All the pairs (x,y) that satisfy the inequality 2√sin2x−2sinx+5⋅14sin2y≤1 also satisfy the equation :
A
sinx=2siny
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B
2sinx=siny
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C
sinx=|siny|
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D
2|sinx|=3siny
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Solution
The correct option is Csinx=|siny| 2√sin2x−2sinx+5⋅14sin2y≤1 ⇒2√sin2x−2sinx+5≤22sin2y⇒√sin2x−2sinx+5≤2sin2y⋯(1)
√sin2x−2sinx+5=√(sinx−1)2+4⇒√(sinx−1)2+4∈[2,2√2]
But 2sin2y∈[0,2]
Equation (1) holds true only when √sin2x−2sinx+5=2sin2y=2 ⇒(sinx−1)2+4=4⇒sinx=1
and 2sin2y=2⇒|siny|=1 ⇒sinx=|siny|