De Moivre's formula

In mathematics, de Moivre's formula (also known as de Moivre's theorem and de Moivre's identity), named after Abraham de Moivre, states that for any complex number (and, in particular, for any real number) $x$ and integer $n$ it holds that

{\big (}\cos(x)+i\sin(x){\big )}^{n}=\cos(nx)+i\sin(nx),

where $i$ is the imaginary unit ( $i 2 = -1$ ). While the formula was named after de Moivre, he never stated it in his works.^[1] The expression $cos(x) + i sin(x)$ is sometimes abbreviated to $cis (x)$ .

The formula is important because it connects complex numbers and trigonometry. By expanding the left hand side and then comparing the real and imaginary parts under the assumption that $x$ is real, it is possible to derive useful expressions for $cos(nx)$ and $sin(nx)$ in terms of $cos(x)$ and $sin(x)$ .

As written, the formula is not valid for non-integer powers $n$ . However, there are generalizations of this formula valid for other exponents. These can be used to give explicit expressions for the $n$ th roots of unity, that is, complex numbers $z$ such that $z n = 1$ .

Derivation from Euler's formula

Although historically proven earlier, de Moivre's formula can easily be derived from Euler's formula

e^{ix}=\cos x+i\sin x

and the exponential law for integer powers

\left(e^{{ix}}\right)^{n}=e^{{inx}}.

Then, by Euler's formula,

e^{inx}=\cos nx+i\sin nx.

Proof by induction (for integer $n$ )

The truth of de Moivre's theorem can be established by mathematical induction for natural numbers, and extended to all integers from there. For an integer $n$ , call the following statement $S(n)$ :

(\cos x+i\sin x)^{n}=\cos nx+i\sin nx.

For $n > 0$ , we proceed by mathematical induction. $S(1)$ is clearly true. For our hypothesis, we assume $S(k)$ is true for some natural $k$ . That is, we assume

\left(\cos x+i\sin x\right)^{k}=\cos kx+i\sin kx.

Now, considering $S(k + 1)$ :

{\begin{alignedat}{2}\left(\cos x+i\sin x\right)^{k+1}&=\left(\cos x+i\sin x\right)^{k}\left(\cos x+i\sin x\right)\\&=\left(\cos kx+i\sin kx\right)\left(\cos x+i\sin x\right)&&\qquad {\text{by the induction hypothesis}}\\&=\cos kx\cos x-\sin kx\sin x+i\left(\cos kx\sin x+\sin kx\cos x\right)\\&=\cos \,(k+1)x+i\sin \,(k+1)x&&\qquad {\text{by the trigonometric identities}}\end{alignedat}}

See angle sum and difference identities.

We deduce that $S(k)$ implies $S(k + 1)$ . By the principle of mathematical induction it follows that the result is true for all natural numbers. Now, $S(0)$ is clearly true since $cos(0 x) + i sin(0 x) = 1 + 0 i = 1$ . Finally, for the negative integer cases, we consider an exponent of $- n$ for natural $n$ .

{\begin{aligned}\left(\cos x+i\sin x\right)^{-n}&={\big (}\left(\cos x+i\sin x\right)^{n}{\big )}^{-1}\\&=\left(\cos nx+i\sin nx\right)^{-1}\\&=\cos(-nx)+i\sin(-nx).\qquad (*)\\\end{aligned}}

The equation (*) is a result of the identity

z^{-1}={\frac {\bar {z}}{|z|^{2}}},

for z = cos (nx) + i sin (nx). Hence, $S(n)$ holds for all integers $n$ .

Formulae for cosine and sine individually

Being an equality of complex numbers, one necessarily has equality both of the real parts and of the imaginary parts of both members of the equation. If $x$ , and therefore also $cos x$ and $sin x$ , are real numbers, then the identity of these parts can be written using binomial coefficients. This formula was given by 16th century French mathematician François Viète:

{\begin{aligned}\sin(nx)&=\sum _{k=0}^{n}{\binom {n}{k}}(\cos x)^{k}\,(\sin x)^{n-k}\,\sin {\frac {(n-k)\pi }{2}}\\\cos(nx)&=\sum _{k=0}^{n}{\binom {n}{k}}(\cos x)^{k}\,(\sin x)^{n-k}\,\cos {\frac {(n-k)\pi }{2}}.\end{aligned}}

In each of these two equations, the final trigonometric function equals one or minus one or zero, thus removing half the entries in each of the sums. These equations are in fact even valid for complex values of $x$ , because both sides are entire (that is, holomorphic on the whole complex plane) functions of $x$ , and two such functions that coincide on the real axis necessarily coincide everywhere. Here are the concrete instances of these equations for $n = 2$ and $n = 3$ :

{\begin{aligned}\cos 2x&=\left(\cos x\right)^{2}+\left(\left(\cos x\right)^{2}-1\right)&&=2\left(\cos x\right)^{2}-1\\\sin 2x&=2\left(\sin x\right)\left(\cos x\right)\\\cos 3x&=\left(\cos x\right)^{3}+3\cos x\left(\left(\cos x\right)^{2}-1\right)&&=4\left(\cos x\right)^{3}-3\cos x\\\sin 3x&=3\left(\cos x\right)^{2}\left(\sin x\right)-\left(\sin x\right)^{3}&&=3\sin x-4\left(\sin x\right)^{3}.\\\end{aligned}}

The right hand side of the formula for $cos nx$ is in fact the value $T n (cos x)$ of the Chebyshev polynomial $T n$ at $cos x$ .

Failure for non-integer powers, and generalization

De Moivre's formula does not hold for non-integer powers. The derivation of de Moivre's formula above involves a complex number raised to the integer power $n$ . If a complex number is raised to a non-integer power, the result is multiple-valued (see failure of power and logarithm identities). For example, when $n = 1 / 2$ , de Moivre's formula gives the following results:

for

x = 0

the formula gives 1^¹⁄₂ = 1, and

for

x = 2 π

the formula gives 1^¹⁄₂ = −1.

This assigns two different values for the same expression 1^¹⁄₂, so the formula is not consistent in this case.

On the other hand, the values 1 and −1 are both square roots of 1. More generally, if $z$ and $w$ are complex numbers, then

\left(\cos z+i\sin z\right)^{w}

is multi-valued while

\cos wz+i\sin wz

is not. However, it is always the case that

\cos wz+i\sin wz

is one value of

\left(\cos z+i\sin z\right)^{w}.

Roots of complex numbers

A modest extension of the version of de Moivre's formula given in this article can be used to find the $n$ th roots of a complex number (equivalently, the power of $1 / n$ ).

If $z$ is a complex number, written in polar form as

z=r\left(\cos x+i\sin x\right),

then the $n$ $n$ th roots of $z$ are given by

r^{\frac {1}{n}}\left(\cos {\frac {x+2\pi k}{n}}+i\sin {\frac {x+2\pi k}{n}}\right)

where $k$ varies over the integer values from 0 to $n - 1$ .

This formula is also sometimes known as de Moivre's formula.^[2]

Analogues in other settings

Hyperbolic trigonometry

Since $cosh x + sinh x = e x$ , an analog to de Moivre's formula also applies to the hyperbolic trigonometry. For all $n \in ℤ$ ,

(\cosh x+\sinh x)^{n}=\cosh nx+\sinh nx.

Also, if $n \in ℚ$ , then one value of $(cosh x + sinh x) n$ will be $cosh nx + sinh nx$ .^[3]

Quaternions

To find the roots of a quaternion there is an analogous form of de Moivre's formula. A quaternion in the form

d+a\mathbf {\hat {i}} +b\mathbf {\hat {j}} +c\mathbf {\hat {k}}

can be represented in the form

q=k(\cos \theta +\varepsilon \sin \theta )\qquad {\mbox{for }}0\leq \theta <2\pi .

In this representation,

k={\sqrt {d^{2}+a^{2}+b^{2}+c^{2}}},

and the trigonometric functions are defined as

\cos \theta ={\frac {d}{k}}\quad {\mbox{and}}\quad \sin \theta =\pm {\frac {\sqrt {a^{2}+b^{2}+c^{2}}}{k}}.

In the case that $a 2 + b 2 + c 2 \neq 0$ ,

\varepsilon =\pm {\frac {a\mathbf {\hat {i}} +b\mathbf {\hat {j}} +c\mathbf {\hat {k}} }{\sqrt {a^{2}+b^{2}+c^{2}}}},

that is, the unit vector. This leads to the variation of De Moivre's formula:

q^{n}=k^{n}(\cos n\theta +\varepsilon \sin n\theta ).

^[4]

Example

To find the cube roots of

Q=1+\mathbf {\hat {i}} +\mathbf {\hat {j}} +\mathbf {\hat {k}} ,

write the quaternion in the form

Q=2\left(\cos {\frac {\pi }{3}}+\varepsilon \sin {\frac {\pi }{3}}\right)\qquad {\mbox{where }}\varepsilon ={\frac {\mathbf {\hat {i}} +\mathbf {\hat {j}} +\mathbf {\hat {k}} }{\sqrt {3}}}.

Then the cube roots are given by:

{\sqrt[{3}]{Q}}={\sqrt[{3}]{2}}(\cos \theta +\varepsilon \sin \theta )\qquad {\mbox{for }}\theta ={\frac {\pi }{9}},{\frac {7\pi }{9}},{\frac {13\pi }{9}}.

2×2 matrices

Consider the following matrix $A={\begin{pmatrix}\cos \phi &\sin \phi \\-\sin \phi &\cos \phi \end{pmatrix}}$ . Then ${\begin{pmatrix}\cos \phi &\sin \phi \\-\sin \phi &\cos \phi \end{pmatrix}}^{n}={\begin{pmatrix}\cos n\phi &\sin n\phi \\-\sin n\phi &\cos n\phi \end{pmatrix}}$ . This fact (although it can be proven in the very same way as for complex numbers) is a direct consequence of the fact that the space of matrices of type ${\begin{pmatrix}a&b\\-b&a\end{pmatrix}}$ is isomorphic to the space of complex numbers.

References

Abramowitz, Milton; Stegun, Irene A. (1964). Handbook of Mathematical Functions. New York: Dover Publications. p. 74. ISBN 0-486-61272-4. .

↑ Lial, Margaret L.; Hornsby, John; Schneider, David I.; Callie J., Daniels (2008). College Algebra and Trigonometry (4th ed.). Boston: Pearson/Addison Wesley. p. 792. ISBN 9780321497444.
↑ Hazewinkel, Michiel, ed. (2001), "De Moivre formula", Encyclopedia of Mathematics, Springer, ISBN 978-1-55608-010-4
↑ Mukhopadhyay, Utpal (August 2006). "Some interesting features of hyperbolic functions". Resonance. 11 (8): 81–85. doi:10.1007/BF02855783.
↑ Brand, Louis (October 1942). "The roots of a quaternion". The American Mathematical Monthly. 49 (8): 519–520. doi:10.2307/2302858. JSTOR 2302858.

External links

De Moivre's Theorem for Trig Identities by Michael Croucher, Wolfram Demonstrations Project.

This article is issued from Wikipedia - version of the 12/1/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.