TS EAMCET · Maths · Complex Number
If \(\omega \neq 1\) is a cube root of unity, then one root among the \(7^{\text {th }}\) roots of \((1+\omega)\) is
- A \(1+\omega\)
- B \(1-\omega\)
- C \(\omega-\omega^2\)
- D \(\frac{\omega}{\omega-\omega^2}\)
Answer & Solution
Correct Answer
(A) \(1+\omega\)
Step-by-step Solution
Detailed explanation
\(1+\omega = -\omega^2\) \(1+\omega = e^{i\pi} \cdot e^{i4\pi/3} = e^{i(3\pi/3+4\pi/3)} = e^{i7\pi/3} = e^{i\pi/3}\) \((1+\omega)^7 = (e^{i\pi/3})^7 = e^{i7\pi/3}\) \(e^{i7\pi/3} = e^{i(2\pi + \pi/3)} = e^{i\pi/3}\) \((1+\omega)^7 = 1+\omega\)
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