For each sentence below, find the value of x that makes each sentence true. (5^1/5) 5 = 25 x = (8^1/3)^ 2 = 4 x =

Question

asked Aug 18, 2023 87.5k views

1 Answer

Patience · Answer 1 · 2023-08-25T09:20:35+0000

Given:

$(5^{(1)/(5)})^5=25^x$

Let's find the value of x that satisfies the equation.

Rewrite the equation:

$25^x=(5^{(1)/(5)})^5$

Apply the power rule:

$\begin{gathered} 25^x=5^{(1)/(5)\ast5} \\ \\ 5^(2x)=5^{(1)/(5)\ast5} \end{gathered}$

Since the bases of both sides are the same (5), strike them out:

$2x=(1)/(5)\ast5^{}$

Solve for x:

$\begin{gathered} 2x=(5)/(5) \\ \\ 2x=1 \end{gathered}$

Divide both sides by 2:

$\begin{gathered} (2x)/(2)=(1)/(2) \\ \\ x=(1)/(2) \\ \\ x=0.5 \end{gathered}$

ANSWER:

x = 0.5 or ½