यदि $f'(x) = \sin(\log x)$ और $y = f\left(\frac{2x + 3}{3 - 2x}\right)$ है,तो $\frac{dy}{dx}$ का मान ज्ञात कीजिए।
- A$\sin\left[\log\left(\frac{2x + 3}{3 - 2x}\right)\right]$
- B$\frac{12}{(3 - 2x)^2}$
- C$\frac{12}{(3 - 2x)^2} \sin\left[\log\left(\frac{2x + 3}{3 - 2x}\right)\right]$
- D$\frac{12}{(3 - 2x)^2} \cos\left[\log\left(\frac{2x + 3}{3 - 2x}\right)\right]$
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