Textbook Question
Find the partial fraction decomposition for each rational expression. See Examples 1–4. (4x^2 - x - 15)/(x(x + 1)(x - 1))
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7. Systems of Equations & Matrices
Introduction to Matrices
9:21 minutesProblem 23
Textbook Question
Find the partial fraction decomposition for each rational expression. See Examples 1–4. (-3)/(x2(x2 + 5))
Verified step by step guidance1
Identify the denominator and factor it completely. The denominator is \(x^2(x^2 + 5)\), which consists of a repeated linear factor \(x^2\) and an irreducible quadratic factor \(x^2 + 5\).
Set up the form of the partial fraction decomposition. For the repeated linear factor \(x^2\), include terms with powers 1 and 2 in the denominator: \(\frac{A}{x} + \frac{B}{x^2}\). For the irreducible quadratic \(x^2 + 5\), include a linear numerator: \(\frac{Cx + D}{x^2 + 5}\).
Write the equation expressing the original fraction as the sum of the partial fractions:
\(\frac{-3}{x^2(x^2 + 5)} = \frac{A}{x} + \frac{B}{x^2} + \frac{Cx + D}{x^2 + 5}\).
Multiply both sides of the equation by the common denominator \(x^2(x^2 + 5)\) to clear the denominators, resulting in a polynomial equation:
\(-3 = A x (x^2 + 5) + B (x^2 + 5) + (Cx + D) x^2\).
Expand the right side, collect like terms by powers of \(x\), and then equate the coefficients of corresponding powers of \(x\) on both sides to form a system of equations. Solve this system to find the values of \(A\), \(B\), \(C\), and \(D\).
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Partial Fraction Decomposition
Partial fraction decomposition is a method used to express a complex rational expression as a sum of simpler fractions. This technique is especially useful for integrating rational functions or solving algebraic equations. The goal is to break down the given fraction into components with simpler denominators.
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Factoring the Denominator
To perform partial fraction decomposition, the denominator must be factored into irreducible polynomials. In this problem, the denominator is x²(x² + 5), which includes a repeated linear factor (x²) and an irreducible quadratic factor (x² + 5). Recognizing these factors guides the form of the decomposition.
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Form of Partial Fractions for Repeated and Quadratic Factors
For repeated linear factors like x², the decomposition includes terms with denominators x and x². For irreducible quadratic factors like x² + 5, the numerator is a linear expression (Ax + B). Understanding these forms helps set up the correct equation to solve for unknown coefficients.
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