Linear Ordinary Differential Equations with Constant Coefficients: Identification of Boole's Integral with that of Cauchy
Keyword(s):
We consider an equation with constant coefficientswhere a≠0 and f(x) is continuous in a suitable interval. Suppose that the symbolic polynomial P(D) has been fully decomposed into its (real or complex) linear factors, so that the equation may be writtenwhere b1, …, bq are distinct, and m1+…+mq = n. The Complementary Function being now known, we may write down a particular integral of (1) by Cauchy's method.
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