A disease is known to be present in 2% of a population - Edexcel - A-Level Maths Statistics - Question 1 - 2008 - Paper 2

To find the probability that the test is positive, we can calculate it using the law of total probability.

egin{align*} P( ext{Positive Test}) & = P( ext{Disease}) imes P( ext{Positive Test} | ext{Disease}) + P( ext{No Disease}) imes P( ext{Positive Test} | ext{No Disease})
& = 0.02 imes 0.95 + 0.98 imes 0.03
& = 0.0484. \end{align*}

Given that the test is positive, we can use Bayes' theorem:

egin{align*} P( ext{No Disease} | ext{Positive Test}) & = \frac{P( ext{Positive Test} | ext{No Disease}) imes P( ext{No Disease})}{P( ext{Positive Test})}
& = \frac{0.03 imes 0.98}{0.0484}
& \approx 0.607. \end{align*}

The test is not very useful because, despite a positive result, there is still a high probability (approximately 60.7%) that the individual does not have the disease. This indicates a high rate of false positives, making the test unreliable for confirming the presence of the disease.