If $α, β, γ, ẟ$ are the smallest positive angles in ascending order of magnitude which have their sines equal to the positive quantity $k$ , then the value of $4 \sin \frac{α}{2} + 3 \sin \frac{β}{2} + 2 \sin \frac{γ}{2} + \sin \frac{ẟ}{2}$ is equal to

$2 \sqrt (1 - k)$

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$\frac{1}{2} \sqrt (1 + k)$

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$2 \sqrt (1 + k)$

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None of these

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Solution

The correct option is C
$2 \sqrt (1 + k)$

Explanation for the correct option:
Step 1. Find the value of $4 \sin \frac{α}{2} + 3 \sin \frac{β}{2} + 2 \sin \frac{γ}{2} + \sin \frac{ẟ}{2}$ :
Given, $α < β < γ < δ$ and $(\sin α = \sin β = \sin γ = \sin δ) = k$
Now,
$\sin α = \sin β$
$\Rightarrow$ $\sin (π - α) = \sin β$
$\Rightarrow$ $π - α = β$ ….(i)
$\sin α = \sin γ$
$\Rightarrow$ $\sin (2 π + α) = γ$
$\Rightarrow$ $2 π + α = γ$ ….(ii)
$\sin α = \sin δ$
$\Rightarrow$ $\sin (3 π - α) = δ$
$\Rightarrow$ $3 π - α = δ$ ….(iii)
Step 2. Put the values of $α, β, γ, ẟ$ in given expression, we get
$4 \sin \frac{α}{2} + 3 \sin \frac{β}{2} + 2 \sin \frac{γ}{2} + \sin \frac{ẟ}{2} = 4 \sin \frac{α}{2} + 3 \sin \frac{(- α)}{2} + 2 \sin \frac{(2 + α)}{2} + \sin \frac{(3 - α)}{2}$
$= 4 \sin \frac{α}{2} + 3 \cos \frac{α}{2} - 2 \sin \frac{α}{2} - \cos \frac{α}{2}$
$= 2 [\sin \frac{α}{2} + \cos \frac{α}{2}]$
$= 2 [\sqrt{{(\sin \frac{α}{2} + \cos \frac{α}{2})}^{2}}]$
$= 2 \sqrt{[\sin^{2} (\frac{α}{2}) + \cos^{2} (\frac{α}{2}) + 2 \sin \frac{α}{2} \cos \frac{α}{2}]}$
$= 2 \sqrt{(1 + \sin α)}$ $[∵ s i n 2 A = 2 s i n A c o s A, s i n^{2} A + c o s^{2} A = 1]$
$∴ 4 s i n \frac{α}{2} + 3 s i n \frac{β}{2} + 2 s i n \frac{γ}{2} + s i n \frac{ẟ}{2} = 2 \sqrt (1 + k)$
Hence, Option ‘C’ is Correct.

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