The abstract class Conic describes the common behavior of conic curves in 2D space and, in particular, their general characteristics. The Geom2d package provides four specific classes of conics: Geom2d_Circle, Geom2d_Ellipse, Geom2d_Hyperbola and Geom2d_Parabola. A conic is positioned in the plane with a coordinate system (gp_Ax22d object), where the origin is the center of the conic (or the apex in case of a parabola). This coordinate system is the local coordinate system of the conic. It gives the conic an explicit orientation, determining the direction in which the parameter increases along the conic. The "X Axis" of the local coordinate system also defines the origin of the parameter of the conic.
More...
|
void | SetAxis (const gp_Ax22d &theA) |
| Modifies this conic, redefining its local coordinate system partially, by assigning theA as its axis. More...
|
|
void | SetXAxis (const gp_Ax2d &theAX) |
| Assigns the origin and unit vector of axis theA to the origin of the local coordinate system of this conic and X Direction. The other unit vector of the local coordinate system of this conic is recomputed normal to theA, without changing the orientation of the local coordinate system (right-handed or left-handed). More...
|
|
void | SetYAxis (const gp_Ax2d &theAY) |
| Assigns the origin and unit vector of axis theA to the origin of the local coordinate system of this conic and Y Direction. The other unit vector of the local coordinate system of this conic is recomputed normal to theA, without changing the orientation of the local coordinate system (right-handed or left-handed). More...
|
|
void | SetLocation (const gp_Pnt2d &theP) |
| Modifies this conic, redefining its local coordinate system partially, by assigning theP as its origin. More...
|
|
gp_Ax2d | XAxis () const |
| Returns the "XAxis" of the conic. This axis defines the origin of parametrization of the conic. This axis and the "Yaxis" define the local coordinate system of the conic. -C++: return const&. More...
|
|
gp_Ax2d | YAxis () const |
| Returns the "YAxis" of the conic. The "YAxis" is perpendicular to the "Xaxis". More...
|
|
virtual Standard_Real | Eccentricity () const =0 |
| returns the eccentricity value of the conic e. e = 0 for a circle 0 < e < 1 for an ellipse (e = 0 if MajorRadius = MinorRadius) e > 1 for a hyperbola e = 1 for a parabola More...
|
|
const gp_Pnt2d & | Location () const |
| Returns the location point of the conic. For the circle, the ellipse and the hyperbola it is the center of the conic. For the parabola it is the vertex of the parabola. More...
|
|
const gp_Ax22d & | Position () const |
| Returns the local coordinates system of the conic. More...
|
|
void | Reverse () override |
| Reverses the direction of parameterization of <me>. The local coordinate system of the conic is modified. More...
|
|
virtual Standard_Real | ReversedParameter (const Standard_Real U) const override=0 |
| Returns the parameter on the reversed curve for the point of parameter U on <me>. More...
|
|
GeomAbs_Shape | Continuity () const override |
| Returns GeomAbs_CN which is the global continuity of any conic. More...
|
|
Standard_Boolean | IsCN (const Standard_Integer N) const override |
| Returns True, the order of continuity of a conic is infinite. More...
|
|
virtual void | DumpJson (Standard_OStream &theOStream, Standard_Integer theDepth=-1) const override |
| Dumps the content of me into the stream. More...
|
|
virtual Standard_Real | TransformedParameter (const Standard_Real U, const gp_Trsf2d &T) const |
| Computes the parameter on the curve transformed by T for the point of parameter U on this curve. Note: this function generally returns U but it can be redefined (for example, on a line). More...
|
|
virtual Standard_Real | ParametricTransformation (const gp_Trsf2d &T) const |
| Returns the coefficient required to compute the parametric transformation of this curve when transformation T is applied. This coefficient is the ratio between the parameter of a point on this curve and the parameter of the transformed point on the new curve transformed by T. Note: this function generally returns 1. but it can be redefined (for example, on a line). More...
|
|
Handle< Geom2d_Curve > | Reversed () const |
| Creates a reversed duplicate Changes the orientation of this curve. The first and last parameters are not changed, but the parametric direction of the curve is reversed. If the curve is bounded: More...
|
|
virtual Standard_Real | FirstParameter () const =0 |
| Returns the value of the first parameter. Warnings : It can be RealFirst or RealLast from package Standard if the curve is infinite. More...
|
|
virtual Standard_Real | LastParameter () const =0 |
| Value of the last parameter. Warnings : It can be RealFirst or RealLast from package Standard if the curve is infinite. More...
|
|
virtual Standard_Boolean | IsClosed () const =0 |
| Returns true if the curve is closed. Examples : Some curves such as circle are always closed, others such as line are never closed (by definition). Some Curves such as OffsetCurve can be closed or not. These curves are considered as closed if the distance between the first point and the last point of the curve is lower or equal to the Resolution from package gp wich is a fixed criterion independant of the application. More...
|
|
virtual Standard_Boolean | IsPeriodic () const =0 |
| Returns true if the parameter of the curve is periodic. It is possible only if the curve is closed and if the following relation is satisfied : for each parametric value U the distance between the point P(u) and the point P (u + T) is lower or equal to Resolution from package gp, T is the period and must be a constant. There are three possibilities : . the curve is never periodic by definition (SegmentLine) . the curve is always periodic by definition (Circle) . the curve can be defined as periodic (BSpline). In this case a function SetPeriodic allows you to give the shape of the curve. The general rule for this case is : if a curve can be periodic or not the default periodicity set is non periodic and you have to turn (explicitly) the curve into a periodic curve if you want the curve to be periodic. More...
|
|
virtual Standard_Real | Period () const |
| Returns thne period of this curve. raises if the curve is not periodic. More...
|
|
virtual void | D0 (const Standard_Real U, gp_Pnt2d &P) const =0 |
| Returns in P the point of parameter U. If the curve is periodic then the returned point is P(U) with U = Ustart + (U - Uend) where Ustart and Uend are the parametric bounds of the curve. More...
|
|
virtual void | D1 (const Standard_Real U, gp_Pnt2d &P, gp_Vec2d &V1) const =0 |
| Returns the point P of parameter U and the first derivative V1. Raised if the continuity of the curve is not C1. More...
|
|
virtual void | D2 (const Standard_Real U, gp_Pnt2d &P, gp_Vec2d &V1, gp_Vec2d &V2) const =0 |
| Returns the point P of parameter U, the first and second derivatives V1 and V2. Raised if the continuity of the curve is not C2. More...
|
|
virtual void | D3 (const Standard_Real U, gp_Pnt2d &P, gp_Vec2d &V1, gp_Vec2d &V2, gp_Vec2d &V3) const =0 |
| Returns the point P of parameter U, the first, the second and the third derivative. Raised if the continuity of the curve is not C3. More...
|
|
virtual gp_Vec2d | DN (const Standard_Real U, const Standard_Integer N) const =0 |
| For the point of parameter U of this curve, computes the vector corresponding to the Nth derivative. Exceptions StdFail_UndefinedDerivative if: More...
|
|
gp_Pnt2d | Value (const Standard_Real U) const |
| Computes the point of parameter U on <me>. If the curve is periodic then the returned point is P(U) with U = Ustart + (U - Uend) where Ustart and Uend are the parametric bounds of the curve. More...
|
|
void | Mirror (const gp_Pnt2d &P) |
| Performs the symmetrical transformation of a Geometry with respect to the point P which is the center of the symmetry and assigns the result to this geometric object. More...
|
|
void | Mirror (const gp_Ax2d &A) |
| Performs the symmetrical transformation of a Geometry with respect to an axis placement which is the axis of the symmetry. More...
|
|
void | Rotate (const gp_Pnt2d &P, const Standard_Real Ang) |
| Rotates a Geometry. P is the center of the rotation. Ang is the angular value of the rotation in radians. More...
|
|
void | Scale (const gp_Pnt2d &P, const Standard_Real S) |
| Scales a Geometry. S is the scaling value. More...
|
|
void | Translate (const gp_Vec2d &V) |
| Translates a Geometry. V is the vector of the tanslation. More...
|
|
void | Translate (const gp_Pnt2d &P1, const gp_Pnt2d &P2) |
| Translates a Geometry from the point P1 to the point P2. More...
|
|
virtual void | Transform (const gp_Trsf2d &T)=0 |
| Transformation of a geometric object. This tansformation can be a translation, a rotation, a symmetry, a scaling or a complex transformation obtained by combination of the previous elementaries transformations. (see class Transformation of the package Geom2d). The following transformations have the same properties as the previous ones but they don't modified the object itself. A copy of the object is returned. More...
|
|
Handle< Geom2d_Geometry > | Mirrored (const gp_Pnt2d &P) const |
|
Handle< Geom2d_Geometry > | Mirrored (const gp_Ax2d &A) const |
|
Handle< Geom2d_Geometry > | Rotated (const gp_Pnt2d &P, const Standard_Real Ang) const |
|
Handle< Geom2d_Geometry > | Scaled (const gp_Pnt2d &P, const Standard_Real S) const |
|
Handle< Geom2d_Geometry > | Transformed (const gp_Trsf2d &T) const |
|
Handle< Geom2d_Geometry > | Translated (const gp_Vec2d &V) const |
|
Handle< Geom2d_Geometry > | Translated (const gp_Pnt2d &P1, const gp_Pnt2d &P2) const |
|
virtual Handle< Geom2d_Geometry > | Copy () const =0 |
|
Public Member Functions inherited from Standard_Transient |
| Standard_Transient () |
| Empty constructor. More...
|
|
| Standard_Transient (const Standard_Transient &) |
| Copy constructor – does nothing. More...
|
|
Standard_Transient & | operator= (const Standard_Transient &) |
| Assignment operator, needed to avoid copying reference counter. More...
|
|
virtual | ~Standard_Transient () |
| Destructor must be virtual. More...
|
|
virtual void | Delete () const |
| Memory deallocator for transient classes. More...
|
|
virtual const opencascade::handle< Standard_Type > & | DynamicType () const |
| Returns a type descriptor about this object. More...
|
|
Standard_Boolean | IsInstance (const opencascade::handle< Standard_Type > &theType) const |
| Returns a true value if this is an instance of Type. More...
|
|
Standard_Boolean | IsInstance (const Standard_CString theTypeName) const |
| Returns a true value if this is an instance of TypeName. More...
|
|
Standard_Boolean | IsKind (const opencascade::handle< Standard_Type > &theType) const |
| Returns true if this is an instance of Type or an instance of any class that inherits from Type. Note that multiple inheritance is not supported by OCCT RTTI mechanism. More...
|
|
Standard_Boolean | IsKind (const Standard_CString theTypeName) const |
| Returns true if this is an instance of TypeName or an instance of any class that inherits from TypeName. Note that multiple inheritance is not supported by OCCT RTTI mechanism. More...
|
|
Standard_Transient * | This () const |
| Returns non-const pointer to this object (like const_cast). For protection against creating handle to objects allocated in stack or call from constructor, it will raise exception Standard_ProgramError if reference counter is zero. More...
|
|
Standard_Integer | GetRefCount () const |
| Get the reference counter of this object. More...
|
|
void | IncrementRefCounter () const |
| Increments the reference counter of this object. More...
|
|
Standard_Integer | DecrementRefCounter () const |
| Decrements the reference counter of this object; returns the decremented value. More...
|
|
The abstract class Conic describes the common behavior of conic curves in 2D space and, in particular, their general characteristics. The Geom2d package provides four specific classes of conics: Geom2d_Circle, Geom2d_Ellipse, Geom2d_Hyperbola and Geom2d_Parabola. A conic is positioned in the plane with a coordinate system (gp_Ax22d object), where the origin is the center of the conic (or the apex in case of a parabola). This coordinate system is the local coordinate system of the conic. It gives the conic an explicit orientation, determining the direction in which the parameter increases along the conic. The "X Axis" of the local coordinate system also defines the origin of the parameter of the conic.