Practice rewriting rational expressions with partial fractions and using the results to find antiderivatives and definite integrals.
Read each problem carefully. Factor denominators when needed, set up a partial fraction decomposition, and show enough work to justify your answer.
Decompose rational functions and use them to evaluate integrals
Math - Grade 9-12
- 1
Decompose the rational expression into partial fractions: 5/(x(x + 2)).
- 2
Use partial fractions to evaluate the indefinite integral: integral of 5/(x(x + 2)) dx.
- 3
Decompose the rational expression into partial fractions: (3x + 7)/((x - 1)(x + 4)).
- 4
Evaluate the indefinite integral: integral of (3x + 7)/((x - 1)(x + 4)) dx.
- 5
Decompose the rational expression into partial fractions: (2x + 1)/(x^2 - 9).
- 6
Evaluate the indefinite integral: integral of (2x + 1)/(x^2 - 9) dx.
- 7
Decompose the rational expression into partial fractions: (x + 5)/(x^2 + 5x + 6).
- 8
Evaluate the indefinite integral: integral of (x + 5)/(x^2 + 5x + 6) dx.
- 9
Decompose the rational expression with a repeated factor: (4x + 1)/(x(x + 1)^2).
- 10
Evaluate the indefinite integral: integral of (4x + 1)/(x(x + 1)^2) dx.
- 11
Evaluate the definite integral from x = 2 to x = 4 of 6/(x^2 - 1) dx.
- 12
The rational function (x^2 + 3x + 1)/(x + 1) is improper because the numerator has degree 2 and the denominator has degree 1. Rewrite it using polynomial division, then integrate.