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

Draw the curve y=e^(x)

Number of positive integral value(s) of a for which the curve y=a^(x) intersects the line y=x is:

Find the equation of the tangent to the curve y = x^2 - x + 2 where it crosses the y-axis.

Find the length of sub-tangent to the curve y=e^(x//a)

A line is drawn from a point P(x, y) on the curve y = f(x), making an angle with the x-axis which is supplementary to the one made by the tangent to the curve at P(x, y). The line meets the x-axis at A. Another line perpendicular to it drawn from P(x, y) meeting the y-axis at B. If OA = OB, where O is the origin, the equation of all curves which pass through ( 1, 1) is

Statement I The curve y=81^(sin^(2)x)+81^(cos^(2)x)-30 intersects X-axis at eight points in the region -pi le x le pi . Statement II The curve y=sinx or y=cos x intersects the X-axis at infinitely many points.

Find the area of the region bounded by the curve ay^2=x^3 , the y-axis and the lines y=a and y=2a.

In the following , find the equation of the line which satisfy the given conditions: Intersecting the y-axis at a distance of 2 units above the origin and making an angle of 30^@ with positive direction of the x-axis.

Show that the line x/a + y/b = 1 touches the curve y = be^(x//a) at the point where the curve intersect the axis of y.