To solve the inequality \( 56x \leq -10 \), we have to divide both sides by 56 to isolate \( x \).
When dividing both sides of an inequality by a positive number (in this case, 56), the direction of the inequality symbol does NOT change. So we have:
\[
x \leq \frac{-10}{56}
\]
This simplifies to:
\[
x \leq -\frac{5}{28}
\]
Let's analyze the statements made by Juana, Anish, and Giselle:
1. **Juana**: She believes the inequality symbol must be reversed because there is a negative sign in the inequality. This is incorrect. The inequality doesn't reverse just because there is a negative number; it only reverses when you multiply or divide by a negative number.
2. **Anish**: He mentions the Multiplication Property of Inequality or Division Property of Inequality must be applied. This is correct but he needs to specify that we are dividing by a positive number (56) in this case, which does not change the direction of the inequality.
3. **Giselle**: She says the inequality symbol must stay the same. This is also correct because we are dividing by a positive number.
So, Anish and Giselle are correct in their reasoning. Thus, the correct combination is:
**Giselle and Anish**.