2 Answers

Pelya · Answer 1 · 2020-06-30T17:16:21+0000

Answer:

The equivalent statement is
$(\sqrt[4]{80})^(x)$ ⇒ 2nd answer

Explanation:

* Lets explain how to solve the problem

- Any root can be a fraction power

- Ex:
$√(a)=a^{(1)/(2)}$

$\sqrt[3]{a}=a^{(1)/(3)}$

$\sqrt[4]{a}=a^{(1)/(4)}$

$\sqrt[n]{a}=a^{(1)/(n)}$

* The expression is
$(80)^{(1)/(4)x}$

∵
$(80)^{(1)/(4)x}$ can be written as
$(80^{(1)/(4)})^(x)$

∵
$(80)^{(1)/(4)}=\sqrt[4]{80}$

∴
$(80^{(1)/(4)})^(x)$ =
$(\sqrt[4]{80})^(x)$

* The equivalent statement is
$(\sqrt[4]{80})^(x)$

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