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https://github.com/UberGames/lilium-voyager.git
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574 lines
13 KiB
C++
Executable file
574 lines
13 KiB
C++
Executable file
/*
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===========================================================================
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Copyright (C) 1999-2005 Id Software, Inc.
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This file is part of Quake III Arena source code.
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Quake III Arena source code is free software; you can redistribute it
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and/or modify it under the terms of the GNU General Public License as
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published by the Free Software Foundation; either version 2 of the License,
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or (at your option) any later version.
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Quake III Arena source code is distributed in the hope that it will be
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useful, but WITHOUT ANY WARRANTY; without even the implied warranty of
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MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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GNU General Public License for more details.
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You should have received a copy of the GNU General Public License
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along with Foobar; if not, write to the Free Software
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Foundation, Inc., 51 Franklin St, Fifth Floor, Boston, MA 02110-1301 USA
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===========================================================================
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*/
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#ifndef __MATH_VECTOR_H__
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#define __MATH_VECTOR_H__
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#if defined(_WIN32)
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#pragma warning(disable : 4244)
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#endif
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#include <math.h>
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#include <assert.h>
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//#define DotProduct(a,b) ((a)[0]*(b)[0]+(a)[1]*(b)[1]+(a)[2]*(b)[2])
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//#define VectorSubtract(a,b,c) ((c)[0]=(a)[0]-(b)[0],(c)[1]=(a)[1]-(b)[1],(c)[2]=(a)[2]-(b)[2])
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//#define VectorAdd(a,b,c) ((c)[0]=(a)[0]+(b)[0],(c)[1]=(a)[1]+(b)[1],(c)[2]=(a)[2]+(b)[2])
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//#define VectorCopy(a,b) ((b)[0]=(a)[0],(b)[1]=(a)[1],(b)[2]=(a)[2])
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//#define VectorCopy(a,b) ((b).x=(a).x,(b).y=(a).y,(b).z=(a).z])
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//#define VectorScale(v, s, o) ((o)[0]=(v)[0]*(s),(o)[1]=(v)[1]*(s),(o)[2]=(v)[2]*(s))
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#define __VectorMA(v, s, b, o) ((o)[0]=(v)[0]+(b)[0]*(s),(o)[1]=(v)[1]+(b)[1]*(s),(o)[2]=(v)[2]+(b)[2]*(s))
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//#define CrossProduct(a,b,c) ((c)[0]=(a)[1]*(b)[2]-(a)[2]*(b)[1],(c)[1]=(a)[2]*(b)[0]-(a)[0]*(b)[2],(c)[2]=(a)[0]*(b)[1]-(a)[1]*(b)[0])
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#define DotProduct4(x,y) ((x)[0]*(y)[0]+(x)[1]*(y)[1]+(x)[2]*(y)[2]+(x)[3]*(y)[3])
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#define VectorSubtract4(a,b,c) ((c)[0]=(a)[0]-(b)[0],(c)[1]=(a)[1]-(b)[1],(c)[2]=(a)[2]-(b)[2],(c)[3]=(a)[3]-(b)[3])
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#define VectorAdd4(a,b,c) ((c)[0]=(a)[0]+(b)[0],(c)[1]=(a)[1]+(b)[1],(c)[2]=(a)[2]+(b)[2],(c)[3]=(a)[3]+(b)[3])
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#define VectorCopy4(a,b) ((b)[0]=(a)[0],(b)[1]=(a)[1],(b)[2]=(a)[2],(b)[3]=(a)[3])
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#define VectorScale4(v, s, o) ((o)[0]=(v)[0]*(s),(o)[1]=(v)[1]*(s),(o)[2]=(v)[2]*(s),(o)[3]=(v)[3]*(s))
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#define VectorMA4(v, s, b, o) ((o)[0]=(v)[0]+(b)[0]*(s),(o)[1]=(v)[1]+(b)[1]*(s),(o)[2]=(v)[2]+(b)[2]*(s),(o)[3]=(v)[3]+(b)[3]*(s))
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//#define VectorClear(a) ((a)[0]=(a)[1]=(a)[2]=0)
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#define VectorNegate(a,b) ((b)[0]=-(a)[0],(b)[1]=-(a)[1],(b)[2]=-(a)[2])
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//#define VectorSet(v, x, y, z) ((v)[0]=(x), (v)[1]=(y), (v)[2]=(z))
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#define Vector4Copy(a,b) ((b)[0]=(a)[0],(b)[1]=(a)[1],(b)[2]=(a)[2],(b)[3]=(a)[3])
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#define SnapVector(v) {v[0]=(int)v[0];v[1]=(int)v[1];v[2]=(int)v[2];}
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//#include "util_heap.h"
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#ifndef EQUAL_EPSILON
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#define EQUAL_EPSILON 0.001
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#endif
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float Q_fabs( float f );
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#ifndef ID_INLINE
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#ifdef _WIN32
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#define ID_INLINE __inline
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#else
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#define ID_INLINE inline
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#endif
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#endif
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// if this is defined, vec3 will take four elements, which may allow
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// easier SIMD optimizations
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//#define FAT_VEC3
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//#ifdef __ppc__
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//#pragma align(16)
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//#endif
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class angles_t;
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#ifdef __ppc__
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// Vanilla PPC code, but since PPC has a reciprocal square root estimate instruction,
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// runs *much* faster than calling sqrt(). We'll use two Newton-Raphson
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// refinement steps to get bunch more precision in the 1/sqrt() value for very little cost.
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// We'll then multiply 1/sqrt times the original value to get the sqrt.
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// This is about 12.4 times faster than sqrt() and according to my testing (not exhaustive)
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// it returns fairly accurate results (error below 1.0e-5 up to 100000.0 in 0.1 increments).
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static inline float idSqrt(float x) {
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const float half = 0.5;
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const float one = 1.0;
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float B, y0, y1;
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// This'll NaN if it hits frsqrte. Handle both +0.0 and -0.0
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if (fabs(x) == 0.0)
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return x;
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B = x;
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#ifdef __GNUC__
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asm("frsqrte %0,%1" : "=f" (y0) : "f" (B));
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#else
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y0 = __frsqrte(B);
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#endif
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/* First refinement step */
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y1 = y0 + half*y0*(one - B*y0*y0);
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/* Second refinement step -- copy the output of the last step to the input of this step */
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y0 = y1;
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y1 = y0 + half*y0*(one - B*y0*y0);
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/* Get sqrt(x) from x * 1/sqrt(x) */
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return x * y1;
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}
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#else
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static inline double idSqrt(double x) {
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return sqrt(x);
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}
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#endif
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//class idVec3_t : public idHeap<idVec3_t> {
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class idVec3_t {
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public:
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#ifndef FAT_VEC3
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float x,y,z;
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#else
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float x,y,z,dist;
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#endif
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#ifndef FAT_VEC3
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idVec3_t() {};
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#else
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idVec3_t() {dist = 0.0f;};
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#endif
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idVec3_t( const float x, const float y, const float z );
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operator float *();
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float operator[]( const int index ) const;
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float &operator[]( const int index );
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void set( const float x, const float y, const float z );
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idVec3_t operator-() const;
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idVec3_t &operator=( const idVec3_t &a );
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float operator*( const idVec3_t &a ) const;
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idVec3_t operator*( const float a ) const;
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friend idVec3_t operator*( float a, idVec3_t b );
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idVec3_t operator+( const idVec3_t &a ) const;
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idVec3_t operator-( const idVec3_t &a ) const;
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idVec3_t &operator+=( const idVec3_t &a );
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idVec3_t &operator-=( const idVec3_t &a );
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idVec3_t &operator*=( const float a );
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int operator==( const idVec3_t &a ) const;
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int operator!=( const idVec3_t &a ) const;
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idVec3_t Cross( const idVec3_t &a ) const;
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idVec3_t &Cross( const idVec3_t &a, const idVec3_t &b );
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float Length( void ) const;
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float Normalize( void );
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void Zero( void );
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void Snap( void );
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void SnapTowards( const idVec3_t &to );
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float toYaw( void );
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float toPitch( void );
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angles_t toAngles( void );
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friend idVec3_t LerpVector( const idVec3_t &w1, const idVec3_t &w2, const float t );
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char *string( void );
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};
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extern idVec3_t vec_zero;
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ID_INLINE idVec3_t::idVec3_t( const float x, const float y, const float z ) {
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this->x = x;
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this->y = y;
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this->z = z;
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#ifdef FAT_VEC3
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this->dist = 0.0f;
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#endif
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}
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ID_INLINE float idVec3_t::operator[]( const int index ) const {
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return ( &x )[ index ];
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}
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ID_INLINE float &idVec3_t::operator[]( const int index ) {
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return ( &x )[ index ];
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}
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ID_INLINE idVec3_t::operator float *( void ) {
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return &x;
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}
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ID_INLINE idVec3_t idVec3_t::operator-() const {
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return idVec3_t( -x, -y, -z );
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}
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ID_INLINE idVec3_t &idVec3_t::operator=( const idVec3_t &a ) {
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x = a.x;
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y = a.y;
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z = a.z;
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return *this;
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}
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ID_INLINE void idVec3_t::set( const float x, const float y, const float z ) {
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this->x = x;
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this->y = y;
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this->z = z;
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}
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ID_INLINE idVec3_t idVec3_t::operator-( const idVec3_t &a ) const {
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return idVec3_t( x - a.x, y - a.y, z - a.z );
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}
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ID_INLINE float idVec3_t::operator*( const idVec3_t &a ) const {
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return x * a.x + y * a.y + z * a.z;
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}
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ID_INLINE idVec3_t idVec3_t::operator*( const float a ) const {
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return idVec3_t( x * a, y * a, z * a );
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}
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ID_INLINE idVec3_t operator*( const float a, const idVec3_t b ) {
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return idVec3_t( b.x * a, b.y * a, b.z * a );
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}
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ID_INLINE idVec3_t idVec3_t::operator+( const idVec3_t &a ) const {
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return idVec3_t( x + a.x, y + a.y, z + a.z );
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}
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ID_INLINE idVec3_t &idVec3_t::operator+=( const idVec3_t &a ) {
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x += a.x;
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y += a.y;
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z += a.z;
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return *this;
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}
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ID_INLINE idVec3_t &idVec3_t::operator-=( const idVec3_t &a ) {
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x -= a.x;
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y -= a.y;
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z -= a.z;
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return *this;
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}
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ID_INLINE idVec3_t &idVec3_t::operator*=( const float a ) {
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x *= a;
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y *= a;
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z *= a;
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return *this;
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}
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ID_INLINE int idVec3_t::operator==( const idVec3_t &a ) const {
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if ( Q_fabs( x - a.x ) > EQUAL_EPSILON ) {
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return false;
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}
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if ( Q_fabs( y - a.y ) > EQUAL_EPSILON ) {
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return false;
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}
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if ( Q_fabs( z - a.z ) > EQUAL_EPSILON ) {
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return false;
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}
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return true;
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}
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ID_INLINE int idVec3_t::operator!=( const idVec3_t &a ) const {
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if ( Q_fabs( x - a.x ) > EQUAL_EPSILON ) {
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return true;
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}
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if ( Q_fabs( y - a.y ) > EQUAL_EPSILON ) {
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return true;
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}
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if ( Q_fabs( z - a.z ) > EQUAL_EPSILON ) {
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return true;
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}
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return false;
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}
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ID_INLINE idVec3_t idVec3_t::Cross( const idVec3_t &a ) const {
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return idVec3_t( y * a.z - z * a.y, z * a.x - x * a.z, x * a.y - y * a.x );
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}
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ID_INLINE idVec3_t &idVec3_t::Cross( const idVec3_t &a, const idVec3_t &b ) {
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x = a.y * b.z - a.z * b.y;
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y = a.z * b.x - a.x * b.z;
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z = a.x * b.y - a.y * b.x;
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return *this;
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}
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ID_INLINE float idVec3_t::Length( void ) const {
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float length;
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length = x * x + y * y + z * z;
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return ( float )idSqrt( length );
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}
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ID_INLINE float idVec3_t::Normalize( void ) {
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float length;
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float ilength;
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length = this->Length();
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if ( length ) {
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ilength = 1.0f / length;
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x *= ilength;
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y *= ilength;
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z *= ilength;
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}
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return length;
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}
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ID_INLINE void idVec3_t::Zero( void ) {
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x = 0.0f;
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y = 0.0f;
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z = 0.0f;
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}
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ID_INLINE void idVec3_t::Snap( void ) {
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x = float( int( x ) );
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y = float( int( y ) );
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z = float( int( z ) );
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}
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/*
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======================
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SnapTowards
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Round a vector to integers for more efficient network
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transmission, but make sure that it rounds towards a given point
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rather than blindly truncating. This prevents it from truncating
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into a wall.
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======================
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*/
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ID_INLINE void idVec3_t::SnapTowards( const idVec3_t &to ) {
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if ( to.x <= x ) {
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x = float( int( x ) );
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} else {
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x = float( int( x ) + 1 );
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}
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if ( to.y <= y ) {
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y = float( int( y ) );
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} else {
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y = float( int( y ) + 1 );
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}
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if ( to.z <= z ) {
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z = float( int( z ) );
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} else {
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z = float( int( z ) + 1 );
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}
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}
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//===============================================================
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class Bounds {
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public:
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idVec3_t b[2];
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Bounds();
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Bounds( const idVec3_t &mins, const idVec3_t &maxs );
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void Clear();
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void Zero();
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float Radius(); // radius from origin, not from center
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idVec3_t Center();
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void AddPoint( const idVec3_t &v );
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void AddBounds( const Bounds &bb );
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bool IsCleared();
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bool ContainsPoint( const idVec3_t &p );
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bool IntersectsBounds( const Bounds &b2 ); // touching is NOT intersecting
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};
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extern Bounds boundsZero;
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ID_INLINE Bounds::Bounds(){
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}
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ID_INLINE bool Bounds::IsCleared() {
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return b[0][0] > b[1][0];
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}
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ID_INLINE bool Bounds::ContainsPoint( const idVec3_t &p ) {
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if ( p[0] < b[0][0] || p[1] < b[0][1] || p[2] < b[0][2]
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|| p[0] > b[1][0] || p[1] > b[1][1] || p[2] > b[1][2] ) {
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return false;
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}
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return true;
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}
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ID_INLINE bool Bounds::IntersectsBounds( const Bounds &b2 ) {
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if ( b2.b[1][0] < b[0][0] || b2.b[1][1] < b[0][1] || b2.b[1][2] < b[0][2]
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|| b2.b[0][0] > b[1][0] || b2.b[0][1] > b[1][1] || b2.b[0][2] > b[1][2] ) {
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return false;
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}
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return true;
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}
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ID_INLINE Bounds::Bounds( const idVec3_t &mins, const idVec3_t &maxs ) {
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b[0] = mins;
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b[1] = maxs;
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}
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ID_INLINE idVec3_t Bounds::Center() {
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return idVec3_t( ( b[1][0] + b[0][0] ) * 0.5f, ( b[1][1] + b[0][1] ) * 0.5f, ( b[1][2] + b[0][2] ) * 0.5f );
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}
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ID_INLINE void Bounds::Clear() {
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b[0][0] = b[0][1] = b[0][2] = 99999;
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b[1][0] = b[1][1] = b[1][2] = -99999;
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}
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ID_INLINE void Bounds::Zero() {
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b[0][0] = b[0][1] = b[0][2] =
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b[1][0] = b[1][1] = b[1][2] = 0;
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}
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ID_INLINE void Bounds::AddPoint( const idVec3_t &v ) {
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if ( v[0] < b[0][0]) {
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b[0][0] = v[0];
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}
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if ( v[0] > b[1][0]) {
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b[1][0] = v[0];
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}
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if ( v[1] < b[0][1] ) {
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b[0][1] = v[1];
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}
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if ( v[1] > b[1][1]) {
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b[1][1] = v[1];
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}
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if ( v[2] < b[0][2] ) {
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b[0][2] = v[2];
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}
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if ( v[2] > b[1][2]) {
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b[1][2] = v[2];
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}
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}
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ID_INLINE void Bounds::AddBounds( const Bounds &bb ) {
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if ( bb.b[0][0] < b[0][0]) {
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b[0][0] = bb.b[0][0];
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}
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if ( bb.b[0][1] < b[0][1]) {
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b[0][1] = bb.b[0][1];
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}
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if ( bb.b[0][2] < b[0][2]) {
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|
b[0][2] = bb.b[0][2];
|
|
}
|
|
|
|
if ( bb.b[1][0] > b[1][0]) {
|
|
b[1][0] = bb.b[1][0];
|
|
}
|
|
if ( bb.b[1][1] > b[1][1]) {
|
|
b[1][1] = bb.b[1][1];
|
|
}
|
|
if ( bb.b[1][2] > b[1][2]) {
|
|
b[1][2] = bb.b[1][2];
|
|
}
|
|
}
|
|
|
|
ID_INLINE float Bounds::Radius( ) {
|
|
int i;
|
|
float total;
|
|
float a, aa;
|
|
|
|
total = 0;
|
|
for (i=0 ; i<3 ; i++) {
|
|
a = (float)fabs( b[0][i] );
|
|
aa = (float)fabs( b[1][i] );
|
|
if ( aa > a ) {
|
|
a = aa;
|
|
}
|
|
total += a * a;
|
|
}
|
|
|
|
return (float)idSqrt( total );
|
|
}
|
|
|
|
//===============================================================
|
|
|
|
|
|
class idVec2_t {
|
|
public:
|
|
float x;
|
|
float y;
|
|
|
|
operator float *();
|
|
float operator[]( int index ) const;
|
|
float &operator[]( int index );
|
|
};
|
|
|
|
ID_INLINE float idVec2_t::operator[]( int index ) const {
|
|
return ( &x )[ index ];
|
|
}
|
|
|
|
ID_INLINE float& idVec2_t::operator[]( int index ) {
|
|
return ( &x )[ index ];
|
|
}
|
|
|
|
ID_INLINE idVec2_t::operator float *( void ) {
|
|
return &x;
|
|
}
|
|
|
|
class vec4_t : public idVec3_t {
|
|
public:
|
|
#ifndef FAT_VEC3
|
|
float dist;
|
|
#endif
|
|
vec4_t();
|
|
~vec4_t() {};
|
|
|
|
vec4_t( float x, float y, float z, float dist );
|
|
float operator[]( int index ) const;
|
|
float &operator[]( int index );
|
|
};
|
|
|
|
ID_INLINE vec4_t::vec4_t() {}
|
|
ID_INLINE vec4_t::vec4_t( float x, float y, float z, float dist ) {
|
|
this->x = x;
|
|
this->y = y;
|
|
this->z = z;
|
|
this->dist = dist;
|
|
}
|
|
|
|
ID_INLINE float vec4_t::operator[]( int index ) const {
|
|
return ( &x )[ index ];
|
|
}
|
|
|
|
ID_INLINE float& vec4_t::operator[]( int index ) {
|
|
return ( &x )[ index ];
|
|
}
|
|
|
|
|
|
class idVec5_t : public idVec3_t {
|
|
public:
|
|
float s;
|
|
float t;
|
|
float operator[]( int index ) const;
|
|
float &operator[]( int index );
|
|
};
|
|
|
|
|
|
ID_INLINE float idVec5_t::operator[]( int index ) const {
|
|
return ( &x )[ index ];
|
|
}
|
|
|
|
ID_INLINE float& idVec5_t::operator[]( int index ) {
|
|
return ( &x )[ index ];
|
|
}
|
|
|
|
#endif /* !__MATH_VECTOR_H__ */
|