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Ryan LeCompte · Answer 1 · 2023-01-17T22:42:39+0000

SOLUTION

We want to find the cube root of

This can be written as

$\sqrt[3]{(4-i.4.√(3))}$

Step 2

Step 3

Step 4

Step 5

So, 3 degree root from input complex number has exactly 3 values:

These become

$\begin{gathered} \alpha_0=2.(cos(-(\pi)/(9))+i.sin(-(\pi)/(9))) \\ \alpha_1=2.(cos(-(5.\pi)/(9))+i.sin((5.\pi)/(9))) \\ \alpha_2=2.(cos(-(11.\pi)/(9))+i.sin((11.\pi)/(9))) \end{gathered}$

Hence the answer is

$\begin{gathered} \alpha_0=2.(cos(-(\pi)/(9))+i.sin(-(\pi)/(9))) \\ \alpha_1=2.(cos(-(5.\pi)/(9))+i.sin((5.\pi)/(9))) \\ \alpha_2=2.(cos(-(11.\pi)/(9))+i.sin((11.\pi)/(9))) \end{gathered}$

Find all cube roots of the complex number. Leave answers in trigonometric form.-example-1

Find all cube roots of the complex number. Leave answers in trigonometric form.-example-2

Find all cube roots of the complex number. Leave answers in trigonometric form.-example-3

Find all cube roots of the complex number. Leave answers in trigonometric form.-example-4

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