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source: code/trunk/src/bullet/BulletCollision/Gimpact/gim_linear_math.h @ 2985

Last change on this file since 2985 was 2662, checked in by rgrieder, 17 years ago
Merged presentation branch back to trunk.
Property svn:eol-style set to `native`
File size: 37.1 KB

Rev	Line
[2431]	1	#ifndef GIM_LINEAR_H_INCLUDED
	2	#define GIM_LINEAR_H_INCLUDED
	3
	4	/*! \file gim_linear_math.h
	5	*\author Francisco Len Nßjera
	6	Type Independant Vector and matrix operations.
	7	*/
	8	/*
	9	-----------------------------------------------------------------------------
	10	This source file is part of GIMPACT Library.
	11
	12	For the latest info, see http://gimpact.sourceforge.net/
	13
	14	Copyright (c) 2006 Francisco Leon Najera. C.C. 80087371.
	15	email: projectileman@yahoo.com
	16
	17	This library is free software; you can redistribute it and/or
	18	modify it under the terms of EITHER:
	19	(1) The GNU Lesser General Public License as published by the Free
	20	Software Foundation; either version 2.1 of the License, or (at
	21	your option) any later version. The text of the GNU Lesser
	22	General Public License is included with this library in the
	23	file GIMPACT-LICENSE-LGPL.TXT.
	24	(2) The BSD-style license that is included with this library in
	25	the file GIMPACT-LICENSE-BSD.TXT.
	26	(3) The zlib/libpng license that is included with this library in
	27	the file GIMPACT-LICENSE-ZLIB.TXT.
	28
	29	This library is distributed in the hope that it will be useful,
	30	but WITHOUT ANY WARRANTY; without even the implied warranty of
	31	MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the files
	32	GIMPACT-LICENSE-LGPL.TXT, GIMPACT-LICENSE-ZLIB.TXT and GIMPACT-LICENSE-BSD.TXT for more details.
	33
	34	-----------------------------------------------------------------------------
	35	*/
	36
	37
	38	#include "gim_math.h"
	39	#include "gim_geom_types.h"
	40
	41
	42
	43
	44	//! Zero out a 2D vector
	45	#define VEC_ZERO_2(a) \
	46	{ \
	47	(a)[0] = (a)[1] = 0.0f; \
	48	}\
	49
	50
	51	//! Zero out a 3D vector
	52	#define VEC_ZERO(a) \
	53	{ \
	54	(a)[0] = (a)[1] = (a)[2] = 0.0f; \
	55	}\
	56
	57
	58	/// Zero out a 4D vector
	59	#define VEC_ZERO_4(a) \
	60	{ \
	61	(a)[0] = (a)[1] = (a)[2] = (a)[3] = 0.0f; \
	62	}\
	63
	64
	65	/// Vector copy
	66	#define VEC_COPY_2(b,a) \
	67	{ \
	68	(b)[0] = (a)[0]; \
	69	(b)[1] = (a)[1]; \
	70	}\
	71
	72
	73	/// Copy 3D vector
	74	#define VEC_COPY(b,a) \
	75	{ \
	76	(b)[0] = (a)[0]; \
	77	(b)[1] = (a)[1]; \
	78	(b)[2] = (a)[2]; \
	79	}\
	80
	81
	82	/// Copy 4D vector
	83	#define VEC_COPY_4(b,a) \
	84	{ \
	85	(b)[0] = (a)[0]; \
	86	(b)[1] = (a)[1]; \
	87	(b)[2] = (a)[2]; \
	88	(b)[3] = (a)[3]; \
	89	}\
	90
	91	/// VECTOR SWAP
	92	#define VEC_SWAP(b,a) \
	93	{ \
	94	GIM_SWAP_NUMBERS((b)[0],(a)[0]);\
	95	GIM_SWAP_NUMBERS((b)[1],(a)[1]);\
	96	GIM_SWAP_NUMBERS((b)[2],(a)[2]);\
	97	}\
	98
	99	/// Vector difference
	100	#define VEC_DIFF_2(v21,v2,v1) \
	101	{ \
	102	(v21)[0] = (v2)[0] - (v1)[0]; \
	103	(v21)[1] = (v2)[1] - (v1)[1]; \
	104	}\
	105
	106
	107	/// Vector difference
	108	#define VEC_DIFF(v21,v2,v1) \
	109	{ \
	110	(v21)[0] = (v2)[0] - (v1)[0]; \
	111	(v21)[1] = (v2)[1] - (v1)[1]; \
	112	(v21)[2] = (v2)[2] - (v1)[2]; \
	113	}\
	114
	115
	116	/// Vector difference
	117	#define VEC_DIFF_4(v21,v2,v1) \
	118	{ \
	119	(v21)[0] = (v2)[0] - (v1)[0]; \
	120	(v21)[1] = (v2)[1] - (v1)[1]; \
	121	(v21)[2] = (v2)[2] - (v1)[2]; \
	122	(v21)[3] = (v2)[3] - (v1)[3]; \
	123	}\
	124
	125
	126	/// Vector sum
	127	#define VEC_SUM_2(v21,v2,v1) \
	128	{ \
	129	(v21)[0] = (v2)[0] + (v1)[0]; \
	130	(v21)[1] = (v2)[1] + (v1)[1]; \
	131	}\
	132
	133
	134	/// Vector sum
	135	#define VEC_SUM(v21,v2,v1) \
	136	{ \
	137	(v21)[0] = (v2)[0] + (v1)[0]; \
	138	(v21)[1] = (v2)[1] + (v1)[1]; \
	139	(v21)[2] = (v2)[2] + (v1)[2]; \
	140	}\
	141
	142
	143	/// Vector sum
	144	#define VEC_SUM_4(v21,v2,v1) \
	145	{ \
	146	(v21)[0] = (v2)[0] + (v1)[0]; \
	147	(v21)[1] = (v2)[1] + (v1)[1]; \
	148	(v21)[2] = (v2)[2] + (v1)[2]; \
	149	(v21)[3] = (v2)[3] + (v1)[3]; \
	150	}\
	151
	152
	153	/// scalar times vector
	154	#define VEC_SCALE_2(c,a,b) \
	155	{ \
	156	(c)[0] = (a)*(b)[0]; \
	157	(c)[1] = (a)*(b)[1]; \
	158	}\
	159
	160
	161	/// scalar times vector
	162	#define VEC_SCALE(c,a,b) \
	163	{ \
	164	(c)[0] = (a)*(b)[0]; \
	165	(c)[1] = (a)*(b)[1]; \
	166	(c)[2] = (a)*(b)[2]; \
	167	}\
	168
	169
	170	/// scalar times vector
	171	#define VEC_SCALE_4(c,a,b) \
	172	{ \
	173	(c)[0] = (a)*(b)[0]; \
	174	(c)[1] = (a)*(b)[1]; \
	175	(c)[2] = (a)*(b)[2]; \
	176	(c)[3] = (a)*(b)[3]; \
	177	}\
	178
	179
	180	/// accumulate scaled vector
	181	#define VEC_ACCUM_2(c,a,b) \
	182	{ \
	183	(c)[0] += (a)*(b)[0]; \
	184	(c)[1] += (a)*(b)[1]; \
	185	}\
	186
	187
	188	/// accumulate scaled vector
	189	#define VEC_ACCUM(c,a,b) \
	190	{ \
	191	(c)[0] += (a)*(b)[0]; \
	192	(c)[1] += (a)*(b)[1]; \
	193	(c)[2] += (a)*(b)[2]; \
	194	}\
	195
	196
	197	/// accumulate scaled vector
	198	#define VEC_ACCUM_4(c,a,b) \
	199	{ \
	200	(c)[0] += (a)*(b)[0]; \
	201	(c)[1] += (a)*(b)[1]; \
	202	(c)[2] += (a)*(b)[2]; \
	203	(c)[3] += (a)*(b)[3]; \
	204	}\
	205
	206
	207	/// Vector dot product
	208	#define VEC_DOT_2(a,b) ((a)[0](b)[0] + (a)[1](b)[1])
	209
	210
	211	/// Vector dot product
	212	#define VEC_DOT(a,b) ((a)[0](b)[0] + (a)[1](b)[1] + (a)[2]*(b)[2])
	213
	214	/// Vector dot product
	215	#define VEC_DOT_4(a,b) ((a)[0](b)[0] + (a)[1](b)[1] + (a)[2](b)[2] + (a)[3](b)[3])
	216
	217	/// vector impact parameter (squared)
	218	#define VEC_IMPACT_SQ(bsq,direction,position) {\
	219	GREAL _llel_ = VEC_DOT(direction, position);\
	220	bsq = VEC_DOT(position, position) - _llel_*_llel_;\
	221	}\
	222
	223
	224	/// vector impact parameter
	225	#define VEC_IMPACT(bsq,direction,position) {\
	226	VEC_IMPACT_SQ(bsq,direction,position); \
	227	GIM_SQRT(bsq,bsq); \
	228	}\
	229
	230	/// Vector length
	231	#define VEC_LENGTH_2(a,l)\
	232	{\
	233	GREAL _pp = VEC_DOT_2(a,a);\
	234	GIM_SQRT(_pp,l);\
	235	}\
	236
	237
	238	/// Vector length
	239	#define VEC_LENGTH(a,l)\
	240	{\
	241	GREAL _pp = VEC_DOT(a,a);\
	242	GIM_SQRT(_pp,l);\
	243	}\
	244
	245
	246	/// Vector length
	247	#define VEC_LENGTH_4(a,l)\
	248	{\
	249	GREAL _pp = VEC_DOT_4(a,a);\
	250	GIM_SQRT(_pp,l);\
	251	}\
	252
	253	/// Vector inv length
	254	#define VEC_INV_LENGTH_2(a,l)\
	255	{\
	256	GREAL _pp = VEC_DOT_2(a,a);\
	257	GIM_INV_SQRT(_pp,l);\
	258	}\
	259
	260
	261	/// Vector inv length
	262	#define VEC_INV_LENGTH(a,l)\
	263	{\
	264	GREAL _pp = VEC_DOT(a,a);\
	265	GIM_INV_SQRT(_pp,l);\
	266	}\
	267
	268
	269	/// Vector inv length
	270	#define VEC_INV_LENGTH_4(a,l)\
	271	{\
	272	GREAL _pp = VEC_DOT_4(a,a);\
	273	GIM_INV_SQRT(_pp,l);\
	274	}\
	275
	276
	277
	278	/// distance between two points
	279	#define VEC_DISTANCE(_len,_va,_vb) {\
	280	vec3f _tmp_; \
	281	VEC_DIFF(_tmp_, _vb, _va); \
	282	VEC_LENGTH(_tmp_,_len); \
	283	}\
	284
	285
	286	/// Vector length
	287	#define VEC_CONJUGATE_LENGTH(a,l)\
	288	{\
	289	GREAL _pp = 1.0 - a[0]a[0] - a[1]a[1] - a[2]*a[2];\
	290	GIM_SQRT(_pp,l);\
	291	}\
	292
	293
	294	/// Vector length
	295	#define VEC_NORMALIZE(a) { \
	296	GREAL len;\
	297	VEC_INV_LENGTH(a,len); \
	298	if(len<G_REAL_INFINITY)\
	299	{\
	300	a[0] *= len; \
	301	a[1] *= len; \
	302	a[2] *= len; \
	303	} \
	304	}\
	305
	306	/// Set Vector size
	307	#define VEC_RENORMALIZE(a,newlen) { \
	308	GREAL len;\
	309	VEC_INV_LENGTH(a,len); \
	310	if(len<G_REAL_INFINITY)\
	311	{\
	312	len *= newlen;\
	313	a[0] *= len; \
	314	a[1] *= len; \
	315	a[2] *= len; \
	316	} \
	317	}\
	318
	319	/// Vector cross
	320	#define VEC_CROSS(c,a,b) \
	321	{ \
	322	c[0] = (a)[1] * (b)[2] - (a)[2] * (b)[1]; \
	323	c[1] = (a)[2] * (b)[0] - (a)[0] * (b)[2]; \
	324	c[2] = (a)[0] * (b)[1] - (a)[1] * (b)[0]; \
	325	}\
	326
	327
	328	/*! Vector perp -- assumes that n is of unit length
	329	* accepts vector v, subtracts out any component parallel to n */
	330	#define VEC_PERPENDICULAR(vp,v,n) \
	331	{ \
	332	GREAL dot = VEC_DOT(v, n); \
	333	vp[0] = (v)[0] - dot*(n)[0]; \
	334	vp[1] = (v)[1] - dot*(n)[1]; \
	335	vp[2] = (v)[2] - dot*(n)[2]; \
	336	}\
	337
	338
	339	/! Vector parallel -- assumes that n is of unit length /
	340	#define VEC_PARALLEL(vp,v,n) \
	341	{ \
	342	GREAL dot = VEC_DOT(v, n); \
	343	vp[0] = (dot) * (n)[0]; \
	344	vp[1] = (dot) * (n)[1]; \
	345	vp[2] = (dot) * (n)[2]; \
	346	}\
	347
	348	/*! Same as Vector parallel -- n can have any length
	349	* accepts vector v, subtracts out any component perpendicular to n */
	350	#define VEC_PROJECT(vp,v,n) \
	351	{ \
	352	GREAL scalar = VEC_DOT(v, n); \
	353	scalar/= VEC_DOT(n, n); \
	354	vp[0] = (scalar) * (n)[0]; \
	355	vp[1] = (scalar) * (n)[1]; \
	356	vp[2] = (scalar) * (n)[2]; \
	357	}\
	358
	359
	360	/! accepts vector v/
	361	#define VEC_UNPROJECT(vp,v,n) \
	362	{ \
	363	GREAL scalar = VEC_DOT(v, n); \
	364	scalar = VEC_DOT(n, n)/scalar; \
	365	vp[0] = (scalar) * (n)[0]; \
	366	vp[1] = (scalar) * (n)[1]; \
	367	vp[2] = (scalar) * (n)[2]; \
	368	}\
	369
	370
	371	/*! Vector reflection -- assumes n is of unit length
	372	Takes vector v, reflects it against reflector n, and returns vr */
	373	#define VEC_REFLECT(vr,v,n) \
	374	{ \
	375	GREAL dot = VEC_DOT(v, n); \
	376	vr[0] = (v)[0] - 2.0 * (dot) * (n)[0]; \
	377	vr[1] = (v)[1] - 2.0 * (dot) * (n)[1]; \
	378	vr[2] = (v)[2] - 2.0 * (dot) * (n)[2]; \
	379	}\
	380
	381
	382	/*! Vector blending
	383	Takes two vectors a, b, blends them together with two scalars */
	384	#define VEC_BLEND_AB(vr,sa,a,sb,b) \
	385	{ \
	386	vr[0] = (sa) * (a)[0] + (sb) * (b)[0]; \
	387	vr[1] = (sa) * (a)[1] + (sb) * (b)[1]; \
	388	vr[2] = (sa) * (a)[2] + (sb) * (b)[2]; \
	389	}\
	390
	391	/*! Vector blending
	392	Takes two vectors a, b, blends them together with s <=1 */
	393	#define VEC_BLEND(vr,a,b,s) VEC_BLEND_AB(vr,(1-s),a,s,b)
	394
	395	#define VEC_SET3(a,b,op,c) a[0]=b[0] op c[0]; a[1]=b[1] op c[1]; a[2]=b[2] op c[2];
	396
	397	//! Finds the bigger cartesian coordinate from a vector
	398	#define VEC_MAYOR_COORD(vec, maxc)\
	399	{\
	400	GREAL A[] = {fabs(vec[0]),fabs(vec[1]),fabs(vec[2])};\
	401	maxc = A[0]>A[1]?(A[0]>A[2]?0:2):(A[1]>A[2]?1:2);\
	402	}\
	403
	404	//! Finds the 2 smallest cartesian coordinates from a vector
	405	#define VEC_MINOR_AXES(vec, i0, i1)\
	406	{\
	407	VEC_MAYOR_COORD(vec,i0);\
	408	i0 = (i0+1)%3;\
	409	i1 = (i0+1)%3;\
	410	}\
	411
	412
	413
	414
	415	#define VEC_EQUAL(v1,v2) (v1[0]==v2[0]&&v1[1]==v2[1]&&v1[2]==v2[2])
	416
	417	#define VEC_NEAR_EQUAL(v1,v2) (GIM_NEAR_EQUAL(v1[0],v2[0])&&GIM_NEAR_EQUAL(v1[1],v2[1])&&GIM_NEAR_EQUAL(v1[2],v2[2]))
	418
	419
	420	/// Vector cross
	421	#define X_AXIS_CROSS_VEC(dst,src)\
	422	{ \
	423	dst[0] = 0.0f; \
	424	dst[1] = -src[2]; \
	425	dst[2] = src[1]; \
	426	}\
	427
	428	#define Y_AXIS_CROSS_VEC(dst,src)\
	429	{ \
	430	dst[0] = src[2]; \
	431	dst[1] = 0.0f; \
	432	dst[2] = -src[0]; \
	433	}\
	434
	435	#define Z_AXIS_CROSS_VEC(dst,src)\
	436	{ \
	437	dst[0] = -src[1]; \
	438	dst[1] = src[0]; \
	439	dst[2] = 0.0f; \
	440	}\
	441
	442
	443
	444
	445
	446
	447	/// initialize matrix
	448	#define IDENTIFY_MATRIX_3X3(m) \
	449	{ \
	450	m[0][0] = 1.0; \
	451	m[0][1] = 0.0; \
	452	m[0][2] = 0.0; \
	453	\
	454	m[1][0] = 0.0; \
	455	m[1][1] = 1.0; \
	456	m[1][2] = 0.0; \
	457	\
	458	m[2][0] = 0.0; \
	459	m[2][1] = 0.0; \
	460	m[2][2] = 1.0; \
	461	}\
	462
	463	/! initialize matrix /
	464	#define IDENTIFY_MATRIX_4X4(m) \
	465	{ \
	466	m[0][0] = 1.0; \
	467	m[0][1] = 0.0; \
	468	m[0][2] = 0.0; \
	469	m[0][3] = 0.0; \
	470	\
	471	m[1][0] = 0.0; \
	472	m[1][1] = 1.0; \
	473	m[1][2] = 0.0; \
	474	m[1][3] = 0.0; \
	475	\
	476	m[2][0] = 0.0; \
	477	m[2][1] = 0.0; \
	478	m[2][2] = 1.0; \
	479	m[2][3] = 0.0; \
	480	\
	481	m[3][0] = 0.0; \
	482	m[3][1] = 0.0; \
	483	m[3][2] = 0.0; \
	484	m[3][3] = 1.0; \
	485	}\
	486
	487	/! initialize matrix /
	488	#define ZERO_MATRIX_4X4(m) \
	489	{ \
	490	m[0][0] = 0.0; \
	491	m[0][1] = 0.0; \
	492	m[0][2] = 0.0; \
	493	m[0][3] = 0.0; \
	494	\
	495	m[1][0] = 0.0; \
	496	m[1][1] = 0.0; \
	497	m[1][2] = 0.0; \
	498	m[1][3] = 0.0; \
	499	\
	500	m[2][0] = 0.0; \
	501	m[2][1] = 0.0; \
	502	m[2][2] = 0.0; \
	503	m[2][3] = 0.0; \
	504	\
	505	m[3][0] = 0.0; \
	506	m[3][1] = 0.0; \
	507	m[3][2] = 0.0; \
	508	m[3][3] = 0.0; \
	509	}\
	510
	511	/! matrix rotation X /
	512	#define ROTX_CS(m,cosine,sine) \
	513	{ \
	514	/* rotation about the x-axis */ \
	515	\
	516	m[0][0] = 1.0; \
	517	m[0][1] = 0.0; \
	518	m[0][2] = 0.0; \
	519	m[0][3] = 0.0; \
	520	\
	521	m[1][0] = 0.0; \
	522	m[1][1] = (cosine); \
	523	m[1][2] = (sine); \
	524	m[1][3] = 0.0; \
	525	\
	526	m[2][0] = 0.0; \
	527	m[2][1] = -(sine); \
	528	m[2][2] = (cosine); \
	529	m[2][3] = 0.0; \
	530	\
	531	m[3][0] = 0.0; \
	532	m[3][1] = 0.0; \
	533	m[3][2] = 0.0; \
	534	m[3][3] = 1.0; \
	535	}\
	536
	537	/! matrix rotation Y /
	538	#define ROTY_CS(m,cosine,sine) \
	539	{ \
	540	/* rotation about the y-axis */ \
	541	\
	542	m[0][0] = (cosine); \
	543	m[0][1] = 0.0; \
	544	m[0][2] = -(sine); \
	545	m[0][3] = 0.0; \
	546	\
	547	m[1][0] = 0.0; \
	548	m[1][1] = 1.0; \
	549	m[1][2] = 0.0; \
	550	m[1][3] = 0.0; \
	551	\
	552	m[2][0] = (sine); \
	553	m[2][1] = 0.0; \
	554	m[2][2] = (cosine); \
	555	m[2][3] = 0.0; \
	556	\
	557	m[3][0] = 0.0; \
	558	m[3][1] = 0.0; \
	559	m[3][2] = 0.0; \
	560	m[3][3] = 1.0; \
	561	}\
	562
	563	/! matrix rotation Z /
	564	#define ROTZ_CS(m,cosine,sine) \
	565	{ \
	566	/* rotation about the z-axis */ \
	567	\
	568	m[0][0] = (cosine); \
	569	m[0][1] = (sine); \
	570	m[0][2] = 0.0; \
	571	m[0][3] = 0.0; \
	572	\
	573	m[1][0] = -(sine); \
	574	m[1][1] = (cosine); \
	575	m[1][2] = 0.0; \
	576	m[1][3] = 0.0; \
	577	\
	578	m[2][0] = 0.0; \
	579	m[2][1] = 0.0; \
	580	m[2][2] = 1.0; \
	581	m[2][3] = 0.0; \
	582	\
	583	m[3][0] = 0.0; \
	584	m[3][1] = 0.0; \
	585	m[3][2] = 0.0; \
	586	m[3][3] = 1.0; \
	587	}\
	588
	589	/! matrix copy /
	590	#define COPY_MATRIX_2X2(b,a) \
	591	{ \
	592	b[0][0] = a[0][0]; \
	593	b[0][1] = a[0][1]; \
	594	\
	595	b[1][0] = a[1][0]; \
	596	b[1][1] = a[1][1]; \
	597	\
	598	}\
	599
	600
	601	/! matrix copy /
	602	#define COPY_MATRIX_2X3(b,a) \
	603	{ \
	604	b[0][0] = a[0][0]; \
	605	b[0][1] = a[0][1]; \
	606	b[0][2] = a[0][2]; \
	607	\
	608	b[1][0] = a[1][0]; \
	609	b[1][1] = a[1][1]; \
	610	b[1][2] = a[1][2]; \
	611	}\
	612
	613
	614	/! matrix copy /
	615	#define COPY_MATRIX_3X3(b,a) \
	616	{ \
	617	b[0][0] = a[0][0]; \
	618	b[0][1] = a[0][1]; \
	619	b[0][2] = a[0][2]; \
	620	\
	621	b[1][0] = a[1][0]; \
	622	b[1][1] = a[1][1]; \
	623	b[1][2] = a[1][2]; \
	624	\
	625	b[2][0] = a[2][0]; \
	626	b[2][1] = a[2][1]; \
	627	b[2][2] = a[2][2]; \
	628	}\
	629
	630
	631	/! matrix copy /
	632	#define COPY_MATRIX_4X4(b,a) \
	633	{ \
	634	b[0][0] = a[0][0]; \
	635	b[0][1] = a[0][1]; \
	636	b[0][2] = a[0][2]; \
	637	b[0][3] = a[0][3]; \
	638	\
	639	b[1][0] = a[1][0]; \
	640	b[1][1] = a[1][1]; \
	641	b[1][2] = a[1][2]; \
	642	b[1][3] = a[1][3]; \
	643	\
	644	b[2][0] = a[2][0]; \
	645	b[2][1] = a[2][1]; \
	646	b[2][2] = a[2][2]; \
	647	b[2][3] = a[2][3]; \
	648	\
	649	b[3][0] = a[3][0]; \
	650	b[3][1] = a[3][1]; \
	651	b[3][2] = a[3][2]; \
	652	b[3][3] = a[3][3]; \
	653	}\
	654
	655
	656	/! matrix transpose /
	657	#define TRANSPOSE_MATRIX_2X2(b,a) \
	658	{ \
	659	b[0][0] = a[0][0]; \
	660	b[0][1] = a[1][0]; \
	661	\
	662	b[1][0] = a[0][1]; \
	663	b[1][1] = a[1][1]; \
	664	}\
	665
	666
	667	/! matrix transpose /
	668	#define TRANSPOSE_MATRIX_3X3(b,a) \
	669	{ \
	670	b[0][0] = a[0][0]; \
	671	b[0][1] = a[1][0]; \
	672	b[0][2] = a[2][0]; \
	673	\
	674	b[1][0] = a[0][1]; \
	675	b[1][1] = a[1][1]; \
	676	b[1][2] = a[2][1]; \
	677	\
	678	b[2][0] = a[0][2]; \
	679	b[2][1] = a[1][2]; \
	680	b[2][2] = a[2][2]; \
	681	}\
	682
	683
	684	/! matrix transpose /
	685	#define TRANSPOSE_MATRIX_4X4(b,a) \
	686	{ \
	687	b[0][0] = a[0][0]; \
	688	b[0][1] = a[1][0]; \
	689	b[0][2] = a[2][0]; \
	690	b[0][3] = a[3][0]; \
	691	\
	692	b[1][0] = a[0][1]; \
	693	b[1][1] = a[1][1]; \
	694	b[1][2] = a[2][1]; \
	695	b[1][3] = a[3][1]; \
	696	\
	697	b[2][0] = a[0][2]; \
	698	b[2][1] = a[1][2]; \
	699	b[2][2] = a[2][2]; \
	700	b[2][3] = a[3][2]; \
	701	\
	702	b[3][0] = a[0][3]; \
	703	b[3][1] = a[1][3]; \
	704	b[3][2] = a[2][3]; \
	705	b[3][3] = a[3][3]; \
	706	}\
	707
	708
	709	/! multiply matrix by scalar /
	710	#define SCALE_MATRIX_2X2(b,s,a) \
	711	{ \
	712	b[0][0] = (s) * a[0][0]; \
	713	b[0][1] = (s) * a[0][1]; \
	714	\
	715	b[1][0] = (s) * a[1][0]; \
	716	b[1][1] = (s) * a[1][1]; \
	717	}\
	718
	719
	720	/! multiply matrix by scalar /
	721	#define SCALE_MATRIX_3X3(b,s,a) \
	722	{ \
	723	b[0][0] = (s) * a[0][0]; \
	724	b[0][1] = (s) * a[0][1]; \
	725	b[0][2] = (s) * a[0][2]; \
	726	\
	727	b[1][0] = (s) * a[1][0]; \
	728	b[1][1] = (s) * a[1][1]; \
	729	b[1][2] = (s) * a[1][2]; \
	730	\
	731	b[2][0] = (s) * a[2][0]; \
	732	b[2][1] = (s) * a[2][1]; \
	733	b[2][2] = (s) * a[2][2]; \
	734	}\
	735
	736
	737	/! multiply matrix by scalar /
	738	#define SCALE_MATRIX_4X4(b,s,a) \
	739	{ \
	740	b[0][0] = (s) * a[0][0]; \
	741	b[0][1] = (s) * a[0][1]; \
	742	b[0][2] = (s) * a[0][2]; \
	743	b[0][3] = (s) * a[0][3]; \
	744	\
	745	b[1][0] = (s) * a[1][0]; \
	746	b[1][1] = (s) * a[1][1]; \
	747	b[1][2] = (s) * a[1][2]; \
	748	b[1][3] = (s) * a[1][3]; \
	749	\
	750	b[2][0] = (s) * a[2][0]; \
	751	b[2][1] = (s) * a[2][1]; \
	752	b[2][2] = (s) * a[2][2]; \
	753	b[2][3] = (s) * a[2][3]; \
	754	\
	755	b[3][0] = s * a[3][0]; \
	756	b[3][1] = s * a[3][1]; \
	757	b[3][2] = s * a[3][2]; \
	758	b[3][3] = s * a[3][3]; \
	759	}\
	760
	761
	762	/! multiply matrix by scalar /
	763	#define SCALE_VEC_MATRIX_2X2(b,svec,a) \
	764	{ \
	765	b[0][0] = svec[0] * a[0][0]; \
	766	b[1][0] = svec[0] * a[1][0]; \
	767	\
	768	b[0][1] = svec[1] * a[0][1]; \
	769	b[1][1] = svec[1] * a[1][1]; \
	770	}\
	771
	772
	773	/! multiply matrix by scalar. Each columns is scaled by each scalar vector component /
	774	#define SCALE_VEC_MATRIX_3X3(b,svec,a) \
	775	{ \
	776	b[0][0] = svec[0] * a[0][0]; \
	777	b[1][0] = svec[0] * a[1][0]; \
	778	b[2][0] = svec[0] * a[2][0]; \
	779	\
	780	b[0][1] = svec[1] * a[0][1]; \
	781	b[1][1] = svec[1] * a[1][1]; \
	782	b[2][1] = svec[1] * a[2][1]; \
	783	\
	784	b[0][2] = svec[2] * a[0][2]; \
	785	b[1][2] = svec[2] * a[1][2]; \
	786	b[2][2] = svec[2] * a[2][2]; \
	787	}\
	788
	789
	790	/! multiply matrix by scalar /
	791	#define SCALE_VEC_MATRIX_4X4(b,svec,a) \
	792	{ \
	793	b[0][0] = svec[0] * a[0][0]; \
	794	b[1][0] = svec[0] * a[1][0]; \
	795	b[2][0] = svec[0] * a[2][0]; \
	796	b[3][0] = svec[0] * a[3][0]; \
	797	\
	798	b[0][1] = svec[1] * a[0][1]; \
	799	b[1][1] = svec[1] * a[1][1]; \
	800	b[2][1] = svec[1] * a[2][1]; \
	801	b[3][1] = svec[1] * a[3][1]; \
	802	\
	803	b[0][2] = svec[2] * a[0][2]; \
	804	b[1][2] = svec[2] * a[1][2]; \
	805	b[2][2] = svec[2] * a[2][2]; \
	806	b[3][2] = svec[2] * a[3][2]; \
	807	\
	808	b[0][3] = svec[3] * a[0][3]; \
	809	b[1][3] = svec[3] * a[1][3]; \
	810	b[2][3] = svec[3] * a[2][3]; \
	811	b[3][3] = svec[3] * a[3][3]; \
	812	}\
	813
	814
	815	/! multiply matrix by scalar /
	816	#define ACCUM_SCALE_MATRIX_2X2(b,s,a) \
	817	{ \
	818	b[0][0] += (s) * a[0][0]; \
	819	b[0][1] += (s) * a[0][1]; \
	820	\
	821	b[1][0] += (s) * a[1][0]; \
	822	b[1][1] += (s) * a[1][1]; \
	823	}\
	824
	825
	826	/! multiply matrix by scalar /
	827	#define ACCUM_SCALE_MATRIX_3X3(b,s,a) \
	828	{ \
	829	b[0][0] += (s) * a[0][0]; \
	830	b[0][1] += (s) * a[0][1]; \
	831	b[0][2] += (s) * a[0][2]; \
	832	\
	833	b[1][0] += (s) * a[1][0]; \
	834	b[1][1] += (s) * a[1][1]; \
	835	b[1][2] += (s) * a[1][2]; \
	836	\
	837	b[2][0] += (s) * a[2][0]; \
	838	b[2][1] += (s) * a[2][1]; \
	839	b[2][2] += (s) * a[2][2]; \
	840	}\
	841
	842
	843	/! multiply matrix by scalar /
	844	#define ACCUM_SCALE_MATRIX_4X4(b,s,a) \
	845	{ \
	846	b[0][0] += (s) * a[0][0]; \
	847	b[0][1] += (s) * a[0][1]; \
	848	b[0][2] += (s) * a[0][2]; \
	849	b[0][3] += (s) * a[0][3]; \
	850	\
	851	b[1][0] += (s) * a[1][0]; \
	852	b[1][1] += (s) * a[1][1]; \
	853	b[1][2] += (s) * a[1][2]; \
	854	b[1][3] += (s) * a[1][3]; \
	855	\
	856	b[2][0] += (s) * a[2][0]; \
	857	b[2][1] += (s) * a[2][1]; \
	858	b[2][2] += (s) * a[2][2]; \
	859	b[2][3] += (s) * a[2][3]; \
	860	\
	861	b[3][0] += (s) * a[3][0]; \
	862	b[3][1] += (s) * a[3][1]; \
	863	b[3][2] += (s) * a[3][2]; \
	864	b[3][3] += (s) * a[3][3]; \
	865	}\
	866
	867	/! matrix product /
	868	/! c[x][y] = a[x][0]b[0][y]+a[x][1]b[1][y]+a[x][2]b[2][y]+a[x][3]b[3][y];/
	869	#define MATRIX_PRODUCT_2X2(c,a,b) \
	870	{ \
	871	c[0][0] = a[0][0]b[0][0]+a[0][1]b[1][0]; \
	872	c[0][1] = a[0][0]b[0][1]+a[0][1]b[1][1]; \
	873	\
	874	c[1][0] = a[1][0]b[0][0]+a[1][1]b[1][0]; \
	875	c[1][1] = a[1][0]b[0][1]+a[1][1]b[1][1]; \
	876	\
	877	}\
	878
	879	/! matrix product /
	880	/! c[x][y] = a[x][0]b[0][y]+a[x][1]b[1][y]+a[x][2]b[2][y]+a[x][3]b[3][y];/
	881	#define MATRIX_PRODUCT_3X3(c,a,b) \
	882	{ \
	883	c[0][0] = a[0][0]b[0][0]+a[0][1]b[1][0]+a[0][2]*b[2][0]; \
	884	c[0][1] = a[0][0]b[0][1]+a[0][1]b[1][1]+a[0][2]*b[2][1]; \
	885	c[0][2] = a[0][0]b[0][2]+a[0][1]b[1][2]+a[0][2]*b[2][2]; \
	886	\
	887	c[1][0] = a[1][0]b[0][0]+a[1][1]b[1][0]+a[1][2]*b[2][0]; \
	888	c[1][1] = a[1][0]b[0][1]+a[1][1]b[1][1]+a[1][2]*b[2][1]; \
	889	c[1][2] = a[1][0]b[0][2]+a[1][1]b[1][2]+a[1][2]*b[2][2]; \
	890	\
	891	c[2][0] = a[2][0]b[0][0]+a[2][1]b[1][0]+a[2][2]*b[2][0]; \
	892	c[2][1] = a[2][0]b[0][1]+a[2][1]b[1][1]+a[2][2]*b[2][1]; \
	893	c[2][2] = a[2][0]b[0][2]+a[2][1]b[1][2]+a[2][2]*b[2][2]; \
	894	}\
	895
	896
	897	/! matrix product /
	898	/! c[x][y] = a[x][0]b[0][y]+a[x][1]b[1][y]+a[x][2]b[2][y]+a[x][3]b[3][y];/
	899	#define MATRIX_PRODUCT_4X4(c,a,b) \
	900	{ \
	901	c[0][0] = a[0][0]b[0][0]+a[0][1]b[1][0]+a[0][2]b[2][0]+a[0][3]b[3][0];\
	902	c[0][1] = a[0][0]b[0][1]+a[0][1]b[1][1]+a[0][2]b[2][1]+a[0][3]b[3][1];\
	903	c[0][2] = a[0][0]b[0][2]+a[0][1]b[1][2]+a[0][2]b[2][2]+a[0][3]b[3][2];\
	904	c[0][3] = a[0][0]b[0][3]+a[0][1]b[1][3]+a[0][2]b[2][3]+a[0][3]b[3][3];\
	905	\
	906	c[1][0] = a[1][0]b[0][0]+a[1][1]b[1][0]+a[1][2]b[2][0]+a[1][3]b[3][0];\
	907	c[1][1] = a[1][0]b[0][1]+a[1][1]b[1][1]+a[1][2]b[2][1]+a[1][3]b[3][1];\
	908	c[1][2] = a[1][0]b[0][2]+a[1][1]b[1][2]+a[1][2]b[2][2]+a[1][3]b[3][2];\
	909	c[1][3] = a[1][0]b[0][3]+a[1][1]b[1][3]+a[1][2]b[2][3]+a[1][3]b[3][3];\
	910	\
	911	c[2][0] = a[2][0]b[0][0]+a[2][1]b[1][0]+a[2][2]b[2][0]+a[2][3]b[3][0];\
	912	c[2][1] = a[2][0]b[0][1]+a[2][1]b[1][1]+a[2][2]b[2][1]+a[2][3]b[3][1];\
	913	c[2][2] = a[2][0]b[0][2]+a[2][1]b[1][2]+a[2][2]b[2][2]+a[2][3]b[3][2];\
	914	c[2][3] = a[2][0]b[0][3]+a[2][1]b[1][3]+a[2][2]b[2][3]+a[2][3]b[3][3];\
	915	\
	916	c[3][0] = a[3][0]b[0][0]+a[3][1]b[1][0]+a[3][2]b[2][0]+a[3][3]b[3][0];\
	917	c[3][1] = a[3][0]b[0][1]+a[3][1]b[1][1]+a[3][2]b[2][1]+a[3][3]b[3][1];\
	918	c[3][2] = a[3][0]b[0][2]+a[3][1]b[1][2]+a[3][2]b[2][2]+a[3][3]b[3][2];\
	919	c[3][3] = a[3][0]b[0][3]+a[3][1]b[1][3]+a[3][2]b[2][3]+a[3][3]b[3][3];\
	920	}\
	921
	922
	923	/! matrix times vector /
	924	#define MAT_DOT_VEC_2X2(p,m,v) \
	925	{ \
	926	p[0] = m[0][0]v[0] + m[0][1]v[1]; \
	927	p[1] = m[1][0]v[0] + m[1][1]v[1]; \
	928	}\
	929
	930
	931	/! matrix times vector /
	932	#define MAT_DOT_VEC_3X3(p,m,v) \
	933	{ \
	934	p[0] = m[0][0]v[0] + m[0][1]v[1] + m[0][2]*v[2]; \
	935	p[1] = m[1][0]v[0] + m[1][1]v[1] + m[1][2]*v[2]; \
	936	p[2] = m[2][0]v[0] + m[2][1]v[1] + m[2][2]*v[2]; \
	937	}\
	938
	939
	940	/*! matrix times vector
	941	v is a vec4f
	942	*/
	943	#define MAT_DOT_VEC_4X4(p,m,v) \
	944	{ \
	945	p[0] = m[0][0]v[0] + m[0][1]v[1] + m[0][2]v[2] + m[0][3]v[3]; \
	946	p[1] = m[1][0]v[0] + m[1][1]v[1] + m[1][2]v[2] + m[1][3]v[3]; \
	947	p[2] = m[2][0]v[0] + m[2][1]v[1] + m[2][2]v[2] + m[2][3]v[3]; \
	948	p[3] = m[3][0]v[0] + m[3][1]v[1] + m[3][2]v[2] + m[3][3]v[3]; \
	949	}\
	950
	951	/*! matrix times vector
	952	v is a vec3f
	953	and m is a mat4f<br>
	954	Last column is added as the position
	955	*/
	956	#define MAT_DOT_VEC_3X4(p,m,v) \
	957	{ \
	958	p[0] = m[0][0]v[0] + m[0][1]v[1] + m[0][2]*v[2] + m[0][3]; \
	959	p[1] = m[1][0]v[0] + m[1][1]v[1] + m[1][2]*v[2] + m[1][3]; \
	960	p[2] = m[2][0]v[0] + m[2][1]v[1] + m[2][2]*v[2] + m[2][3]; \
	961	}\
	962
	963
	964	/! vector transpose times matrix /
	965	/! p[j] = v[0]m[0][j] + v[1]m[1][j] + v[2]m[2][j]; */
	966	#define VEC_DOT_MAT_3X3(p,v,m) \
	967	{ \
	968	p[0] = v[0]m[0][0] + v[1]m[1][0] + v[2]*m[2][0]; \
	969	p[1] = v[0]m[0][1] + v[1]m[1][1] + v[2]*m[2][1]; \
	970	p[2] = v[0]m[0][2] + v[1]m[1][2] + v[2]*m[2][2]; \
	971	}\
	972
	973
	974	/! affine matrix times vector /
	975	/** The matrix is assumed to be an affine matrix, with last two
	976	* entries representing a translation */
	977	#define MAT_DOT_VEC_2X3(p,m,v) \
	978	{ \
	979	p[0] = m[0][0]v[0] + m[0][1]v[1] + m[0][2]; \
	980	p[1] = m[1][0]v[0] + m[1][1]v[1] + m[1][2]; \
	981	}\
	982
	983	//! Transform a plane
	984	#define MAT_TRANSFORM_PLANE_4X4(pout,m,plane)\
	985	{ \
	986	pout[0] = m[0][0]plane[0] + m[0][1]plane[1] + m[0][2]*plane[2];\
	987	pout[1] = m[1][0]plane[0] + m[1][1]plane[1] + m[1][2]*plane[2];\
	988	pout[2] = m[2][0]plane[0] + m[2][1]plane[1] + m[2][2]*plane[2];\
	989	pout[3] = m[0][3]pout[0] + m[1][3]pout[1] + m[2][3]*pout[2] + plane[3];\
	990	}\
	991
	992
	993
	994	/** inverse transpose of matrix times vector
	995	*
	996	* This macro computes inverse transpose of matrix m,
	997	* and multiplies vector v into it, to yeild vector p
	998	*
	999	* DANGER !!! Do Not use this on normal vectors!!!
	1000	* It will leave normals the wrong length !!!
	1001	* See macro below for use on normals.
	1002	*/
	1003	#define INV_TRANSP_MAT_DOT_VEC_2X2(p,m,v) \
	1004	{ \
	1005	GREAL det; \
	1006	\
	1007	det = m[0][0]m[1][1] - m[0][1]m[1][0]; \
	1008	p[0] = m[1][1]v[0] - m[1][0]v[1]; \
	1009	p[1] = - m[0][1]v[0] + m[0][0]v[1]; \
	1010	\
	1011	/* if matrix not singular, and not orthonormal, then renormalize */ \
	1012	if ((det!=1.0f) && (det != 0.0f)) { \
	1013	det = 1.0f / det; \
	1014	p[0] *= det; \
	1015	p[1] *= det; \
	1016	} \
	1017	}\
	1018
	1019
	1020	/** transform normal vector by inverse transpose of matrix
	1021	* and then renormalize the vector
	1022	*
	1023	* This macro computes inverse transpose of matrix m,
	1024	* and multiplies vector v into it, to yeild vector p
	1025	* Vector p is then normalized.
	1026	*/
	1027	#define NORM_XFORM_2X2(p,m,v) \
	1028	{ \
	1029	GREAL len; \
	1030	\
	1031	/* do nothing if off-diagonals are zero and diagonals are \
	1032	* equal */ \
	1033	if ((m[0][1] != 0.0) \|\| (m[1][0] != 0.0) \|\| (m[0][0] != m[1][1])) { \
	1034	p[0] = m[1][1]v[0] - m[1][0]v[1]; \
	1035	p[1] = - m[0][1]v[0] + m[0][0]v[1]; \
	1036	\
	1037	len = p[0]p[0] + p[1]p[1]; \
	1038	GIM_INV_SQRT(len,len); \
	1039	p[0] *= len; \
	1040	p[1] *= len; \
	1041	} else { \
	1042	VEC_COPY_2 (p, v); \
	1043	} \
	1044	}\
	1045
	1046
	1047	/** outer product of vector times vector transpose
	1048	*
	1049	* The outer product of vector v and vector transpose t yeilds
	1050	* dyadic matrix m.
	1051	*/
	1052	#define OUTER_PRODUCT_2X2(m,v,t) \
	1053	{ \
	1054	m[0][0] = v[0] * t[0]; \
	1055	m[0][1] = v[0] * t[1]; \
	1056	\
	1057	m[1][0] = v[1] * t[0]; \
	1058	m[1][1] = v[1] * t[1]; \
	1059	}\
	1060
	1061
	1062	/** outer product of vector times vector transpose
	1063	*
	1064	* The outer product of vector v and vector transpose t yeilds
	1065	* dyadic matrix m.
	1066	*/
	1067	#define OUTER_PRODUCT_3X3(m,v,t) \
	1068	{ \
	1069	m[0][0] = v[0] * t[0]; \
	1070	m[0][1] = v[0] * t[1]; \
	1071	m[0][2] = v[0] * t[2]; \
	1072	\
	1073	m[1][0] = v[1] * t[0]; \
	1074	m[1][1] = v[1] * t[1]; \
	1075	m[1][2] = v[1] * t[2]; \
	1076	\
	1077	m[2][0] = v[2] * t[0]; \
	1078	m[2][1] = v[2] * t[1]; \
	1079	m[2][2] = v[2] * t[2]; \
	1080	}\
	1081
	1082
	1083	/** outer product of vector times vector transpose
	1084	*
	1085	* The outer product of vector v and vector transpose t yeilds
	1086	* dyadic matrix m.
	1087	*/
	1088	#define OUTER_PRODUCT_4X4(m,v,t) \
	1089	{ \
	1090	m[0][0] = v[0] * t[0]; \
	1091	m[0][1] = v[0] * t[1]; \
	1092	m[0][2] = v[0] * t[2]; \
	1093	m[0][3] = v[0] * t[3]; \
	1094	\
	1095	m[1][0] = v[1] * t[0]; \
	1096	m[1][1] = v[1] * t[1]; \
	1097	m[1][2] = v[1] * t[2]; \
	1098	m[1][3] = v[1] * t[3]; \
	1099	\
	1100	m[2][0] = v[2] * t[0]; \
	1101	m[2][1] = v[2] * t[1]; \
	1102	m[2][2] = v[2] * t[2]; \
	1103	m[2][3] = v[2] * t[3]; \
	1104	\
	1105	m[3][0] = v[3] * t[0]; \
	1106	m[3][1] = v[3] * t[1]; \
	1107	m[3][2] = v[3] * t[2]; \
	1108	m[3][3] = v[3] * t[3]; \
	1109	}\
	1110
	1111
	1112	/** outer product of vector times vector transpose
	1113	*
	1114	* The outer product of vector v and vector transpose t yeilds
	1115	* dyadic matrix m.
	1116	*/
	1117	#define ACCUM_OUTER_PRODUCT_2X2(m,v,t) \
	1118	{ \
	1119	m[0][0] += v[0] * t[0]; \
	1120	m[0][1] += v[0] * t[1]; \
	1121	\
	1122	m[1][0] += v[1] * t[0]; \
	1123	m[1][1] += v[1] * t[1]; \
	1124	}\
	1125
	1126
	1127	/** outer product of vector times vector transpose
	1128	*
	1129	* The outer product of vector v and vector transpose t yeilds
	1130	* dyadic matrix m.
	1131	*/
	1132	#define ACCUM_OUTER_PRODUCT_3X3(m,v,t) \
	1133	{ \
	1134	m[0][0] += v[0] * t[0]; \
	1135	m[0][1] += v[0] * t[1]; \
	1136	m[0][2] += v[0] * t[2]; \
	1137	\
	1138	m[1][0] += v[1] * t[0]; \
	1139	m[1][1] += v[1] * t[1]; \
	1140	m[1][2] += v[1] * t[2]; \
	1141	\
	1142	m[2][0] += v[2] * t[0]; \
	1143	m[2][1] += v[2] * t[1]; \
	1144	m[2][2] += v[2] * t[2]; \
	1145	}\
	1146
	1147
	1148	/** outer product of vector times vector transpose
	1149	*
	1150	* The outer product of vector v and vector transpose t yeilds
	1151	* dyadic matrix m.
	1152	*/
	1153	#define ACCUM_OUTER_PRODUCT_4X4(m,v,t) \
	1154	{ \
	1155	m[0][0] += v[0] * t[0]; \
	1156	m[0][1] += v[0] * t[1]; \
	1157	m[0][2] += v[0] * t[2]; \
	1158	m[0][3] += v[0] * t[3]; \
	1159	\
	1160	m[1][0] += v[1] * t[0]; \
	1161	m[1][1] += v[1] * t[1]; \
	1162	m[1][2] += v[1] * t[2]; \
	1163	m[1][3] += v[1] * t[3]; \
	1164	\
	1165	m[2][0] += v[2] * t[0]; \
	1166	m[2][1] += v[2] * t[1]; \
	1167	m[2][2] += v[2] * t[2]; \
	1168	m[2][3] += v[2] * t[3]; \
	1169	\
	1170	m[3][0] += v[3] * t[0]; \
	1171	m[3][1] += v[3] * t[1]; \
	1172	m[3][2] += v[3] * t[2]; \
	1173	m[3][3] += v[3] * t[3]; \
	1174	}\
	1175
	1176
	1177	/** determinant of matrix
	1178	*
	1179	* Computes determinant of matrix m, returning d
	1180	*/
	1181	#define DETERMINANT_2X2(d,m) \
	1182	{ \
	1183	d = m[0][0] * m[1][1] - m[0][1] * m[1][0]; \
	1184	}\
	1185
	1186
	1187	/** determinant of matrix
	1188	*
	1189	* Computes determinant of matrix m, returning d
	1190	*/
	1191	#define DETERMINANT_3X3(d,m) \
	1192	{ \
	1193	d = m[0][0] * (m[1][1]m[2][2] - m[1][2] m[2][1]); \
	1194	d -= m[0][1] * (m[1][0]m[2][2] - m[1][2] m[2][0]); \
	1195	d += m[0][2] * (m[1][0]m[2][1] - m[1][1] m[2][0]); \
	1196	}\
	1197
	1198
	1199	/** i,j,th cofactor of a 4x4 matrix
	1200	*
	1201	*/
	1202	#define COFACTOR_4X4_IJ(fac,m,i,j) \
	1203	{ \
	1204	GUINT __ii[4], __jj[4], __k; \
	1205	\
	1206	for (__k=0; __k<i; __k++) __ii[__k] = __k; \
	1207	for (__k=i; __k<3; __k++) __ii[__k] = __k+1; \
	1208	for (__k=0; __k<j; __k++) __jj[__k] = __k; \
	1209	for (__k=j; __k<3; __k++) __jj[__k] = __k+1; \
	1210	\
	1211	(fac) = m[__ii[0]][__jj[0]] * (m[__ii[1]][__jj[1]]*m[__ii[2]][__jj[2]] \
	1212	- m[__ii[1]][__jj[2]]*m[__ii[2]][__jj[1]]); \
	1213	(fac) -= m[__ii[0]][__jj[1]] * (m[__ii[1]][__jj[0]]*m[__ii[2]][__jj[2]] \
	1214	- m[__ii[1]][__jj[2]]*m[__ii[2]][__jj[0]]);\
	1215	(fac) += m[__ii[0]][__jj[2]] * (m[__ii[1]][__jj[0]]*m[__ii[2]][__jj[1]] \
	1216	- m[__ii[1]][__jj[1]]*m[__ii[2]][__jj[0]]);\
	1217	\
	1218	__k = i+j; \
	1219	if ( __k != (__k/2)*2) { \
	1220	(fac) = -(fac); \
	1221	} \
	1222	}\
	1223
	1224
	1225	/** determinant of matrix
	1226	*
	1227	* Computes determinant of matrix m, returning d
	1228	*/
	1229	#define DETERMINANT_4X4(d,m) \
	1230	{ \
	1231	GREAL cofac; \
	1232	COFACTOR_4X4_IJ (cofac, m, 0, 0); \
	1233	d = m[0][0] * cofac; \
	1234	COFACTOR_4X4_IJ (cofac, m, 0, 1); \
	1235	d += m[0][1] * cofac; \
	1236	COFACTOR_4X4_IJ (cofac, m, 0, 2); \
	1237	d += m[0][2] * cofac; \
	1238	COFACTOR_4X4_IJ (cofac, m, 0, 3); \
	1239	d += m[0][3] * cofac; \
	1240	}\
	1241
	1242
	1243	/** cofactor of matrix
	1244	*
	1245	* Computes cofactor of matrix m, returning a
	1246	*/
	1247	#define COFACTOR_2X2(a,m) \
	1248	{ \
	1249	a[0][0] = (m)[1][1]; \
	1250	a[0][1] = - (m)[1][0]; \
	1251	a[1][0] = - (m)[0][1]; \
	1252	a[1][1] = (m)[0][0]; \
	1253	}\
	1254
	1255
	1256	/** cofactor of matrix
	1257	*
	1258	* Computes cofactor of matrix m, returning a
	1259	*/
	1260	#define COFACTOR_3X3(a,m) \
	1261	{ \
	1262	a[0][0] = m[1][1]m[2][2] - m[1][2]m[2][1]; \
	1263	a[0][1] = - (m[1][0]m[2][2] - m[2][0]m[1][2]); \
	1264	a[0][2] = m[1][0]m[2][1] - m[1][1]m[2][0]; \
	1265	a[1][0] = - (m[0][1]m[2][2] - m[0][2]m[2][1]); \
	1266	a[1][1] = m[0][0]m[2][2] - m[0][2]m[2][0]; \
	1267	a[1][2] = - (m[0][0]m[2][1] - m[0][1]m[2][0]); \
	1268	a[2][0] = m[0][1]m[1][2] - m[0][2]m[1][1]; \
	1269	a[2][1] = - (m[0][0]m[1][2] - m[0][2]m[1][0]); \
	1270	a[2][2] = m[0][0]m[1][1] - m[0][1]m[1][0]); \
	1271	}\
	1272
	1273
	1274	/** cofactor of matrix
	1275	*
	1276	* Computes cofactor of matrix m, returning a
	1277	*/
	1278	#define COFACTOR_4X4(a,m) \
	1279	{ \
	1280	int i,j; \
	1281	\
	1282	for (i=0; i<4; i++) { \
	1283	for (j=0; j<4; j++) { \
	1284	COFACTOR_4X4_IJ (a[i][j], m, i, j); \
	1285	} \
	1286	} \
	1287	}\
	1288
	1289
	1290	/** adjoint of matrix
	1291	*
	1292	* Computes adjoint of matrix m, returning a
	1293	* (Note that adjoint is just the transpose of the cofactor matrix)
	1294	*/
	1295	#define ADJOINT_2X2(a,m) \
	1296	{ \
	1297	a[0][0] = (m)[1][1]; \
	1298	a[1][0] = - (m)[1][0]; \
	1299	a[0][1] = - (m)[0][1]; \
	1300	a[1][1] = (m)[0][0]; \
	1301	}\
	1302
	1303
	1304	/** adjoint of matrix
	1305	*
	1306	* Computes adjoint of matrix m, returning a
	1307	* (Note that adjoint is just the transpose of the cofactor matrix)
	1308	*/
	1309	#define ADJOINT_3X3(a,m) \
	1310	{ \
	1311	a[0][0] = m[1][1]m[2][2] - m[1][2]m[2][1]; \
	1312	a[1][0] = - (m[1][0]m[2][2] - m[2][0]m[1][2]); \
	1313	a[2][0] = m[1][0]m[2][1] - m[1][1]m[2][0]; \
	1314	a[0][1] = - (m[0][1]m[2][2] - m[0][2]m[2][1]); \
	1315	a[1][1] = m[0][0]m[2][2] - m[0][2]m[2][0]; \
	1316	a[2][1] = - (m[0][0]m[2][1] - m[0][1]m[2][0]); \
	1317	a[0][2] = m[0][1]m[1][2] - m[0][2]m[1][1]; \
	1318	a[1][2] = - (m[0][0]m[1][2] - m[0][2]m[1][0]); \
	1319	a[2][2] = m[0][0]m[1][1] - m[0][1]m[1][0]); \
	1320	}\
	1321
	1322
	1323	/** adjoint of matrix
	1324	*
	1325	* Computes adjoint of matrix m, returning a
	1326	* (Note that adjoint is just the transpose of the cofactor matrix)
	1327	*/
	1328	#define ADJOINT_4X4(a,m) \
	1329	{ \
	1330	char _i_,_j_; \
	1331	\
	1332	for (_i_=0; _i_<4; _i_++) { \
	1333	for (_j_=0; _j_<4; _j_++) { \
	1334	COFACTOR_4X4_IJ (a[_j_][_i_], m, _i_, _j_); \
	1335	} \
	1336	} \
	1337	}\
	1338
	1339
	1340	/** compute adjoint of matrix and scale
	1341	*
	1342	* Computes adjoint of matrix m, scales it by s, returning a
	1343	*/
	1344	#define SCALE_ADJOINT_2X2(a,s,m) \
	1345	{ \
	1346	a[0][0] = (s) * m[1][1]; \
	1347	a[1][0] = - (s) * m[1][0]; \
	1348	a[0][1] = - (s) * m[0][1]; \
	1349	a[1][1] = (s) * m[0][0]; \
	1350	}\
	1351
	1352
	1353	/** compute adjoint of matrix and scale
	1354	*
	1355	* Computes adjoint of matrix m, scales it by s, returning a
	1356	*/
	1357	#define SCALE_ADJOINT_3X3(a,s,m) \
	1358	{ \
	1359	a[0][0] = (s) * (m[1][1] * m[2][2] - m[1][2] * m[2][1]); \
	1360	a[1][0] = (s) * (m[1][2] * m[2][0] - m[1][0] * m[2][2]); \
	1361	a[2][0] = (s) * (m[1][0] * m[2][1] - m[1][1] * m[2][0]); \
	1362	\
	1363	a[0][1] = (s) * (m[0][2] * m[2][1] - m[0][1] * m[2][2]); \
	1364	a[1][1] = (s) * (m[0][0] * m[2][2] - m[0][2] * m[2][0]); \
	1365	a[2][1] = (s) * (m[0][1] * m[2][0] - m[0][0] * m[2][1]); \
	1366	\
	1367	a[0][2] = (s) * (m[0][1] * m[1][2] - m[0][2] * m[1][1]); \
	1368	a[1][2] = (s) * (m[0][2] * m[1][0] - m[0][0] * m[1][2]); \
	1369	a[2][2] = (s) * (m[0][0] * m[1][1] - m[0][1] * m[1][0]); \
	1370	}\
	1371
	1372
	1373	/** compute adjoint of matrix and scale
	1374	*
	1375	* Computes adjoint of matrix m, scales it by s, returning a
	1376	*/
	1377	#define SCALE_ADJOINT_4X4(a,s,m) \
	1378	{ \
	1379	char _i_,_j_; \
	1380	for (_i_=0; _i_<4; _i_++) { \
	1381	for (_j_=0; _j_<4; _j_++) { \
	1382	COFACTOR_4X4_IJ (a[_j_][_i_], m, _i_, _j_); \
	1383	a[_j_][_i_] *= s; \
	1384	} \
	1385	} \
	1386	}\
	1387
	1388	/** inverse of matrix
	1389	*
	1390	* Compute inverse of matrix a, returning determinant m and
	1391	* inverse b
	1392	*/
	1393	#define INVERT_2X2(b,det,a) \
	1394	{ \
	1395	GREAL _tmp_; \
	1396	DETERMINANT_2X2 (det, a); \
	1397	_tmp_ = 1.0 / (det); \
	1398	SCALE_ADJOINT_2X2 (b, _tmp_, a); \
	1399	}\
	1400
	1401
	1402	/** inverse of matrix
	1403	*
	1404	* Compute inverse of matrix a, returning determinant m and
	1405	* inverse b
	1406	*/
	1407	#define INVERT_3X3(b,det,a) \
	1408	{ \
	1409	GREAL _tmp_; \
	1410	DETERMINANT_3X3 (det, a); \
	1411	_tmp_ = 1.0 / (det); \
	1412	SCALE_ADJOINT_3X3 (b, _tmp_, a); \
	1413	}\
	1414
	1415
	1416	/** inverse of matrix
	1417	*
	1418	* Compute inverse of matrix a, returning determinant m and
	1419	* inverse b
	1420	*/
	1421	#define INVERT_4X4(b,det,a) \
	1422	{ \
	1423	GREAL _tmp_; \
	1424	DETERMINANT_4X4 (det, a); \
	1425	_tmp_ = 1.0 / (det); \
	1426	SCALE_ADJOINT_4X4 (b, _tmp_, a); \
	1427	}\
	1428
	1429	//! Get the triple(3) row of a transform matrix
	1430	#define MAT_GET_ROW(mat,vec3,rowindex)\
	1431	{\
	1432	vec3[0] = mat[rowindex][0];\
	1433	vec3[1] = mat[rowindex][1];\
	1434	vec3[2] = mat[rowindex][2]; \
	1435	}\
	1436
	1437	//! Get the tuple(2) row of a transform matrix
	1438	#define MAT_GET_ROW2(mat,vec2,rowindex)\
	1439	{\
	1440	vec2[0] = mat[rowindex][0];\
	1441	vec2[1] = mat[rowindex][1];\
	1442	}\
	1443
	1444
	1445	//! Get the quad (4) row of a transform matrix
	1446	#define MAT_GET_ROW4(mat,vec4,rowindex)\
	1447	{\
	1448	vec4[0] = mat[rowindex][0];\
	1449	vec4[1] = mat[rowindex][1];\
	1450	vec4[2] = mat[rowindex][2];\
	1451	vec4[3] = mat[rowindex][3];\
	1452	}\
	1453
	1454	//! Get the triple(3) col of a transform matrix
	1455	#define MAT_GET_COL(mat,vec3,colindex)\
	1456	{\
	1457	vec3[0] = mat[0][colindex];\
	1458	vec3[1] = mat[1][colindex];\
	1459	vec3[2] = mat[2][colindex]; \
	1460	}\
	1461
	1462	//! Get the tuple(2) col of a transform matrix
	1463	#define MAT_GET_COL2(mat,vec2,colindex)\
	1464	{\
	1465	vec2[0] = mat[0][colindex];\
	1466	vec2[1] = mat[1][colindex];\
	1467	}\
	1468
	1469
	1470	//! Get the quad (4) col of a transform matrix
	1471	#define MAT_GET_COL4(mat,vec4,colindex)\
	1472	{\
	1473	vec4[0] = mat[0][colindex];\
	1474	vec4[1] = mat[1][colindex];\
	1475	vec4[2] = mat[2][colindex];\
	1476	vec4[3] = mat[3][colindex];\
	1477	}\
	1478
	1479	//! Get the triple(3) col of a transform matrix
	1480	#define MAT_GET_X(mat,vec3)\
	1481	{\
	1482	MAT_GET_COL(mat,vec3,0);\
	1483	}\
	1484
	1485	//! Get the triple(3) col of a transform matrix
	1486	#define MAT_GET_Y(mat,vec3)\
	1487	{\
	1488	MAT_GET_COL(mat,vec3,1);\
	1489	}\
	1490
	1491	//! Get the triple(3) col of a transform matrix
	1492	#define MAT_GET_Z(mat,vec3)\
	1493	{\
	1494	MAT_GET_COL(mat,vec3,2);\
	1495	}\
	1496
	1497
	1498	//! Get the triple(3) col of a transform matrix
	1499	#define MAT_SET_X(mat,vec3)\
	1500	{\
	1501	mat[0][0] = vec3[0];\
	1502	mat[1][0] = vec3[1];\
	1503	mat[2][0] = vec3[2];\
	1504	}\
	1505
	1506	//! Get the triple(3) col of a transform matrix
	1507	#define MAT_SET_Y(mat,vec3)\
	1508	{\
	1509	mat[0][1] = vec3[0];\
	1510	mat[1][1] = vec3[1];\
	1511	mat[2][1] = vec3[2];\
	1512	}\
	1513
	1514	//! Get the triple(3) col of a transform matrix
	1515	#define MAT_SET_Z(mat,vec3)\
	1516	{\
	1517	mat[0][2] = vec3[0];\
	1518	mat[1][2] = vec3[1];\
	1519	mat[2][2] = vec3[2];\
	1520	}\
	1521
	1522
	1523	//! Get the triple(3) col of a transform matrix
	1524	#define MAT_GET_TRANSLATION(mat,vec3)\
	1525	{\
	1526	vec3[0] = mat[0][3];\
	1527	vec3[1] = mat[1][3];\
	1528	vec3[2] = mat[2][3]; \
	1529	}\
	1530
	1531	//! Set the triple(3) col of a transform matrix
	1532	#define MAT_SET_TRANSLATION(mat,vec3)\
	1533	{\
	1534	mat[0][3] = vec3[0];\
	1535	mat[1][3] = vec3[1];\
	1536	mat[2][3] = vec3[2]; \
	1537	}\
	1538
	1539
	1540
	1541	//! Returns the dot product between a vec3f and the row of a matrix
	1542	#define MAT_DOT_ROW(mat,vec3,rowindex) (vec3[0]mat[rowindex][0] + vec3[1]mat[rowindex][1] + vec3[2]*mat[rowindex][2])
	1543
	1544	//! Returns the dot product between a vec2f and the row of a matrix
	1545	#define MAT_DOT_ROW2(mat,vec2,rowindex) (vec2[0]mat[rowindex][0] + vec2[1]mat[rowindex][1])
	1546
	1547	//! Returns the dot product between a vec4f and the row of a matrix
	1548	#define MAT_DOT_ROW4(mat,vec4,rowindex) (vec4[0]mat[rowindex][0] + vec4[1]mat[rowindex][1] + vec4[2]mat[rowindex][2] + vec4[3]mat[rowindex][3])
	1549
	1550
	1551	//! Returns the dot product between a vec3f and the col of a matrix
	1552	#define MAT_DOT_COL(mat,vec3,colindex) (vec3[0]mat[0][colindex] + vec3[1]mat[1][colindex] + vec3[2]*mat[2][colindex])
	1553
	1554	//! Returns the dot product between a vec2f and the col of a matrix
	1555	#define MAT_DOT_COL2(mat,vec2,colindex) (vec2[0]mat[0][colindex] + vec2[1]mat[1][colindex])
	1556
	1557	//! Returns the dot product between a vec4f and the col of a matrix
	1558	#define MAT_DOT_COL4(mat,vec4,colindex) (vec4[0]mat[0][colindex] + vec4[1]mat[1][colindex] + vec4[2]mat[2][colindex] + vec4[3]mat[3][colindex])
	1559
	1560	/*!Transpose matrix times vector
	1561	v is a vec3f
	1562	and m is a mat4f<br>
	1563	*/
	1564	#define INV_MAT_DOT_VEC_3X3(p,m,v) \
	1565	{ \
	1566	p[0] = MAT_DOT_COL(m,v,0); \
	1567	p[1] = MAT_DOT_COL(m,v,1); \
	1568	p[2] = MAT_DOT_COL(m,v,2); \
	1569	}\
	1570
	1571
	1572
	1573	#endif // GIM_VECTOR_H_INCLUDED

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