Asked by Cutie

We start with the expression:

\[
\left( \frac{7^{-4}}{8^6} \right)^{-2} \cdot \frac{7^{-3}}{8^9}
\]

First, we simplify \( \left( \frac{7^{-4}}{8^6} \right)^{-2} \).

Using the property of exponents that \( (a/b)^{-n} = \frac{b^n}{a^n} \), we have:

\[
\left( \frac{7^{-4}}{8^6} \right)^{-2} = \frac{(8^6)^2}{(7^{-4})^2} = \frac{8^{12}}{7^{-8}} = \frac{8^{12}}{\frac{1}{7^8}} = 8^{12} \cdot 7^8
\]

Now substituting back into our expression:

\[
8^{12} \cdot 7^8 \cdot \frac{7^{-3}}{8^9}
\]

Now we combine the terms:

1. For the \( 7 \) terms:

\[
7^8 \cdot 7^{-3} = 7^{8 + (-3)} = 7^{5}
\]

2. For the \( 8 \) terms:

\[
8^{12} \cdot 8^{-9} = 8^{12 + (-9)} = 8^{3}
\]

Putting it all together, we obtain:

\[
\frac{7^5}{8^3}
\]

Therefore, the equivalent expression is:

\[
\frac{7^5}{8^3}
\]

Sure! Let's write the equivalent expression without using slashes.

We started with:

\[
\left( \frac{7^{-4}}{8^6} \right)^{-2} \cdot \frac{7^{-3}}{8^9}
\]

We simplified this to:

\[
8^{12} \cdot 7^{8} \cdot 8^{-9} \cdot 7^{-3}
\]

Which we combined into:

1. For the \( 7 \) terms:
\[
7^{8} \cdot 7^{-3} = 7^{5}
\]

2. For the \( 8 \) terms:
\[
8^{12} \cdot 8^{-9} = 8^{3}
\]

So, combining both results, the equivalent expression is:

\[
7^{5} \text{ over } 8^{3}
\]

Or simply stated without slashes:

**7 to the power of 5 over 8 to the power of 3.**

I apologize for misunderstanding your request. Here's the expression written without slashes:

**7 to the power of 5 multiplied by 8 to the power of negative 3.**

Thank you for your patience!