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Period of Trigonometric Ratios

If α, β, γ, δ...

Question

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

A

2 \sqrt{1 - k}

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B

\frac{1}{2} \sqrt{1 + k}

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C

2 \sqrt{1 + k}

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D

N o n e o f t h e s e

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Solution

The correct option is C $2 \sqrt{1 + k}$
Given $α$ < $β$ < $γ$ < $δ$ and $s i n α = s i n β = s i n γ = s i n δ = k$ . Also $α, β, γ, δ$ are smallest positive angles satisfying above two conditions.
$∴$ We can take $β = π - α, γ = 2 π + α, δ = 3 π - α$
Given expression
$= 4 s i n \frac{α}{2} + 3 s i n (\frac{π}{2} - \frac{α}{2}) + 2 s i n (π + \frac{α}{2}) + s i n (\frac{3 π}{2} - \frac{α}{2}) = 4 s i n \frac{α}{2} + 3 c o s \frac{α}{2} - 2 s i n \frac{α}{2} - c o s \frac{α}{2} = 2 (s i n \frac{α}{2} + c o s \frac{α}{2}) = 2 \sqrt{{(s i n \frac{1}{2} α + c o s \frac{1}{2} α)}^{2}} = 2 \sqrt{1 + s i n α} = 2 \sqrt{1 + k}$

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