(a^2-28)/(a-5)

2 min read Jun 16, 2024
(a^2-28)/(a-5)

Simplifying the Expression (a^2 - 28)/(a - 5)

The expression (a^2 - 28)/(a - 5) represents a rational expression, which is a fraction where the numerator and denominator are polynomials. To simplify this expression, we can follow these steps:

1. Factor the numerator:

The numerator, a^2 - 28, is a difference of squares. We can factor it as: (a + √28)(a - √28)

2. Simplify the expression:

Now we can rewrite the original expression as: (a + √28)(a - √28) / (a - 5)

3. Identify any restrictions:

The expression is undefined when the denominator equals zero. Therefore, a ≠ 5.

Final Simplified Expression:

The simplified expression is: (a + √28)(a - √28) / (a - 5), where a ≠ 5

Note:

  • We can further simplify the expression by substituting √28 = 2√7.
  • This simplified form allows us to easily identify the values of 'a' for which the expression is defined and undefined.
  • The simplified expression can be used for various mathematical operations, such as solving equations, finding the domain and range, or analyzing the behavior of the expression.

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