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Solve the following equation:
[tex]\[
\left(3a^2b + 2b^2\right)^3
\][/tex]

A) [tex]\(27a^6b^3 + 54a^4b^4 + 36a^2b^5 + 8b^6\)[/tex]

Sagot :

GinnyAnswer
Para encontrar el resultado de la expresión [tex]\((3 a^2 b + 2 b^2)^3\)[/tex], debemos expandir el binomio elevado al cubo. A continuación, paso a paso, desarrollaremos la expansión del binomio:

Primero, recordemos la fórmula para el cubo de un binomio [tex]\((x + y)^3\)[/tex], que se puede expresar como:
[tex]\[ (x + y)^3 = x^3 + 3x^2y + 3xy^2 + y^3 \][/tex]

En este caso, digamos que [tex]\( x = 3a^2b \)[/tex] e [tex]\( y = 2b^2 \)[/tex]. Aplicando la fórmula sobre estos términos, tenemos que expandir:

[tex]\[ (3a^2b + 2b^2)^3 \][/tex]

Siguiendo la fórmula general del cubo de un binomio:
[tex]\[ (3a^2b + 2b^2)^3 = (3a^2b)^3 + 3(3a^2b)^2(2b^2) + 3(3a^2b)(2b^2)^2 + (2b^2)^3 \][/tex]

Ahora, calculemos cada término individualmente:

1. [tex]\( (3a^2b)^3 \)[/tex]:
[tex]\[ (3a^2b)^3 = 27a^6b^3 \][/tex]

2. [tex]\( 3(3a^2b)^2(2b^2) \)[/tex]:
[tex]\[ 3(3a^2b)^2(2b^2) = 3 \cdot 9a^4b^2 \cdot 2b^2 = 54a^4b^4 \][/tex]

3. [tex]\( 3(3a^2b)(2b^2)^2 \)[/tex]:
[tex]\[ 3(3a^2b)(2b^2)^2 = 3 \cdot 3a^2b \cdot 4b^4 = 36a^2b^5 \][/tex]

4. [tex]\( (2b^2)^3 \)[/tex]:
[tex]\[ (2b^2)^3 = 8b^6 \][/tex]

Finalmente, sumamos todos los términos obtenidos:

[tex]\[ 27a^6b^3 + 54a^4b^4 + 36a^2b^5 + 8b^6 \][/tex]

Por lo tanto, la respuesta correcta es:

[tex]\[ 27a^6b^3 + 54a^4b^4 + 36a^2b^5 + 8b^6 \][/tex]

Esto coincide con la opción A.
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