src/math/sin.go - go - Git at Google

 // Copyright 2011 The Go Authors. All rights reserved.
 // Use of this source code is governed by a BSD-style
 // license that can be found in the LICENSE file.

 package math

 /*
 	Floating-point sine and cosine.
 */

 // The original C code, the long comment, and the constants
 // below were from http://netlib.sandia.gov/cephes/cmath/sin.c,
 // available from http://www.netlib.org/cephes/cmath.tgz.
 // The go code is a simplified version of the original C.
 //
 //      sin.c
 //
 //      Circular sine
 //
 // SYNOPSIS:
 //
 // double x, y, sin();
 // y = sin( x );
 //
 // DESCRIPTION:
 //
 // Range reduction is into intervals of pi/4.  The reduction error is nearly
 // eliminated by contriving an extended precision modular arithmetic.
 //
 // Two polynomial approximating functions are employed.
 // Between 0 and pi/4 the sine is approximated by
 //      x  +  x**3 P(x**2).
 // Between pi/4 and pi/2 the cosine is represented as
 //      1  -  x**2 Q(x**2).
 //
 // ACCURACY:
 //
 //                      Relative error:
 // arithmetic   domain      # trials      peak         rms
 //    DEC       0, 10       150000       3.0e-17     7.8e-18
 //    IEEE -1.07e9,+1.07e9  130000       2.1e-16     5.4e-17
 //
 // Partial loss of accuracy begins to occur at x = 2**30 = 1.074e9.  The loss
 // is not gradual, but jumps suddenly to about 1 part in 10e7.  Results may
 // be meaningless for x > 2**49 = 5.6e14.
 //
 //      cos.c
 //
 //      Circular cosine
 //
 // SYNOPSIS:
 //
 // double x, y, cos();
 // y = cos( x );
 //
 // DESCRIPTION:
 //
 // Range reduction is into intervals of pi/4.  The reduction error is nearly
 // eliminated by contriving an extended precision modular arithmetic.
 //
 // Two polynomial approximating functions are employed.
 // Between 0 and pi/4 the cosine is approximated by
 //      1  -  x**2 Q(x**2).
 // Between pi/4 and pi/2 the sine is represented as
 //      x  +  x**3 P(x**2).
 //
 // ACCURACY:
 //
 //                      Relative error:
 // arithmetic   domain      # trials      peak         rms
 //    IEEE -1.07e9,+1.07e9  130000       2.1e-16     5.4e-17
 //    DEC        0,+1.07e9   17000       3.0e-17     7.2e-18
 //
 // Cephes Math Library Release 2.8:  June, 2000
 // Copyright 1984, 1987, 1989, 1992, 2000 by Stephen L. Moshier
 //
 // The readme file at http://netlib.sandia.gov/cephes/ says:
 //    Some software in this archive may be from the book _Methods and
 // Programs for Mathematical Functions_ (Prentice-Hall or Simon & Schuster
 // International, 1989) or from the Cephes Mathematical Library, a
 // commercial product. In either event, it is copyrighted by the author.
 // What you see here may be used freely but it comes with no support or
 // guarantee.
 //
 //   The two known misprints in the book are repaired here in the
 // source listings for the gamma function and the incomplete beta
 // integral.
 //
 //   Stephen L. Moshier
 //   moshier@na-net.ornl.gov

 // sin coefficients
 var _sin = [...]float64{
 	1.58962301576546568060E-10, // 0x3de5d8fd1fd19ccd
 	-2.50507477628578072866E-8, // 0xbe5ae5e5a9291f5d
 	2.75573136213857245213E-6,  // 0x3ec71de3567d48a1
 	-1.98412698295895385996E-4, // 0xbf2a01a019bfdf03
 	8.33333333332211858878E-3,  // 0x3f8111111110f7d0
 	-1.66666666666666307295E-1, // 0xbfc5555555555548
 }

 // cos coefficients
 var _cos = [...]float64{
 	-1.13585365213876817300E-11, // 0xbda8fa49a0861a9b
 	2.08757008419747316778E-9,   // 0x3e21ee9d7b4e3f05
 	-2.75573141792967388112E-7,  // 0xbe927e4f7eac4bc6
 	2.48015872888517045348E-5,   // 0x3efa01a019c844f5
 	-1.38888888888730564116E-3,  // 0xbf56c16c16c14f91
 	4.16666666666665929218E-2,   // 0x3fa555555555554b
 }

 // Cos returns the cosine of the radian argument x.
 //
 // Special cases are:
 //	Cos(±Inf) = NaN
 //	Cos(NaN) = NaN
 func Cos(x float64) float64

 func cos(x float64) float64 {
 	const (
 		PI4A = 7.85398125648498535156E-1                             // 0x3fe921fb40000000, Pi/4 split into three parts
 		PI4B = 3.77489470793079817668E-8                             // 0x3e64442d00000000,
 		PI4C = 2.69515142907905952645E-15                            // 0x3ce8469898cc5170,
 		M4PI = 1.273239544735162542821171882678754627704620361328125 // 4/pi
 	)
 	// special cases
 	switch {
 	case IsNaN(x) || IsInf(x, 0):
 		return NaN()
 	}

 	// make argument positive
 	sign := false
 	x = Abs(x)

 	j := int64(x * M4PI) // integer part of x/(Pi/4), as integer for tests on the phase angle
 	y := float64(j)      // integer part of x/(Pi/4), as float

 	// map zeros to origin
 	if j&1 == 1 {
 		j++
 		y++
 	}
 	j &= 7 // octant modulo 2Pi radians (360 degrees)
 	if j > 3 {
 		j -= 4
 		sign = !sign
 	}
 	if j > 1 {
 		sign = !sign
 	}

 	z := ((x - y*PI4A) - y*PI4B) - y*PI4C // Extended precision modular arithmetic
 	zz := z * z
 	if j == 1 || j == 2 {
 		y = z + z*zz*((((((_sin[0]*zz)+_sin[1])*zz+_sin[2])*zz+_sin[3])*zz+_sin[4])*zz+_sin[5])
 	} else {
 		y = 1.0 - 0.5*zz + zz*zz*((((((_cos[0]*zz)+_cos[1])*zz+_cos[2])*zz+_cos[3])*zz+_cos[4])*zz+_cos[5])
 	}
 	if sign {
 		y = -y
 	}
 	return y
 }

 // Sin returns the sine of the radian argument x.
 //
 // Special cases are:
 //	Sin(±0) = ±0
 //	Sin(±Inf) = NaN
 //	Sin(NaN) = NaN
 func Sin(x float64) float64

 func sin(x float64) float64 {
 	const (
 		PI4A = 7.85398125648498535156E-1                             // 0x3fe921fb40000000, Pi/4 split into three parts
 		PI4B = 3.77489470793079817668E-8                             // 0x3e64442d00000000,
 		PI4C = 2.69515142907905952645E-15                            // 0x3ce8469898cc5170,
 		M4PI = 1.273239544735162542821171882678754627704620361328125 // 4/pi
 	)
 	// special cases
 	switch {
 	case x == 0 || IsNaN(x):
 		return x // return ±0 || NaN()
 	case IsInf(x, 0):
 		return NaN()
 	}

 	// make argument positive but save the sign
 	sign := false
 	if x < 0 {
 		x = -x
 		sign = true
 	}

 	j := int64(x * M4PI) // integer part of x/(Pi/4), as integer for tests on the phase angle
 	y := float64(j)      // integer part of x/(Pi/4), as float

 	// map zeros to origin
 	if j&1 == 1 {
 		j++
 		y++
 	}
 	j &= 7 // octant modulo 2Pi radians (360 degrees)
 	// reflect in x axis
 	if j > 3 {
 		sign = !sign
 		j -= 4
 	}

 	z := ((x - y*PI4A) - y*PI4B) - y*PI4C // Extended precision modular arithmetic
 	zz := z * z
 	if j == 1 || j == 2 {
 		y = 1.0 - 0.5*zz + zz*zz*((((((_cos[0]*zz)+_cos[1])*zz+_cos[2])*zz+_cos[3])*zz+_cos[4])*zz+_cos[5])
 	} else {
 		y = z + z*zz*((((((_sin[0]*zz)+_sin[1])*zz+_sin[2])*zz+_sin[3])*zz+_sin[4])*zz+_sin[5])
 	}
 	if sign {
 		y = -y
 	}
 	return y
 }
	// Copyright 2011 The Go Authors. All rights reserved.
	// Use of this source code is governed by a BSD-style
	// license that can be found in the LICENSE file.

	package math

	/*
	Floating-point sine and cosine.
	*/

	// The original C code, the long comment, and the constants
	// below were from http://netlib.sandia.gov/cephes/cmath/sin.c,
	// available from http://www.netlib.org/cephes/cmath.tgz.
	// The go code is a simplified version of the original C.
	//
	// sin.c
	//
	// Circular sine
	//
	// SYNOPSIS:
	//
	// double x, y, sin();
	// y = sin( x );
	//
	// DESCRIPTION:
	//
	// Range reduction is into intervals of pi/4. The reduction error is nearly
	// eliminated by contriving an extended precision modular arithmetic.
	//
	// Two polynomial approximating functions are employed.
	// Between 0 and pi/4 the sine is approximated by
	// x + x3 P(x2).
	// Between pi/4 and pi/2 the cosine is represented as
	// 1 - x2 Q(x2).
	//
	// ACCURACY:
	//
	// Relative error:
	// arithmetic domain # trials peak rms
	// DEC 0, 10 150000 3.0e-17 7.8e-18
	// IEEE -1.07e9,+1.07e9 130000 2.1e-16 5.4e-17
	//
	// Partial loss of accuracy begins to occur at x = 2**30 = 1.074e9. The loss
	// is not gradual, but jumps suddenly to about 1 part in 10e7. Results may
	// be meaningless for x > 2**49 = 5.6e14.
	//
	// cos.c
	//
	// Circular cosine
	//
	// SYNOPSIS:
	//
	// double x, y, cos();
	// y = cos( x );
	//
	// DESCRIPTION:
	//
	// Range reduction is into intervals of pi/4. The reduction error is nearly
	// eliminated by contriving an extended precision modular arithmetic.
	//
	// Two polynomial approximating functions are employed.
	// Between 0 and pi/4 the cosine is approximated by
	// 1 - x2 Q(x2).
	// Between pi/4 and pi/2 the sine is represented as
	// x + x3 P(x2).
	//
	// ACCURACY:
	//
	// Relative error:
	// arithmetic domain # trials peak rms
	// IEEE -1.07e9,+1.07e9 130000 2.1e-16 5.4e-17
	// DEC 0,+1.07e9 17000 3.0e-17 7.2e-18
	//
	// Cephes Math Library Release 2.8: June, 2000
	// Copyright 1984, 1987, 1989, 1992, 2000 by Stephen L. Moshier
	//
	// The readme file at http://netlib.sandia.gov/cephes/ says:
	// Some software in this archive may be from the book _Methods and
	// Programs for Mathematical Functions_ (Prentice-Hall or Simon & Schuster
	// International, 1989) or from the Cephes Mathematical Library, a
	// commercial product. In either event, it is copyrighted by the author.
	// What you see here may be used freely but it comes with no support or
	// guarantee.
	//
	// The two known misprints in the book are repaired here in the
	// source listings for the gamma function and the incomplete beta
	// integral.
	//
	// Stephen L. Moshier
	// moshier@na-net.ornl.gov

	// sin coefficients
	var _sin = [...]float64{
	1.58962301576546568060E-10, // 0x3de5d8fd1fd19ccd
	-2.50507477628578072866E-8, // 0xbe5ae5e5a9291f5d
	2.75573136213857245213E-6, // 0x3ec71de3567d48a1
	-1.98412698295895385996E-4, // 0xbf2a01a019bfdf03
	8.33333333332211858878E-3, // 0x3f8111111110f7d0
	-1.66666666666666307295E-1, // 0xbfc5555555555548
	}

	// cos coefficients
	var _cos = [...]float64{
	-1.13585365213876817300E-11, // 0xbda8fa49a0861a9b
	2.08757008419747316778E-9, // 0x3e21ee9d7b4e3f05
	-2.75573141792967388112E-7, // 0xbe927e4f7eac4bc6
	2.48015872888517045348E-5, // 0x3efa01a019c844f5
	-1.38888888888730564116E-3, // 0xbf56c16c16c14f91
	4.16666666666665929218E-2, // 0x3fa555555555554b
	}

	// Cos returns the cosine of the radian argument x.
	//
	// Special cases are:
	// Cos(±Inf) = NaN
	// Cos(NaN) = NaN
	func Cos(x float64) float64

	func cos(x float64) float64 {
	const (
	PI4A = 7.85398125648498535156E-1 // 0x3fe921fb40000000, Pi/4 split into three parts
	PI4B = 3.77489470793079817668E-8 // 0x3e64442d00000000,
	PI4C = 2.69515142907905952645E-15 // 0x3ce8469898cc5170,
	M4PI = 1.273239544735162542821171882678754627704620361328125 // 4/pi
	)
	// special cases
	switch {
	case IsNaN(x) \|\| IsInf(x, 0):
	return NaN()
	}

	// make argument positive
	sign := false
	x = Abs(x)

	j := int64(x * M4PI) // integer part of x/(Pi/4), as integer for tests on the phase angle
	y := float64(j) // integer part of x/(Pi/4), as float

	// map zeros to origin
	if j&1 == 1 {
	j++
	y++
	}
	j &= 7 // octant modulo 2Pi radians (360 degrees)
	if j > 3 {
	j -= 4
	sign = !sign
	}
	if j > 1 {
	sign = !sign
	}

	z := ((x - yPI4A) - yPI4B) - y*PI4C // Extended precision modular arithmetic
	zz := z * z
	if j == 1 \|\| j == 2 {
	y = z + zzz((((((_sin[0]zz)+_sin[1])zz+_sin[2])zz+_sin[3])zz+_sin[4])*zz+_sin[5])
	} else {
	y = 1.0 - 0.5zz + zzzz((((((_cos[0]zz)+_cos[1])zz+_cos[2])zz+_cos[3])zz+_cos[4])zz+_cos[5])
	}
	if sign {
	y = -y
	}
	return y
	}

	// Sin returns the sine of the radian argument x.
	//
	// Special cases are:
	// Sin(±0) = ±0
	// Sin(±Inf) = NaN
	// Sin(NaN) = NaN
	func Sin(x float64) float64

	func sin(x float64) float64 {
	const (
	PI4A = 7.85398125648498535156E-1 // 0x3fe921fb40000000, Pi/4 split into three parts
	PI4B = 3.77489470793079817668E-8 // 0x3e64442d00000000,
	PI4C = 2.69515142907905952645E-15 // 0x3ce8469898cc5170,
	M4PI = 1.273239544735162542821171882678754627704620361328125 // 4/pi
	)
	// special cases
	switch {
	case x == 0 \|\| IsNaN(x):
	return x // return ±0 \|\| NaN()
	case IsInf(x, 0):
	return NaN()
	}

	// make argument positive but save the sign
	sign := false
	if x < 0 {
	x = -x
	sign = true
	}

	j := int64(x * M4PI) // integer part of x/(Pi/4), as integer for tests on the phase angle
	y := float64(j) // integer part of x/(Pi/4), as float

	// map zeros to origin
	if j&1 == 1 {
	j++
	y++
	}
	j &= 7 // octant modulo 2Pi radians (360 degrees)
	// reflect in x axis
	if j > 3 {
	sign = !sign
	j -= 4
	}

	z := ((x - yPI4A) - yPI4B) - y*PI4C // Extended precision modular arithmetic
	zz := z * z
	if j == 1 \|\| j == 2 {
	y = 1.0 - 0.5zz + zzzz((((((_cos[0]zz)+_cos[1])zz+_cos[2])zz+_cos[3])zz+_cos[4])zz+_cos[5])
	} else {
	y = z + zzz((((((_sin[0]zz)+_sin[1])zz+_sin[2])zz+_sin[3])zz+_sin[4])*zz+_sin[5])
	}
	if sign {
	y = -y
	}
	return y
	}