1 Answer

Kiril Rusev · Answer 1 · 2023-10-25T09:08:45+0000

Given:

There are given the equation:

$\frac{x^{(4)/(3)}}{x^{(2)/(3)}}=x^a$

Step-by-step explanation:

To find the value of a, first, we need to apply the exponent rule:

So,

From the exponent rule:

Then,

Apply the above rule to the given question:

So,

$\begin{gathered} \frac{x^{(4)/(3)}}{x^{(2)/(3)}}=x^a \\ x^{(4)/(3)-(2)/(3)}=x^a \end{gathered}$

Now,

From the second rule of the exponent:

$\begin{gathered} x^(p-q)=x^d \\ p-q=d \end{gathered}$

Then,

Apply above second rule into the given equation:

$\begin{gathered} x^{(4)/(3)-(2)/(3)}=x^a \\ (4)/(3)-(2)/(3)=a \end{gathered}$

Then,

$\begin{gathered} (4)/(3)-(2)/(3)=a \\ (4-2)/(3)=a \\ (2)/(3)=a \end{gathered}$

Final answer:

Hence, the value of the a is shown below:

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