(x-3) X^2-6x+9/x+3

2 min read Jun 17, 2024
(x-3) X^2-6x+9/x+3

Simplifying the Rational Expression (x-3)x^2-6x+9 / (x+3)

This article explores the simplification of the rational expression:

(x-3)x^2-6x+9 / (x+3)

We will simplify this expression by factoring the numerator and denominator, then canceling out common factors.

Factoring the Numerator

The numerator, (x-3)x^2-6x+9, is a quadratic expression. We can factor it using the following steps:

  1. Factor out the common factor (x-3): (x-3) (x^2 - 2x + 3)
  2. Factor the remaining quadratic expression: (x-3) (x-1)(x-3)

Therefore, the factored form of the numerator is (x-3)^2 (x-1).

Factoring the Denominator

The denominator, (x+3), is already in its simplest factored form.

Simplifying the Expression

Now, let's rewrite the original expression with the factored forms:

(x-3)^2 (x-1) / (x+3)

We can cancel out the common factor (x-3) from the numerator and denominator, resulting in:

(x-3)(x-1) / (x+3)

This is the simplified form of the original expression.

Important Considerations:

  • Restrictions: Remember that the original expression is undefined when the denominator is zero. Therefore, x ≠ -3.
  • Domain: The domain of the simplified expression is all real numbers except x = -3.

In conclusion, the simplified form of the expression (x-3)x^2-6x+9 / (x+3) is (x-3)(x-1) / (x+3), with the restriction x ≠ -3.

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