यदि $y = (\log_{x} \sin x)^{x}$ है,तो $\frac{dy}{dx} = $
- A$y \left[ \frac{x \cot x}{\log \sin x} + \log(\log_{x} \sin x) - \frac{\log \sin x \cdot \log x}{x (\log x)^2} \right]$
- B$y \left[ \frac{x \cot x}{\log \sin x} + \log(\log_{x} \sin x) - \frac{\log \sin x}{x \log x} \right]$
- C$y \left[ \frac{x \cot x}{\log \sin x} + \log(\log_{x} \sin x) - \frac{\log \sin x}{x (\log x)^2} \right]$
- D$y \left[ \frac{x \cot x}{\log \sin x} + \log(\log_{x} \sin x) - \frac{\log \sin x}{x \log x} \cdot \frac{1}{\log x} \right]$
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