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- AU Maths Extension 1
- Algebraic Fractions

Still Confused?

Try reviewing these fundamentals first

Still Confused?

Try reviewing these fundamentals first

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Get Started Now- Intro Lesson9:49
- Lesson: 1a16:29
- Lesson: 1b7:49
- Lesson: 2a14:50
- Lesson: 2b6:36
- Lesson: 38:37
- Lesson: 418:13
- Lesson: 5a12:10
- Lesson: 5b11:31

Related Concepts: Integration of rational functions by partial fractions

$\bullet$ Partial fraction decomposition expresses a rational function $\frac{f(x)}{g(x)}$, where $f(x)$ and $g(x)$ are polynomials in $x$, as a sum of simpler fractions.

$\bullet$Partial fraction decomposition only applies to proper fractions in which the degree of the numerator is less than that of the denominator.

- IntroductionIntroduction to Partial Fraction Decompositiona)What is partial fraction decomposition?b)When can we perform partial fraction decomposition?
- 1.
**Case 1: Denominator is a product of linear factors with no repeats**Find the partial fractions of:

a)$\frac{x + 7}{(x + 3)(x - 1)}$b)$\frac{4x + 3}{x^{2} + x}$ - 2.
**Case 2: Denominator is a product of linear factors with repeats**Find the partial fractions of :

a)$\frac{3x^{2} - 5}{(x - 2)^{3}}$b)$\frac{2x - 1}{x^{2} + 10x + 25}$ - 3.
**Case 3: Denominator contains irreducible quadratic factors with no repeats**Find the partial fractions of :

$\frac{2x^{2} + 5x + 8}{x^{3} - 8x}$

- 4.
**Case 4: Denominator contains irreducible quadratic factors with repeats**Find the partial fractions of:

$\frac{3x^{4} + x^{3} + 1}{x(x^{2} + 1)^{2}}$

- 5.
**First perform long division, then partial fraction decomposition**Find the partial fractions of:

a)$\frac{x^{3} - 3x^{2} + 4x}{x^{2} - 3x 2}$b)$\frac{2x^{2} + 14x + 24}{x^{2} + 6x - 16}$

14.

Algebraic Fractions

14.1

Simplifying algebraic fractions and restrictions

14.2

Adding and subtracting algebraic fractions

14.3

Multiplying algebraic fractions

14.4

Dividing algebraic fractions

14.5

Solving equations with algebraic fractions

14.6

Applications of equations with algebraic fractions

14.7

Simplifying complex fractions

14.8

Partial fraction decomposition