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4cd0563a93
- sin/cos calls with incrementing numbers can lead to bad outcomes, the functions (_approx or original sinf/cosf) return bad values for very large float inputs
223 lines
6.7 KiB
C++
223 lines
6.7 KiB
C++
/*
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* Contains some trigonometric functions.
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* The ANSI C equivalents are likely faster, but using any sin/cos/tan function incurs a memory penalty of 460 bytes on ESP8266, likely for lookup tables.
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* This implementation has no extra static memory usage.
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*
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* Source of the cos_t() function: https://web.eecs.utk.edu/~azh/blog/cosine.html (cos_taylor_literal_6terms)
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*/
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#include <Arduino.h> //PI constant
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//#define WLED_DEBUG_MATH
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// Note: cos_t, sin_t and tan_t are very accurate but slow
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// the math.h functions use several kB of flash and are to be avoided if possible
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// sin16_t / cos16_t are faster and much more accurate than the fastled variants
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// sin_approx and cos_approx are float wrappers for sin16_t/cos16_t and have an accuracy better than +/-0.0015 compared to sinf()
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// sin8_t / cos8_t are fastled replacements and use sin16_t / cos16_t. Slightly slower than fastled version but very accurate
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// Taylor series approximations, replaced with Bhaskara I's approximation
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/*
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#define modd(x, y) ((x) - (int)((x) / (y)) * (y))
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float cos_t(float phi)
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{
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float x = modd(phi, M_TWOPI);
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if (x < 0) x = -1 * x;
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int8_t sign = 1;
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if (x > M_PI)
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{
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x -= M_PI;
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sign = -1;
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}
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float xx = x * x;
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float res = sign * (1 - ((xx) / (2)) + ((xx * xx) / (24)) - ((xx * xx * xx) / (720)) + ((xx * xx * xx * xx) / (40320)) - ((xx * xx * xx * xx * xx) / (3628800)) + ((xx * xx * xx * xx * xx * xx) / (479001600)));
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#ifdef WLED_DEBUG_MATH
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Serial.printf("cos: %f,%f,%f,(%f)\n",phi,res,cos(x),res-cos(x));
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#endif
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return res;
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}
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float sin_t(float phi) {
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float res = cos_t(M_PI_2 - phi);
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#ifdef WLED_DEBUG_MATH
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Serial.printf("sin: %f,%f,%f,(%f)\n",x,res,sin(x),res-sin(x));
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#endif
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return res;
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}
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float tan_t(float x) {
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float c = cos_t(x);
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if (c==0.0f) return 0;
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float res = sin_t(x) / c;
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#ifdef WLED_DEBUG_MATH
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Serial.printf("tan: %f,%f,%f,(%f)\n",x,res,tan(x),res-tan(x));
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#endif
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return res;
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}
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*/
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// 16-bit, integer based Bhaskara I's sine approximation: 16*x*(pi - x) / (5*pi^2 - 4*x*(pi - x))
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// input is 16bit unsigned (0-65535), output is 16bit signed (-32767 to +32767)
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// optimized integer implementation by @dedehai
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int16_t sin16_t(uint16_t theta) {
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int scale = 1;
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if (theta > 0x7FFF) {
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theta = 0xFFFF - theta;
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scale = -1; // second half of the sine function is negative (pi - 2*pi)
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}
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uint32_t precal = theta * (0x7FFF - theta);
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uint64_t numerator = (uint64_t)precal * (4 * 0x7FFF); // 64bit required
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int32_t denominator = 1342095361 - precal; // 1342095361 is 5 * 0x7FFF^2 / 4
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int16_t result = numerator / denominator;
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return result * scale;
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}
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int16_t cos16_t(uint16_t theta) {
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return sin16_t(theta + 0x4000); //cos(x) = sin(x+pi/2)
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}
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uint8_t sin8_t(uint8_t theta) {
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int32_t sin16 = sin16_t((uint16_t)theta * 257); // 255 * 257 = 0xFFFF
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sin16 += 0x7FFF + 128; //shift result to range 0-0xFFFF, +128 for rounding
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return min(sin16, int32_t(0xFFFF)) >> 8; // min performs saturation, and prevents overflow
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}
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uint8_t cos8_t(uint8_t theta) {
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return sin8_t(theta + 64); //cos(x) = sin(x+pi/2)
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}
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float sin_approx(float theta) {
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uint16_t scaled_theta = (int)(theta * (float)(0xFFFF / M_TWOPI)); // note: do not cast negative float to uint! cast to int first (undefined on C3)
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int32_t result = sin16_t(scaled_theta);
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float sin = float(result) / 0x7FFF;
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return sin;
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}
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float cos_approx(float theta) {
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uint16_t scaled_theta = (int)(theta * (float)(0xFFFF / M_TWOPI)); // note: do not cast negative float to uint! cast to int first (undefined on C3)
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int32_t result = sin16_t(scaled_theta + 0x4000);
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float cos = float(result) / 0x7FFF;
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return cos;
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}
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float tan_approx(float x) {
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float c = cos_approx(x);
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if (c==0.0f) return 0;
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float res = sin_approx(x) / c;
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return res;
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}
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#define ATAN2_CONST_A 0.1963f
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#define ATAN2_CONST_B 0.9817f
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// atan2_t approximation, with the idea from https://gist.github.com/volkansalma/2972237?permalink_comment_id=3872525#gistcomment-3872525
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float atan2_t(float y, float x) {
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float abs_y = fabs(y);
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float abs_x = fabs(x);
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float r = (abs_x - abs_y) / (abs_y + abs_x + 1e-10f); // avoid division by zero by adding a small nubmer
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float angle;
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if(x < 0) {
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r = -r;
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angle = M_PI_2 + M_PI_4;
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}
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else
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angle = M_PI_2 - M_PI_4;
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float add = (ATAN2_CONST_A * (r * r) - ATAN2_CONST_B) * r;
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angle += add;
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angle = y < 0 ? -angle : angle;
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return angle;
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}
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//https://stackoverflow.com/questions/3380628
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// Absolute error <= 6.7e-5
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float acos_t(float x) {
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float negate = float(x < 0);
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float xabs = std::abs(x);
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float ret = -0.0187293f;
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ret = ret * xabs;
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ret = ret + 0.0742610f;
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ret = ret * xabs;
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ret = ret - 0.2121144f;
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ret = ret * xabs;
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ret = ret + M_PI_2;
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ret = ret * sqrt(1.0f-xabs);
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ret = ret - 2 * negate * ret;
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float res = negate * M_PI + ret;
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#ifdef WLED_DEBUG_MATH
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Serial.printf("acos: %f,%f,%f,(%f)\n",x,res,acos(x),res-acos(x));
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#endif
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return res;
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}
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float asin_t(float x) {
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float res = M_PI_2 - acos_t(x);
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#ifdef WLED_DEBUG_MATH
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Serial.printf("asin: %f,%f,%f,(%f)\n",x,res,asin(x),res-asin(x));
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#endif
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return res;
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}
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// declare a template with no implementation, and only one specialization
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// this allows hiding the constants, while ensuring ODR causes optimizations
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// to still apply. (Fixes issues with conflicting 3rd party #define's)
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template <typename T> T atan_t(T x);
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template<>
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float atan_t(float x) {
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//For A/B/C, see https://stackoverflow.com/a/42542593
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static const double A { 0.0776509570923569 };
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static const double B { -0.287434475393028 };
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static const double C { ((M_PI_4) - A - B) };
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// polynominal factors for approximation between 1 and 5
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static const float C0 { 0.089494f };
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static const float C1 { 0.974207f };
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static const float C2 { -0.326175f };
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static const float C3 { 0.05375f };
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static const float C4 { -0.003445f };
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#ifdef WLED_DEBUG_MATH
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float xinput = x;
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#endif
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bool neg = (x < 0);
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x = std::abs(x);
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float res;
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if (x > 5.0f) { // atan(x) converges to pi/2 - (1/x) for large values
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res = M_PI_2 - (1.0f/x);
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} else if (x > 1.0f) { //1 < x < 5
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float xx = x * x;
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res = (C4*xx*xx)+(C3*xx*x)+(C2*xx)+(C1*x)+C0;
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} else { // this approximation is only for x <= 1
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float xx = x * x;
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res = ((A*xx + B)*xx + C)*x;
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}
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if (neg) {
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res = -res;
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}
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#ifdef WLED_DEBUG_MATH
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Serial.printf("atan: %f,%f,%f,(%f)\n",xinput,res,atan(xinput),res-atan(xinput));
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#endif
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return res;
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}
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float floor_t(float x) {
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bool neg = x < 0;
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int val = x;
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if (neg) val--;
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#ifdef WLED_DEBUG_MATH
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Serial.printf("floor: %f,%f,%f\n",x,(float)val,floor(x));
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#endif
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return val;
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}
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float fmod_t(float num, float denom) {
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int tquot = num / denom;
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float res = num - tquot * denom;
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#ifdef WLED_DEBUG_MATH
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Serial.printf("fmod: %f,%f,(%f)\n",res,fmod(num,denom),res-fmod(num,denom));
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#endif
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return res;
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}
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