Let x - f-tcos t -f-t sin t and y - - f-t sin t -f-t cos t- then - dxdt 2 - dydt 2-1-2 dt equals

Dxdt = f”'(t)cos t f”(t) sin t + f”(t) sin t + f'(t)cos t dxdt=[f”'(t) + f'(t)] cos t dydt = f”'(t)sin t f”(t)cos t + f”(t)cos t f'(t)sin t dydt= [f”' ...

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Standard XIII

Mathematics

Integration as Antiderivative

Let x = f”tco...

Question

Let $x = f^{''} (t) cos t + f^{'} (t) sin t$ and $y = - f^{''} (t) sin t + f^{'} (t) cos t$ , then $\int {[{(\frac{d x}{d t})}^{2} + {(\frac{d y}{d t})}^{2}]}^{1 / 2} d t$ equals

f^{'} (t) + f^{''} (t) + c

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f^{''} (t) + f^{'''} (t) + c

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f (t) + f^{''} (t) + c

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f^{'} (t) - f^{''} (t) + c

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Solution

The correct option is C $f (t) + f^{''} (t) + c$
$\frac{d x}{d t} = f^{'''} (t) cos t - f^{''} (t) sin t + f^{''} (t) sin t + f^{'} (t) cos t$
$\frac{d x}{d t} = [f^{'''} (t) + f^{'} (t)] cos t$

$\frac{d y}{d t} = - f^{'''} (t) sin t - f^{''} (t) cos t + f^{''} (t) cos t - f^{'} (t) sin t$
$\frac{d y}{d t} = - [f^{'''} (t) + f^{'} (t)] sin t$

$∴ {[\begin{matrix} {(\frac{d x}{d t})}^{2} + {(\frac{d y}{d t})}^{2} \end{matrix}]}^{1 / 2}$
$= [(f^{'''} (t) + f^{'} (t))^{2} ({cos}^{2} t + {sin}^{2} t)]^{1 / 2}$
$= f^{'''} (t) + f^{'} (t)$
$∴ \int {[\begin{matrix} {(\frac{d x}{d t})}^{2} + {(\frac{d y}{d t})}^{2} \end{matrix}]}^{1 / 2} d t = f^{''} (t) + f (t) + c$

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