TS EAMCET · Maths · Indefinite Integration
\(\begin{aligned} & \text { If } \int x[\log (1+x)]^3 d x=\frac{(1+x)^2}{16}(f(x)) \ & +(1+x)(g(x)), \text { then } f(x)+g(x)=\end{aligned}\)
- A \(\log (1+x)\left[6+9(\log (1+x))-7(\log (1+x))^2\right]+C\)
- B \(\log (1+x) x^3+7(\log (1+x))^2+4 \log (1+x)+C\)
- C \(\begin{aligned} 12-18 \log (1+x)+15(\log (1+x))^2 \ -9(\log (1+x))^3+C\end{aligned}\)
- D \(\begin{aligned} 6 \log (1+x)-9(\log (1 & +x))^2 \ & +7(\log (1+x))^3+C\end{aligned}\)
Answer & Solution
Correct Answer
(D) \(\begin{aligned} 6 \log (1+x)-9(\log (1 & +x))^2 \ & +7(\log (1+x))^3+C\end{aligned}\)
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