Though a sole solution is guaranteed, it is not an easy task to perform the computation of effectively, especially when the functions to be expanded contain high-order or ill-conditioned poles. It is also a classic topic studied by many scholars over the time. Partial fraction expansion ( ) has been a powerful tool widely used in the field of calculus, differential equations, control theory, and some other areas of pure or applied mathematics. Various numerical experiments confirm that the proposed methods can achieve quite desirable accuracy even for pfe of rational functions with multiple high-order poles or some tricky ill-conditioned poles. The methods are efficient and very easy to apply for both computer and manual calculation. They do not involve derivatives when tackling proper functions and require no polynomial division when dealing with improper functions. The proposed pfe methods require only simple pure-algebraic operations in the whole computation process. Novel, simple, and recursive formulas for the computation of residues and residual polynomial coefficients are derived. The paper focuses on the pfe of general rational functions in both factorized and expanded form. Partial fraction expansion (pfe) is a classic technique used in many fields of pure or applied mathematics.
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