De Moivre's Formula/Positive Integer Index/Proof 2

Proof
From Product of Complex Numbers in Polar Form: General Result:
 * $z_1 z_2 \cdots z_n = r_1 r_2 \cdots r_n \paren {\cos \paren {\theta_1 + \theta_2 + \cdots + \theta_n} + i \sin \paren {\theta_1 + \theta_2 + \cdots + \theta_n} }$

Setting $z_1 = z_2 = \cdots = z_n = r \paren {\cos x + i \sin x}$ gives the result.