Angle addition formulas express trigonometric functions of sums of angles 
in terms of functions of 
and 
. The fundamental formulas of angle addition in trigonometry
are given by
The first four of these are known as the prosthaphaeresis formulas, or sometimes as Simpson's formulas.
The sine and cosine angle addition identities can be compactly summarized by the matrix equation
![[cosalpha sinalpha; -sinalpha cosalpha][cosbeta sinbeta; -sinbeta cosbeta]=[cos(alpha+beta) sin(alpha+beta); -sin(alpha+beta) cos(alpha+beta)].](https://txtdot.deep-swarm.xyz/proxy/img?url=https%3A%2F%2Fmathworld.wolfram.com%2Fimages%2Fequations%2FTrigonometricAdditionFormulas%2FNumberedEquation1.svg) |
(7) |
These formulas can be simply derived using complex exponentials and the Euler formula as follows.
Equating real and imaginary parts then gives (1) and (3), and (2) and (4) follow immediately by substituting
for 
.
Taking the ratio of (1) and (3) gives the tangent angle addition formula
The double-angle formulas are
Multiple-angle formulas are given by
and can also be written using the recurrence relations
The angle addition formulas can also be derived purely algebraically without the use of complex numbers. Consider the small right triangle in the figure above, which gives
Now, the usual trigonometric definitions applied to the large right triangle give
Solving these two equations simultaneously for the variables 
and 
then immediately gives
These can be put into the familiar forms with the aid of the trigonometric identities
 |
(34) |
and
which can be verified by direct multiplication. Plugging (◇) into (◇) and (38) into (◇) then gives
as before.
A similar proof due to Smiley and Smiley uses the left figure above to obtain
 |
(41) |
from which it follows that
 |
(42) |
Similarly, from the right figure,
 |
(43) |
so
 |
(44) |
Similar diagrams can be used to prove the angle subtraction formulas (Smiley 1999, Smiley and Smiley). In the figure at left,
giving
 |
(48) |
Similarly, in the figure at right,
giving
 |
(52) |
A more complex diagram can be used to obtain a proof from the 
identity (Ren 1999). In the above figure, let
.
Then
 |
(53) |
An interesting identity relating the sum and difference tangent formulas is given by
See also
Double-Angle Formulas, Half-Angle Formulas, Harmonic Addition Theorem, Multiple-Angle Formulas, Prosthaphaeresis Formulas, Trigonometry Angles, Trigonometry, Werner Formulas Explore this topic in the MathWorld classroom
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References
Beyer, W. H. CRC Standard Mathematical Tables, 28th ed. Boca Raton, FL: CRC Press, 1987.Nelson,
R. To appear in College Math. J., March 2000.Ren, G. "Proof
without Words: 
." College Math. J. 30, 212,
1999.Smiley, L. M. "Proof without Words: Geometry of Subtraction
Formulas." Math. Mag. 72, 366, 1999.Smiley, L. and
Smiley, D. "Geometry of Addition and Subtraction Formulas." http://math.uaa.alaska.edu/~smiley/trigproofs.html.
Referenced on Wolfram|Alpha
Trigonometric Addition Formulas
Cite this as:
Weisstein, Eric W. "Trigonometric Addition Formulas." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/TrigonometricAdditionFormulas.html