Statement 1 : Any chord of the conic x^2...

Statement 1 : Any chord of the conic `x^2+y^2+x y=1` through (0, 0) is bisected at (0, 0). Statement 2 : The center of a conic is a point through which every chord is bisected.

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Statement 1: Any chord of the conic x^(2)+y^(2)+xy=1 through (0,0) is bisected at (0,0) .Statement 2: The center of a conic is a point through which every chord is bisected.

Statement 1: Any chord of the conic x^(2) +y^(2) +xy = 1 through (0,0) is bisected at ( 0,0 ) Statement 2: The centre of a conic is a point through which every chord is bisected.

Any chord of the conic x^(2)+y^(2)+xy=1 passing through origin is bisected at a point (p, q), then (p+q+12) equals to :

The chord of the circle x^(2)+y^(2)-y^(2)-4x=0 which is bisected at (1,0) is perpendicular to the line

The focus of the conic x ^(2) -6x + 4y +1=0 is

Chord of the circle x ^(2) +y ^(2) = 81 bisected at the point (-2,3) meets the diameter x + 5y =0 at a point

The length of the chord of the of the parabola y^2=x which is bisected at (2,1) is

Statement 1 : Any chord of the conic `x^2+y^2+x y=1` through (0, 0) is bisected at (0, 0). Statement 2 : The center of a conic is a point through which every chord is bisected.

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