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326 | /**************************************************************************/
/* basis.h */
/**************************************************************************/
/* This file is part of: */
/* GODOT ENGINE */
/* https://godotengine.org */
/**************************************************************************/
/* Copyright (c) 2014-present Godot Engine contributors (see AUTHORS.md). */
/* Copyright (c) 2007-2014 Juan Linietsky, Ariel Manzur. */
/* */
/* Permission is hereby granted, free of charge, to any person obtaining */
/* a copy of this software and associated documentation files (the */
/* "Software"), to deal in the Software without restriction, including */
/* without limitation the rights to use, copy, modify, merge, publish, */
/* distribute, sublicense, and/or sell copies of the Software, and to */
/* permit persons to whom the Software is furnished to do so, subject to */
/* the following conditions: */
/* */
/* The above copyright notice and this permission notice shall be */
/* included in all copies or substantial portions of the Software. */
/* */
/* THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, */
/* EXPRESS OR IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF */
/* MERCHANTABILITY, FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. */
/* IN NO EVENT SHALL THE AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY */
/* CLAIM, DAMAGES OR OTHER LIABILITY, WHETHER IN AN ACTION OF CONTRACT, */
/* TORT OR OTHERWISE, ARISING FROM, OUT OF OR IN CONNECTION WITH THE */
/* SOFTWARE OR THE USE OR OTHER DEALINGS IN THE SOFTWARE. */
/**************************************************************************/
#ifndef BASIS_H
#define BASIS_H
#include "core/math/quaternion.h"
#include "core/math/vector3.h"
struct [[nodiscard]] Basis {
Vector3 rows[3] = {
Vector3(1, 0, 0),
Vector3(0, 1, 0),
Vector3(0, 0, 1)
};
_FORCE_INLINE_ const Vector3 &operator[](int p_row) const {
return rows[p_row];
}
_FORCE_INLINE_ Vector3 &operator[](int p_row) {
return rows[p_row];
}
void invert();
void transpose();
Basis inverse() const;
Basis transposed() const;
_FORCE_INLINE_ real_t determinant() const;
void rotate(const Vector3 &p_axis, real_t p_angle);
Basis rotated(const Vector3 &p_axis, real_t p_angle) const;
void rotate_local(const Vector3 &p_axis, real_t p_angle);
Basis rotated_local(const Vector3 &p_axis, real_t p_angle) const;
void rotate(const Vector3 &p_euler, EulerOrder p_order = EulerOrder::YXZ);
Basis rotated(const Vector3 &p_euler, EulerOrder p_order = EulerOrder::YXZ) const;
void rotate(const Quaternion &p_quaternion);
Basis rotated(const Quaternion &p_quaternion) const;
Vector3 get_euler_normalized(EulerOrder p_order = EulerOrder::YXZ) const;
void get_rotation_axis_angle(Vector3 &p_axis, real_t &p_angle) const;
void get_rotation_axis_angle_local(Vector3 &p_axis, real_t &p_angle) const;
Quaternion get_rotation_quaternion() const;
void rotate_to_align(Vector3 p_start_direction, Vector3 p_end_direction);
Vector3 rotref_posscale_decomposition(Basis &rotref) const;
Vector3 get_euler(EulerOrder p_order = EulerOrder::YXZ) const;
void set_euler(const Vector3 &p_euler, EulerOrder p_order = EulerOrder::YXZ);
static Basis from_euler(const Vector3 &p_euler, EulerOrder p_order = EulerOrder::YXZ) {
Basis b;
b.set_euler(p_euler, p_order);
return b;
}
Quaternion get_quaternion() const;
void set_quaternion(const Quaternion &p_quaternion);
void get_axis_angle(Vector3 &r_axis, real_t &r_angle) const;
void set_axis_angle(const Vector3 &p_axis, real_t p_angle);
void scale(const Vector3 &p_scale);
Basis scaled(const Vector3 &p_scale) const;
void scale_local(const Vector3 &p_scale);
Basis scaled_local(const Vector3 &p_scale) const;
void scale_orthogonal(const Vector3 &p_scale);
Basis scaled_orthogonal(const Vector3 &p_scale) const;
real_t get_uniform_scale() const;
Vector3 get_scale() const;
Vector3 get_scale_abs() const;
Vector3 get_scale_global() const;
void set_axis_angle_scale(const Vector3 &p_axis, real_t p_angle, const Vector3 &p_scale);
void set_euler_scale(const Vector3 &p_euler, const Vector3 &p_scale, EulerOrder p_order = EulerOrder::YXZ);
void set_quaternion_scale(const Quaternion &p_quaternion, const Vector3 &p_scale);
// transposed dot products
_FORCE_INLINE_ real_t tdotx(const Vector3 &p_v) const {
return rows[0][0] * p_v[0] + rows[1][0] * p_v[1] + rows[2][0] * p_v[2];
}
_FORCE_INLINE_ real_t tdoty(const Vector3 &p_v) const {
return rows[0][1] * p_v[0] + rows[1][1] * p_v[1] + rows[2][1] * p_v[2];
}
_FORCE_INLINE_ real_t tdotz(const Vector3 &p_v) const {
return rows[0][2] * p_v[0] + rows[1][2] * p_v[1] + rows[2][2] * p_v[2];
}
bool is_equal_approx(const Basis &p_basis) const;
bool is_finite() const;
bool operator==(const Basis &p_matrix) const;
bool operator!=(const Basis &p_matrix) const;
_FORCE_INLINE_ Vector3 xform(const Vector3 &p_vector) const;
_FORCE_INLINE_ Vector3 xform_inv(const Vector3 &p_vector) const;
_FORCE_INLINE_ void operator*=(const Basis &p_matrix);
_FORCE_INLINE_ Basis operator*(const Basis &p_matrix) const;
_FORCE_INLINE_ void operator+=(const Basis &p_matrix);
_FORCE_INLINE_ Basis operator+(const Basis &p_matrix) const;
_FORCE_INLINE_ void operator-=(const Basis &p_matrix);
_FORCE_INLINE_ Basis operator-(const Basis &p_matrix) const;
_FORCE_INLINE_ void operator*=(real_t p_val);
_FORCE_INLINE_ Basis operator*(real_t p_val) const;
_FORCE_INLINE_ void operator/=(real_t p_val);
_FORCE_INLINE_ Basis operator/(real_t p_val) const;
bool is_orthogonal() const;
bool is_orthonormal() const;
bool is_conformal() const;
bool is_diagonal() const;
bool is_rotation() const;
Basis lerp(const Basis &p_to, real_t p_weight) const;
Basis slerp(const Basis &p_to, real_t p_weight) const;
void rotate_sh(real_t *p_values);
operator String() const;
/* create / set */
_FORCE_INLINE_ void set(real_t p_xx, real_t p_xy, real_t p_xz, real_t p_yx, real_t p_yy, real_t p_yz, real_t p_zx, real_t p_zy, real_t p_zz) {
rows[0][0] = p_xx;
rows[0][1] = p_xy;
rows[0][2] = p_xz;
rows[1][0] = p_yx;
rows[1][1] = p_yy;
rows[1][2] = p_yz;
rows[2][0] = p_zx;
rows[2][1] = p_zy;
rows[2][2] = p_zz;
}
_FORCE_INLINE_ void set_columns(const Vector3 &p_x, const Vector3 &p_y, const Vector3 &p_z) {
set_column(0, p_x);
set_column(1, p_y);
set_column(2, p_z);
}
_FORCE_INLINE_ Vector3 get_column(int p_index) const {
// Get actual basis axis column (we store transposed as rows for performance).
return Vector3(rows[0][p_index], rows[1][p_index], rows[2][p_index]);
}
_FORCE_INLINE_ void set_column(int p_index, const Vector3 &p_value) {
// Set actual basis axis column (we store transposed as rows for performance).
rows[0][p_index] = p_value.x;
rows[1][p_index] = p_value.y;
rows[2][p_index] = p_value.z;
}
_FORCE_INLINE_ Vector3 get_main_diagonal() const {
return Vector3(rows[0][0], rows[1][1], rows[2][2]);
}
_FORCE_INLINE_ void set_zero() {
rows[0].zero();
rows[1].zero();
rows[2].zero();
}
_FORCE_INLINE_ Basis transpose_xform(const Basis &p_m) const {
return Basis(
rows[0].x * p_m[0].x + rows[1].x * p_m[1].x + rows[2].x * p_m[2].x,
rows[0].x * p_m[0].y + rows[1].x * p_m[1].y + rows[2].x * p_m[2].y,
rows[0].x * p_m[0].z + rows[1].x * p_m[1].z + rows[2].x * p_m[2].z,
rows[0].y * p_m[0].x + rows[1].y * p_m[1].x + rows[2].y * p_m[2].x,
rows[0].y * p_m[0].y + rows[1].y * p_m[1].y + rows[2].y * p_m[2].y,
rows[0].y * p_m[0].z + rows[1].y * p_m[1].z + rows[2].y * p_m[2].z,
rows[0].z * p_m[0].x + rows[1].z * p_m[1].x + rows[2].z * p_m[2].x,
rows[0].z * p_m[0].y + rows[1].z * p_m[1].y + rows[2].z * p_m[2].y,
rows[0].z * p_m[0].z + rows[1].z * p_m[1].z + rows[2].z * p_m[2].z);
}
Basis(real_t p_xx, real_t p_xy, real_t p_xz, real_t p_yx, real_t p_yy, real_t p_yz, real_t p_zx, real_t p_zy, real_t p_zz) {
set(p_xx, p_xy, p_xz, p_yx, p_yy, p_yz, p_zx, p_zy, p_zz);
}
void orthonormalize();
Basis orthonormalized() const;
void orthogonalize();
Basis orthogonalized() const;
#ifdef MATH_CHECKS
bool is_symmetric() const;
#endif
Basis diagonalize();
operator Quaternion() const { return get_quaternion(); }
static Basis looking_at(const Vector3 &p_target, const Vector3 &p_up = Vector3(0, 1, 0), bool p_use_model_front = false);
Basis(const Quaternion &p_quaternion) { set_quaternion(p_quaternion); }<--- Struct 'Basis' has a constructor with 1 argument that is not explicit. [+]Struct 'Basis' has a constructor with 1 argument that is not explicit. Such constructors should in general be explicit for type safety reasons. Using the explicit keyword in the constructor means some mistakes when using the class can be avoided.
Basis(const Quaternion &p_quaternion, const Vector3 &p_scale) { set_quaternion_scale(p_quaternion, p_scale); }
Basis(const Vector3 &p_axis, real_t p_angle) { set_axis_angle(p_axis, p_angle); }
Basis(const Vector3 &p_axis, real_t p_angle, const Vector3 &p_scale) { set_axis_angle_scale(p_axis, p_angle, p_scale); }
static Basis from_scale(const Vector3 &p_scale);
_FORCE_INLINE_ Basis(const Vector3 &p_x_axis, const Vector3 &p_y_axis, const Vector3 &p_z_axis) {
set_columns(p_x_axis, p_y_axis, p_z_axis);
}
_FORCE_INLINE_ Basis() {}
private:
// Helper method.
void _set_diagonal(const Vector3 &p_diag);
};
_FORCE_INLINE_ void Basis::operator*=(const Basis &p_matrix) {
set(
p_matrix.tdotx(rows[0]), p_matrix.tdoty(rows[0]), p_matrix.tdotz(rows[0]),
p_matrix.tdotx(rows[1]), p_matrix.tdoty(rows[1]), p_matrix.tdotz(rows[1]),
p_matrix.tdotx(rows[2]), p_matrix.tdoty(rows[2]), p_matrix.tdotz(rows[2]));
}
_FORCE_INLINE_ Basis Basis::operator*(const Basis &p_matrix) const {
return Basis(
p_matrix.tdotx(rows[0]), p_matrix.tdoty(rows[0]), p_matrix.tdotz(rows[0]),
p_matrix.tdotx(rows[1]), p_matrix.tdoty(rows[1]), p_matrix.tdotz(rows[1]),
p_matrix.tdotx(rows[2]), p_matrix.tdoty(rows[2]), p_matrix.tdotz(rows[2]));
}
_FORCE_INLINE_ void Basis::operator+=(const Basis &p_matrix) {
rows[0] += p_matrix.rows[0];
rows[1] += p_matrix.rows[1];
rows[2] += p_matrix.rows[2];
}
_FORCE_INLINE_ Basis Basis::operator+(const Basis &p_matrix) const {
Basis ret(*this);
ret += p_matrix;
return ret;
}
_FORCE_INLINE_ void Basis::operator-=(const Basis &p_matrix) {
rows[0] -= p_matrix.rows[0];
rows[1] -= p_matrix.rows[1];
rows[2] -= p_matrix.rows[2];
}
_FORCE_INLINE_ Basis Basis::operator-(const Basis &p_matrix) const {
Basis ret(*this);
ret -= p_matrix;
return ret;
}
_FORCE_INLINE_ void Basis::operator*=(real_t p_val) {
rows[0] *= p_val;
rows[1] *= p_val;
rows[2] *= p_val;
}
_FORCE_INLINE_ Basis Basis::operator*(real_t p_val) const {
Basis ret(*this);
ret *= p_val;
return ret;
}
_FORCE_INLINE_ void Basis::operator/=(real_t p_val) {
rows[0] /= p_val;
rows[1] /= p_val;
rows[2] /= p_val;
}
_FORCE_INLINE_ Basis Basis::operator/(real_t p_val) const {
Basis ret(*this);
ret /= p_val;
return ret;
}
Vector3 Basis::xform(const Vector3 &p_vector) const {
return Vector3(
rows[0].dot(p_vector),
rows[1].dot(p_vector),
rows[2].dot(p_vector));
}
Vector3 Basis::xform_inv(const Vector3 &p_vector) const {
return Vector3(
(rows[0][0] * p_vector.x) + (rows[1][0] * p_vector.y) + (rows[2][0] * p_vector.z),
(rows[0][1] * p_vector.x) + (rows[1][1] * p_vector.y) + (rows[2][1] * p_vector.z),
(rows[0][2] * p_vector.x) + (rows[1][2] * p_vector.y) + (rows[2][2] * p_vector.z));
}
real_t Basis::determinant() const {
return rows[0][0] * (rows[1][1] * rows[2][2] - rows[2][1] * rows[1][2]) -
rows[1][0] * (rows[0][1] * rows[2][2] - rows[2][1] * rows[0][2]) +
rows[2][0] * (rows[0][1] * rows[1][2] - rows[1][1] * rows[0][2]);
}
#endif // BASIS_H
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