The curve `y-e^(xy)+x=0` has a vertical tangent at the point :

The curve y=x^(1//5) has at (0, 0) :

The curves x = y^(2) and xy = a^(3) cut orthogonally at a point, then a^(2) =

The point on the curve y=(x-3)^(2) , where the tangent is parallel to the chord joining (3, 0) and (4, 1) is :

The point on the curve y=x^(2) , where slope of the tangent is equal to the x-coordinate of the point is :

The points on the curve y=12x-x^(3) , the tangents at which are parallel to x-axis are :

The point on the curve y^(2) = x where the tangent makes an angle (pi)/(4) with X-axis is

In which of the following cases, the function f(x) has vertical tangent at x = 0 ? f(x)=x^(2//3)

In which of the following cases, the function f(x) has vertical tangent at x = 0 ? f(x)=sqrt(|x|)

If the parametric equation of a curve is given by x = e^(t) cos t, y = e^(t) sin t , then the tangent to the curve at the point t = pi/4 makes with the x-axis of the angle.

Find a point on the curve y=(x-2)^(2) at which the tangent is parallel to the x-axis .