Esercizio
$\frac{xy-wz}{\sqrt[3]{xy}+\sqrt[3]{xzwy}+\:\sqrt[3]{w^2z^2}}$
Soluzione passo-passo
Impara online a risolvere i problemi di passo dopo passo. (xy-wz)/((xy)^(1/3)+(xzwy)^(1/3)(w^2z^2)^(1/3)). Applicare la formula: \left(ab\right)^n=a^nb^n, dove a=w^2, b=z^2 e n=\frac{1}{3}. Applicare la formula: \left(ab\right)^n=a^nb^n, dove a=w, b=y e n=\frac{1}{3}. Applicare la formula: \left(ab\right)^n=a^nb^n, dove a=z, b=wy e n=\frac{1}{3}. Applicare la formula: \left(ab\right)^n=a^nb^n, dove a=x, b=zwy e n=\frac{1}{3}.
(xy-wz)/((xy)^(1/3)+(xzwy)^(1/3)(w^2z^2)^(1/3))
Risposta finale al problema
$\frac{xy-wz}{\sqrt[3]{x}\sqrt[3]{y}+\sqrt[3]{x}\sqrt[3]{z}\sqrt[3]{w}\sqrt[3]{y}+\sqrt[3]{w^{2}}\sqrt[3]{z^{2}}}$