Linear Second Order Differential Equations A linear second order differential equations is written as
When d(x) = 0, the equation is called homogeneous, otherwise it is called nonhomogeneous. To a nonhomogeneous equation , we associate the so called associated homogeneous equation
For the study of these equations we consider the explicit ones given by
where p(x) = b(x)/a(x), q(x) = c(x)/a(x) and g(x) = d(x)/a(x). If p(x), q(x) and g(x) are defined and continuous on the interval I, then the IVP , where
and
are arbitrary numbers, has a unique solution defined on I.
Main result: The general solution to the equation (NH) is given by , where (i) is the general solution to the homogeneous associated equation (H); (ii) is a particular solution to the equation (NH). In conclusion, we deduce that in order to solve the nonhomogeneous equation (NH), we need to Step 1: find the general solution to the homogeneous associated equation (H), say Step 2: find a particular solution to the equation (NH), say ;
;
Step 3: write down the general solution to (NH) as