#define max(A,B) ((A) > (B) ? (A) : (B))
#endif
-#define lhrandom(MIN,MAX) ((rand() & 32767) * (((MAX)-(MIN)) * (1.0f / 32767.0f)) + (MIN))
+//#define lhrandom(MIN,MAX) ((rand() & 32767) * (((MAX)-(MIN)) * (1.0f / 32767.0f)) + (MIN))
+#define lhrandom(MIN,MAX) (((double)rand() / RAND_MAX) * ((MAX)-(MIN)) + (MIN))
+
+#define invpow(base,number) (log(number) / log(base))
+#define log2i(n) ((((n) & 0xAAAAAAAA) != 0 ? 1 : 0) | (((n) & 0xCCCCCCCC) != 0 ? 2 : 0) | (((n) & 0xF0F0F0F0) != 0 ? 4 : 0) | (((n) & 0xFF00FF00) != 0 ? 8 : 0) | (((n) & 0xFFFF0000) != 0 ? 16 : 0))
+#define bit2i(n) log2i((n) << 1)
#define DEG2RAD(a) ((a) * ((float) M_PI / 180.0f))
#define RAD2DEG(a) ((a) * (180.0f / (float) M_PI))
#define VectorNormalizeDouble(v) {double ilength = sqrt(DotProduct(v,v));if (ilength) ilength = 1.0 / ilength;v[0] *= ilength;v[1] *= ilength;v[2] *= ilength;}
#define VectorDistance2(a, b) (((a)[0] - (b)[0]) * ((a)[0] - (b)[0]) + ((a)[1] - (b)[1]) * ((a)[1] - (b)[1]) + ((a)[2] - (b)[2]) * ((a)[2] - (b)[2]))
#define VectorDistance(a, b) (sqrt(VectorDistance2(a,b)))
-#define VectorLength(a) sqrt(DotProduct(a, a))
+#define VectorLength(a) (sqrt(DotProduct(a, a)))
+#define VectorLength2(a) (DotProduct(a, a))
#define VectorScale(in, scale, out) ((out)[0] = (in)[0] * (scale),(out)[1] = (in)[1] * (scale),(out)[2] = (in)[2] * (scale))
#define VectorCompare(a,b) (((a)[0]==(b)[0])&&((a)[1]==(b)[1])&&((a)[2]==(b)[2]))
#define VectorMA(a, scale, b, c) ((c)[0] = (a)[0] + (scale) * (b)[0],(c)[1] = (a)[1] + (scale) * (b)[1],(c)[2] = (a)[2] + (scale) * (b)[2])
#define VectorMAM(scale1, b1, scale2, b2, c) ((c)[0] = (scale1) * (b1)[0] + (scale2) * (b2)[0],(c)[1] = (scale1) * (b1)[1] + (scale2) * (b2)[1],(c)[2] = (scale1) * (b1)[2] + (scale2) * (b2)[2])
#define VectorMAMAM(scale1, b1, scale2, b2, scale3, b3, c) ((c)[0] = (scale1) * (b1)[0] + (scale2) * (b2)[0] + (scale3) * (b3)[0],(c)[1] = (scale1) * (b1)[1] + (scale2) * (b2)[1] + (scale3) * (b3)[1],(c)[2] = (scale1) * (b1)[2] + (scale2) * (b2)[2] + (scale3) * (b3)[2])
#define VectorMAMAMAM(scale1, b1, scale2, b2, scale3, b3, scale4, b4, c) ((c)[0] = (scale1) * (b1)[0] + (scale2) * (b2)[0] + (scale3) * (b3)[0] + (scale4) * (b4)[0],(c)[1] = (scale1) * (b1)[1] + (scale2) * (b2)[1] + (scale3) * (b3)[1] + (scale4) * (b4)[1],(c)[2] = (scale1) * (b1)[2] + (scale2) * (b2)[2] + (scale3) * (b3)[2] + (scale4) * (b4)[2])
-#define VectorNormalizeFast(_v)\
-{\
- float _y, _number;\
- _number = DotProduct(_v, _v);\
- if (_number != 0.0)\
- {\
- *((long *)&_y) = 0x5f3759df - ((* (long *) &_number) >> 1);\
- _y = _y * (1.5f - (_number * 0.5f * _y * _y));\
- VectorScale(_v, _y, _v);\
- }\
-}
#define VectorRandom(v) do{(v)[0] = lhrandom(-1, 1);(v)[1] = lhrandom(-1, 1);(v)[2] = lhrandom(-1, 1);}while(DotProduct(v, v) > 1)
-#define VectorBlend(b1, b2, blend, c) do{float iblend = 1 - (blend);VectorMAM(iblend, b1, blend, b2, c);}while(0)
+#define VectorLerp(v1,lerp,v2,c) ((c)[0] = (v1)[0] + (lerp) * ((v2)[0] - (v1)[0]), (c)[1] = (v1)[1] + (lerp) * ((v2)[1] - (v1)[1]), (c)[2] = (v1)[2] + (lerp) * ((v2)[2] - (v1)[2]))
+#define VectorReflect(a,r,b,c) do{double d;d = DotProduct((a), (b)) * -(1.0 + (r));VectorMA((a), (d), (b), (c));}while(0)
#define BoxesOverlap(a,b,c,d) ((a)[0] <= (d)[0] && (b)[0] >= (c)[0] && (a)[1] <= (d)[1] && (b)[1] >= (c)[1] && (a)[2] <= (d)[2] && (b)[2] >= (c)[2])
+#define TriangleNormal(a,b,c,n) ( \
+ (n)[0] = ((a)[1] - (b)[1]) * ((c)[2] - (b)[2]) - ((a)[2] - (b)[2]) * ((c)[1] - (b)[1]), \
+ (n)[1] = ((a)[2] - (b)[2]) * ((c)[0] - (b)[0]) - ((a)[0] - (b)[0]) * ((c)[2] - (b)[2]), \
+ (n)[2] = ((a)[0] - (b)[0]) * ((c)[1] - (b)[1]) - ((a)[1] - (b)[1]) * ((c)[0] - (b)[0]) \
+ )
+
+// fast PointInfrontOfTriangle
+// subtracts v1 from v0 and v2, combined into a crossproduct, combined with a
+// dotproduct of the light location relative to the first point of the
+// triangle (any point works, since any triangle is obviously flat), and
+// finally a comparison to determine if the light is infront of the triangle
+// (the goal of this statement) we do not need to normalize the surface
+// normal because both sides of the comparison use it, therefore they are
+// both multiplied the same amount... furthermore the subtract can be done
+// on the vectors, saving a little bit of math in the dotproducts
+#define PointInfrontOfTriangle(p,a,b,c) (((p)[0] - (a)[0]) * (((a)[1] - (b)[1]) * ((c)[2] - (b)[2]) - ((a)[2] - (b)[2]) * ((c)[1] - (b)[1])) + ((p)[1] - (a)[1]) * (((a)[2] - (b)[2]) * ((c)[0] - (b)[0]) - ((a)[0] - (b)[0]) * ((c)[2] - (b)[2])) + ((p)[2] - (a)[2]) * (((a)[0] - (b)[0]) * ((c)[1] - (b)[1]) - ((a)[1] - (b)[1]) * ((c)[0] - (b)[0])) > 0)
+#if 0
+// readable version, kept only for explanatory reasons
+int PointInfrontOfTriangle(const float *p, const float *a, const float *b, const float *c)
+{
+ float dir0[3], dir1[3], normal[3];
+
+ // calculate two mostly perpendicular edge directions
+ VectorSubtract(a, b, dir0);
+ VectorSubtract(c, b, dir1);
+
+ // we have two edge directions, we can calculate a third vector from
+ // them, which is the direction of the surface normal (it's magnitude
+ // is not 1 however)
+ CrossProduct(dir0, dir1, normal);
+
+ // compare distance of light along normal, with distance of any point
+ // of the triangle along the same normal (the triangle is planar,
+ // I.E. flat, so all points give the same answer)
+ return DotProduct(p, normal) > DotProduct(a, normal);
+}
+#endif
+
/*
// LordHavoc: quaternion math, untested, don't know if these are correct,
// need to add conversion to/from matrices
void VectorVectorsDouble(const double *forward, double *right, double *up);
void PlaneClassify(struct mplane_s *p);
-int BoxOnPlaneSide (const vec3_t emins, const vec3_t emaxs, const struct mplane_s *p);
+int BoxOnPlaneSide(const vec3_t emins, const vec3_t emaxs, const struct mplane_s *p);
+int BoxOnPlaneSide_Separate(const vec3_t emins, const vec3_t emaxs, const vec3_t normal, const vec_t dist);
+void BoxPlaneCorners(const vec3_t emins, const vec3_t emaxs, const struct mplane_s *p, vec3_t outnear, vec3_t outfar);
+void BoxPlaneCorners_Separate(const vec3_t emins, const vec3_t emaxs, const vec3_t normal, vec3_t outnear, vec3_t outfar);
+void BoxPlaneCornerDistances(const vec3_t emins, const vec3_t emaxs, const struct mplane_s *p, vec_t *outnear, vec_t *outfar);
+void BoxPlaneCornerDistances_Separate(const vec3_t emins, const vec3_t emaxs, const vec3_t normal, vec_t *outnear, vec_t *outfar);
#define PlaneDist(point,plane) ((plane)->type < 3 ? (point)[(plane)->type] : DotProduct((point), (plane)->normal))
#define PlaneDiff(point,plane) (((plane)->type < 3 ? (point)[(plane)->type] : DotProduct((point), (plane)->normal)) - (plane)->dist)
// print a matrix to the console
struct matrix4x4_s;
void Matrix4x4_Print(const struct matrix4x4_s *in);
+int Math_atov(const char *s, vec3_t out);
+
+void BoxFromPoints(vec3_t mins, vec3_t maxs, int numpoints, vec_t *point3f);
#endif