Three normals to `y^2=4x` pass through the point (15, 12). Show that one of the normals is given by `y=x-3` and find the equation of the other.

The number of normals to the curve 3y ^(3) =4x which passes through the point (0,1) is

If equation of the curve is y^2=4x then find the slope of normal to the curve

In parabola y^2=4x, From the point (15,12), three normals are drawn then centroid of triangle formed by three Co normal points is

Find the equation of the normal to curve x^2=4y which passes through the point (1, 2).

Find the equation of the normal to curve x^2=4y which passes through the point (1, 2).

Equation of normal to y^(2) = 4x at the point whose ordinate is 4 is

Find the equation of the normal to y=2x^3-x^2+3 at (1,4).

Find the equation of the normal to y=2x^3-x^2+3 at (1,\ 4) .

Three normals are drawn from the point (a,0) to the parabola y^2=x . One normal is the X-axis . If other two normals are perpendicular to each other , then the value of 4a is

The radius of the circle passing through (6,2) and the equation of two normals for the circle are x+y=6 and x+2y=4 is