AP EAMCET · Maths · Trigonometric Equations
All the pairs \((x, y)\) that satisfy the inequality \(2^{\sqrt{\sin ^2 x-2 \sin x+5}}, \frac{1}{4\sin ^2 y} \leq 1\) also satisfy the equation
- A \(2|\sin x|=\sin y\)
- B \(2 \sin x=\sin y\)
- C \(\sin x=2 \sin y\)
- D \(\sin x=|\sin y|\)
Answer & Solution
Correct Answer
(D) \(\sin x=|\sin y|\)
Step-by-step Solution
Detailed explanation
\(2^{\sqrt{\sin ^2 x-2 \sin x+5}} \cdot 2^{-2 \sin ^2 y} \leq 1\) \(\begin{aligned} & 2^{\sqrt{\sin ^2 x-2 \sin x+5}} \leq 2^{2 \sin ^2 y} \\ & \sqrt{\sin ^2 x-2 \sin x+5} \leq 2 \sin ^2 y \\ & \sqrt{(\sin x-1)^2+4} \leq 2 \sin ^2 y\end{aligned}\)…
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