mirror of
https://github.com/zeldaret/oot.git
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669732abbe
* Cleanup `UNK_TYPE`, `UNK_PTR` usage * Add some missing empty lines after declarations * Remove some legacy comments from non-matching times * Fix some grammar (mostly "it's"/"its") * Use proper names for two symbols after ZAPD bugfix * Cleanup `place_title_cards.xml` * Use `NULL` to check against `D_8012D260` pointer * Parentheses around some macro arguments * wip proofread headers up to z64animation.h
161 lines
3 KiB
C
161 lines
3 KiB
C
#include "global.h"
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#include "fp.h"
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s32 gUseAtanContFrac;
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f32 Math_FTanF(f32 x) {
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f32 sin = sinf(x);
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f32 cos = cosf(x);
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return sin / cos;
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}
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f32 Math_FFloorF(f32 x) {
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return floorf(x);
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}
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f32 Math_FCeilF(f32 x) {
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return ceilf(x);
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}
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f32 Math_FRoundF(f32 x) {
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return roundf(x);
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}
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f32 Math_FTruncF(f32 x) {
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return truncf(x);
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}
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f32 Math_FNearbyIntF(f32 x) {
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return nearbyintf(x);
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}
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/* Arctangent approximation using a Taylor series (one quadrant) */
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f32 Math_FAtanTaylorQF(f32 x) {
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static const f32 coeffs[] = {
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-1.0f / 3, +1.0f / 5, -1.0f / 7, +1.0f / 9, -1.0f / 11, +1.0f / 13, -1.0f / 15, +1.0f / 17, 0.0f,
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};
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f32 poly = x;
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f32 sq = SQ(x);
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f32 exp = x * sq;
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const f32* c = coeffs;
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f32 term;
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while (1) {
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term = *c++ * exp;
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if (poly + term == poly) {
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break;
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}
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poly = poly + term;
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exp = exp * sq;
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}
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return poly;
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}
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/* Ditto for two quadrants */
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f32 Math_FAtanTaylorF(f32 x) {
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f32 t;
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f32 q;
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if (x > 0.0f) {
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t = x;
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} else if (x < 0.0f) {
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t = -x;
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} else if (x == 0.0f) {
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return 0.0f;
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} else {
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return qNaN0x10000;
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}
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if (t <= M_SQRT2 - 1.0f) {
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return Math_FAtanTaylorQF(x);
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}
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if (t >= M_SQRT2 + 1.0f) {
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q = M_PI / 2 - Math_FAtanTaylorQF(1.0f / t);
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} else {
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q = M_PI / 4 - Math_FAtanTaylorQF((1.0f - t) / (1.0f + t));
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}
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if (x > 0.0f) {
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return q;
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} else {
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return -q;
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}
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}
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/* Arctangent approximation using a continued fraction */
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f32 Math_FAtanContFracF(f32 x) {
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s32 sector;
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f32 z;
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f32 conv;
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f32 sq;
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s32 i;
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if (x >= -1.0f && x <= 1.0f) {
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sector = 0;
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} else if (x > 1.0f) {
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sector = 1;
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x = 1.0f / x;
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} else if (x < -1.0f) {
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sector = -1;
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x = 1.0f / x;
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} else {
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return qNaN0x10000;
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}
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sq = SQ(x);
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conv = 0.0f;
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z = 8.0f;
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for (i = 8; i != 0; i--) {
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conv = SQ(z) * sq / (2.0f * z + 1.0f + conv);
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z -= 1.0f;
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}
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conv = x / (1.0f + conv);
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if (sector == 0) {
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return conv;
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} else if (sector > 0) {
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return M_PI / 2 - conv;
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} else {
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return -M_PI / 2 - conv;
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}
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}
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f32 Math_FAtanF(f32 x) {
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if (!gUseAtanContFrac) {
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return Math_FAtanTaylorF(x);
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} else {
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return Math_FAtanContFracF(x);
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}
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}
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f32 Math_FAtan2F(f32 y, f32 x) {
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if (x == 0.0f) {
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if (y == 0.0f) {
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return 0.0f;
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} else if (y > 0.0f) {
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return M_PI / 2;
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} else if (y < 0.0f) {
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return -M_PI / 2;
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} else {
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return qNaN0x10000;
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}
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} else if (x >= 0.0f) {
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return Math_FAtanF(y / x);
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} else if (y < 0.0f) {
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return Math_FAtanF(y / x) - M_PI;
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} else {
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return M_PI - Math_FAtanF(-(y / x));
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}
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}
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f32 Math_FAsinF(f32 x) {
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return Math_FAtan2F(x, sqrtf(1.0f - SQ(x)));
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}
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f32 Math_FAcosF(f32 x) {
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return M_PI / 2 - Math_FAsinF(x);
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}
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