/* ============================================================================== This file is part of the JUCE library. Copyright (c) 2022 - Raw Material Software Limited JUCE is an open source library subject to commercial or open-source licensing. By using JUCE, you agree to the terms of both the JUCE 7 End-User License Agreement and JUCE Privacy Policy. End User License Agreement: www.juce.com/juce-7-licence Privacy Policy: www.juce.com/juce-privacy-policy Or: You may also use this code under the terms of the GPL v3 (see www.gnu.org/licenses). JUCE IS PROVIDED "AS IS" WITHOUT ANY WARRANTY, AND ALL WARRANTIES, WHETHER EXPRESSED OR IMPLIED, INCLUDING MERCHANTABILITY AND FITNESS FOR PURPOSE, ARE DISCLAIMED. ============================================================================== */ namespace juce { namespace dsp { /** This class contains various fast mathematical function approximations. @tags{DSP} */ struct FastMathApproximations { /** Provides a fast approximation of the function cosh(x) using a Pade approximant continued fraction, calculated sample by sample. Note: This is an approximation which works on a limited range. You are advised to use input values only between -5 and +5 for limiting the error. */ template static FloatType cosh (FloatType x) noexcept { auto x2 = x * x; auto numerator = -(39251520 + x2 * (18471600 + x2 * (1075032 + 14615 * x2))); auto denominator = -39251520 + x2 * (1154160 + x2 * (-16632 + 127 * x2)); return numerator / denominator; } /** Provides a fast approximation of the function cosh(x) using a Pade approximant continued fraction, calculated on a whole buffer. Note: This is an approximation which works on a limited range. You are advised to use input values only between -5 and +5 for limiting the error. */ template static void cosh (FloatType* values, size_t numValues) noexcept { for (size_t i = 0; i < numValues; ++i) values[i] = FastMathApproximations::cosh (values[i]); } /** Provides a fast approximation of the function sinh(x) using a Pade approximant continued fraction, calculated sample by sample. Note: This is an approximation which works on a limited range. You are advised to use input values only between -5 and +5 for limiting the error. */ template static FloatType sinh (FloatType x) noexcept { auto x2 = x * x; auto numerator = -x * (11511339840 + x2 * (1640635920 + x2 * (52785432 + x2 * 479249))); auto denominator = -11511339840 + x2 * (277920720 + x2 * (-3177720 + x2 * 18361)); return numerator / denominator; } /** Provides a fast approximation of the function sinh(x) using a Pade approximant continued fraction, calculated on a whole buffer. Note: This is an approximation which works on a limited range. You are advised to use input values only between -5 and +5 for limiting the error. */ template static void sinh (FloatType* values, size_t numValues) noexcept { for (size_t i = 0; i < numValues; ++i) values[i] = FastMathApproximations::sinh (values[i]); } /** Provides a fast approximation of the function tanh(x) using a Pade approximant continued fraction, calculated sample by sample. Note: This is an approximation which works on a limited range. You are advised to use input values only between -5 and +5 for limiting the error. */ template static FloatType tanh (FloatType x) noexcept { auto x2 = x * x; auto numerator = x * (135135 + x2 * (17325 + x2 * (378 + x2))); auto denominator = 135135 + x2 * (62370 + x2 * (3150 + 28 * x2)); return numerator / denominator; } /** Provides a fast approximation of the function tanh(x) using a Pade approximant continued fraction, calculated on a whole buffer. Note: This is an approximation which works on a limited range. You are advised to use input values only between -5 and +5 for limiting the error. */ template static void tanh (FloatType* values, size_t numValues) noexcept { for (size_t i = 0; i < numValues; ++i) values[i] = FastMathApproximations::tanh (values[i]); } //============================================================================== /** Provides a fast approximation of the function cos(x) using a Pade approximant continued fraction, calculated sample by sample. Note: This is an approximation which works on a limited range. You are advised to use input values only between -pi and +pi for limiting the error. */ template static FloatType cos (FloatType x) noexcept { auto x2 = x * x; auto numerator = -(-39251520 + x2 * (18471600 + x2 * (-1075032 + 14615 * x2))); auto denominator = 39251520 + x2 * (1154160 + x2 * (16632 + x2 * 127)); return numerator / denominator; } /** Provides a fast approximation of the function cos(x) using a Pade approximant continued fraction, calculated on a whole buffer. Note: This is an approximation which works on a limited range. You are advised to use input values only between -pi and +pi for limiting the error. */ template static void cos (FloatType* values, size_t numValues) noexcept { for (size_t i = 0; i < numValues; ++i) values[i] = FastMathApproximations::cos (values[i]); } /** Provides a fast approximation of the function sin(x) using a Pade approximant continued fraction, calculated sample by sample. Note: This is an approximation which works on a limited range. You are advised to use input values only between -pi and +pi for limiting the error. */ template static FloatType sin (FloatType x) noexcept { auto x2 = x * x; auto numerator = -x * (-11511339840 + x2 * (1640635920 + x2 * (-52785432 + x2 * 479249))); auto denominator = 11511339840 + x2 * (277920720 + x2 * (3177720 + x2 * 18361)); return numerator / denominator; } /** Provides a fast approximation of the function sin(x) using a Pade approximant continued fraction, calculated on a whole buffer. Note: This is an approximation which works on a limited range. You are advised to use input values only between -pi and +pi for limiting the error. */ template static void sin (FloatType* values, size_t numValues) noexcept { for (size_t i = 0; i < numValues; ++i) values[i] = FastMathApproximations::sin (values[i]); } /** Provides a fast approximation of the function tan(x) using a Pade approximant continued fraction, calculated sample by sample. Note: This is an approximation which works on a limited range. You are advised to use input values only between -pi/2 and +pi/2 for limiting the error. */ template static FloatType tan (FloatType x) noexcept { auto x2 = x * x; auto numerator = x * (-135135 + x2 * (17325 + x2 * (-378 + x2))); auto denominator = -135135 + x2 * (62370 + x2 * (-3150 + 28 * x2)); return numerator / denominator; } /** Provides a fast approximation of the function tan(x) using a Pade approximant continued fraction, calculated on a whole buffer. Note: This is an approximation which works on a limited range. You are advised to use input values only between -pi/2 and +pi/2 for limiting the error. */ template static void tan (FloatType* values, size_t numValues) noexcept { for (size_t i = 0; i < numValues; ++i) values[i] = FastMathApproximations::tan (values[i]); } //============================================================================== /** Provides a fast approximation of the function exp(x) using a Pade approximant continued fraction, calculated sample by sample. Note: This is an approximation which works on a limited range. You are advised to use input values only between -6 and +4 for limiting the error. */ template static FloatType exp (FloatType x) noexcept { auto numerator = 1680 + x * (840 + x * (180 + x * (20 + x))); auto denominator = 1680 + x *(-840 + x * (180 + x * (-20 + x))); return numerator / denominator; } /** Provides a fast approximation of the function exp(x) using a Pade approximant continued fraction, calculated on a whole buffer. Note: This is an approximation which works on a limited range. You are advised to use input values only between -6 and +4 for limiting the error. */ template static void exp (FloatType* values, size_t numValues) noexcept { for (size_t i = 0; i < numValues; ++i) values[i] = FastMathApproximations::exp (values[i]); } /** Provides a fast approximation of the function log(x+1) using a Pade approximant continued fraction, calculated sample by sample. Note: This is an approximation which works on a limited range. You are advised to use input values only between -0.8 and +5 for limiting the error. */ template static FloatType logNPlusOne (FloatType x) noexcept { auto numerator = x * (7560 + x * (15120 + x * (9870 + x * (2310 + x * 137)))); auto denominator = 7560 + x * (18900 + x * (16800 + x * (6300 + x * (900 + 30 * x)))); return numerator / denominator; } /** Provides a fast approximation of the function log(x+1) using a Pade approximant continued fraction, calculated on a whole buffer. Note: This is an approximation which works on a limited range. You are advised to use input values only between -0.8 and +5 for limiting the error. */ template static void logNPlusOne (FloatType* values, size_t numValues) noexcept { for (size_t i = 0; i < numValues; ++i) values[i] = FastMathApproximations::logNPlusOne (values[i]); } }; } // namespace dsp } // namespace juce