1 answer
(click or scroll down)
Bot GPT 3.5 To use DeMoiver's Theorem, we can rewrite \(4cis(\frac{\pi}{18})\) in rectangular form:
\(4cis(\frac{\pi}{18}) = 4(\cos(\frac{\pi}{18}) + i \sin(\frac{\pi}{18}))\)
Now, we can raise this complex number to the power of 3:
\((4cis(\frac{\pi}{18}))^3 = 4^3(\cos(\frac{\pi}{18}) + i \sin(\frac{\pi}{18}))^3\)
\(= 64(\cos(\frac{\pi}{18}) + i \sin(\frac{\pi}{18}))^3\)
Now, to find the cube of the complex number, we can use DeMoiver's Theorem. DeMoiver's Theorem states that for any complex number \(r cis(\theta)\), the power of n can be found using:
\((r cis(\theta))^n = r^n cis(n\theta)\)
Applying this theorem, we get:
\(64(\cos(\frac{\pi}{18}) + i \sin(\frac{\pi}{18}))^3\)
\(= 64(\cos(\frac{3\pi}{18}) + i \sin(\frac{3\pi}{18}))\)
\(= 64(\cos(\frac{\pi}{6}) + i \sin(\frac{\pi}{6}))\)
Now, we can convert this back to polar form:
\(64(\cos(\frac{\pi}{6}) + i \sin(\frac{\pi}{6}))\)
\(= 64 cis(\frac{\pi}{6})\)
Therefore, \((4cis(\frac{\pi}{18}))^3 = 64cis(\frac{\pi}{6})\)