De Moivre's Theorem

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De Moivre's Theorem is a very useful theorem in the mathematical fields of complex numbers. It allows complex numbers in polar form to be easily raised to certain powers. It states that for $x\in\mathbb{R}$ and $n\in\mathbb{Z}$, $\left(\cos x+i\sin x\right)^n=\cos(nx)+i\sin(nx)$.

Proof

This is one proof of de Moivre's theorem by induction.

  • If $n\ge0$:
If $n=0$, the formula holds true because $\cos(0x)+i\sin(0x)=1+0i=1=z^0.$
Assume the formula is true for $n=k$. Now, consider $n=k+1$:

\begin{align*} (\cos x+i \sin x)^{k+1} & =(\cos x+i \sin x)^{k}(\cos x+i \sin x) & \text { by Exponential laws } \\ & =[\cos (k x)+i \sin (k x)](\cos x+i \sin x) & \text { by our assumption } \\ & =\cos (k x) \cos x-\sin (k x) \sin x+i[\cos (k x) \sin x+\sin (k x) \cos x] & \\ & =\operatorname{cis}((k+1)(x)) & \text { by various trigonometric identities } \end{align*}

Therefore, the result is true for all nonnegative integers $n$.
  • If $n<0$, one must consider $n=-m$ when $m$ is a positive integer.

\begin{align*} (\operatorname{cis} x)^{n} &=(\operatorname{cis} x)^{-m}  \\ &=\frac{1}{(\operatorname{cis} x)^{m}}  \\ &=\frac{1}{\operatorname{cis}(m x)}  \\ &=\cos (m x)-i \sin (m x) & \text { rationalization of the denominator } \\ &=\operatorname{cis}(-m x)  \\ &=\operatorname{cis}(n x)  \end{align*}

And thus, the formula proves true for all integral values of $n$. $\blacksquare$

Generalization

Note that from the functional equation $f(x)^n = f(nx)$ where $f(x) = \cos x + i\sin x$, we see that $f(x)$ behaves like an exponential function. Indeed, Euler's identity states that $e^{ix} = \cos x+i\sin x$. This extends de Moivre's theorem to all $n\in \mathbb{R}$.

See Also