The equation of the transvers and conjug...

The equation of the transvers and conjugate axes of a hyperbola are, respectively, `x+2y-3=0` and `2x-y+4=0` , and their respective lengths are `sqrt(2)` and `2sqrt(3).` The equation of the hyperbola is

`(2)/(5)(x+2y-3)^(2)-(3)/(5)(2x-y+4)^(2)=1`

`(2)/(5)(2x-y+4)^(2)-(3)/(5)(x+2y-3)^(2)=1`

`2(2x-y+4)^(2)-3(x+2y-3)^(2)=1`

`2(x+2y-3)^(2)-3(2x-y+4)^(2)=1`

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The correct Answer is:

The equation of the hyperbola is
`({(2x-y+4)//sqrt5}^(2))/(1//2)-({(x+2y-3)//sqrt5}^(2))/(1//3)=1`
`"or "(2)/(5)(2x-y+4)^(2)-(3)/(5)(x+2y-3)^(2)=1`

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