Solve the following problem:

Simplify the expression.

[tex]\[ 4x^4 y^5 - 6x^3 y^6 z^a + 10x^8 y^7 z \][/tex]

Question

26-06-2024
Mathematics

Answered

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Solve the following problem:

Simplify the expression.

[tex]\[ 4x^4 y^5 - 6x^3 y^6 z^a + 10x^8 y^7 z \][/tex]

Sagot :

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GinnyAnswer GinnyAnswer · Answer 1 · 2024-06-26T22:26:36-04:00

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

[tex]\[ 4x^4 y^5 - 6x^3 y^6 z^2 + 10x^8 y^7 z \][/tex]

Para simplificar esta expresión, buscamos términos comunes que podamos factorizar.

1. Identificamos el MCD (Máximo Común Divisor):
Observamos que cada término de la expresión tiene al menos un factor de \( x \) y un factor de \( y \). Entonces, buscamos la cantidad mínima de \( x \) y \( y \) que están presentes en cada término:

- El primer término \( 4 x^4 y^5 \)
- El segundo término \( -6 x^3 y^6 z^2 \)
- El tercer término \( 10 x^8 y^7 z \)

El mínimo de \( x \) presente en todos los términos es \( x^3 \).

El mínimo de \( y \) presente en todos los términos es \( y^5 \).

Así que el término común más grande que podemos factorizar es \( x^3 y^5 \).

2. Factorizamos el MCD:
Extraemos \( x^3 y^5 \) de cada término de la expresión original:

[tex]\[ 4x^4 y^5 - 6x^3 y^6 z^2 + 10x^8 y^7 z = x^3 y^5 (4x - 6y z^2 + 10x^5 y^2 z) \][/tex]

Simplifiquemos este factor:

- La factorización del primer término da \( 4x \)
- La factorización del segundo término da \(-6y z^2 \)
- La factorización del tercer término da \( 10x^5 y^2 z \)

3. Expresión final simplificada:
La expresión factorizada queda:

[tex]\[ 4x^4 y^5 - 6x^3 y^6 z^2 + 10x^8 y^7 z = x^3 y^5 (4x - 6y z^2 + 10x^5 y^2 z) \][/tex]

Y así llegamos a la expresión simplificada.

Sagot :

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