Pagano's high power partial fraction decomposition theorem
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The problem of fraction decomposition it's easy to solve by using the cover up method, when there are no repeated linear factors in the denominator .
Nevertheless it could turn into a hard work if these factors are raised to a high power, where the cover up method doesn't work . This technique shows how to calculate these coefficients without solving large systems of equations with a clever rearrangement of the numerator.
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APA
Pagano, F. (2026). Pagano's high power partial fraction decomposition theorem. Afribary. Retrieved June 14, 2026, from http://library.afribary.com/works/paganos-high-power-partial-fraction-decomposition-theorem
MLA
Pagano, Federico. "Pagano's high power partial fraction decomposition theorem." Afribary, 7 Jun. 2026, http://library.afribary.com/works/paganos-high-power-partial-fraction-decomposition-theorem. Accessed June 14, 2026.
Chicago
Pagano, Federico. "Pagano's high power partial fraction decomposition theorem." Afribary (2026). Accessed June 14, 2026. http://library.afribary.com/works/paganos-high-power-partial-fraction-decomposition-theorem