Transforming to parallel axes through a ...

Transforming to parallel axes through a point (p, q). The equation
`2x^(2)+3xy+4y^(2)+x+18y+25=0` becomes `2x^(2)+3xy+4y^(2)=1`. Then

A

`p=-2,q=3`

B

`p=2,q=-3`

C

`p=3,q=-4`

D

`p=-4,q=3`

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Knowledge Check

If the axes are transferred to parallel axes through the point (1,-2), then the equation y^(2) -4x +4y+8=0 becomes -

A

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

B

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

C

`y^(2) =4 (x+2)`

D

`y^(2) =4x`

The point of intersection of the straight lines given by the equation 3y^2 - 8xy - 3x^2 - 29x - 3y + 18 = 0 is :

A

`(1, 1/2)`

B

`(1, -1/2)`

C

`(-3/2, 5/2)`

D

`(-3/2, -5/2)`

If the origin is transferred to the point (-3,2) keeping the axes parallel, then the equation 2x-3y+6=0 becomes-

A

`2x' +3y' =6`

B

`2x' +3y' +6=0`

C

`3x' -2y'=6`

D

`2x' -3y' =6`

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