Consider the parabola y^2=12 x Column I...

Consider the parabola `y^2=12 x` Column I, Column II Equation of tangent can be, p. `2x+y-6=0` Equation of normal can be, q. `3x-y+1=0` Equation of chord of contact w.r.t. any point on the directrix can be, r. `x-2y-12=0` Equation of chord which subtends right angle at the vertex can be, s. `2x-y-36=0`

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Consider the parabola y^(2)=12x Column I Column II Equation of tangent can be,p.2x+y-6=0 Equation of normal can be,q .3x-y+1=0 Equation of normal can be, wrt.any point on the directrix can be,r.x-2y-12=0 Equation of chord which subtends right angle at the vertex can be,s.2x-y-36=0

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The focus and directrix of a parabola are (1,2) and 2x-3y+1=0 .Then the equation of the tangent at the vertex is

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the focus and directrix of a parabola are (1 2) and 2x-3y+1=0 .Then the equation of the tangent at the vertex is

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