vector3D v1, Vector3D v2) throws MathRuntimeException
This method computes the angular separation between two vectors using the dot product for well separated vectors and the cross product for almost aligned vectors. This allows to have a good accuracy in all cases, even for vectors very close to each other.
v1
- first vectorv2
- second vectorMathRuntimeException
- if either vector has a null normpublic Vector3D negate()
negate
in interface Vector<Euclidean3D>
public Vector3D scalarMultiply(double a)
scalarMultiply
in interface Vector<Euclidean3D>
a
- scalarpublic boolean isNaN()
isNaN
in interface Point<Euclidean3D>
public boolean isInfinite()
isInfinite
in interface Vector<Euclidean3D>
public boolean equals(Object other)
If all coordinates of two 3D vectors are exactly the same, and none are
Double.NaN
, the two 3D vectors are considered to be equal.
NaN
coordinates are considered to affect globally the vector
and be equals to each other - i.e, if either (or all) coordinates of the
3D vector are equal to Double.NaN
, the 3D vector is equal to
NaN
.
public int hashCode()
All NaN values have the same hash code.
public double dotProduct(Vector<Euclidean3D> v)
The implementation uses specific multiplication and addition algorithms to preserve accuracy and reduce cancellation effects. It should be very accurate even for nearly orthogonal vectors.
dotProduct
in interface Vector<Euclidean3D>
v
- second vectorMathArrays.linearCombination(double, double, double, double, double, double)
public Vector3D crossProduct(Vector<Euclidean3D> v)
v
- other vectorpublic double distance1(Vector<Euclidean3D> v)
Calling this method is equivalent to calling:
q.subtract(p).getNorm1()
except that no intermediate
vector is built
distance1
in interface Vector<Euclidean3D>
v
- second vectorpublic double distance(Point<Euclidean3D> v)
distance
in interface Point<Euclidean3D>
v
- second pointpublic double distanceInf(Vector<Euclidean3D> v)
Calling this method is equivalent to calling:
q.subtract(p).getNormInf()
except that no intermediate
vector is built
distanceInf
in interface Vector<Euclidean3D>
v
- second vectorpublic double distanceSq(Vector<Euclidean3D> v)
Calling this method is equivalent to calling:
q.subtract(p).getNormSq()
except that no intermediate
vector is built
distanceSq
in interface Vector<Euclidean3D>
v
- second vectorpublic static double dotProduct(Vector3D v1, Vector3D v2)
v1
- first vectorv2
- second vectorpublic static Vector3D crossProduct(Vector3D v1, Vector3D v2)
v1
- first vectorv2
- second vectorpublic static double distance1(Vector3D v1, Vector3D v2)
Calling this method is equivalent to calling:
v1.subtract(v2).getNorm1()
except that no intermediate
vector is built
v1
- first vectorv2
- second vectorpublic static double distance(Vector3D v1, Vector3D v2)
Calling this method is equivalent to calling:
v1.subtract(v2).getNorm()
except that no intermediate
vector is built
v1
- first vectorv2
- second vectorpublic static double distanceInf(Vector3D v1, Vector3D v2)
Calling this method is equivalent to calling:
v1.subtract(v2).getNormInf()
except that no intermediate
vector is built
v1
- first vectorv2
- second vectorpublic static double distanceSq(Vector3D v1, Vector3D v2)
Calling this method is equivalent to calling:
v1.subtract(v2).getNormSq()
except that no intermediate
vector is built
v1
- first vectorv2
- second vectorpublic String toString()
public String toString(NumberFormat format)
toString
in interface Vector<Euclidean3D>
format
- the custom format for componentsCopyright © 2016–2020 Hipparchus.org. All rights reserved.