A conic C satisfies the differential equation, `(1+y^2)dx - xy dy = 0` and passes through the point `(1,0)`.An ellipse E which is confocal with C having its eccentricity equal to `sqrt(2/3)` . The equation of the ellipse E is

A conic C satisfies the differential equation (1+y^(2))dx-xydy=0 and passes through the point (1, 0) . An ellipse E which is confocal with C having its eccentricity equal to sqrt((2)/(3)) Q. Length of latusrectum of the conic C is

Solve the differential equation y dx + ( x-y"e^(y) ) dy = 0

Latusrectum of the conic satisfying the differential equation xdy+ydx=0 and passing through the point (2, 8) is

Solve the differential equation (dy)/(dx) + 3y = e^(-3x)

Solve the differential equation: (dy)/(dx) = e^(x+y) +x^(2)e^(y)

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

The solution of the differential equation xsqrt(1-y^(2)) dx+y sqrt(1-x^(2)) dy = 0

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