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Question
what is $sqrt{44y^{5}}$ expressed in simplest radical form? use the drag and drop feature to create your answer. drag & drop the answer note: use ctrl+d to drag the option via keyboard
Explicación:
Paso 1: Descomponer el número y la variable
Descomponemos 44 en factores primos: $44 = 4\times11=2^{2}\times11$, y $y^{5}=y^{4}\times y=(y^{2})^{2}\times y$. Entonces $\sqrt{44y^{5}}=\sqrt{2^{2}\times11\times(y^{2})^{2}\times y}$.
Paso 2: Aplicar la propiedad $\sqrt{ab}=\sqrt{a}\cdot\sqrt{b}$
$\sqrt{2^{2}\times11\times(y^{2})^{2}\times y}=\sqrt{2^{2}}\times\sqrt{(y^{2})^{2}}\times\sqrt{11y}=2y^{2}\sqrt{11y}$.
Respuesta:
$2y^{2}\sqrt{11y}$
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Explicación:
Paso 1: Descomponer el número y la variable
Descomponemos 44 en factores primos: $44 = 4\times11=2^{2}\times11$, y $y^{5}=y^{4}\times y=(y^{2})^{2}\times y$. Entonces $\sqrt{44y^{5}}=\sqrt{2^{2}\times11\times(y^{2})^{2}\times y}$.
Paso 2: Aplicar la propiedad $\sqrt{ab}=\sqrt{a}\cdot\sqrt{b}$
$\sqrt{2^{2}\times11\times(y^{2})^{2}\times y}=\sqrt{2^{2}}\times\sqrt{(y^{2})^{2}}\times\sqrt{11y}=2y^{2}\sqrt{11y}$.
Respuesta:
$2y^{2}\sqrt{11y}$