Final answer to the problem
Step-by-step Solution
How should I solve this problem?
- Scegliere un'opzione
- Risolvere per x
- Semplificare
- Fattore
- Trovare le radici
- Load more...
Apply the formula: $x^a=b$$\to \left(x^a\right)^{inverse\left(a\right)}=b^{inverse\left(a\right)}$, where $a=\frac{1}{3}$, $b=-4$, $x^a=b=\sqrt[3]{x}=-4$ and $x^a=\sqrt[3]{x}$
Learn how to solve equazioni con radici cubiche problems step by step online.
$\left(\sqrt[3]{x}\right)^3={\left(-4\right)}^3$
Learn how to solve equazioni con radici cubiche problems step by step online. Solve the equation with radicals x^(1/3)=-4. Apply the formula: x^a=b\to \left(x^a\right)^{inverse\left(a\right)}=b^{inverse\left(a\right)}, where a=\frac{1}{3}, b=-4, x^a=b=\sqrt[3]{x}=-4 and x^a=\sqrt[3]{x}. Apply the formula: \left(x^a\right)^b=x, where a=\frac{1}{3}, b=3, x^a^b=\left(\sqrt[3]{x}\right)^3 and x^a=\sqrt[3]{x}. Apply the formula: a^b=a^b, where a=-4, b=3 and a^b={\left(-4\right)}^3.