The solution of differential equation
`(1+y^(2))+(x-e^(tan^(-1)y))(dy)/(dx)=0`, is

The solution of the differential equation : (1+y^2)+(x-e^(tan^(-1)y))(dy)/(dx)=0 is :

The solution of differential equation (1+y^(2))+((x-2e^(tan^(-1)y))dy)/(dx)=0 is (x-2)=ke^(tan^(-1)y)xe^(tan-1)y=e^(2)tan^(-4)y+kxe^(tan^(-1)y)=tan^(-1)y+kxe^(2tan^(-1)y)=e^(2tan^(-1)y)+k

The solution of the differential equation (1+y^2)+(x-e^(tan^-1 y))(dy)/(dx)=0 , is

The solution of differential equation (1+y^2)+((x-2e^tan^((-1)y))dy)/(dx)=0 is (x-2)=k e^tan^((-1)y) x e^t a n-1y=e^2tan^((-4)y)+k x e^tan^((-1)y)=tan^(-1)y+k x e^2tan^((-1)y)=e^2tan^((-1)y)+k

The solution of the differential equation (1 + y^(2)) + (x- e^(Tan^(-1)y)) (dy)/(dx) = 0 is

The solution of the differential equation (1+y^2)+(x-e^(tan^-1y))dy/dx=0 is (A) x e^(2 tan^-1y)=e^(tan^-1y)+k (B) (x-2)=k e^(-tan^-1y) (C) 2 x e^(tan^-1y)=e^(2 tan^-1y)+k (D) x e^(tan^-1y)=tan^-1y+k