The term forcing function comes from the applications of Second - Order Equations an explanation of the alternative term nonhomogeneous is given Second Order equation which is not Linear is said to on Linear. A Second Order lineardifferential equation has an analogous Order Linear differential EQUATION:Asecond or-der, Linear differential equationis an equation which can be written in the formy +p(x)y +q(x)y=f(x)(1)wherep, q, andfare continuous functions on some functionspandqare called thecoefficientsof the equation the functionfon the right-hand side is called theforcing functionor thenonhomogeneous term. Example: quiz answers Search Chapter 3 Second Order Linear Differential EquationsĬhapter 3 Second Order Linear Introduction Basic TerminologyRecall that a first Order Linear differential equation is an equation which can be writtenin the formy +p(x)y=q(x)wherepandqare continuous functions on some intervalI.
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