dy/dx = ?
y =`x^(2)` + xy

The solution of (dy)/(dx) = 1+ y + y^(2) + x+ xy + xy^(2) is

dy/dx + xy = xy^(2) " when "x=1 , y =4

If the solution of differential equation ( dy )/(dx) =1 + x +y^2 + xy ^2 where Y (0) =0 is Y= tan ( x + ( x^2)/( a)) , then a is _______

The general solution of the DE (dy)/(dx) = ( y^(2)- x ^(2))/( 2xy ) is

If x^(3) dy + xy dx = x^(2) dy + 2y dx , y (2) = e and x gt 1 , then y(4) is equal to .

The solution x^2( dy )/( dx) = x^2 + xy + y^2 is :

The differential equations of all circle touching the x-axis at orgin is (a) (y^(2)-x^(2))=2xy((dy)/(dx)) (b) (x^(2)-y^(2))(dy)/(dx)=2xy ( c ) (x^(2)-y^(2))=2xy((dy)/(dx)) (d) None of these

The solution of the differential equation (dy)/(dx) = (y^(2))/(xy-x^(2)) is

The solution of differential equation (dy)/(dx) (x^(2) y^(3)+xy) = 1 is

If sin (xy) + (x)/(y) =x^(2) - y , " then " (dy)/(dx) is equal to