$\int (\log x)^3 x^4 \, dx$
- A$\frac{x^5}{625} [125 p^3 - 75 p^2 + 30 p - 6] + c$ (જ્યાં,$p = \log x$)
- B$\frac{x^5}{625} [125 p^3 - 25 p^2 + 30 p - 5] + c$ (જ્યાં,$p = \log x$)
- C$\frac{x^5}{625} [125 p^3 - 60 p^2 - 25 p + 5] + c$ (જ્યાં,$p = \log x$)
- D$\frac{x^5}{125} [625 p^3 - 75 p^2 + 30 p + 6] + c$ (જ્યાં,$p = \log x$)
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