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Partial fraction decomposition breaks a complex rational expression into simpler fractions. It is essential for integration in calculus and for solving differential equations using Laplace transforms.

Formel

Express rational function as sum of simpler fractions: P(x)/Q(x) = A/(x−a) + B/(x−b) + ...

P(x): numerator polynomial
Q(x): denominator polynomial
A, B, ...: coefficients of partial fractions

Trin-for-trin guide

1For (ax+b)/((x+p)(x+q)): write as A/(x+p) + B/(x+q)
2Multiply both sides by denominator
3Equate coefficients or substitute values
4Solve for A and B

Løste eksempler

Input

(3x+5)/((x+1)(x+2))

Resultat

A/(x+1) + B/(x+2); A=2, B=1

Input

1/(x²−1)

Resultat

1/((x−1)(x+1)) = ½/(x−1) − ½/(x+1)

Ofte stillede spørgsmål

When is partial fractions useful?

Integration: ∫ P(x)/Q(x) dx becomes simpler. System solving and signal processing.

What if the numerator has degree ≥ denominator?

Use polynomial long division first. Then apply partial fractions to the remainder.

How do I handle repeated roots?

For root r repeated k times: include A/(x−r) + B/(x−r)² + ... + Z/(x−r)ᵏ.

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