Find all real solutions of the equation $\displaystyle \sqrt{x} - 3 \sqrt[4]{x} - 4 = 0$
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\begin{equation}
\begin{aligned}
\sqrt{x} - 3 \sqrt[4]{x} - 4 =& 0
&& \text{Given}
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(\sqrt[4]{x})^2 - 3 \sqrt[4]{x - 4} =& 0
&& \text{Let } w = \sqrt[4]{x}
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(w - 4)(w + 1)=& 0
&& \text{Factor}
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w - 4 =& 0 \text{ and } w + 1 = 0
&& \text{Zero Product Property}
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w =& 4 \text{ and } w = -1
&& \text{Solve for } w
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\sqrt[4]{x} =& 4 \text{ and } \sqrt[4]{x} = -1
&& \text{Substitute } w = \sqrt[4]{x}
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(\sqrt[4]{x})^4 =& (4)^4 \text{ and } (\sqrt[4]{x})^4 = (-1)^4
&& \text{Raise both sides by } 4
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x =& 256 \text{ and } x = 1
&& \text{Solve for } x
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x =& 256
&& \text{The only solution for the equation } \sqrt{x} - 3 \sqrt[4]{x} - 4 = 0
\end{aligned}
\end{equation}
$
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