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#ifndef __CGLA__ARITHVEC3FLOAT_H__
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#define __CGLA__ARITHVEC3FLOAT_H__
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#include "ArithVecFloat.h"
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namespace CGLA {
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template<class T, class V>
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class ArithVec3Float: public ArithVecFloat<T,V,3>
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{
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public:
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/// Construct a 3D float vector.
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ArithVec3Float(T a, T b, T c): ArithVecFloat<T,V,3>(a,b,c) {}
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/// Construct a 3D float vector.
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ArithVec3Float() {}
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/** Get the vector in spherical coordinates.
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The first argument (theta) is inclination from the vertical axis.
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The second argument (phi) is the angle of rotation about the vertical
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axis. The third argument (r) is the length of the vector. */
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void get_spherical( T&, T&, T& ) const;
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/** Assign the vector in spherical coordinates.
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The first argument (theta) is inclination from the vertical axis.
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The second argument (phi) is the angle of rotation about the vertical
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axis. The third argument (r) is the length of the vector. */
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void set_spherical( T, T, T);
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};
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/// Returns cross product of arguments
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template<class T, class V>
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inline V cross( const ArithVec3Float<T,V>& x,
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const ArithVec3Float<T,V>& y )
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{
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return V( x[1] * y[2] - x[2] * y[1],
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x[2] * y[0] - x[0] * y[2],
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x[0] * y[1] - x[1] * y[0] );
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}
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/** Compute basis of orthogonal plane.
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Given a vector Compute two vectors that are orthogonal to it and
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to each other. */
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template<class T, class V>
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void orthogonal(const ArithVec3Float<T,V>&,
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ArithVec3Float<T,V>&,
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ArithVec3Float<T,V>&);
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}
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#endif
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