The curve `y=f(x)` in the first quadrant is such that the y - intercept of the tangent drawn at any point P is equal to twice the ordinate of P If `y=f(x)` passes through `Q(2, 3)`, then the equation of the curve is

The slope of a curve at any point is the reciprocal of twice the ordinate at that point and it passes through the point(4,3). The equation of the curve is:

A curve is such that the slope of the tangent to it at any point P is the product of ordinate of P and abscissa increased by 2. If it passes through (-4, e), then its equation is

The slope of the tangent to the curve at any point is reciprocal of twice the ordinate of that point. The curve passes through the point (4, 3) . Determine its equation.

The slope of the tangent to the curve at any point is reciprocal of twice the ordinate of that point. The curve passes through the point (4, 3) . Determine its equation.

The equation of the curve lying in the first quadrant, such that the portion of the x - axis cut - off between the origin and the tangent at any point P is equal to the ordinate of P, is (where, c is an arbitrary constant)

Tangent to a curve intercepts the y-axis at a point P .A line perpendicular to this tangent through P passes through another point (1,0). The differential equation of the curve is

A curve is such that the x - intercept of the tangent drawn to it the point P(x, y) is reciprocal of the abscissa of P. Then, the equation of the curveis (where, c is the constant of integration and x gt 1 )

A curve in the first quadrant is such that the slope of OP is twice the slope of the tangent drawn at P to the curve, where O is the origin and P is any general point on the curve. If the curve passes through (4, 2), then its equation is

A curve y=f(x) passes through point P(1,1) . The normal to the curve at P is a (y-1)+(x-1)=0 . If the slope of the tangent at any point on the curve is proportional to the ordinate of the point, then the equation of the curve is

lf length of tangent at any point on th curve y=f(x) intercepted between the point and the x-axis is of length 1. Find the equation of the curve.