Simplify:
[tex]\[ \sqrt[5]{\frac{x^{12}}{x^7}} \sqrt[4]{x^{16}} \][/tex]

Question

11-07-2024
Mathematics

Answered

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Simplify:
[tex]\[ \sqrt[5]{\frac{x^{12}}{x^7}} \sqrt[4]{x^{16}} \][/tex]

Sagot :

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GinnyAnswer GinnyAnswer · Answer 1 · 2024-07-11T18:41:43-04:00

¡Claro! Vamos a simplificar la expresión paso a paso:

La expresión a simplificar es:
[tex]\[ \sqrt[5]{\frac{x^{12}}{x^7}} \cdot \sqrt[4]{x^{16}} \][/tex]

### Paso 1: Simplificar la primera raíz radical
Primero, simplifiquemos el argumento dentro de la primera raíz radical:
[tex]\[ \frac{x^{12}}{x^7} \][/tex]
Podemos simplificar esto utilizando la ley de los exponentes que dice que cuando dividimos dos potencias que tienen la misma base, restamos los exponentes:
[tex]\[ \frac{x^{12}}{x^7} = x^{12-7} = x^5 \][/tex]
Entonces, la primera raíz radical se convierte en:
[tex]\[ \sqrt[5]{x^5} \][/tex]
Reconociendo que tomar la quinta raíz de [tex]$x^5$[/tex] es simplemente [tex]$x$[/tex]:
[tex]\[ \sqrt[5]{x^5} = x \][/tex]

### Paso 2: Simplificar la segunda raíz radical
Ahora, simplifiquemos la segunda raíz radical:
[tex]\[ \sqrt[4]{x^{16}} \][/tex]
Podemos reescribir esto como una potencia con un exponente racional:
[tex]\[ \sqrt[4]{x^{16}} = (x^{16})^{1/4} \][/tex]
Utilizando la propiedad de que [tex]$(a^m)^n = a^{m \cdot n}$[/tex]:
[tex]\[ (x^{16})^{1/4} = x^{16 \cdot 1/4} = x^4 \][/tex]

### Paso 3: Multiplicar los resultados
Ya hemos simplificado ambas raíces radicales:
[tex]\[ \sqrt[5]{x^5} = x \quad \text{y} \quad \sqrt[4]{x^{16}} = x^4 \][/tex]
Ahora, multiplicamos los resultados:
[tex]\[ x \cdot x^4 \][/tex]
Usando la propiedad de los exponentes que dice que cuando multiplicamos dos potencias de la misma base, sumamos los exponentes:
[tex]\[ x \cdot x^4 = x^{1+4} = x^5 \][/tex]

### Resumen
La expresión simplificada es:
[tex]\[ \sqrt[5]{\frac{x^{12}}{x^7}} \cdot \sqrt[4]{x^{16}} = x^5 \][/tex]

Por lo tanto, la respuesta final es:
[tex]\[ x^5 \][/tex]

Simplify:[tex]\[ \sqrt[5]{\frac{x^{12}}{x^7}} \sqrt[4]{x^{16}} \][/tex]

Sagot :

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Simplify:
[tex]\[ \sqrt[5]{\frac{x^{12}}{x^7}} \sqrt[4]{x^{16}} \][/tex]