EHS/include/ehs/Math.h

#pragma once

#include "ehs/system/CPU.h"

#define EHS_LOW_WORD(x) *((int*)&x) + 1

namespace ehs
{
	class Math
	{
    private:
        static float Sqrt_AVX(const float from);

        static double Sqrt_AVX(const double from);

        static float Sqrt_SSE(const float from);

        static double Sqrt_SSE2(const double from);

		static float Sqrt_VFP4(const float from);

		static double Sqrt_VFP4(const double from);

	public:
		constexpr static float fltEpsilon = 1e-7f;
		constexpr static double dblEpsilon = 1e-16;

		/// Absolute tolerance comparison for single precision floats.
		static bool AbsCmp(const float a, const float b);

		/// Absolute tolerance comparison for double precision floats.
		static bool AbsCmp(const double a, const double b);

		/// Relative tolerance comparison for single precision floats.
		static bool RelCmp(const float a, const float b);

		/// Relative tolerance comparison for double precision floats.
		static bool RelCmp(const double a, const double b);

		/// Combined absolute and relative tolerance comparison for single precision floats.
		static bool ComCmp(const float a, const float b);

		/// Combined absolute and relative tolerance comparison for double precision floats.
		static bool ComCmp(const double a, const double b);

		template<typename T = float>
		static T Max(const T a, const T b)
		{
			return a > b ? a : b;
		}

		template<typename T = float>
		static T Min(const T a, const T b)
		{
			return a < b ? a : b;
		}

        template<typename T = float>
        static T Clamp(const T value, const T min, const T max)
        {
            if (value < min)
                return min;
            else if (value > max)
                return max;

            return value;
        }

	    template<typename T = float>
	    static T Abs(const T from)
        {
	        return from < 0 ? -from : from;
        }

	    /// Retrieves a very accurate version of Pi as a long double and converts it.
	    /// @tparam T The data type to return Pi as.
	    /// @returns The result.
		template<typename T = float>
		static constexpr T Pi()
		{
			return (T)3.141592653589793238462643383279502884L;
		}

		/// Converts degrees into radians.
		/// @tparam T The data type to return;
		/// @param [in] from The value to convert to radians.
		/// @returns The value in radians.
		template<typename T = float>
        static T Rads(const T from)
		{
			return from * 0.01745329251994329576923690768489;
		}

        /// Converts radians into degrees.
        /// @tparam T The data type to return;
        /// @param [in] from The value to convert to degrees.
        /// @returns The value in degrees.
		template<typename T = float>
        static T Degr(const T from)
		{
			return from * 57.295779513082320876798154814105;
		}

		template <typename T = float>
		static T Exp(const T x)
		{
			T sum = 1;
			T term = 1;

			for (int n = 1; n <= 20; ++n)
			{
				term *= x / n;
				sum += term;
			}

			return sum;
		}

		template <typename T = float>
		static T Ln_Taylor(T x)
		{
			T result = 0;
			T term = (x - 1) / (x + 1);
			T term_squared = term * term;
			T denominator = 1;
			T current_term = term;

			for (int n = 0; n < 100; ++n)
			{
				result += current_term / denominator;
				current_term *= term_squared;
				denominator += 2;
			}

			return 2 * result;
		}

		template <typename T = float>
		static T Ln(T x)
		{
			if (x <= 0)
				return -1;

			if (x == 1)
				return 0;

			SSize exp = 0;
			while (x > 2)
			{
				x /= 2;
				exp++;
			}

			while (x < 0.5)
			{
				x *= 2;
				exp--;
			}

			T result = Ln_Taylor<T>(x);
			result += exp * Ln_Taylor<T>(2);

			return result;
		}

		/// A method for use of exponents.
		/// @tparam T The data type to return;
		/// @tparam I The data type to use as the exponent.
		/// @param [in] from The value to use the exponent on.
		/// @param [in] of The exponent.
		/// @returns The result.
		template<typename T = float, typename I = float>
        static T Pow(const T base, const I exponent)
		{
			if (base == 0)
				return (exponent == 0) ? 1 : 0;

			if (exponent == 0)
				return 1;

			SSize intExp = (SSize)exponent;
			bool isInteger = exponent == intExp;
			bool isNeg = base < 0;

			if (isNeg && isInteger)
			{
				T result = Exp<T>(exponent * Ln<T>(-base));
				if ((SSize)exponent % 2)
					result = -result;

				return result;
			}

			if (isNeg && !isInteger)
			{
				T magnitude = Exp<T>(exponent * Ln<T>(-base));
				T angle = exponent * Pi<T>();
				T realPart = magnitude * Cos<T>(angle);
				T imagPart = magnitude * Sin<T>(angle);

				return realPart;
			}

			return Exp<T>(exponent * Ln<T>(base));
		}

		template <typename T = float>
		static T Log10(const T x)
		{
			return Ln<T>(x) / Ln<T>(10);
		}

        static float Near(const float from);

        static double Near(const double from);

        static float Floor(const float from);

        static double Floor(const double from);

        static float Ceil(const float from);

        static double Ceil(const double from);

		static float Trunc(const float from);

		static double Trunc(const double from);

		static float Mod(const float from, const float divisor);

		static double Mod(const double from, const double divisor);

		/// A method for retrieving the square root of a value.
		/// @tparam T The data type to use.
		/// @param [in] from The value to retrieve to square root of.
		/// @returns The result.
		template<typename T = float>
        static T Sqrt(const T from)
		{
			T temp = 0;
			T result = from / 2;

			while (result != temp)
            {
				temp = result;
				result = (from / temp + temp) / 2;
			}

			return result;
		}

        static double Sqrt(const double from);

        static float Sqrt(const float from);

		template<typename R = float>
        static R Sin(const R angle, const R precision = 0.001)
		{
			R sum = angle;
			R term = angle;

			for (UInt_64 i = 1; Abs<R>(term) >= precision; ++i)
			{
				term *= -angle * angle / (R)((2 * i + 1) * (2 * i));
				sum += term;
			}

			return sum;

			/*
            R sum = 0;

            for (USize n = 0; n < precision; ++n)
				sum += Pow<R>(-1, n) / (R)Fact<T>(2 * n + 1) * Pow<R>(angle, 2 * n + 1);

            return sum;
            */
		}

		template<typename R = float, typename T = UInt_64>
		static R ASin(const R yPos, const T precision = 10)
		{
			R sum = 0;

			for (T n = 0; n < precision; ++n)
				sum += (R)Fact<T>(2 * n) / (Pow<R>(4, n) * Pow<R>((R)Fact<T>(n), 2) * (2 * n + 1)) * Pow<R>(yPos, 2 * n + 1);

			return sum;
		}

		/// A trigonometry Cosine function for finding the X-Axis position from the Z-Axis angle.
		/// @tparam R BaseInput and result data type.
		/// @tparam T Precision data type.
		/// @param[in] angle The angle in radians from the Z-Axis.
		/// @param [in] precision Sigma max.
		/// @returns The X-Axis position.
		template<typename R = float>
        static R Cos(const R angle, const R precision = 0.001)
        {
			R sum = 1.0;
			R term = 1.0;

			for (UInt_64 i = 2; Abs<R>(term) >= precision; i += 2)
			{
				term *= -angle * angle / (R)(i * (i - 1));
				sum += term;
			}

			return sum;

			/*
            R sum = 0;

			for (T n = 0; n < precision; ++n)
				sum += Pow<R>(-1, n) / (R)Fact<T>(2 * n) * Pow<R>(angle, 2 * n);

			return sum;
			*/
        }

		/// A trigonometry Arc Cosine function for finding the Z-Axis angle form the X-Axis position.
		/// @tparam R BaseInput and result data type.
		/// @tparam T Precision data type.
		/// @param [in] xPos The position from the X-Axis.
		/// @param [in] precision Sigma max.
		/// @returns The Z-Axis angle.
		template<typename R = float, typename T = UInt_64>
		static R ACos(const R xPos, const T precision = 10)
		{
			return Pi<R>() / 2 - ASin<R, T>(xPos, precision);
		}

        template<typename R = float>
        static R Tan(const R angle, const R precision = 0.001)
        {
			/*
			R sum = 0;

            for (T n = 1; n < precision + 1; ++n)
				sum += B<R>(2 * n) * Pow<R>(-4, n) * (1 - Pow<R>(4, n)) / (R)Fact<T>(2 * n) * Pow<R>(angle, 2 * n - 1);

			return sum;
			*/
			return Sin<R>(angle) / Cos<R>(angle);
        }

		template<typename R = float, typename T = UInt_64>
		static R ATan(const R x, const T precision = 1)
		{
			R sum = 0;

			for (T n = 0; n < precision; ++n)
				sum += Pow<R>(-1, n) / (2 * n + 1) * Pow<R>(x, 2 * n + 1);

			return sum;
		}

		template<typename R = float>
		static R Cot(const R x, const R precision = 0.001)
		{
			return 1 / Tan<R>(x, precision);
		}

        template<typename T = UInt_64>
        static T Fact(const T n)
        {
			if (n <= 1)
				return 1;

            return n * Fact<T>(n - 1);
        }

		template<typename R = float, typename T = UInt_64>
		static R Combination(const T n, const T k)
		{
			if (k <= n)
				return (R)Fact<T>(n) / (R)(Fact<T>(n - k) * Fact<T>(k));

			return 0;
		}

		template<typename R = float, typename T = UInt_64>
		static R B(const T n)
		{
			R innerSum = 0;
			R outerSum = 0;

			for (T k = 0; k <= n; ++k)
			{
				for (T r = 0; r <= k; ++r)
					innerSum += Pow<R, T>(-1, r) * Combination<R, T>(k, r) * Pow<R, T>(r, n);

				outerSum += 1 / ((R)k + 1) * innerSum;
				innerSum = 0;
			}

			return outerSum;
		}
	};
}