1. **State the problem:** Solve the inequality $18 + 0.04m \geq 76.08$ for $m$. 2. **Isolate the variable term:** Subtract 18 from both sides to get $$18 + 0.04m - 18 \geq 76.08 - 18$$ which simplifies to $$0.04m \geq 58.08$$ 3. **Divide both sides by 0.04:** Since 0.04 is positive, the inequality direction stays the same. $$\frac{\cancel{0.04}m}{\cancel{0.04}} \geq \frac{58.08}{0.04}$$ which simplifies to $$m \geq 1452$$ 4. **Interpretation:** The solution means $m$ must be greater than or equal to 1452 to satisfy the inequality. **Final answer:** $$m \geq 1452$$