/** * \file GeodesicExact.hpp * \brief Header for GeographicLib::GeodesicExact class * * Copyright (c) Charles Karney (2012-2019) and licensed * under the MIT/X11 License. For more information, see * https://geographiclib.sourceforge.io/ **********************************************************************/ #if !defined(GEOGRAPHICLIB_GEODESICEXACT_HPP) #define GEOGRAPHICLIB_GEODESICEXACT_HPP 1 #include #include #if !defined(GEOGRAPHICLIB_GEODESICEXACT_ORDER) /** * The order of the expansions used by GeodesicExact. **********************************************************************/ # define GEOGRAPHICLIB_GEODESICEXACT_ORDER 30 #endif namespace GeographicLib { class GeodesicLineExact; /** * \brief Exact geodesic calculations * * The equations for geodesics on an ellipsoid can be expressed in terms of * incomplete elliptic integrals. The Geodesic class expands these integrals * in a series in the flattening \e f and this provides an accurate solution * for \e f ∈ [-0.01, 0.01]. The GeodesicExact class computes the * ellitpic integrals directly and so provides a solution which is valid for * all \e f. However, in practice, its use should be limited to about * b/\e a ∈ [0.01, 100] or \e f ∈ [−99, 0.99]. * * For the WGS84 ellipsoid, these classes are 2--3 times \e slower than the * series solution and 2--3 times \e less \e accurate (because it's less easy * to control round-off errors with the elliptic integral formulation); i.e., * the error is about 40 nm (40 nanometers) instead of 15 nm. However the * error in the series solution scales as f⁷ while the * error in the elliptic integral solution depends weakly on \e f. If the * quarter meridian distance is 10000 km and the ratio b/\e a = 1 * − \e f is varied then the approximate maximum error (expressed as a * distance) is

   *       1 - f  error (nm)
   *       1/128     387
   *       1/64      345
   *       1/32      269
   *       1/16      210
   *       1/8       115
   *       1/4        69
   *       1/2        36
   *         1        15
   *         2        25
   *         4        96
   *         8       318
   *        16       985
   *        32      2352
   *        64      6008
   *       128     19024
   *

* * The computation of the area in these classes is via a 30th order series. * This gives accurate results for b/\e a ∈ [1/2, 2]; the * accuracy is about 8 decimal digits for b/\e a ∈ [1/4, 4]. * * See \ref geodellip for the formulation. See the documentation on the * Geodesic class for additional information on the geodesic problems. * * Example of use: * \include example-GeodesicExact.cpp * * GeodSolve is a command-line utility * providing access to the functionality of GeodesicExact and * GeodesicLineExact (via the -E option). **********************************************************************/ class GEOGRAPHICLIB_EXPORT GeodesicExact { private: typedef Math::real real; friend class GeodesicLineExact; static const int nC4_ = GEOGRAPHICLIB_GEODESICEXACT_ORDER; static const int nC4x_ = (nC4_ * (nC4_ + 1)) / 2; static const unsigned maxit1_ = 20; unsigned maxit2_; real tiny_, tol0_, tol1_, tol2_, tolb_, xthresh_; enum captype { CAP_NONE = 0U, CAP_E = 1U<<0, // Skip 1U<<1 for compatibility with Geodesic (not required) CAP_D = 1U<<2, CAP_H = 1U<<3, CAP_C4 = 1U<<4, CAP_ALL = 0x1FU, CAP_MASK = CAP_ALL, OUT_ALL = 0x7F80U, OUT_MASK = 0xFF80U, // Includes LONG_UNROLL }; static real CosSeries(real sinx, real cosx, const real c[], int n); static real Astroid(real x, real y); real _a, _f, _f1, _e2, _ep2, _n, _b, _c2, _etol2; real _C4x[nC4x_]; void Lengths(const EllipticFunction& E, real sig12, real ssig1, real csig1, real dn1, real ssig2, real csig2, real dn2, real cbet1, real cbet2, unsigned outmask, real& s12s, real& m12a, real& m0, real& M12, real& M21) const; real InverseStart(EllipticFunction& E, real sbet1, real cbet1, real dn1, real sbet2, real cbet2, real dn2, real lam12, real slam12, real clam12, real& salp1, real& calp1, real& salp2, real& calp2, real& dnm) const; real Lambda12(real sbet1, real cbet1, real dn1, real sbet2, real cbet2, real dn2, real salp1, real calp1, real slam120, real clam120, real& salp2, real& calp2, real& sig12, real& ssig1, real& csig1, real& ssig2, real& csig2, EllipticFunction& E, real& domg12, bool diffp, real& dlam12) const; real GenInverse(real lat1, real lon1, real lat2, real lon2, unsigned outmask, real& s12, real& salp1, real& calp1, real& salp2, real& calp2, real& m12, real& M12, real& M21, real& S12) const; // These are Maxima generated functions to provide series approximations to // the integrals for the area. void C4coeff(); void C4f(real k2, real c[]) const; // Large coefficients are split so that lo contains the low 52 bits and hi // the rest. This choice avoids double rounding with doubles and higher // precision types. float coefficients will suffer double rounding; // however the accuracy is already lousy for floats. static Math::real reale(long long hi, long long lo) { using std::ldexp; return ldexp(real(hi), 52) + lo; } public: /** * Bit masks for what calculations to do. These masks do double duty. * They signify to the GeodesicLineExact::GeodesicLineExact constructor and * to GeodesicExact::Line what capabilities should be included in the * GeodesicLineExact object. They also specify which results to return in * the general routines GeodesicExact::GenDirect and * GeodesicExact::GenInverse routines. GeodesicLineExact::mask is a * duplication of this enum. **********************************************************************/ enum mask { /** * No capabilities, no output. * @hideinitializer **********************************************************************/ NONE = 0U, /** * Calculate latitude \e lat2. (It's not necessary to include this as a * capability to GeodesicLineExact because this is included by default.) * @hideinitializer **********************************************************************/ LATITUDE = 1U<<7 | CAP_NONE, /** * Calculate longitude \e lon2. * @hideinitializer **********************************************************************/ LONGITUDE = 1U<<8 | CAP_H, /** * Calculate azimuths \e azi1 and \e azi2. (It's not necessary to * include this as a capability to GeodesicLineExact because this is * included by default.) * @hideinitializer **********************************************************************/ AZIMUTH = 1U<<9 | CAP_NONE, /** * Calculate distance \e s12. * @hideinitializer **********************************************************************/ DISTANCE = 1U<<10 | CAP_E, /** * Allow distance \e s12 to be used as input in the direct geodesic * problem. * @hideinitializer **********************************************************************/ DISTANCE_IN = 1U<<11 | CAP_E, /** * Calculate reduced length \e m12. * @hideinitializer **********************************************************************/ REDUCEDLENGTH = 1U<<12 | CAP_D, /** * Calculate geodesic scales \e M12 and \e M21. * @hideinitializer **********************************************************************/ GEODESICSCALE = 1U<<13 | CAP_D, /** * Calculate area \e S12. * @hideinitializer **********************************************************************/ AREA = 1U<<14 | CAP_C4, /** * Unroll \e lon2 in the direct calculation. * @hideinitializer **********************************************************************/ LONG_UNROLL = 1U<<15, /** * All capabilities, calculate everything. (LONG_UNROLL is not * included in this mask.) * @hideinitializer **********************************************************************/ ALL = OUT_ALL| CAP_ALL, }; /** \name Constructor **********************************************************************/ ///@{ /** * Constructor for a ellipsoid with * * @param[in] a equatorial radius (meters). * @param[in] f flattening of ellipsoid. Setting \e f = 0 gives a sphere. * Negative \e f gives a prolate ellipsoid. * @exception GeographicErr if \e a or (1 − \e f) \e a is not * positive. **********************************************************************/ GeodesicExact(real a, real f); ///@} /** \name Direct geodesic problem specified in terms of distance. **********************************************************************/ ///@{ /** * Perform the direct geodesic calculation where the length of the geodesic * is specified in terms of distance. * * @param[in] lat1 latitude of point 1 (degrees). * @param[in] lon1 longitude of point 1 (degrees). * @param[in] azi1 azimuth at point 1 (degrees). * @param[in] s12 distance between point 1 and point 2 (meters); it can be * signed. * @param[out] lat2 latitude of point 2 (degrees). * @param[out] lon2 longitude of point 2 (degrees). * @param[out] azi2 (forward) azimuth at point 2 (degrees). * @param[out] m12 reduced length of geodesic (meters). * @param[out] M12 geodesic scale of point 2 relative to point 1 * (dimensionless). * @param[out] M21 geodesic scale of point 1 relative to point 2 * (dimensionless). * @param[out] S12 area under the geodesic (meters²). * @return \e a12 arc length of between point 1 and point 2 (degrees). * * \e lat1 should be in the range [−90°, 90°]. The values of * \e lon2 and \e azi2 returned are in the range [−180°, * 180°]. * * If either point is at a pole, the azimuth is defined by keeping the * longitude fixed, writing \e lat = ±(90° − ε), * and taking the limit ε → 0+. An arc length greater that * 180° signifies a geodesic which is not a shortest path. (For a * prolate ellipsoid, an additional condition is necessary for a shortest * path: the longitudinal extent must not exceed of 180°.) * * The following functions are overloaded versions of GeodesicExact::Direct * which omit some of the output parameters. Note, however, that the arc * length is always computed and returned as the function value. **********************************************************************/ Math::real Direct(real lat1, real lon1, real azi1, real s12, real& lat2, real& lon2, real& azi2, real& m12, real& M12, real& M21, real& S12) const { real t; return GenDirect(lat1, lon1, azi1, false, s12, LATITUDE | LONGITUDE | AZIMUTH | REDUCEDLENGTH | GEODESICSCALE | AREA, lat2, lon2, azi2, t, m12, M12, M21, S12); } /** * See the documentation for GeodesicExact::Direct. **********************************************************************/ Math::real Direct(real lat1, real lon1, real azi1, real s12, real& lat2, real& lon2) const { real t; return GenDirect(lat1, lon1, azi1, false, s12, LATITUDE | LONGITUDE, lat2, lon2, t, t, t, t, t, t); } /** * See the documentation for GeodesicExact::Direct. **********************************************************************/ Math::real Direct(real lat1, real lon1, real azi1, real s12, real& lat2, real& lon2, real& azi2) const { real t; return GenDirect(lat1, lon1, azi1, false, s12, LATITUDE | LONGITUDE | AZIMUTH, lat2, lon2, azi2, t, t, t, t, t); } /** * See the documentation for GeodesicExact::Direct. **********************************************************************/ Math::real Direct(real lat1, real lon1, real azi1, real s12, real& lat2, real& lon2, real& azi2, real& m12) const { real t; return GenDirect(lat1, lon1, azi1, false, s12, LATITUDE | LONGITUDE | AZIMUTH | REDUCEDLENGTH, lat2, lon2, azi2, t, m12, t, t, t); } /** * See the documentation for GeodesicExact::Direct. **********************************************************************/ Math::real Direct(real lat1, real lon1, real azi1, real s12, real& lat2, real& lon2, real& azi2, real& M12, real& M21) const { real t; return GenDirect(lat1, lon1, azi1, false, s12, LATITUDE | LONGITUDE | AZIMUTH | GEODESICSCALE, lat2, lon2, azi2, t, t, M12, M21, t); } /** * See the documentation for GeodesicExact::Direct. **********************************************************************/ Math::real Direct(real lat1, real lon1, real azi1, real s12, real& lat2, real& lon2, real& azi2, real& m12, real& M12, real& M21) const { real t; return GenDirect(lat1, lon1, azi1, false, s12, LATITUDE | LONGITUDE | AZIMUTH | REDUCEDLENGTH | GEODESICSCALE, lat2, lon2, azi2, t, m12, M12, M21, t); } ///@} /** \name Direct geodesic problem specified in terms of arc length. **********************************************************************/ ///@{ /** * Perform the direct geodesic calculation where the length of the geodesic * is specified in terms of arc length. * * @param[in] lat1 latitude of point 1 (degrees). * @param[in] lon1 longitude of point 1 (degrees). * @param[in] azi1 azimuth at point 1 (degrees). * @param[in] a12 arc length between point 1 and point 2 (degrees); it can * be signed. * @param[out] lat2 latitude of point 2 (degrees). * @param[out] lon2 longitude of point 2 (degrees). * @param[out] azi2 (forward) azimuth at point 2 (degrees). * @param[out] s12 distance between point 1 and point 2 (meters). * @param[out] m12 reduced length of geodesic (meters). * @param[out] M12 geodesic scale of point 2 relative to point 1 * (dimensionless). * @param[out] M21 geodesic scale of point 1 relative to point 2 * (dimensionless). * @param[out] S12 area under the geodesic (meters²). * * \e lat1 should be in the range [−90°, 90°]. The values of * \e lon2 and \e azi2 returned are in the range [−180°, * 180°]. * * If either point is at a pole, the azimuth is defined by keeping the * longitude fixed, writing \e lat = ±(90° − ε), * and taking the limit ε → 0+. An arc length greater that * 180° signifies a geodesic which is not a shortest path. (For a * prolate ellipsoid, an additional condition is necessary for a shortest * path: the longitudinal extent must not exceed of 180°.) * * The following functions are overloaded versions of GeodesicExact::Direct * which omit some of the output parameters. **********************************************************************/ void ArcDirect(real lat1, real lon1, real azi1, real a12, real& lat2, real& lon2, real& azi2, real& s12, real& m12, real& M12, real& M21, real& S12) const { GenDirect(lat1, lon1, azi1, true, a12, LATITUDE | LONGITUDE | AZIMUTH | DISTANCE | REDUCEDLENGTH | GEODESICSCALE | AREA, lat2, lon2, azi2, s12, m12, M12, M21, S12); } /** * See the documentation for GeodesicExact::ArcDirect. **********************************************************************/ void ArcDirect(real lat1, real lon1, real azi1, real a12, real& lat2, real& lon2) const { real t; GenDirect(lat1, lon1, azi1, true, a12, LATITUDE | LONGITUDE, lat2, lon2, t, t, t, t, t, t); } /** * See the documentation for GeodesicExact::ArcDirect. **********************************************************************/ void ArcDirect(real lat1, real lon1, real azi1, real a12, real& lat2, real& lon2, real& azi2) const { real t; GenDirect(lat1, lon1, azi1, true, a12, LATITUDE | LONGITUDE | AZIMUTH, lat2, lon2, azi2, t, t, t, t, t); } /** * See the documentation for GeodesicExact::ArcDirect. **********************************************************************/ void ArcDirect(real lat1, real lon1, real azi1, real a12, real& lat2, real& lon2, real& azi2, real& s12) const { real t; GenDirect(lat1, lon1, azi1, true, a12, LATITUDE | LONGITUDE | AZIMUTH | DISTANCE, lat2, lon2, azi2, s12, t, t, t, t); } /** * See the documentation for GeodesicExact::ArcDirect. **********************************************************************/ void ArcDirect(real lat1, real lon1, real azi1, real a12, real& lat2, real& lon2, real& azi2, real& s12, real& m12) const { real t; GenDirect(lat1, lon1, azi1, true, a12, LATITUDE | LONGITUDE | AZIMUTH | DISTANCE | REDUCEDLENGTH, lat2, lon2, azi2, s12, m12, t, t, t); } /** * See the documentation for GeodesicExact::ArcDirect. **********************************************************************/ void ArcDirect(real lat1, real lon1, real azi1, real a12, real& lat2, real& lon2, real& azi2, real& s12, real& M12, real& M21) const { real t; GenDirect(lat1, lon1, azi1, true, a12, LATITUDE | LONGITUDE | AZIMUTH | DISTANCE | GEODESICSCALE, lat2, lon2, azi2, s12, t, M12, M21, t); } /** * See the documentation for GeodesicExact::ArcDirect. **********************************************************************/ void ArcDirect(real lat1, real lon1, real azi1, real a12, real& lat2, real& lon2, real& azi2, real& s12, real& m12, real& M12, real& M21) const { real t; GenDirect(lat1, lon1, azi1, true, a12, LATITUDE | LONGITUDE | AZIMUTH | DISTANCE | REDUCEDLENGTH | GEODESICSCALE, lat2, lon2, azi2, s12, m12, M12, M21, t); } ///@} /** \name General version of the direct geodesic solution. **********************************************************************/ ///@{ /** * The general direct geodesic calculation. GeodesicExact::Direct and * GeodesicExact::ArcDirect are defined in terms of this function. * * @param[in] lat1 latitude of point 1 (degrees). * @param[in] lon1 longitude of point 1 (degrees). * @param[in] azi1 azimuth at point 1 (degrees). * @param[in] arcmode boolean flag determining the meaning of the second * parameter. * @param[in] s12_a12 if \e arcmode is false, this is the distance between * point 1 and point 2 (meters); otherwise it is the arc length between * point 1 and point 2 (degrees); it can be signed. * @param[in] outmask a bitor'ed combination of GeodesicExact::mask values * specifying which of the following parameters should be set. * @param[out] lat2 latitude of point 2 (degrees). * @param[out] lon2 longitude of point 2 (degrees). * @param[out] azi2 (forward) azimuth at point 2 (degrees). * @param[out] s12 distance between point 1 and point 2 (meters). * @param[out] m12 reduced length of geodesic (meters). * @param[out] M12 geodesic scale of point 2 relative to point 1 * (dimensionless). * @param[out] M21 geodesic scale of point 1 relative to point 2 * (dimensionless). * @param[out] S12 area under the geodesic (meters²). * @return \e a12 arc length of between point 1 and point 2 (degrees). * * The GeodesicExact::mask values possible for \e outmask are * - \e outmask |= GeodesicExact::LATITUDE for the latitude \e lat2; * - \e outmask |= GeodesicExact::LONGITUDE for the latitude \e lon2; * - \e outmask |= GeodesicExact::AZIMUTH for the latitude \e azi2; * - \e outmask |= GeodesicExact::DISTANCE for the distance \e s12; * - \e outmask |= GeodesicExact::REDUCEDLENGTH for the reduced length \e * m12; * - \e outmask |= GeodesicExact::GEODESICSCALE for the geodesic scales \e * M12 and \e M21; * - \e outmask |= GeodesicExact::AREA for the area \e S12; * - \e outmask |= GeodesicExact::ALL for all of the above; * - \e outmask |= GeodesicExact::LONG_UNROLL to unroll \e lon2 instead of * wrapping it into the range [−180°, 180°]. * . * The function value \e a12 is always computed and returned and this * equals \e s12_a12 is \e arcmode is true. If \e outmask includes * GeodesicExact::DISTANCE and \e arcmode is false, then \e s12 = \e * s12_a12. It is not necessary to include GeodesicExact::DISTANCE_IN in * \e outmask; this is automatically included is \e arcmode is false. * * With the GeodesicExact::LONG_UNROLL bit set, the quantity \e lon2 * − \e lon1 indicates how many times and in what sense the geodesic * encircles the ellipsoid. **********************************************************************/ Math::real GenDirect(real lat1, real lon1, real azi1, bool arcmode, real s12_a12, unsigned outmask, real& lat2, real& lon2, real& azi2, real& s12, real& m12, real& M12, real& M21, real& S12) const; ///@} /** \name Inverse geodesic problem. **********************************************************************/ ///@{ /** * Perform the inverse geodesic calculation. * * @param[in] lat1 latitude of point 1 (degrees). * @param[in] lon1 longitude of point 1 (degrees). * @param[in] lat2 latitude of point 2 (degrees). * @param[in] lon2 longitude of point 2 (degrees). * @param[out] s12 distance between point 1 and point 2 (meters). * @param[out] azi1 azimuth at point 1 (degrees). * @param[out] azi2 (forward) azimuth at point 2 (degrees). * @param[out] m12 reduced length of geodesic (meters). * @param[out] M12 geodesic scale of point 2 relative to point 1 * (dimensionless). * @param[out] M21 geodesic scale of point 1 relative to point 2 * (dimensionless). * @param[out] S12 area under the geodesic (meters²). * @return \e a12 arc length of between point 1 and point 2 (degrees). * * \e lat1 and \e lat2 should be in the range [−90°, 90°]. * The values of \e azi1 and \e azi2 returned are in the range * [−180°, 180°]. * * If either point is at a pole, the azimuth is defined by keeping the * longitude fixed, writing \e lat = ±(90° − ε), * and taking the limit ε → 0+. * * The following functions are overloaded versions of * GeodesicExact::Inverse which omit some of the output parameters. Note, * however, that the arc length is always computed and returned as the * function value. **********************************************************************/ Math::real Inverse(real lat1, real lon1, real lat2, real lon2, real& s12, real& azi1, real& azi2, real& m12, real& M12, real& M21, real& S12) const { return GenInverse(lat1, lon1, lat2, lon2, DISTANCE | AZIMUTH | REDUCEDLENGTH | GEODESICSCALE | AREA, s12, azi1, azi2, m12, M12, M21, S12); } /** * See the documentation for GeodesicExact::Inverse. **********************************************************************/ Math::real Inverse(real lat1, real lon1, real lat2, real lon2, real& s12) const { real t; return GenInverse(lat1, lon1, lat2, lon2, DISTANCE, s12, t, t, t, t, t, t); } /** * See the documentation for GeodesicExact::Inverse. **********************************************************************/ Math::real Inverse(real lat1, real lon1, real lat2, real lon2, real& azi1, real& azi2) const { real t; return GenInverse(lat1, lon1, lat2, lon2, AZIMUTH, t, azi1, azi2, t, t, t, t); } /** * See the documentation for GeodesicExact::Inverse. **********************************************************************/ Math::real Inverse(real lat1, real lon1, real lat2, real lon2, real& s12, real& azi1, real& azi2) const { real t; return GenInverse(lat1, lon1, lat2, lon2, DISTANCE | AZIMUTH, s12, azi1, azi2, t, t, t, t); } /** * See the documentation for GeodesicExact::Inverse. **********************************************************************/ Math::real Inverse(real lat1, real lon1, real lat2, real lon2, real& s12, real& azi1, real& azi2, real& m12) const { real t; return GenInverse(lat1, lon1, lat2, lon2, DISTANCE | AZIMUTH | REDUCEDLENGTH, s12, azi1, azi2, m12, t, t, t); } /** * See the documentation for GeodesicExact::Inverse. **********************************************************************/ Math::real Inverse(real lat1, real lon1, real lat2, real lon2, real& s12, real& azi1, real& azi2, real& M12, real& M21) const { real t; return GenInverse(lat1, lon1, lat2, lon2, DISTANCE | AZIMUTH | GEODESICSCALE, s12, azi1, azi2, t, M12, M21, t); } /** * See the documentation for GeodesicExact::Inverse. **********************************************************************/ Math::real Inverse(real lat1, real lon1, real lat2, real lon2, real& s12, real& azi1, real& azi2, real& m12, real& M12, real& M21) const { real t; return GenInverse(lat1, lon1, lat2, lon2, DISTANCE | AZIMUTH | REDUCEDLENGTH | GEODESICSCALE, s12, azi1, azi2, m12, M12, M21, t); } ///@} /** \name General version of inverse geodesic solution. **********************************************************************/ ///@{ /** * The general inverse geodesic calculation. GeodesicExact::Inverse is * defined in terms of this function. * * @param[in] lat1 latitude of point 1 (degrees). * @param[in] lon1 longitude of point 1 (degrees). * @param[in] lat2 latitude of point 2 (degrees). * @param[in] lon2 longitude of point 2 (degrees). * @param[in] outmask a bitor'ed combination of GeodesicExact::mask values * specifying which of the following parameters should be set. * @param[out] s12 distance between point 1 and point 2 (meters). * @param[out] azi1 azimuth at point 1 (degrees). * @param[out] azi2 (forward) azimuth at point 2 (degrees). * @param[out] m12 reduced length of geodesic (meters). * @param[out] M12 geodesic scale of point 2 relative to point 1 * (dimensionless). * @param[out] M21 geodesic scale of point 1 relative to point 2 * (dimensionless). * @param[out] S12 area under the geodesic (meters²). * @return \e a12 arc length of between point 1 and point 2 (degrees). * * The GeodesicExact::mask values possible for \e outmask are * - \e outmask |= GeodesicExact::DISTANCE for the distance \e s12; * - \e outmask |= GeodesicExact::AZIMUTH for the latitude \e azi2; * - \e outmask |= GeodesicExact::REDUCEDLENGTH for the reduced length \e * m12; * - \e outmask |= GeodesicExact::GEODESICSCALE for the geodesic scales \e * M12 and \e M21; * - \e outmask |= GeodesicExact::AREA for the area \e S12; * - \e outmask |= GeodesicExact::ALL for all of the above. * . * The arc length is always computed and returned as the function value. **********************************************************************/ Math::real GenInverse(real lat1, real lon1, real lat2, real lon2, unsigned outmask, real& s12, real& azi1, real& azi2, real& m12, real& M12, real& M21, real& S12) const; ///@} /** \name Interface to GeodesicLineExact. **********************************************************************/ ///@{ /** * Set up to compute several points on a single geodesic. * * @param[in] lat1 latitude of point 1 (degrees). * @param[in] lon1 longitude of point 1 (degrees). * @param[in] azi1 azimuth at point 1 (degrees). * @param[in] caps bitor'ed combination of GeodesicExact::mask values * specifying the capabilities the GeodesicLineExact object should * possess, i.e., which quantities can be returned in calls to * GeodesicLineExact::Position. * @return a GeodesicLineExact object. * * \e lat1 should be in the range [−90°, 90°]. * * The GeodesicExact::mask values are * - \e caps |= GeodesicExact::LATITUDE for the latitude \e lat2; this is * added automatically; * - \e caps |= GeodesicExact::LONGITUDE for the latitude \e lon2; * - \e caps |= GeodesicExact::AZIMUTH for the azimuth \e azi2; this is * added automatically; * - \e caps |= GeodesicExact::DISTANCE for the distance \e s12; * - \e caps |= GeodesicExact::REDUCEDLENGTH for the reduced length \e m12; * - \e caps |= GeodesicExact::GEODESICSCALE for the geodesic scales \e M12 * and \e M21; * - \e caps |= GeodesicExact::AREA for the area \e S12; * - \e caps |= GeodesicExact::DISTANCE_IN permits the length of the * geodesic to be given in terms of \e s12; without this capability the * length can only be specified in terms of arc length; * - \e caps |= GeodesicExact::ALL for all of the above. * . * The default value of \e caps is GeodesicExact::ALL which turns on all * the capabilities. * * If the point is at a pole, the azimuth is defined by keeping \e lon1 * fixed, writing \e lat1 = ±(90 − ε), and taking the * limit ε → 0+. **********************************************************************/ GeodesicLineExact Line(real lat1, real lon1, real azi1, unsigned caps = ALL) const; /** * Define a GeodesicLineExact in terms of the inverse geodesic problem. * * @param[in] lat1 latitude of point 1 (degrees). * @param[in] lon1 longitude of point 1 (degrees). * @param[in] lat2 latitude of point 2 (degrees). * @param[in] lon2 longitude of point 2 (degrees). * @param[in] caps bitor'ed combination of GeodesicExact::mask values * specifying the capabilities the GeodesicLineExact object should * possess, i.e., which quantities can be returned in calls to * GeodesicLineExact::Position. * @return a GeodesicLineExact object. * * This function sets point 3 of the GeodesicLineExact to correspond to * point 2 of the inverse geodesic problem. * * \e lat1 and \e lat2 should be in the range [−90°, 90°]. **********************************************************************/ GeodesicLineExact InverseLine(real lat1, real lon1, real lat2, real lon2, unsigned caps = ALL) const; /** * Define a GeodesicLineExact in terms of the direct geodesic problem * specified in terms of distance. * * @param[in] lat1 latitude of point 1 (degrees). * @param[in] lon1 longitude of point 1 (degrees). * @param[in] azi1 azimuth at point 1 (degrees). * @param[in] s12 distance between point 1 and point 2 (meters); it can be * negative. * @param[in] caps bitor'ed combination of GeodesicExact::mask values * specifying the capabilities the GeodesicLineExact object should * possess, i.e., which quantities can be returned in calls to * GeodesicLineExact::Position. * @return a GeodesicLineExact object. * * This function sets point 3 of the GeodesicLineExact to correspond to * point 2 of the direct geodesic problem. * * \e lat1 should be in the range [−90°, 90°]. **********************************************************************/ GeodesicLineExact DirectLine(real lat1, real lon1, real azi1, real s12, unsigned caps = ALL) const; /** * Define a GeodesicLineExact in terms of the direct geodesic problem * specified in terms of arc length. * * @param[in] lat1 latitude of point 1 (degrees). * @param[in] lon1 longitude of point 1 (degrees). * @param[in] azi1 azimuth at point 1 (degrees). * @param[in] a12 arc length between point 1 and point 2 (degrees); it can * be negative. * @param[in] caps bitor'ed combination of GeodesicExact::mask values * specifying the capabilities the GeodesicLineExact object should * possess, i.e., which quantities can be returned in calls to * GeodesicLineExact::Position. * @return a GeodesicLineExact object. * * This function sets point 3 of the GeodesicLineExact to correspond to * point 2 of the direct geodesic problem. * * \e lat1 should be in the range [−90°, 90°]. **********************************************************************/ GeodesicLineExact ArcDirectLine(real lat1, real lon1, real azi1, real a12, unsigned caps = ALL) const; /** * Define a GeodesicLineExact in terms of the direct geodesic problem * specified in terms of either distance or arc length. * * @param[in] lat1 latitude of point 1 (degrees). * @param[in] lon1 longitude of point 1 (degrees). * @param[in] azi1 azimuth at point 1 (degrees). * @param[in] arcmode boolean flag determining the meaning of the \e * s12_a12. * @param[in] s12_a12 if \e arcmode is false, this is the distance between * point 1 and point 2 (meters); otherwise it is the arc length between * point 1 and point 2 (degrees); it can be negative. * @param[in] caps bitor'ed combination of GeodesicExact::mask values * specifying the capabilities the GeodesicLineExact object should * possess, i.e., which quantities can be returned in calls to * GeodesicLineExact::Position. * @return a GeodesicLineExact object. * * This function sets point 3 of the GeodesicLineExact to correspond to * point 2 of the direct geodesic problem. * * \e lat1 should be in the range [−90°, 90°]. **********************************************************************/ GeodesicLineExact GenDirectLine(real lat1, real lon1, real azi1, bool arcmode, real s12_a12, unsigned caps = ALL) const; ///@} /** \name Inspector functions. **********************************************************************/ ///@{ /** * @return \e a the equatorial radius of the ellipsoid (meters). This is * the value used in the constructor. **********************************************************************/ Math::real EquatorialRadius() const { return _a; } /** * @return \e f the flattening of the ellipsoid. This is the * value used in the constructor. **********************************************************************/ Math::real Flattening() const { return _f; } /** * @return total area of ellipsoid in meters². The area of a * polygon encircling a pole can be found by adding * GeodesicExact::EllipsoidArea()/2 to the sum of \e S12 for each side of * the polygon. **********************************************************************/ Math::real EllipsoidArea() const { return 4 * Math::pi() * _c2; } /** * \deprecated An old name for EquatorialRadius(). **********************************************************************/ // GEOGRAPHICLIB_DEPRECATED("Use EquatorialRadius()") Math::real MajorRadius() const { return EquatorialRadius(); } ///@} /** * A global instantiation of GeodesicExact with the parameters for the * WGS84 ellipsoid. **********************************************************************/ static const GeodesicExact& WGS84(); }; } // namespace GeographicLib #endif // GEOGRAPHICLIB_GEODESICEXACT_HPP