A curve `C` has the property that if the tangent drawn at any point `P` on `C` meets the co-ordinate axis at `A` and `B` , then `P` is the mid-point of `A Bdot` The curve passes through the point (1,1). Determine the equation of the curve.

Find the equation of the normal to the curve x^(2)=4y which passes through the point (1, 2).

Find the equation of a curve passing through the point (0,0) and whose differential equation is y' = e^(x) sin x .

Find the equation of the curve passing through the point (1,1) whose differential equation is x dy = (2x^(2) + 1) dx(x ne 0) .

The tangent to the curve y=e^(2x) at the point (0, 1) meets X-axis at :

Find the slope of the tangent to curve y=x^(3)-x+1 at the point whose x- coordinate is 2.

The Curve possessing the property text the intercept made by the tangent at any point of the curve on the y-axis is equal to square of the abscissa of the point of tangency, is given by

Let y=f(x)be curve passing through (1,sqrt3) such that tangent at any point P on the curve lying in the first quadrant has positive slope and the tangent and the normal at the point P cut the x-axis at A and B respectively so that the mid-point of AB is origin. Find the differential equation of the curve and hence determine f(x).

The x-intercept of the tangent to a curve is equal to the ordinate of the point of contact. The equation of the curve through the point (1,1) is

A tangent to the curve y = log _(e) x at point P is passing through the point (0,0) then the co-ordinates of point P are . . . .