If a curve `y=f(x)` satisfy the differential equation `2x^2dy=(2xy+y^2)dx` and passes `(1,2)` the find `f(1/2)`

A curve y=f(x) satisfy the differential equation (1+x^(2))(dy)/(dx)+2yx=4x^(2) and passes through the origin. The function y=f(x)

A curve y=f(x) satisfy the differential equation (1+x^(2))(dy)/(dx)+2yx=4x^(2) and passes through the origin. The area enclosed by y=f^(-1)(x), the x-axis and the ordinate at x=2//3 is

If the curve satisfies the differential equation x.(dy)/(dx)=x^(2)+y-2 and passes through (1, 1), then is also passes through the point

let y(x) satisfying the differential equation x(dy)/(dx)+2y=x^(2) given y(1)=1 then y(x)=

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

If y=f (x) satisfy the differential equation (dy)/(dx) + y/x =x ^(2),f (1)=1, then value of f (3) equals:

The curve satisfying the differential equation (dx)/(dy) = (x + 2yx^2)/(y-2x^3) and passing through (1, 0) is given by

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

Let a curve satisfying the differential equation y^(2)dx=(x-(1)/(y))dy=0 which passes through (1,1) if the curve also passes through (k,2) then value of k is