#### 81. A pharmaceutical company produces 1200 units of a medication each day. Due to a transport issue, 15% of the medication goes unused before reaching pharmacies. If each pharmacy requires 85 units per day, how many pharmacies can be fully supplied each day with the available medication? - Get link 4share

Understanding the Context

Step 1: Calculate the Usable Medication After Transport Loss

The company produces 1,200 units per day, but 15% is lost during transport. First, calculate the amount of medication that reaches pharmacies:

• 15% of 1,200 units = 0.15 × 1,200 = 180 units lost
  
• Usable medication = 1,200 – 180 = 1,020 units

So, only 1,020 units are available for distribution to pharmacies.

Key Insights

Step 2: Determine Pharmacy Demand

Each pharmacy requires 85 units per day to meet patient needs. To find out how many pharmacies can be fully supplied, divide the total usable units by the daily requirement per pharmacy:

• 1,020 units ÷ 85 units per pharmacy ≈ 12.00 pharmacies

Since only complete pharmacies receive full supplies, the company can fully supply 12 pharmacies daily.

Final Thoughts

Why This Matters

Understanding how transport inefficiencies impact usable supply highlights the importance of robust logistics in healthcare. Even a moderate loss like 15% significantly reduces the number of patients who can be reliably served. Optimizing transport reliability ensures medications reach those who need them—day in, day out.

Conclusion
With daily production of 1,200 units and 15% loss due to transport issues, a pharmaceutical company can fully supply 12 pharmacies each day, providing 85 usable units per pharmacy. This calculation emphasizes how critical supply chain efficiency is in delivering consistent healthcare access.

Keywords: pharmaceutical production, medication dispatch, transport loss calculation, pharmacy supply, healthcare logistics, daily medication distribution