MHT CET · Maths · Indefinite Integration
\(\int \frac{1}{7-6 x-x^2} d x=\)
- A \(\frac{1}{4} \log \left(\frac{7+x}{1-x}\right)+\mathrm{c}\), where \(\mathrm{c}\) is a constant of integration.
- B \(\frac{1}{8} \log \left(\frac{7+x}{1-x}\right)+\mathrm{c}\), where \(\mathrm{c}\) is a constant of integration.
- C \(\frac{1}{16} \log \left(\frac{7+x}{1-x}\right)+\mathrm{c}\), where \(\mathrm{c}\) is a constant of integration.
- D \(\frac{1}{32} \log \left(\frac{7+x}{1-x}\right)+\mathrm{c}\), where \(\mathrm{c}\) is a constant of integration.
Answer & Solution
Correct Answer
(B) \(\frac{1}{8} \log \left(\frac{7+x}{1-x}\right)+\mathrm{c}\), where \(\mathrm{c}\) is a constant of integration.
Step-by-step Solution
Detailed explanation
Let
\(\begin{aligned}
\mathbf{I} & =\int \frac{1}{7-6 x-x^2} \mathrm{~d} x \\
& =\int \frac{1}{7-6 x-x^2-9+9} \mathrm{~d} x \\
& =\int \frac{1}{16-\left(x^2+6 x+9\right)} \mathrm{d} x \\
& =\int \frac{1}{(4)^2-(x+3)^2} \mathrm{~d} x \\
& =\frac{1}{8} \log \left|\frac{4+x+3}{4-(x+3)}\right|+\mathrm{c} \\
& =\frac{1}{8} \log \left|\frac{7+x}{1-x}\right|+\mathrm{c}
\end{aligned}\)
\(\begin{aligned}
\mathbf{I} & =\int \frac{1}{7-6 x-x^2} \mathrm{~d} x \\
& =\int \frac{1}{7-6 x-x^2-9+9} \mathrm{~d} x \\
& =\int \frac{1}{16-\left(x^2+6 x+9\right)} \mathrm{d} x \\
& =\int \frac{1}{(4)^2-(x+3)^2} \mathrm{~d} x \\
& =\frac{1}{8} \log \left|\frac{4+x+3}{4-(x+3)}\right|+\mathrm{c} \\
& =\frac{1}{8} \log \left|\frac{7+x}{1-x}\right|+\mathrm{c}
\end{aligned}\)
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