44. \( \begin{array}{l} \int \frac{\sqrt{x-2}}{x+1} d x \\ u=\sqrt{x-2}\end{array} \)
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Since \( u = \sqrt{x-2} \), squaring both sides gives us \( u^2 = x - 2 \). Therefore, \( x = u^2 + 2 \). Show more…
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