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Question

The equation of the common tangent to x2=6y and 2x24y2=9 can be

A
x+y=1
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B
xy=1
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C
x+y=92
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D
xy=32
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Solution

The correct option is D xy=32
Let y=mx+c be the equation of the common tangent
Solving this with parabola x2=6y, we get
x2=6(mx+c)x26mx6c=0
From condition of tangency, we get
D=036m2+24c=0c=32m2(i)
Equation tangent becomes
y=mx32m22y=2mx3m2
This is also a tangent to 2x24y2=9, so
2x2(2mx3m2)2=9(24m2)x2+12m3x9m49=0
From condition of tangency, we get
D=0144m672(m4+1)(2m21)=02m6(2m6m4+2m21)=0m42m2+1=0(m21)2=0m=±1

Hence, the required equation of tangents are
xy=32 and x+y=32

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