`(x^2+1)dy/dx+2xy=sqrt(x^2+4)` Find its integrating factor.

Consider the D.E (x^2-1)dy/dx+2(x+2)y=2(x+1) Find the integrating factor of the above diffrential equation.

Consider the differential equation dy/dx-3cotxy=sin2x . Find its integrating factors.

Consider the differential equation dy/dx+ytanx=x^2cos^2x . Find its integrating factor.

(x^2+1)dy/dx+2xy=sqrt(x^2+4) Obtain the general solution.

Consider the differential equation xdy/dx+2y=x^2 , x!=0 What is its integrating factor?

Consider the differential equation xdy/dx+y=1/x^2 Find the integrating factor.

Consider (1+y^2)dx=(tan^-1y-x)dy Find the integrating factor.

Express the differential equation (x^2+1)dy/dx+2xy=sqrt(x^2+4) in the form dy/dx+P(x)y=q(x) .

Consider dy/dx=-(2xy)/(x^2+1) Find the general solution of the differential equation.

Consider dy/dx=-(2xy)/(x^2+1) Find the equation of the curve that passes through (1,2) and satisfies the differential equation.