Предмет: Алгебра, автор: Leonori

Помогите, пожалуйста, вычислить определённый интеграл

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Ответы

Автор ответа: igundane

$\int\limits^9_4 {\frac{\sqrt{x} }{x-1} } \, dx \\\sqrt{x} =t=>x=t^2=>2\int\limits {\frac{t^2}{t^2-1} } \, dt=2(\int\limits{\frac{1}{t^2-1} } \, dt+\int\limits{1} \, dt )=\\=2(\frac{1}{2}ln(|\frac{t-1}{t+1} |)+t )=ln(|\frac{\sqrt{x} -1}{\sqrt{x}+1 } |)+2\sqrt{x}$

Подставляем

$ln(|\frac{\sqrt{9} -1}{\sqrt{9}+1 } |)+2\sqrt{9}-ln(|\frac{\sqrt{4} -1}{\sqrt{4}+1 } |)-2\sqrt{4}=ln(\frac{1}{2})+6-ln(\frac{1}{3})-4=ln(\frac{3}{2} )+2$

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