$\frac{d}{d x} [x^{\sin x}+(\sin x)^x]=$
- A$x^{\sin x} [\frac{\sin x}{x}+\cos x \log x]+(\sin x)^x [\log \sin x+x \cot x]$
- B$x^{\sin x} [x \tan x+\cos x \log x]+(\sin x)^x [\frac{\sin x}{x}+\log (\sin x)]$
- C$x^{\sin x} [\frac{x}{\sin x}+\cos x \log x]+(\sin x)^x [x \cot x+\log (\sin x)]$
- D$x^{\sin x} [\frac{\sin x}{x}+\sin x \log x]+(\sin x)^x [x \cot x+\log (\cos x)]$
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