(8+3a)(8−3a)

less than a minute read Jun 16, 2024
(8+3a)(8−3a)

Simplifying the Expression (8+3a)(8−3a)

The expression (8+3a)(8−3a) represents the product of two binomials. We can simplify this expression using the difference of squares pattern.

Understanding the Difference of Squares

The difference of squares pattern states:

(a + b)(a - b) = a² - b²

Applying the Pattern

In our expression, we can identify:

  • a = 8
  • b = 3a

Substituting these values into the pattern, we get:

(8 + 3a)(8 - 3a) = 8² - (3a)²

Simplifying Further

  • 8² = 64
  • (3a)² = 9a²

Therefore, the simplified expression is:

(8 + 3a)(8 - 3a) = 64 - 9a²

Conclusion

By recognizing the difference of squares pattern, we have successfully simplified the expression (8+3a)(8−3a) into 64 - 9a². This simplified form is much easier to work with and can be used for further calculations or analysis.

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