If x=3secθ−2 and y=3tanθ+2, then which of the following equation in x,y is correct?
A
x2−y2+4x+4y=9
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B
x2+y2−2x+4y=0
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C
x2−y2−4x+4y=0
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D
x2+y2+2x−4y=9
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Solution
The correct option is Ax2−y2+4x+4y=9 Given: x=3secθ−2,y=3tanθ+2 ⇒secθ=x+23,tanθ=y−23
Using trigonometric identity, sec2θ−tan2θ=1 ⇒(x+23)2−(y−23)2=1⇒x2+4x+4−y2+4y−4=9 ⇒x2−y2+4x+4y=9