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The solutions are \(x=-\sqrt{5}\), \(x=0\), and \(x=\sqrt{5}\).
Solución
Solve the equation \( x^{5}=25x \).
Solve the equation by following steps:
- step0: Solve for \(x\):
\(x^{5}=25x\)
- step1: Move the expression to the left side:
\(x^{5}-25x=0\)
- step2: Factor the expression:
\(x\left(x^{4}-25\right)=0\)
- step3: Separate into possible cases:
\(\begin{align}&x=0\\&x^{4}-25=0\end{align}\)
- step4: Solve the equation:
\(\begin{align}&x=0\\&x=\sqrt{5}\\&x=-\sqrt{5}\end{align}\)
- step5: Rewrite:
\(x_{1}=-\sqrt{5},x_{2}=0,x_{3}=\sqrt{5}\)
The solutions to the equation \(x^{5}=25x\) are \(x=-\sqrt{5}\), \(x=0\), and \(x=\sqrt{5}\).
Revisado y aprobado por el equipo de tutoría de UpStudy
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Simplifique esta solución Bonus Knowledge
To solve the equation \( x^{5} = 25x \), you can first rearrange it to form \( x^{5} - 25x = 0 \). This can be factored as \( x(x^{4} - 25) = 0 \). From here, you can set \( x = 0 \) or solve \( x^{4} - 25 = 0 \) by recognizing it as a difference of squares, yielding \( (x^2 - 5)(x^2 + 5) = 0 \). The real solutions emerge from \( x^2 - 5 = 0 \), giving \( x = \pm\sqrt{5} \). Upon closer inspection, it's important to note common mistakes. A frequent pitfall is neglecting the simpler solutions, like \( x = 0 \), when handling higher degree polynomials. A systematic approach to factoring or using the rational root theorem is helpful in ensuring no solutions are overlooked!
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