(a%2Bb)(a-3b).jpeg "(a-b)(a+b)(a-3b)")
Expanding the Expression (a-b)(a+b)(a-3b)
This article will guide you through expanding the given expression: (a-b)(a+b)(a-3b). This involves using the distributive property and recognizing the special product patterns.
Understanding the Special Product Patterns
Before we start, let's recall two important special product patterns:
- Difference of Squares: (x + y)(x - y) = x² - y²
- Square of a Binomial: (x + y)² = x² + 2xy + y²
Expanding the Expression
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Focus on the First Two Factors:
- Notice that (a-b)(a+b) is in the form of the difference of squares.
- Applying the pattern, we get: (a-b)(a+b) = a² - b²
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Multiply the Result with the Third Factor:
- Now, we have (a² - b²)(a-3b)
- Use the distributive property to expand:
- a² * (a-3b) - b² * (a-3b)
- a³ - 3a²b - ab² + 3b³
Final Result
The fully expanded form of the expression (a-b)(a+b)(a-3b) is a³ - 3a²b - ab² + 3b³.
Key Points
- Recognizing and applying special product patterns can significantly simplify the expansion process.
- The distributive property is essential for multiplying polynomials.
- Practice with different examples to become comfortable with these concepts.