Question

To solve the inequality \( 56x \leq -10 \), we follow these steps:

1. **Dividing by a positive number**: The first step is to isolate \( x \) by dividing both sides of the inequality by \( 56 \). Since \( 56 \) is a positive number, the direction of the inequality remains the same.

\[
x \leq \frac{-10}{56}
\]

2. **Simplifying**: This can be simplified to:

\[
x \leq -\frac{5}{28}
\]

Now, let's evaluate the statements from Juana, Anish, and Giselle:

- **Juana's statement**: Incorrect. She is wrong because the inequality symbol does not need to be reversed when dividing by a positive number. The presence of the negative sign on the right side of the inequality does not affect the inequality symbol.

- **Anish's statement**: Correct. He is correct in saying that the Multiplication or Division Property of Inequality applies here, but it's specifically that since we are dividing by a positive number, the inequality does not flip.

- **Giselle's statement**: Correct. She is correct that the inequality symbol must stay the same when dividing by a positive number.

Thus, the correct combination of people is:

**Giselle and Anish**.