Which normal to the curve `y=x^(2)` forms the shortest chord?

What normal to the curve y=x^2 forms the shortest chord?

The equation of the normal to the curve y=e^(-2|x|) at the point where the curve cuts the line x = 1//2 is

The equation of the normal to the curve y= e^(-2|x|) at the point where the curve cuts the line x=-(1)/(2), is

The equation of the normal to the curve y=x^(-x) at the point of its maximum is

Find the equation of normal of the curve 2y= 7x - 5x^(2) at those points at which the curve intersects the line x = y.

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

The y-intercept of the line normal to the curve y^2=x^2+33(y gt 0) at the point with abscissa 4 is :

If x + y = k is a normal to the curve y^(2) = 12 x , then k is equal to

The slope of the normal to the curve y=2x^(2)+3 sin x at x = 0 is

Equation of the normal to the curve y=-sqrt(x)+2 at the point (1,1)