TS EAMCET · Maths · Complex Number
If the complex number \(a\) is such that \(|a|=1\) and \(\arg (a)=\theta\), then the roots of the equation \[ \left(\frac{1+i z}{1-i z}\right)^4=a \text { are } z= \]
- A \(\tan \left(\frac{2 k \pi+\theta}{4}\right), k=0,1,2,3\)
- B \(\tan \left(\frac{k \pi+\theta}{8}\right), k=0,1,2,3\)
- C \(\tan \left(\frac{3 k \pi+\theta}{4}\right), k=0,1,2,3\)
- D \(\tan \left(\frac{2 k \pi+\theta}{8}\right), k=0,1,2,3\)
Answer & Solution
Correct Answer
(D) \(\tan \left(\frac{2 k \pi+\theta}{8}\right), k=0,1,2,3\)
Step-by-step Solution
Detailed explanation
We have, \[ |a|=1 \Rightarrow \arg (a)=\theta \]…
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