Find the angle at which the curve `y=K e^(K x)` intersects the y-axis.

Let f(x) be a real valued continuous function on R defined as f(x)=x^2e^(-|x|) The value of k for which the curve y=k x^2(k >0) intersect the curve y=e^(|x|) at exactly two points, is e^2 (b) (e^2)/2 (c) (e^2)/4\ (d) (e^2)/8

Find the angle at which the parabolas y^2=4x and x^2=32 y intersect.

Find the angle at which the parabolas y^2=4x and x^2=32 y intersect.

Find the area bounded by the curve y=e^(-x) the X-axis and the Y-axis.

Find the angle between the curves y^(2)=4xand y=e^(-x//2).

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 line which intersects the y-axis at a distance of 2 units above the origin and makes an angle of 30^0 with the positive direction of the x-axis.

Find the equation of the line which intersects the y-axis at a distance of 2 units above the origin and makes an angle of 30^0 with the positive direction of the x-axis.

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

Find the angle between the curve y=lnx and y=(lnx)^(2) at their point of intersections.