To solve the inequality \(-32.5 - 6b \geq 48.5\), we can start by isolating the term that involves \(b\).
- First, add \(32.5\) to both sides:
\[ -6b \geq 48.5 + 32.5 \]
- Simplifying the right side:
\[ -6b \geq 81 \]
- Next, divide both sides by \(-6\). Remember that when you divide or multiply an inequality by a negative number, you need to flip the inequality sign:
\[ b \leq \frac{81}{-6} \]
- Simplifying \(\frac{81}{-6}\):
\[ b \leq -13.5 \]
This means that any value of \(b\) that is less than or equal to \(-13.5\) will satisfy the original inequality.
Now, we can evaluate the given options:
- −13: This is greater than \(-13.5\), so it does not satisfy the inequality.
- −13.5: This is equal to \(-13.5\), so it does satisfy the inequality.
- −12: This is greater than \(-13.5\), so it does not satisfy the inequality.
- −12.5: This is greater than \(-13.5\), so it does not satisfy the inequality.
The value that makes the inequality true is −13.5.