(5x+3)(5x-3) Answer

less than a minute read Jun 16, 2024
(5x+3)(5x-3) Answer

Expanding (5x + 3)(5x - 3)

This expression is a classic example of the difference of squares pattern. Here's how to expand it:

Understanding the Difference of Squares

The difference of squares pattern states:

(a + b)(a - b) = a² - b²

This pattern arises because when you multiply the terms, the middle terms cancel each other out:

  • a * a = a²
  • a * -b = -ab
  • b * a = ab
  • b * -b = -b²

The -ab and ab terms cancel, leaving only a² - b².

Applying the Pattern

In our expression (5x + 3)(5x - 3):

  • a = 5x
  • b = 3

Applying the difference of squares pattern, we get:

(5x + 3)(5x - 3) = (5x)² - (3)²

Simplifying the Expression

Now, we simplify by squaring the terms:

(5x)² - (3)² = 25x² - 9

Conclusion

Therefore, the expanded form of (5x + 3)(5x - 3) is 25x² - 9. This demonstrates how recognizing patterns in algebra can simplify complex expressions.

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