The gradient of the curve is given by `(dy)/(dx)=2x-(3)/(x^(2))`.
The curve passes through (1, 2) find its equation.

The slope of the tangent at a point P(x,y) on a curve is -(y+3)/(x+2) . If the curve passes through the origin, find its equation.

The line normal to a given curve at each point (x,y) on the curve passes through the point (2,0). If the curve contains the point (2,3), find its equation.

Find the equations of the normal at a point on the curve x^2=4y , which passes through the point (1,2). Also find the equation of the corresponding tangent.

Find the constant of intergration by the general solution of the differential equation (2x^(2)y-2y^(4))dx+(2x^(3)+3xy^(3))dy=0 if curve passes through (1,1).

The curve satisfying the equation (dy)/(dx)=(y(x+y^3))/(x(y^3-x)) and passing through the point (4,-2) is

A normal is drawn at a point P(x , y) of a curve. It meets the x-axis at Qdot If P Q has constant length k , then show that the differential equation describing such curves is y(dy)/(dx)=+-sqrt(k^2-y^2) . Find the equation of such a curve passing through (0, k)dot

A curve y=f(x) passes through (1,1) and tangent at P(x , y) cuts the x-axis and y-axis at A and B , respectively, such that B P : A P=3, then (a) equation of curve is x y^(prime)-3y=0 (b) normal at (1,1) is x+3y=4 (c) curve passes through 2, 1/8 (d) equation of curve is x y^(prime)+3y=0

For the differential equation xy (dy)/(dx) = (x+2)(y+2) , find the solution curve passing through the point (1, –1).

The asymptotes of a hyperbola are parallel to lines 2x+3y=0 and 3x+2y=0 . The hyperbola has its centre at (1, 2) and it passes through (5, 3). Find its equation.