If the normals from any point to the par...

If the normals from any point to the parabola `x^2=4y` cuts the line y=2 in points whose abscissae are in A.P., then the slopes of the tangents at the 3 conormal points are in (a) AP (b) GP (c) HP (d) none of these

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If the normals any point to the parabola x^(2)=4y cuts the line y = 2 in points whose abscissa are in A.P., them the slopes of the tangents at the 3 conormal points are in

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If the normals from any point to the parabola y^2=4x cut the line x=2 at points whose ordinates are in AP, then prove that the slopes of tangents at the co-normal points are in GP.

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If the normals from any point to the parabola `x^2=4y` cuts the line y=2 in points whose abscissae are in A.P., then the slopes of the tangents at the 3 conormal points are in (a) AP (b) GP (c) HP (d) none of these

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