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Second Fundamental Theorem of Calculus

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Question

What is the integration of $\log (\frac{1 - x}{x})$ with limit $0$ to $1$ ?

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Solution

Find the integration of $\log (\frac{1 - x}{x})$ with limit $0$ to $1$ .
$\begin{array}{rcl} \int_{0}^{1} \log (\frac{1 - x}{x}) d x & = & {[\log (\frac{1 - x}{x}) . x - \int x (\frac{x}{1 - x}) (\frac{- 1}{x^{2}} - 0) d x]}_{0}^{1} [∵ U s e i n t e g r a t i o n b y p a r t s i . e . \int u v d x = u \int v d x - \int [(\int v d x) (\frac{d u}{d x}) d x]] \\ \Rightarrow & \int_{0}^{1} \log (\frac{1 - x}{x}) d x = {[\log (\frac{1 - x}{x}) . x + \int (\frac{1}{1 - x}) d x]}_{0}^{1} \\ \Rightarrow & \int_{0}^{1} \log (\frac{1 - x}{x}) d x = {[\log (\frac{1 - x}{x}) . x - \log (1 - x)]}_{0}^{1} \\ \Rightarrow & \int_{0}^{1} \log (\frac{1 - x}{x}) d x = [\log (\frac{1 - 1}{1}) . 1 - \log (1 - 1)] - [\log (\frac{1 - 0}{0}) . 0 - \log (1 - 0)] \\ \Rightarrow & \int_{0}^{1} \log (\frac{1 - x}{x}) d x = 0 \end{array}$ Hence, the required integral is $\int_{0}^{1} \log (\frac{1 - x}{x}) dx = 0$

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