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6. \( x^{2}-a^{2}+x-a^{2} x \)

Ask by Bernard Conner. in Mexico
Mar 13,2025

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La expresión \( x^{2} - a^{2} + x - a^{2}x \) se puede factorizar como \( (x - a^{2})(x + 1) \).

Solución

1. Primero, reescribimos la expresión agrupándola de manera conveniente: \[ x^{2}-a^{2}+x-a^{2}x = x^{2} - a^{2}x + x - a^{2} \] 2. Agrupamos términos que tengan un factor común: \[ (x^{2} - a^{2}x) + (x - a^{2}) \] 3. En el primer grupo, factorizamos \( x \): \[ x(x - a^{2}) \] 4. En el segundo grupo, factorizamos \( 1 \) (ya que \((x - a^{2})\) ya es un factor): \[ 1(x - a^{2}) \] 5. Ahora, ambos grupos tienen el factor común \( (x - a^{2}) \): \[ x(x - a^{2}) + 1(x - a^{2}) = (x - a^{2})(x+1) \] La forma factorizada de la expresión es: \[ (x - a^{2})(x+1) \]

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Beyond the Answer

To grasp the essence of this expression, let's first observe that it can be rearranged for clarity. Notice that you can group and factor terms, giving you a chance to recognize potential patterns, like completing the square or using the difference of squares. This can lead you to simplify it further, revealing more about its underlying structure. Understanding how to manipulate algebraic expressions is crucial. For example, when faced with this polynomial, always look to factor or group terms effectively before diving deeper into solving. A common mistake is forgetting to check for common factors or overlooking simplification steps, which can lead to unnecessary confusion later on!

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