Normals of parabola

Line and parabola || Length OF chord || Tangent to parabola || Director circle || Normals to parabola

Tangents and Normals of a parabola

Number of distinct normals of a parabola passing through the focus of the parabola is

Locus of Point of intersection of two normal of parabola which are at right angle to one other

Statement 1: The line x-y-5=0 cannot be normal to the parabola (5x-15)^(2)+(5y+10)^(2)=(3x-4y+2)^(2) Statement 2: Normal to parabola never passes through its focus.

Normal to Parabola and Co-Normal Points

find the equation of normal to parabola x^(2)=4 by

The normal to parabola y^(2) =4ax from the point (5a, -2a) are

A normal to parabola, whose inclination is 30^(@) , cuts it again at an angle of