Let `y=e^(x^(2))" and "y=e^(x^(2))sinx` be two given curves. Then the angle between the tangents to the curves at any point of their intersection is-

Let y=e^(x^2) and y=e^(x^2) sin x be two given curves . Then the angle between the tangents to the curves at any point of their intersection is

Let y=e^(x^2) and y=e^(x^2) sin x be two given curves . Then the angle between the tangents to the curves at any point of their intersection is a) 0 b) pi c) pi/2 d) pi/4

Let y=e^(x^2) and y=e^(x^2) sinx be two given curves. Then the angle between the tangents to the curves any point of their intersectons is

The angle between the tangents to the curves y=sin x and y = cos x at their point of intersection is

Write the angle between the curves y=e^(-x) and y=e^x at their point of intersection.

Write the angle between the curves y=e^(-x) and y=e^x at their point of intersection.

The angle between the curves y^2 = 16x and 2x^2 + y^2 = 18 at their point of intersection is

The minimum distance between a point on the curve y = e^x and a point on the curve y=log_e x is