(2m+3n)^2-(3m+2n)^2

less than a minute read Jun 16, 2024
(2m+3n)^2-(3m+2n)^2

Factoring the Difference of Squares: (2m + 3n)² - (3m + 2n)²

This problem involves the difference of squares, a common pattern in algebra. Here's how to solve it:

Understanding the Pattern

The difference of squares pattern states that:

a² - b² = (a + b)(a - b)

Applying the Pattern

  1. Identify a and b:

    • In our expression, a = (2m + 3n) and b = (3m + 2n)
  2. Substitute into the pattern:

    • (2m + 3n)² - (3m + 2n)² = [(2m + 3n) + (3m + 2n)][(2m + 3n) - (3m + 2n)]
  3. Simplify:

    • [(2m + 3n) + (3m + 2n)][(2m + 3n) - (3m + 2n)] = (5m + 5n)(-m + n)

Final Answer:

Therefore, (2m + 3n)² - (3m + 2n)² = (5m + 5n)(-m + n)

Important Note: You can further factor out a 5 from the first term to get: 5(m + n)(-m + n)

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