A curve has the property that area of triangle formed by the x-axis, the tangent to the curve and radius vector of the point of tangency is `k^(2)`. The equation of all such curves passing through (0, 1) is ln (ay) `= (xy^(b))/(2k^(2))` then

Find the curve for which area of triangle formed by x-axis,tangent drawn at any point on the curve and radius vector of point of tangency is constant,equal to a^(2)

The area of the traingle formed by the coordinate axes and a tangent to the curve xy=a^2 at the point (x_1,y_1) is

The area of a triangle formed by a tangent to the curve 2xy =a^(2) and the coordinate axes, is

If the slope of tangent to the curve at every point on it is (-2xy)/(x^(2)+1) , then the equation of curve passing throgh the point (1,2) is

The slope of the tangent to the curve at any point is equal to y + 2x. Find the equation of the curve passing through the origin .

The area of the triangle formed by the tangent to the curve xy=a^(2) at any point on the curve with the coordinate axis is

If slope of the tangent at the point (x, y) on the curve is (y-1)/(x^(2)+x) , then the equation of the curve passing through M(1, 0) is :

A curve in the first quadrant is such that the area of the triangle formed in the first quadrant bythe X-axis,a tangent to the curve at any of its point P and radius vector of the point P is 2 sq .units.If the curve passes through (2,1), find the equation of the curve.

Find the area bounded by x - axis, the curve y = 2x^(2) and tangent to the curve at the point whose abscissa is 2.