यदि $\frac{3-2 i \sin \theta}{1+2 i \sin \theta}$ एक शुद्ध काल्पनिक संख्या है,तो $\theta=$
- A$2 n \pi \pm \frac{\pi}{4}$
- B$2 n \pi \pm \frac{\pi}{2}$
- C$n \pi \pm \frac{\pi}{3}$
- D$n \pi \pm \frac{\pi}{6}$
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$\begin{aligned} & \text{यदि } z=e^{i \theta} \text{ और } \frac{3 \cos 3 \theta+2 \cos 2 \theta+5 \cos 5 \theta}{3 \sin 3 \theta+2 \sin 2 \theta+5 \sin 5 \theta} \\ & =\frac{i \sum_{r=0}^{10} a_r z^r}{\sum_{r=0}^{10} b_r z^r} \text{ तो } \frac{\left(\sum_{r=0}^{10} a_r+\sum_{r=0}^{10} b_r\right)}{10}= \end{aligned}$
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