The foci of the curve which satisfies the equation `(1+y^(2))dx - xy dy = 0` and passes through the point (1, 0) are

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 curve satisfying the differential equation y(x+y^3)dx=x(y^3-x)dy and passing through the point (1,1) is

Let the curve y = f (x) satisfies the equation (dy)/(dx)=1-1/x^2 and passes through the point (2,7/2) then the value of f(1) is

The equation of the curve satisfying the differential equation y^2 (x^2 + 1) = 2xy passing through the point (0,1) and having slope of tangnet at x = 0 as 3, is (Here y=(dy)/(dx)andy_2=(d^2y)/(dx^2))

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

The equation of the curve satisfying the differential equation Y_2 ( x^2 +1) = 4 xy _1 , passing through the point (0, – 4) and having slope of tangent at x = 0 as 4 is:

In curve which satisfies the differential equation (x^2-y^2)dx+2xy\ dy=0 passes through (1,1) then curve is (a) a circle with centre on x-axis (b) a circle with centre on y-axis (c) a hyperbola with transverse axis as x-axis (d) an ellipse with major axis as y-axis

The equation of the curve whose slope is given by (dy)/(dx)=(2y)/x ; x >0,\ y >0 and which passes through the point (1,1) is

The equation of the curve satisfying the differential equation x^(2)dy=(2-y)dx and passing through P(1, 4) is

y = f(x) which has differential equation y(2xy + e^(x)) dx - e^(x) dy = 0 passing through the point (0,1). Then which of the following is/are true about the function?