Linear Second Order Differential Equations
This document was uploaded by user and they confirmed that they have the permission to share it. If you are author or own the copyright of this book, please report to us by using this DMCA report form. Report DMCA
Overview
Download & View Linear Second Order Differential Equations as PDF for free.
More details
- Words: 180
- Pages: 2
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
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
Related Documents
Linear Second Order Differential Equations
June 2020 1
Linear Ordinary Differential Equations
October 2019 26