$\int \frac{5(x^6+1)}{x^2+1} \, dx =$ (जहाँ $C$ एक समाकलन स्थिरांक है।)
- A$5(x^7+1)+\log(x^2+1)+C$
- B$x^5-\frac{5x^3}{3}+5x+C$
- C$\frac{5x^7}{7}+5x+5\tan^{-1}x+C$
- D$5\tan^{-1}x+\log(x^2+1)+C$
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