Question: A hydrology researcher tests 9 groundwater samples, 5 from a contaminated well, 3 from a nearby monitoring well, and 1 from a control well. If 4 samples are randomly chosen, what is the probability that exactly 2 are from the contaminated well and 1 is from the nearby monitoring well? - Decision Point

Understanding the Context

Why This Question Matters in Environmental Science and Public Trust

Groundwater contamination detection requires careful sampling and statistical rigor. When researchers randomly choose samples, they model real-world variability and assess risk with precision. The probability question posed reflects a practical, methodological challenge faced by scientists and regulators: They don’t test every drop, but instead use representative samples to infer broader conditions.

This line of inquiry supports better environmental monitoring, regulatory compliance, and public awareness. Finding ways to interpret such data clearly helps bridge the gap between technical research and community understanding—especially during emerging water quality concerns.

Key Insights

How to Calculate the Probability: Breaking Down the Sample Query

Prime among statistical questions is determining how likely a specific pattern emerges from a defined group. In this case, we examine 9 groundwater samples:

• Contaminated well: 5 samples
• Nearby monitoring well: 3 samples
• Control well: 1 sample

Total: 9 samples. Choose 4 at random. We want exactly:

• 2 from the contaminated well
• 1 from the monitoring well
• 1 from the control well (no monitoring well sample left)

Final Thoughts

Note: No sample combination violates the total selection. This constraint shapes the calculation.

Step-by-Step Breakdown: Combinatorics Behind the Probability

To compute this probability, use foundational combinatorics—specifically, combinations, which count how many ways to choose samples without regard to order.

The total number of ways to select any 4 samples from 9 is:

[ \binom{9}{4} = \frac{