Asked by hudson

To find an equivalent expression to \( 81^{-12} \), let's first rewrite it in a more manageable form.

The expression \( 81^{-12} \) can be expressed as:

\[
\frac{1}{81^{12}}
\]

Next, we also know that \( 81 \) can be written as \( 3^4 \). Therefore, we can rewrite \( 81^{12} \) as follows:

\[
81^{12} = (3^4)^{12} = 3^{4 \cdot 12} = 3^{48}
\]

Thus, we can express \( 81^{-12} \) as:

\[
81^{-12} = \frac{1}{81^{12}} = \frac{1}{3^{48}}
\]

Now let’s analyze the options provided:

1. \( -\sqrt{81} \): This evaluates to \(-9\), not equivalent.
2. \( \sqrt{81} \): This evaluates to \(9\), not equivalent.
3. \( \frac{1}{\sqrt{81}} \): This evaluates to \(\frac{1}{9}\), not equivalent.
4. \( -\frac{1}{\sqrt{81}} \): This evaluates to \(-\frac{1}{9}\), not equivalent.

None of the options given appears to be a direct equivalent expression to \( 81^{-12} \) or \(\frac{1}{81^{12}}\).

If any of the options may have typographical errors, please re-check or clarify, but based on the given expressions, none is equivalent to \( 81^{-12} \).