Distributing & Factoring Basics
TipLearning Objectives
- Use the distributive property to expand expressions.
- Factor common terms from expressions.
- Recognize when distributing vs factoring is most efficient.
Key Ideas
Distributive Property
\[ a(b + c) = ab + ac \]
Examples: - \(4(x + 3) = 4x + 12\)
- \(-2(3y - 5) = -6y + 10\)
Factoring (Reverse Distributing)
Factor out the greatest common factor (GCF):
\[ ab + ac = a(b+c) \]
Examples: - \(6x + 9 = 3(2x + 3)\)
- \(14y - 21 = 7(2y - 3)\)
Factoring simplifies expressions, solves equations, and prepares for advanced algebra.
Worked Examples
Example 1 — Distribute
Expand: \[ -3(2x - 5) \]
\[ -6x + 15 \]
Example 2 — Factor Out the GCF
Factor: \[ 12x - 18 \]
GCF = 6:
\[ 6(2x - 3) \]
Example 3 — Factor Expressions With Variables
Factor: \[ 8x^2 + 4x \]
GCF = \(4x\):
\[ 4x(2x + 1) \]
Common Mistakes
WarningCommon Mistakes
- Forgetting to distribute the negative sign.
- Incorrect GCF factoring (leaving out variables).
- Factoring only part of the expression.
Practice Problems
- Expand: \(5(3x - 4)\)
- Expand: \(-(7y + 2)\)
- Factor: \(15x - 20\)
- Factor: \(9x^2 + 6x\)
- Expand: \(4(2x - 3y + 5)\)
TipStep-by-Step Solutions
1. \(15x - 20\)
2. \(-7y - 2\)
3. \(5(3x - 4)\)
4. \(3x(3x + 2)\)
5. \(8x - 12y + 20\)