Learn on PengiAoPS: Introduction to Algebra (AMC 8 & 10)Chapter 4: More Variables

Lesson 4: Fractions

In this Grade 4 lesson from AoPS: Introduction to Algebra (AMC 8 & 10), students learn how to add and subtract algebraic fractions with multiple variables by finding a least common denominator. The lesson covers simplifying fractions through factoring and canceling common factors before combining them. Students practice these skills with variable expressions such as combining fractions with denominators like rs, 6x²y, and 2ab(a-1).

Section 1

Finding the Lowest Common Denominator

Property

The lowest common denominator (LCD) for two or more algebraic fractions is the simplest algebraic expression that is a multiple of each denominator. To find the LCD:

  1. Factor each denominator completely.
  2. For each factor, include the most copies of that factor that appears in any single denominator.
  3. Multiply together the factors of the LCD.

Examples

  • The LCD for 16a2b\frac{1}{6a^2b} and 59ab3\frac{5}{9ab^3} is 18a2b318a^2b^3. We need factors of 232a2b32 \cdot 3^2 \cdot a^2 \cdot b^3.

Section 2

To Add or Subtract Algebraic Fractions

Property

  1. Find the lowest common denominator (LCD).
  2. Build each fraction to an equivalent one with the LCD.
  3. Add or subtract the numerators, and keep the same denominator.
  4. Reduce if necessary.

Examples

Problem: Calculate 4x3+2x+1\frac{4}{x-3} + \frac{2}{x+1}.

Step 1: Find the LCD.
The denominators are prime, so the LCD is (x3)(x+1)(x-3)(x+1).

Book overview

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Chapter 4: More Variables

  1. Lesson 1

    Lesson 1: Evaluating Multi-Variable Expressions

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  2. Lesson 2

    Lesson 2: Still More Arithmetic

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  3. Lesson 3

    Lesson 3: Distribution and Factoring

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  4. Lesson 4Current

    Lesson 4: Fractions

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  5. Lesson 5

    Lesson 5: Equations

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Lesson overview

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Section 1

Finding the Lowest Common Denominator

Property

The lowest common denominator (LCD) for two or more algebraic fractions is the simplest algebraic expression that is a multiple of each denominator. To find the LCD:

  1. Factor each denominator completely.
  2. For each factor, include the most copies of that factor that appears in any single denominator.
  3. Multiply together the factors of the LCD.

Examples

  • The LCD for 16a2b\frac{1}{6a^2b} and 59ab3\frac{5}{9ab^3} is 18a2b318a^2b^3. We need factors of 232a2b32 \cdot 3^2 \cdot a^2 \cdot b^3.

Section 2

To Add or Subtract Algebraic Fractions

Property

  1. Find the lowest common denominator (LCD).
  2. Build each fraction to an equivalent one with the LCD.
  3. Add or subtract the numerators, and keep the same denominator.
  4. Reduce if necessary.

Examples

Problem: Calculate 4x3+2x+1\frac{4}{x-3} + \frac{2}{x+1}.

Step 1: Find the LCD.
The denominators are prime, so the LCD is (x3)(x+1)(x-3)(x+1).

Book overview

Jump across lessons in the current chapter without opening the full course modal.

Continue this chapter

Chapter 4: More Variables

  1. Lesson 1

    Lesson 1: Evaluating Multi-Variable Expressions

    LearnPractice
  2. Lesson 2

    Lesson 2: Still More Arithmetic

    LearnPractice
  3. Lesson 3

    Lesson 3: Distribution and Factoring

    LearnPractice
  4. Lesson 4Current

    Lesson 4: Fractions

    LearnPractice
  5. Lesson 5

    Lesson 5: Equations

    LearnPractice