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Differentiation under Integral Sign

Let fx be a n...

Question

Let $f (x)$ be a non-negative continuous function such that the area bounded by the curve $y = f (x),$ $x$ -axis and the ordinates $x = \frac{π}{4}$ and $x = β > \frac{π}{4}$ is $β sin β + \frac{π}{4} cos β + \sqrt{2} β .$ Then $f^{'} (\frac{π}{2})$ is

A

(\frac{π}{2} - \sqrt{2} - 1)

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B

(\frac{π}{4} + \sqrt{2} - 1)

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C

- \frac{π}{2}

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D

(1 - \frac{π}{4} - \sqrt{2})

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Solution

The correct option is C $- \frac{π}{2}$
$β \int π / 4 f (x) d x = β sin β + \frac{π}{4} cos β + \sqrt{2} β$
Differentiating both sides w.r.t. $β,$ we get
$∴ f (β) = β cos β + sin β - \frac{π}{4} sin β + \sqrt{2}$
$\Rightarrow f^{'} (β) = - β sin β + cos β + cos β - \frac{π}{4} cos β$
$\Rightarrow f^{'} (\frac{π}{2}) = - \frac{π}{2}$

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