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Standard Logarithm

The value of ...

Question

The value of the integral $\int \frac{log (x + 1) - log x}{x (x + 1)} d x$ is:

A

- (1 / 2) (log (x + 1)^{2} - (1 / 2) (log x)^{2} + log (x + 1) log x + C

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B

- [(log (x + 1)^{2} - (log x)^{2}] + log (x + 1) log x + C

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C

C - (1 / 2) (log (1 + 1 / x)^{2}

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D

None of these

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Solution

The correct options are
A $- (1 / 2) (log (x + 1)^{2} - (1 / 2) (log x)^{2} + log (x + 1) log x + C$
C $C - (1 / 2) (log (1 + 1 / x)^{2}$
Let $I = \int \frac{log (x + 1) - log x}{x (x + 1)} d x$
Substitute2 $t = 1 + \frac{1}{x} \Rightarrow d t = - \frac{d x}{x^{2}}$
$I = - \int \frac{log t}{t} d t = - \frac{1}{2} {(log t)}^{2} + c$
$= - \frac{1}{2} ({(log 1 + \frac{1}{x})}^{2}) + c$
$= - \frac{1}{2} ({(log x + 1)}^{2}) - \frac{1}{2} ({(log x)}^{2}) + (log x + 1) log x + c$

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