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Question

The center of a rectangular hyperbola lies on the line y=2x. If one of the asymptotes is x+y+c=0, then the other asymptote is

A
xy3c=0
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B
2xy+c=0
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C
xyc=0
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D
none of these
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Solution

The correct option is D none of these
The asymptotes of a rectangular hyperbola are perpendicular to each other.
Given one asymptote
x+y+c=0
Let the other asymptote be
xy+λ=0
We also know that the asymptotes pass through the center of the hyperbola. Therefore, the line 2xy=0 and the asymptotes must be concurrent.
Thus, we have
∣ ∣21011c11λ∣ ∣=0
or λ=c3

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