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

Prove that the curve y=e^(|x|) cannot have a unique tangent line at the point x = 0. Find the angle between the one-sided tangents to the curve at the point x = 0.

The curve given by x+y=e^(xy) has a tangent parallel to the y-axis at the point

The curve given by x+y=e^(xy) has a tangent parallel to the y-axis at the point (0,1)(b)(1,0)(1,1) (d) none of these

The curve f(x)=x at the point with x = 0 , has 1) vertical tangent 2) horizontal tangent 3) no vertical tangent 4) none of these

Consider the curve y=e^(2x) What is the slope of the tangent to the curve at (0,1)

The curve given by x + y = e^(xy) has a tangent parallel to the y-axis at the point

The equation of the tangent to the curve y=1-e^(x//2) at the tangent to the curve y=1-e^(x//2) at the point of intersection with the y-axis, is

Find the point on the curve y=x^3-11 x+5 at which the tangent has the equation y=x-11