Asked by optimus

To solve the inequality \( x^{13} < 45 \), we first take the 13th root of both sides.

This gives us:

\[
x < 45^{1/13}
\]

Calculating \( 45^{1/13} \) approximately, we find that:

\[
45^{1/13} \approx 1.5
\]

Thus, the solution to the inequality is:

\[
x < 1.5
\]

From the options provided, none seem to directly match this result exactly. However, let's break down the provided choices to determine if they correspond to this result:

1. **x < 465**: This is much larger than 1.5.
2. **x < 1345**: This is also much larger than 1.5.
3. **x < 1025**: This is still much larger than 1.5.
4. **x > 525**: This is incorrect as it suggests x is greater than a large value.

None of the responses correctly articulate the derived condition \( x < 45^{1/13} \approx 1.5 \). If you have to choose among the existing options, please check if there might have been a typographic error, or if you can approximate to the most reasonable value. However, mathematically, the solution remains \( x < 45^{1/13} \).