In Exercises 21–24, use these results from the “1-Panel-THC” test for marijuana use, which is provided by the company Drug Test Success: Among 143 subjects with positive test results, there are 24 false positive results; among 157 negative results, there are 3 false negative results. (Hint: Construct a table similar to Table 4-1, which is included with the Chapter Problem.)

Testing for Marijuana: Use If one of the test subjects is randomly selected, find the probability that the subject did not use marijuana. Do you think that the result reflects the general population rate of subjects who do not use marijuana?

The numbers of positive and negative drug test results of subjects are provided.

The frequencies are categorized as true and false results.

The probability of an event involves two counts; favorable to the event and the total possible counts of outcomes in the sample space.

Mathematically, it is stated as:

$P\left(A\right)=\frac{\text{Number}\text{of}\text{outcomes}\text{favorable}\text{to}\text{A}}{\text{Total}\text{outcomes}}$

The table below shows the number of subjects that fall into each category:

The total number of subjects is equal to 300.

Let E be the event of selecting a subject who did not use marijuana.

The number of subjects who did not use marijuana is:

$$\begin{gathered} \text{False}\text{Positive}+\text{True}\text{Negative}=24+154 \\ =178 \end{gathered}$$

The probability of selecting a subject who did not use marijuana is given as:

$$\begin{gathered} P\left(E\right)=\frac{178}{300} \\ =0.593 \end{gathered}$$

Therefore,the probability of selecting a subject who did not use marijuana is equal to 0.593.

As the probability is approximately equal to 60%, which is quite high, the chances that the results appeared by chance in sampling are unlikely. Also, the sample size is 300, which is quite large.

Therefore, it can be said that the result actually reflects the general population rate of subjects who do not use marijuana.