Let C be the curve `y^(3) - 3xy + 2 =0`. If H is the set of points on the curve C, where the tangent is horizontal and V is the set of points on the curve C, where the tangent is vertical, then H = … and V = … .

Consider the curve represented parametrically by the equation x=t^(3)-4t^(2)-3t and y=2t^(2)+3t-5 where t in R. If H denotes the number of point on the curve where the tangent is horizontal and V the number of point where the tangent is vertical then

Consider the curve represented parametrically by the equation x = t^3-4t^2-3t and y = 2t^2 + 3t-5 where t in R .If H denotes the number of point on the curve where the tangent is horizontal and V the number of point where the tangent is vertical then

The point(s) on the curve y^(3)+3x^(2)=12y , where the tangent is vertical, is (are) :

The point on the curve y^(3)+3x^(2)=12y where the tangent is vertical is ………..

The point (s) on the curve y^3+3x^2=12y where line tangent is vertical , is (are)

Find the points on the curve x^2=4y , where the tangents from (4,0) meet the curve.

The number of point(s) on the curve y^(3)=12y-3x^(2) where a tangents is vertical is/are