Answer to Question #296626 in Differential Equations for Tobias Felix

Let us determine the general/particular solution of the differential equation

"(1+y^2)dx + (1+x^2)dy = 0 ;" when "x = 0, y = 1."

After dividing both parts by "(1+y^2) (1+x^2)" we get the equation

"\\frac{dx}{1+x^2} + \\frac{dy}{1+y^2} = 0,"

and hence

"\\int\\frac{dx}{1+x^2} + \\int\\frac{dy}{1+y^2} = C."

It follows that the general solution is of the form:

"\\arctan x+\\arctan y=C."

Since when "x = 0, y = 1," we get "\\arctan 0+\\arctan 1=C," and hence "C=\\frac{\\pi}4."

We conclude that the particular solution is the following:

"\\arctan x+\\arctan y=\\frac{\\pi}4."