WBJEE · Maths · Complex Number
If \(P, Q\) and \(R\) are angles of an isosceles triangle and \(\angle P=\frac{\pi}{2},\) then the value of \(\left(\cos \frac{P}{3}-i \sin \frac{P}{3}\right)^{3}+(\cos Q+i \sin Q) \\ (\cos R-i \sin R)+(\cos P-i \sin P) \\ (\cos Q-i \sin Q)(\cos R-i \sin R) \text { is }\)
- A \(i\)
- B \(-i\)
- C 1
- D -1
Answer & Solution
Correct Answer
(B) \(-i\)
Step-by-step Solution
Detailed explanation
Given that, \(P, Q\) and \(R\) are angles of an isosceles triangle and \(\angle P=\frac{\pi}{2}\) \(\therefore \quad Q=R=\frac{\pi}{4}\left(\because P+Q+R=180^{\circ}\right)\) Now, \(\left(\cos \frac{P}{3}-i \sin \frac{P}{3}\right)^{3}+(\cos Q+i \sin Q)\) \((\cos R-i \sin R)\)…
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