About the Project
NIST
4 Elementary FunctionsTrigonometric Functions

§4.21 Identities

Keywords:
identities, trigonometric functions
Permalink:
http://dlmf.nist.gov/4.21
See also:
Annotations for Ch.4
Contents

§4.21(i) Addition Formulas

Keywords:
addition formulas, trigonometric functions
Notes:
See Hobson (1928, Chapter 4). For (4.21.1) use (4.21.2) and (4.21.3) with ν=14π.
Permalink:
http://dlmf.nist.gov/4.21.i
Addition (effective with 1.1.0):
Equation (4.21.1_5) was added.

Suggested 2018-08-14 by Ted Ersek

See also:
Annotations for §4.21 and Ch.4
4.21.1 sinu±cosu=2sin(u±14π)=±2cos(u14π).
Symbols:
π: the ratio of the circumference of a circle to its diameter, cosz: cosine function and sinz: sine function
Referenced by:
§4.21(i), Erratum (V1.0.7) for Equation (4.21.1)
Permalink:
http://dlmf.nist.gov/4.21.E1
Encodings:
TeX, pMML, png
Correction (effective with 1.0.7):
Originally the symbol ± was missing after the second equal sign.

Suggested 2012-09-27 by Dennis M. Heim

See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.1_5 Acosu+Bsinu=A2+B2cos(u-ph(A+Bi)),
A,B,
Symbols:
cosz: cosine function, : element of, i: imaginary unit, ph: phase, : real line and sinz: sine function
Referenced by:
§4.21(i), Erratum (V1.1.0) for Additions
Permalink:
http://dlmf.nist.gov/4.21.E1_5
Encodings:
TeX, pMML, png
Addition (effective with 1.1.0):
This equation was added.

Suggested 2018-08-14 by Ted Ersek

See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.2 sin(u±v) =sinucosv±cosusinv,
Symbols:
cosz: cosine function and sinz: sine function
A&S Ref:
4.3.16
Referenced by:
§4.21(i), (9.8.13)
Permalink:
http://dlmf.nist.gov/4.21.E2
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.3 cos(u±v) =cosucosvsinusinv,
Symbols:
cosz: cosine function and sinz: sine function
A&S Ref:
4.3.17
Referenced by:
§4.21(i)
Permalink:
http://dlmf.nist.gov/4.21.E3
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.4 tan(u±v) =tanu±tanv1tanutanv,
Symbols:
tanz: tangent function
A&S Ref:
4.3.18
Referenced by:
(9.8.17)
Permalink:
http://dlmf.nist.gov/4.21.E4
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.5 cot(u±v) =±cotucotv-1cotu±cotv.
Symbols:
cotz: cotangent function
A&S Ref:
4.3.19
Permalink:
http://dlmf.nist.gov/4.21.E5
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.6 sinu+sinv =2sin(u+v2)cos(u-v2),
Symbols:
cosz: cosine function and sinz: sine function
A&S Ref:
4.3.34
Permalink:
http://dlmf.nist.gov/4.21.E6
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.7 sinu-sinv =2cos(u+v2)sin(u-v2),
Symbols:
cosz: cosine function and sinz: sine function
A&S Ref:
4.3.35
Permalink:
http://dlmf.nist.gov/4.21.E7
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.8 cosu+cosv =2cos(u+v2)cos(u-v2),
Symbols:
cosz: cosine function
A&S Ref:
4.3.36
Permalink:
http://dlmf.nist.gov/4.21.E8
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.9 cosu-cosv =-2sin(u+v2)sin(u-v2).
Symbols:
cosz: cosine function and sinz: sine function
A&S Ref:
4.3.37
Permalink:
http://dlmf.nist.gov/4.21.E9
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.10 tanu±tanv =sin(u±v)cosucosv,
Symbols:
cosz: cosine function, sinz: sine function and tanz: tangent function
A&S Ref:
4.3.38
Permalink:
http://dlmf.nist.gov/4.21.E10
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(i), §4.21 and Ch.4
4.21.11 cotu±cotv =sin(v±u)sinusinv.
Symbols:
cotz: cotangent function and sinz: sine function
A&S Ref:
4.3.39
Permalink:
http://dlmf.nist.gov/4.21.E11
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(i), §4.21 and Ch.4

§4.21(ii) Squares and Products

Keywords:
squares and products, trigonometric functions
Notes:
See Hobson (1928, pp. 19, 45, 60).
Permalink:
http://dlmf.nist.gov/4.21.ii
See also:
Annotations for §4.21 and Ch.4
4.21.12 sin2z+cos2z=1,
Symbols:
cosz: cosine function, sinz: sine function and z: complex variable
A&S Ref:
4.3.10
Permalink:
http://dlmf.nist.gov/4.21.E12
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(ii), §4.21 and Ch.4
4.21.13 sec2z=1+tan2z,
Symbols:
secz: secant function, tanz: tangent function and z: complex variable
A&S Ref:
4.3.11
Permalink:
http://dlmf.nist.gov/4.21.E13
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(ii), §4.21 and Ch.4
4.21.14 csc2z=1+cot2z.
Symbols:
cscz: cosecant function, cotz: cotangent function and z: complex variable
A&S Ref:
4.3.12
Permalink:
http://dlmf.nist.gov/4.21.E14
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(ii), §4.21 and Ch.4
4.21.15 2sinusinv=cos(u-v)-cos(u+v),
Symbols:
cosz: cosine function and sinz: sine function
A&S Ref:
4.3.31
Permalink:
http://dlmf.nist.gov/4.21.E15
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(ii), §4.21 and Ch.4
4.21.16 2cosucosv=cos(u-v)+cos(u+v),
Symbols:
cosz: cosine function
A&S Ref:
4.3.32
Permalink:
http://dlmf.nist.gov/4.21.E16
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(ii), §4.21 and Ch.4
4.21.17 2sinucosv=sin(u-v)+sin(u+v).
Symbols:
cosz: cosine function and sinz: sine function
A&S Ref:
4.3.33
Permalink:
http://dlmf.nist.gov/4.21.E17
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(ii), §4.21 and Ch.4
4.21.18 sin2u-sin2v =sin(u+v)sin(u-v),
Symbols:
sinz: sine function
A&S Ref:
4.3.40
Permalink:
http://dlmf.nist.gov/4.21.E18
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(ii), §4.21 and Ch.4
4.21.19 cos2u-cos2v =-sin(u+v)sin(u-v),
Symbols:
cosz: cosine function and sinz: sine function
A&S Ref:
4.3.41
Permalink:
http://dlmf.nist.gov/4.21.E19
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(ii), §4.21 and Ch.4
4.21.20 cos2u-sin2v =cos(u+v)cos(u-v).
Symbols:
cosz: cosine function and sinz: sine function
A&S Ref:
4.3.42
Permalink:
http://dlmf.nist.gov/4.21.E20
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(ii), §4.21 and Ch.4

§4.21(iii) Multiples of the Argument

Keywords:
multiples of argument, trigonometric functions
Notes:
See Hobson (1928, pp. 21, 52–53, 63–69, 237–239). For (4.21.35) see Walker (1996, §1.9).
Permalink:
http://dlmf.nist.gov/4.21.iii
See also:
Annotations for §4.21 and Ch.4
4.21.21 sinz2=±(1-cosz2)1/2,
Symbols:
cosz: cosine function, sinz: sine function and z: complex variable
A&S Ref:
4.3.20
Referenced by:
§4.21(iii)
Permalink:
http://dlmf.nist.gov/4.21.E21
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.22 cosz2=±(1+cosz2)1/2,
Symbols:
cosz: cosine function and z: complex variable
A&S Ref:
4.3.21
Permalink:
http://dlmf.nist.gov/4.21.E22
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.23 tanz2=±(1-cosz1+cosz)1/2=1-coszsinz=sinz1+cosz.
Symbols:
cosz: cosine function, sinz: sine function, tanz: tangent function and z: complex variable
A&S Ref:
4.3.22
Referenced by:
§4.21(iii)
Permalink:
http://dlmf.nist.gov/4.21.E23
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4

In (4.21.21)–(4.21.23) Table 4.16.1 and analytic continuation will assist in resolving sign ambiguities.

4.21.24 sin(-z) =-sinz,
Symbols:
sinz: sine function and z: complex variable
A&S Ref:
4.3.13
Permalink:
http://dlmf.nist.gov/4.21.E24
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.25 cos(-z) =cosz,
Symbols:
cosz: cosine function and z: complex variable
A&S Ref:
4.3.14
Permalink:
http://dlmf.nist.gov/4.21.E25
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.26 tan(-z) =-tanz.
Symbols:
tanz: tangent function and z: complex variable
A&S Ref:
4.3.15
Permalink:
http://dlmf.nist.gov/4.21.E26
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.27 sin(2z)=2sinzcosz=2tanz1+tan2z,
Symbols:
cosz: cosine function, sinz: sine function, tanz: tangent function and z: complex variable
A&S Ref:
4.3.24
Permalink:
http://dlmf.nist.gov/4.21.E27
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.28 cos(2z)=2cos2z-1=1-2sin2z=cos2z-sin2z=1-tan2z1+tan2z,
Symbols:
cosz: cosine function, sinz: sine function, tanz: tangent function and z: complex variable
A&S Ref:
4.3.25
Permalink:
http://dlmf.nist.gov/4.21.E28
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.29 tan(2z)=2tanz1-tan2z=2cotzcot2z-1=2cotz-tanz.
Symbols:
cotz: cotangent function, tanz: tangent function and z: complex variable
A&S Ref:
4.3.26
Permalink:
http://dlmf.nist.gov/4.21.E29
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.30 sin(3z) =3sinz-4sin3z,
Symbols:
sinz: sine function and z: complex variable
A&S Ref:
4.3.27
Permalink:
http://dlmf.nist.gov/4.21.E30
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.31 cos(3z) =-3cosz+4cos3z,
Symbols:
cosz: cosine function and z: complex variable
A&S Ref:
4.3.28
Permalink:
http://dlmf.nist.gov/4.21.E31
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.32 sin(4z) =8cos3zsinz-4coszsinz,
Symbols:
cosz: cosine function, sinz: sine function and z: complex variable
A&S Ref:
4.3.29
Permalink:
http://dlmf.nist.gov/4.21.E32
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4
4.21.33 cos(4z) =8cos4z-8cos2z+1.
Symbols:
cosz: cosine function and z: complex variable
A&S Ref:
4.3.30
Permalink:
http://dlmf.nist.gov/4.21.E33
Encodings:
TeX, pMML, png
See also:
Annotations for §4.21(iii), §4.21 and Ch.4

De Moivre’s Theorem

Keywords:
De Moivre’s theorem, trigonometric functions
See also:
Annotations for §4.21(iii), §4.21 and Ch.4

When n

4.21.34 cos(nz)+isin(nz)=(cosz+isinz)n.

This result is also valid when n is fractional or complex, provided that -πzπ.

4.21.35 sin(nz)=2n-1k=0n-1sin(z+kπn),
n=1,2,3,.

If t=tan(12z), then

4.21.36 sinz =2t1+t2,
cosz =1-t21+t2,
dz =21+t2dt.

§4.21(iv) Real and Imaginary Parts; Moduli

Keywords:
moduli, real and imaginary parts, trigonometric functions
Notes:
See Hobson (1928, p. 331).
Permalink:
http://dlmf.nist.gov/4.21.iv
See also:
Annotations for §4.21 and Ch.4

With z=x+iy

4.21.37 sinz=sinxcoshy+icosxsinhy,
4.21.38 cosz=cosxcoshy-isinxsinhy,
4.21.39 tanz=sin(2x)+isinh(2y)cos(2x)+cosh(2y),
4.21.40 cotz=sin(2x)-isinh(2y)cosh(2y)-cos(2x).
4.21.41 |sinz|=(sin2x+sinh2y)1/2=(12(cosh(2y)-cos(2x)))1/2,
4.21.42 |cosz|=(cos2x+sinh2y)1/2=(12(cosh(2y)+cos(2x)))1/2,
4.21.43 |tanz|=(cosh(2y)-cos(2x)cosh(2y)+cos(2x))1/2.
© 2010–2020 NIST / Privacy Policy / Disclaimer / Feedback; Version 1.1.0; Release date 2020-12-15. A printed companion is available.