The asymptotes of the hyperbola x y=h x+...

The asymptotes of the hyperbola `x y=h x+k y` are `x-k=0` and `y-h=0` `x+h=0` and `y+k=0` `x-k=0` and `y+h=0` `x+k=0` and `y-h=0`

A

x - k = 0 and y - h = 0

B

x + h = 0 and y + k = 0

C

x - k = 0 and y + h = 0

D

x + k = 0 and y - h = 0

Text Solution

Verified by Experts

The correct Answer is:

A

The given hyperbola is
`xy-hx-ky=0" (1)"`
The equation of asymptotes is given by
`xy-hx-ky+c=0" (2)"`
Equation (2) gives a pair of straight lines. So,
`|(A,H,G),(H,B,F),(G,F,C)|=0`
`or|(0,1//2,-h//2),(1//2,0,-k//2),(-h//2,-k//2,c)|=0`
`"or "(hk)/(8)+(hk)/(8)-(c)/(4)=0`
`"or "c=hk`
Hence, the asymptotes are
`xy-hx-ky+hk=0`
`"or "(x-k)(y-h)=0`

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