SRB2/src/m_fixed.c
2018-12-20 18:52:51 -03:00

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// SONIC ROBO BLAST 2
//-----------------------------------------------------------------------------
// Copyright (C) 1993-1996 by id Software, Inc.
// Copyright (C) 1998-2000 by DooM Legacy Team.
// Copyright (C) 1999-2018 by Sonic Team Junior.
//
// This program is free software distributed under the
// terms of the GNU General Public License, version 2.
// See the 'LICENSE' file for more details.
//-----------------------------------------------------------------------------
/// \file m_fixed.c
/// \brief Fixed point implementation
#if 0 //#ifndef NO_M
#include <math.h>
#define HAVE_SQRT
#if 0 //#ifndef _WIN32 // MSVCRT does not have *f() functions
#define HAVE_SQRTF
#endif
#endif
#include "doomdef.h"
#include "m_fixed.h"
#ifdef __USE_C_FIXEDMUL__
/** \brief The FixedMul function
\param a fixed_t number
\param b fixed_t number
\return a*b>>FRACBITS
*/
fixed_t FixedMul(fixed_t a, fixed_t b)
{
// Need to cast to unsigned before shifting to avoid undefined behaviour
// for negative integers
return (fixed_t)(((UINT64)((INT64)a * b)) >> FRACBITS);
}
#endif //__USE_C_FIXEDMUL__
#ifdef __USE_C_FIXEDDIV__
/** \brief The FixedDiv2 function
\param a fixed_t number
\param b fixed_t number
\return a/b * FRACUNIT
*/
fixed_t FixedDiv2(fixed_t a, fixed_t b)
{
INT64 ret;
if (b == 0)
I_Error("FixedDiv: divide by zero");
ret = (((INT64)a * FRACUNIT) ) / b;
if ((ret > INT32_MAX) || (ret < INT32_MIN))
I_Error("FixedDiv: divide by zero");
return (fixed_t)ret;
}
#endif // __USE_C_FIXEDDIV__
fixed_t FixedSqrt(fixed_t x)
{
#ifdef HAVE_SQRT
const float fx = FIXED_TO_FLOAT(x);
float fr;
#ifdef HAVE_SQRTF
fr = sqrtf(fx);
#else
fr = (float)sqrt(fx);
#endif
return FLOAT_TO_FIXED(fr);
#else
// The neglected art of Fixed Point arithmetic
// Jetro Lauha
// Seminar Presentation
// Assembly 2006, 3rd- 6th August 2006
// (Revised: September 13, 2006)
// URL: http://jet.ro/files/The_neglected_art_of_Fixed_Point_arithmetic_20060913.pdf
register UINT32 root, remHi, remLo, testDiv, count;
root = 0; /* Clear root */
remHi = 0; /* Clear high part of partial remainder */
remLo = x; /* Get argument into low part of partial remainder */
count = (15 + (FRACBITS >> 1)); /* Load loop counter */
do
{
remHi = (remHi << 2) | (remLo >> 30); remLo <<= 2; /* get 2 bits of arg */
root <<= 1; /* Get ready for the next bit in the root */
testDiv = (root << 1) + 1; /* Test radical */
if (remHi >= testDiv)
{
remHi -= testDiv;
root += 1;
}
} while (count-- != 0);
return root;
#endif
}
fixed_t FixedHypot(fixed_t x, fixed_t y)
{
fixed_t ax, yx, yx2, yx1;
if (abs(y) > abs(x)) // |y|>|x|
{
ax = abs(y); // |y| => ax
yx = FixedDiv(x, y); // (x/y)
}
else // |x|>|y|
{
ax = abs(x); // |x| => ax
yx = FixedDiv(y, x); // (x/y)
}
yx2 = FixedMul(yx, yx); // (x/y)^2
yx1 = FixedSqrt(1*FRACUNIT + yx2); // (1 + (x/y)^2)^1/2
return FixedMul(ax, yx1); // |x|*((1 + (x/y)^2)^1/2)
}
vector2_t *FV2_Load(vector2_t *vec, fixed_t x, fixed_t y)
{
vec->x = x;
vec->y = y;
return vec;
}
vector2_t *FV2_UnLoad(vector2_t *vec, fixed_t *x, fixed_t *y)
{
*x = vec->x;
*y = vec->y;
return vec;
}
vector2_t *FV2_Copy(vector2_t *a_o, const vector2_t *a_i)
{
return M_Memcpy(a_o, a_i, sizeof(vector2_t));
}
vector2_t *FV2_AddEx(const vector2_t *a_i, const vector2_t *a_c, vector2_t *a_o)
{
a_o->x = a_i->x + a_c->x;
a_o->y = a_i->y + a_c->y;
return a_o;
}
vector2_t *FV2_Add(vector2_t *a_i, const vector2_t *a_c)
{
return FV2_AddEx(a_i, a_c, a_i);
}
vector2_t *FV2_SubEx(const vector2_t *a_i, const vector2_t *a_c, vector2_t *a_o)
{
a_o->x = a_i->x - a_c->x;
a_o->y = a_i->y - a_c->y;
return a_o;
}
vector2_t *FV2_Sub(vector2_t *a_i, const vector2_t *a_c)
{
return FV2_SubEx(a_i, a_c, a_i);
}
vector2_t *FV2_MulEx(const vector2_t *a_i, fixed_t a_c, vector2_t *a_o)
{
a_o->x = FixedMul(a_i->x, a_c);
a_o->y = FixedMul(a_i->y, a_c);
return a_o;
}
vector2_t *FV2_Mul(vector2_t *a_i, fixed_t a_c)
{
return FV2_MulEx(a_i, a_c, a_i);
}
vector2_t *FV2_DivideEx(const vector2_t *a_i, fixed_t a_c, vector2_t *a_o)
{
a_o->x = FixedDiv(a_i->x, a_c);
a_o->y = FixedDiv(a_i->y, a_c);
return a_o;
}
vector2_t *FV2_Divide(vector2_t *a_i, fixed_t a_c)
{
return FV2_DivideEx(a_i, a_c, a_i);
}
// Vector Complex Math
vector2_t *FV2_Midpoint(const vector2_t *a_1, const vector2_t *a_2, vector2_t *a_o)
{
a_o->x = FixedDiv(a_2->x - a_1->x, 2*FRACUNIT);
a_o->y = FixedDiv(a_2->y - a_1->y, 2*FRACUNIT);
a_o->x = a_1->x + a_o->x;
a_o->y = a_1->y + a_o->y;
return a_o;
}
fixed_t FV2_Distance(const vector2_t *p1, const vector2_t *p2)
{
fixed_t xs = FixedMul(p2->x-p1->x,p2->x-p1->x);
fixed_t ys = FixedMul(p2->y-p1->y,p2->y-p1->y);
return FixedSqrt(xs+ys);
}
fixed_t FV2_Magnitude(const vector2_t *a_normal)
{
fixed_t xs = FixedMul(a_normal->x,a_normal->x);
fixed_t ys = FixedMul(a_normal->y,a_normal->y);
return FixedSqrt(xs+ys);
}
// Also returns the magnitude
fixed_t FV2_NormalizeEx(const vector2_t *a_normal, vector2_t *a_o)
{
fixed_t magnitude = FV2_Magnitude(a_normal);
a_o->x = FixedDiv(a_normal->x, magnitude);
a_o->y = FixedDiv(a_normal->y, magnitude);
return magnitude;
}
fixed_t FV2_Normalize(vector2_t *a_normal)
{
return FV2_NormalizeEx(a_normal, a_normal);
}
vector2_t *FV2_NegateEx(const vector2_t *a_1, vector2_t *a_o)
{
a_o->x = -a_1->x;
a_o->y = -a_1->y;
return a_o;
}
vector2_t *FV2_Negate(vector2_t *a_1)
{
return FV2_NegateEx(a_1, a_1);
}
boolean FV2_Equal(const vector2_t *a_1, const vector2_t *a_2)
{
fixed_t Epsilon = FRACUNIT/FRACUNIT;
if ((abs(a_2->x - a_1->x) > Epsilon) ||
(abs(a_2->y - a_1->y) > Epsilon))
{
return true;
}
return false;
}
fixed_t FV2_Dot(const vector2_t *a_1, const vector2_t *a_2)
{
return (FixedMul(a_1->x, a_2->x) + FixedMul(a_1->y, a_2->y));
}
//
// Point2Vec
//
// Given two points, create a vector between them.
//
vector2_t *FV2_Point2Vec (const vector2_t *point1, const vector2_t *point2, vector2_t *a_o)
{
a_o->x = point1->x - point2->x;
a_o->y = point1->y - point2->y;
return a_o;
}
vector3_t *FV3_Load(vector3_t *vec, fixed_t x, fixed_t y, fixed_t z)
{
vec->x = x;
vec->y = y;
vec->z = z;
return vec;
}
vector3_t *FV3_UnLoad(vector3_t *vec, fixed_t *x, fixed_t *y, fixed_t *z)
{
*x = vec->x;
*y = vec->y;
*z = vec->z;
return vec;
}
vector3_t *FV3_Copy(vector3_t *a_o, const vector3_t *a_i)
{
return M_Memcpy(a_o, a_i, sizeof(vector3_t));
}
vector3_t *FV3_AddEx(const vector3_t *a_i, const vector3_t *a_c, vector3_t *a_o)
{
a_o->x = a_i->x + a_c->x;
a_o->y = a_i->y + a_c->y;
a_o->z = a_i->z + a_c->z;
return a_o;
}
vector3_t *FV3_Add(vector3_t *a_i, const vector3_t *a_c)
{
return FV3_AddEx(a_i, a_c, a_i);
}
vector3_t *FV3_SubEx(const vector3_t *a_i, const vector3_t *a_c, vector3_t *a_o)
{
a_o->x = a_i->x - a_c->x;
a_o->y = a_i->y - a_c->y;
a_o->z = a_i->z - a_c->z;
return a_o;
}
vector3_t *FV3_Sub(vector3_t *a_i, const vector3_t *a_c)
{
return FV3_SubEx(a_i, a_c, a_i);
}
vector3_t *FV3_MulEx(const vector3_t *a_i, fixed_t a_c, vector3_t *a_o)
{
a_o->x = FixedMul(a_i->x, a_c);
a_o->y = FixedMul(a_i->y, a_c);
a_o->z = FixedMul(a_i->z, a_c);
return a_o;
}
vector3_t *FV3_Mul(vector3_t *a_i, fixed_t a_c)
{
return FV3_MulEx(a_i, a_c, a_i);
}
vector3_t *FV3_DivideEx(const vector3_t *a_i, fixed_t a_c, vector3_t *a_o)
{
a_o->x = FixedDiv(a_i->x, a_c);
a_o->y = FixedDiv(a_i->y, a_c);
a_o->z = FixedDiv(a_i->z, a_c);
return a_o;
}
vector3_t *FV3_Divide(vector3_t *a_i, fixed_t a_c)
{
return FV3_DivideEx(a_i, a_c, a_i);
}
// Vector Complex Math
vector3_t *FV3_Midpoint(const vector3_t *a_1, const vector3_t *a_2, vector3_t *a_o)
{
a_o->x = FixedDiv(a_2->x - a_1->x, 2*FRACUNIT);
a_o->y = FixedDiv(a_2->y - a_1->y, 2*FRACUNIT);
a_o->z = FixedDiv(a_2->z - a_1->z, 2*FRACUNIT);
a_o->x = a_1->x + a_o->x;
a_o->y = a_1->y + a_o->y;
a_o->z = a_1->z + a_o->z;
return a_o;
}
fixed_t FV3_Distance(const vector3_t *p1, const vector3_t *p2)
{
fixed_t xs = FixedMul(p2->x-p1->x,p2->x-p1->x);
fixed_t ys = FixedMul(p2->y-p1->y,p2->y-p1->y);
fixed_t zs = FixedMul(p2->z-p1->z,p2->z-p1->z);
return FixedSqrt(xs+ys+zs);
}
fixed_t FV3_Magnitude(const vector3_t *a_normal)
{
fixed_t xs = FixedMul(a_normal->x,a_normal->x);
fixed_t ys = FixedMul(a_normal->y,a_normal->y);
fixed_t zs = FixedMul(a_normal->z,a_normal->z);
return FixedSqrt(xs+ys+zs);
}
// Also returns the magnitude
fixed_t FV3_NormalizeEx(const vector3_t *a_normal, vector3_t *a_o)
{
fixed_t magnitude = FV3_Magnitude(a_normal);
a_o->x = FixedDiv(a_normal->x, magnitude);
a_o->y = FixedDiv(a_normal->y, magnitude);
a_o->z = FixedDiv(a_normal->z, magnitude);
return magnitude;
}
fixed_t FV3_Normalize(vector3_t *a_normal)
{
return FV3_NormalizeEx(a_normal, a_normal);
}
vector3_t *FV3_NegateEx(const vector3_t *a_1, vector3_t *a_o)
{
a_o->x = -a_1->x;
a_o->y = -a_1->y;
a_o->z = -a_1->z;
return a_o;
}
vector3_t *FV3_Negate(vector3_t *a_1)
{
return FV3_NegateEx(a_1, a_1);
}
boolean FV3_Equal(const vector3_t *a_1, const vector3_t *a_2)
{
fixed_t Epsilon = FRACUNIT/FRACUNIT;
if ((abs(a_2->x - a_1->x) > Epsilon) ||
(abs(a_2->y - a_1->y) > Epsilon) ||
(abs(a_2->z - a_1->z) > Epsilon))
{
return true;
}
return false;
}
fixed_t FV3_Dot(const vector3_t *a_1, const vector3_t *a_2)
{
return (FixedMul(a_1->x, a_2->x) + FixedMul(a_1->y, a_2->y) + FixedMul(a_1->z, a_2->z));
}
vector3_t *FV3_Cross(const vector3_t *a_1, const vector3_t *a_2, vector3_t *a_o)
{
a_o->x = FixedMul(a_1->y, a_2->z) - FixedMul(a_1->z, a_2->y);
a_o->y = FixedMul(a_1->z, a_2->x) - FixedMul(a_1->x, a_2->z);
a_o->z = FixedMul(a_1->x, a_2->y) - FixedMul(a_1->y, a_2->x);
return a_o;
}
//
// ClosestPointOnLine
//
// Finds the point on a line closest
// to the specified point.
//
vector3_t *FV3_ClosestPointOnLine(const vector3_t *Line, const vector3_t *p, vector3_t *out)
{
// Determine t (the length of the vector from <20>Line[0]<5D> to <20>p<EFBFBD>)
vector3_t c, V;
fixed_t t, d = 0;
FV3_SubEx(p, &Line[0], &c);
FV3_SubEx(&Line[1], &Line[0], &V);
FV3_NormalizeEx(&V, &V);
d = FV3_Distance(&Line[0], &Line[1]);
t = FV3_Dot(&V, &c);
// Check to see if <20>t<EFBFBD> is beyond the extents of the line segment
if (t < 0)
{
return FV3_Copy(out, &Line[0]);
}
if (t > d)
{
return FV3_Copy(out, &Line[1]);
}
// Return the point between <20>Line[0]<5D> and <20>Line[1]<5D>
FV3_Mul(&V, t);
return FV3_AddEx(&Line[0], &V, out);
}
//
// ClosestPointOnTriangle
//
// Given a triangle and a point,
// the closest point on the edge of
// the triangle is returned.
//
void FV3_ClosestPointOnTriangle (const vector3_t *tri, const vector3_t *point, vector3_t *result)
{
UINT8 i;
fixed_t dist, closestdist;
vector3_t EdgePoints[3];
vector3_t Line[2];
FV3_Copy(&Line[0], &tri[0]);
FV3_Copy(&Line[1], &tri[1]);
FV3_ClosestPointOnLine(Line, point, &EdgePoints[0]);
FV3_Copy(&Line[0], &tri[1]);
FV3_Copy(&Line[1], &tri[2]);
FV3_ClosestPointOnLine(Line, point, &EdgePoints[1]);
FV3_Copy(&Line[0], &tri[2]);
FV3_Copy(&Line[1], &tri[0]);
FV3_ClosestPointOnLine(Line, point, &EdgePoints[2]);
// Find the closest one of the three
FV3_Copy(result, &EdgePoints[0]);
closestdist = FV3_Distance(point, &EdgePoints[0]);
for (i = 1; i < 3; i++)
{
dist = FV3_Distance(point, &EdgePoints[i]);
if (dist < closestdist)
{
closestdist = dist;
FV3_Copy(result, &EdgePoints[i]);
}
}
// We now have the closest point! Whee!
}
//
// Point2Vec
//
// Given two points, create a vector between them.
//
vector3_t *FV3_Point2Vec (const vector3_t *point1, const vector3_t *point2, vector3_t *a_o)
{
a_o->x = point1->x - point2->x;
a_o->y = point1->y - point2->y;
a_o->z = point1->z - point2->z;
return a_o;
}
//
// Normal
//
// Calculates the normal of a polygon.
//
void FV3_Normal (const vector3_t *a_triangle, vector3_t *a_normal)
{
vector3_t a_1;
vector3_t a_2;
FV3_Point2Vec(&a_triangle[2], &a_triangle[0], &a_1);
FV3_Point2Vec(&a_triangle[1], &a_triangle[0], &a_2);
FV3_Cross(&a_1, &a_2, a_normal);
FV3_NormalizeEx(a_normal, a_normal);
}
//
// PlaneDistance
//
// Calculates distance between a plane and the origin.
//
fixed_t FV3_PlaneDistance(const vector3_t *a_normal, const vector3_t *a_point)
{
return -(FixedMul(a_normal->x, a_point->x) + FixedMul(a_normal->y, a_point->y) + FixedMul(a_normal->z, a_point->z));
}
boolean FV3_IntersectedPlane(const vector3_t *a_triangle, const vector3_t *a_line, vector3_t *a_normal, fixed_t *originDistance)
{
fixed_t distance1 = 0, distance2 = 0;
FV3_Normal(a_triangle, a_normal);
*originDistance = FV3_PlaneDistance(a_normal, &a_triangle[0]);
distance1 = (FixedMul(a_normal->x, a_line[0].x) + FixedMul(a_normal->y, a_line[0].y)
+ FixedMul(a_normal->z, a_line[0].z)) + *originDistance;
distance2 = (FixedMul(a_normal->x, a_line[1].x) + FixedMul(a_normal->y, a_line[1].y)
+ FixedMul(a_normal->z, a_line[1].z)) + *originDistance;
// Positive or zero number means no intersection
if (FixedMul(distance1, distance2) >= 0)
return false;
return true;
}
//
// PlaneIntersection
//
// Returns the distance from
// rOrigin to where the ray
// intersects the plane. Assumes
// you already know it intersects
// the plane.
//
fixed_t FV3_PlaneIntersection(const vector3_t *pOrigin, const vector3_t *pNormal, const vector3_t *rOrigin, const vector3_t *rVector)
{
fixed_t d = -(FV3_Dot(pNormal, pOrigin));
fixed_t number = FV3_Dot(pNormal,rOrigin) + d;
fixed_t denom = FV3_Dot(pNormal,rVector);
return -FixedDiv(number, denom);
}
//
// IntersectRaySphere
// Input : rO - origin of ray in world space
// rV - vector describing direction of ray in world space
// sO - Origin of sphere
// sR - radius of sphere
// Notes : Normalized directional vectors expected
// Return: distance to sphere in world units, -1 if no intersection.
//
fixed_t FV3_IntersectRaySphere(const vector3_t *rO, const vector3_t *rV, const vector3_t *sO, fixed_t sR)
{
vector3_t Q;
fixed_t c, v, d;
FV3_SubEx(sO, rO, &Q);
c = FV3_Magnitude(&Q);
v = FV3_Dot(&Q, rV);
d = FixedMul(sR, sR) - (FixedMul(c,c) - FixedMul(v,v));
// If there was no intersection, return -1
if (d < 0*FRACUNIT)
return (-1*FRACUNIT);
// Return the distance to the [first] intersecting point
return (v - FixedSqrt(d));
}
//
// IntersectionPoint
//
// This returns the intersection point of the line that intersects the plane
//
vector3_t *FV3_IntersectionPoint(const vector3_t *vNormal, const vector3_t *vLine, fixed_t distance, vector3_t *ReturnVec)
{
vector3_t vLineDir; // Variables to hold the point and the line's direction
fixed_t Numerator = 0, Denominator = 0, dist = 0;
// Here comes the confusing part. We need to find the 3D point that is actually
// on the plane. Here are some steps to do that:
// 1) First we need to get the vector of our line, Then normalize it so it's a length of 1
FV3_Point2Vec(&vLine[1], &vLine[0], &vLineDir); // Get the Vector of the line
FV3_NormalizeEx(&vLineDir, &vLineDir); // Normalize the lines vector
// 2) Use the plane equation (distance = Ax + By + Cz + D) to find the distance from one of our points to the plane.
// Here I just chose a arbitrary point as the point to find that distance. You notice we negate that
// distance. We negate the distance because we want to eventually go BACKWARDS from our point to the plane.
// By doing this is will basically bring us back to the plane to find our intersection point.
Numerator = - (FixedMul(vNormal->x, vLine[0].x) + // Use the plane equation with the normal and the line
FixedMul(vNormal->y, vLine[0].y) +
FixedMul(vNormal->z, vLine[0].z) + distance);
// 3) If we take the dot product between our line vector and the normal of the polygon,
// this will give us the cosine of the angle between the 2 (since they are both normalized - length 1).
// We will then divide our Numerator by this value to find the offset towards the plane from our arbitrary point.
Denominator = FV3_Dot(vNormal, &vLineDir); // Get the dot product of the line's vector and the normal of the plane
// Since we are using division, we need to make sure we don't get a divide by zero error
// If we do get a 0, that means that there are INFINITE points because the the line is
// on the plane (the normal is perpendicular to the line - (Normal.Vector = 0)).
// In this case, we should just return any point on the line.
if( Denominator == 0*FRACUNIT) // Check so we don't divide by zero
{
ReturnVec->x = vLine[0].x;
ReturnVec->y = vLine[0].y;
ReturnVec->z = vLine[0].z;
return ReturnVec; // Return an arbitrary point on the line
}
// We divide the (distance from the point to the plane) by (the dot product)
// to get the distance (dist) that we need to move from our arbitrary point. We need
// to then times this distance (dist) by our line's vector (direction). When you times
// a scalar (single number) by a vector you move along that vector. That is what we are
// doing. We are moving from our arbitrary point we chose from the line BACK to the plane
// along the lines vector. It seems logical to just get the numerator, which is the distance
// from the point to the line, and then just move back that much along the line's vector.
// Well, the distance from the plane means the SHORTEST distance. What about in the case that
// the line is almost parallel with the polygon, but doesn't actually intersect it until half
// way down the line's length. The distance from the plane is short, but the distance from
// the actual intersection point is pretty long. If we divide the distance by the dot product
// of our line vector and the normal of the plane, we get the correct length. Cool huh?
dist = FixedDiv(Numerator, Denominator); // Divide to get the multiplying (percentage) factor
// Now, like we said above, we times the dist by the vector, then add our arbitrary point.
// This essentially moves the point along the vector to a certain distance. This now gives
// us the intersection point. Yay!
// Return the intersection point
ReturnVec->x = vLine[0].x + FixedMul(vLineDir.x, dist);
ReturnVec->y = vLine[0].y + FixedMul(vLineDir.y, dist);
ReturnVec->z = vLine[0].z + FixedMul(vLineDir.z, dist);
return ReturnVec;
}
//
// PointOnLineSide
//
// If on the front side of the line, returns 1.
// If on the back side of the line, returns 0.
// 2D only.
//
UINT8 FV3_PointOnLineSide(const vector3_t *point, const vector3_t *line)
{
fixed_t s1 = FixedMul((point->y - line[0].y),(line[1].x - line[0].x));
fixed_t s2 = FixedMul((point->x - line[0].x),(line[1].y - line[0].y));
return (UINT8)(s1 - s2 < 0);
}
//
// PointInsideBox
//
// Given four points of a box,
// determines if the supplied point is
// inside the box or not.
//
boolean FV3_PointInsideBox(const vector3_t *point, const vector3_t *box)
{
vector3_t lastLine[2];
FV3_Load(&lastLine[0], box[3].x, box[3].y, box[3].z);
FV3_Load(&lastLine[1], box[0].x, box[0].y, box[0].z);
if (FV3_PointOnLineSide(point, &box[0])
|| FV3_PointOnLineSide(point, &box[1])
|| FV3_PointOnLineSide(point, &box[2])
|| FV3_PointOnLineSide(point, lastLine))
return false;
return true;
}
//
// LoadIdentity
//
// Loads the identity matrix into a matrix
//
void FM_LoadIdentity(matrix_t* matrix)
{
#define M(row,col) matrix->m[col * 4 + row]
memset(matrix, 0x00, sizeof(matrix_t));
M(0, 0) = FRACUNIT;
M(1, 1) = FRACUNIT;
M(2, 2) = FRACUNIT;
M(3, 3) = FRACUNIT;
#undef M
}
//
// CreateObjectMatrix
//
// Creates a matrix that can be used for
// adjusting the position of an object
//
void FM_CreateObjectMatrix(matrix_t *matrix, fixed_t x, fixed_t y, fixed_t z, fixed_t anglex, fixed_t angley, fixed_t anglez, fixed_t upx, fixed_t upy, fixed_t upz, fixed_t radius)
{
vector3_t upcross;
vector3_t upvec;
vector3_t basevec;
FV3_Load(&upvec, upx, upy, upz);
FV3_Load(&basevec, anglex, angley, anglez);
FV3_Cross(&upvec, &basevec, &upcross);
FV3_Normalize(&upcross);
FM_LoadIdentity(matrix);
matrix->m[0] = upcross.x;
matrix->m[1] = upcross.y;
matrix->m[2] = upcross.z;
matrix->m[3] = 0*FRACUNIT;
matrix->m[4] = upx;
matrix->m[5] = upy;
matrix->m[6] = upz;
matrix->m[7] = 0;
matrix->m[8] = anglex;
matrix->m[9] = angley;
matrix->m[10] = anglez;
matrix->m[11] = 0;
matrix->m[12] = x - FixedMul(upx,radius);
matrix->m[13] = y - FixedMul(upy,radius);
matrix->m[14] = z - FixedMul(upz,radius);
matrix->m[15] = FRACUNIT;
}
//
// MultMatrixVec
//
// Multiplies a vector by the specified matrix
//
void FM_MultMatrixVec3(const matrix_t *matrix, const vector3_t *vec, vector3_t *out)
{
#define M(row,col) matrix->m[col * 4 + row]
out->x = FixedMul(vec->x,M(0, 0))
+ FixedMul(vec->y,M(0, 1))
+ FixedMul(vec->z,M(0, 2))
+ M(0, 3);
out->y = FixedMul(vec->x,M(1, 0))
+ FixedMul(vec->y,M(1, 1))
+ FixedMul(vec->z,M(1, 2))
+ M(1, 3);
out->z = FixedMul(vec->x,M(2, 0))
+ FixedMul(vec->y,M(2, 1))
+ FixedMul(vec->z,M(2, 2))
+ M(2, 3);
#undef M
}
//
// MultMatrix
//
// Multiples one matrix into another
//
void FM_MultMatrix(matrix_t *dest, const matrix_t *multme)
{
matrix_t result;
UINT8 i, j;
#define M(row,col) multme->m[col * 4 + row]
#define D(row,col) dest->m[col * 4 + row]
#define R(row,col) result.m[col * 4 + row]
for (i = 0; i < 4; i++)
{
for (j = 0; j < 4; j++)
R(i, j) = FixedMul(D(i, 0),M(0, j)) + FixedMul(D(i, 1),M(1, j)) + FixedMul(D(i, 2),M(2, j)) + FixedMul(D(i, 3),M(3, j));
}
M_Memcpy(dest, &result, sizeof(matrix_t));
#undef R
#undef D
#undef M
}
//
// Translate
//
// Translates a matrix
//
void FM_Translate(matrix_t *dest, fixed_t x, fixed_t y, fixed_t z)
{
matrix_t trans;
#define M(row,col) trans.m[col * 4 + row]
memset(&trans, 0x00, sizeof(matrix_t));
M(0, 0) = M(1, 1) = M(2, 2) = M(3, 3) = FRACUNIT;
M(0, 3) = x;
M(1, 3) = y;
M(2, 3) = z;
FM_MultMatrix(dest, &trans);
#undef M
}
//
// Scale
//
// Scales a matrix
//
void FM_Scale(matrix_t *dest, fixed_t x, fixed_t y, fixed_t z)
{
matrix_t scale;
#define M(row,col) scale.m[col * 4 + row]
memset(&scale, 0x00, sizeof(matrix_t));
M(3, 3) = FRACUNIT;
M(0, 0) = x;
M(1, 1) = y;
M(2, 2) = z;
FM_MultMatrix(dest, &scale);
#undef M
}
#ifdef M_TESTCASE
//#define MULDIV_TEST
#define SQRT_TEST
static inline void M_print(INT64 a)
{
const fixed_t w = (a>>FRACBITS);
fixed_t f = a%FRACUNIT;
fixed_t d = FRACUNIT;
if (f == 0)
{
printf("%d", (fixed_t)w);
return;
}
else while (f != 1 && f/2 == f>>1)
{
d /= 2;
f /= 2;
}
if (w == 0)
printf("%d/%d", (fixed_t)f, d);
else
printf("%d+(%d/%d)", (fixed_t)w, (fixed_t)f, d);
}
FUNCMATH FUNCINLINE static inline fixed_t FixedMulC(fixed_t a, fixed_t b)
{
return (fixed_t)((((INT64)a * b) ) / FRACUNIT);
}
FUNCMATH FUNCINLINE static inline fixed_t FixedDivC2(fixed_t a, fixed_t b)
{
INT64 ret;
if (b == 0)
I_Error("FixedDiv: divide by zero");
ret = (((INT64)a * FRACUNIT) ) / b;
if ((ret > INT32_MAX) || (ret < INT32_MIN))
I_Error("FixedDiv: divide by zero");
return (fixed_t)ret;
}
FUNCMATH FUNCINLINE static inline fixed_t FixedDivC(fixed_t a, fixed_t b)
{
if ((abs(a) >> (FRACBITS-2)) >= abs(b))
return (a^b) < 0 ? INT32_MIN : INT32_MAX;
return FixedDivC2(a, b);
}
FUNCMATH FUNCINLINE static inline fixed_t FixedSqrtC(fixed_t x)
{
const float fx = FIXED_TO_FLOAT(x);
float fr;
#ifdef HAVE_SQRTF
fr = sqrtf(fx);
#else
fr = (float)sqrt(fx);
#endif
return FLOAT_TO_FIXED(fr);
}
int main(int argc, char** argv)
{
int n = 10;
INT64 a, b;
fixed_t c, d;
(void)argc;
(void)argv;
#ifdef MULDIV_TEST
for (a = 1; a <= INT32_MAX; a += FRACUNIT)
for (b = 0; b <= INT32_MAX; b += FRACUNIT)
{
c = FixedMul(a, b);
d = FixedMulC(a, b);
if (c != d)
{
printf("(");
M_print(a);
printf(") * (");
M_print(b);
printf(") = (");
M_print(c);
printf(") != (");
M_print(d);
printf(") \n");
n--;
printf("%d != %d\n", c, d);
}
c = FixedDiv(a, b);
d = FixedDivC(a, b);
if (c != d)
{
printf("(");
M_print(a);
printf(") / (");
M_print(b);
printf(") = (");
M_print(c);
printf(") != (");
M_print(d);
printf(")\n");
n--;
printf("%d != %d\n", c, d);
}
if (n <= 0)
exit(-1);
}
#endif
#ifdef SQRT_TEST
for (a = 0; a <= INT32_MAX; a += 1)
{
c = FixedSqrt(a);
d = FixedSqrtC(a);
b = abs(c-d);
if (b > 1)
{
printf("sqrt(");
M_print(a);
printf(") = {(");
M_print(c);
printf(") != (");
M_print(d);
printf(")} \n");
//n--;
printf("%d != %d {", c, d);
M_print(b);
printf("}\n");
}
if (n <= 0)
exit(-1);
}
#endif
exit(0);
}
static void *cpu_cpy(void *dest, const void *src, size_t n)
{
return memcpy(dest, src, n);
}
void *(*M_Memcpy)(void* dest, const void* src, size_t n) = cpu_cpy;
void I_Error(const char *error, ...)
{
(void)error;
exit(-1);
}
#endif