A person’s blood group is determined by whether or not it contains any of 3 substances A, B and C - Edexcel - A-Level Maths Statistics - Question 5 - 2008 - Paper 2

To find this probability, we need to sum up all patients who have substance C:

• Only C: 100
• A and C but not B: 100
• B and C but not A: 25
• A and B and C: 10

Total patients with substance C = 100 + 100 + 25 + 10 = 235.

Therefore, the probability is given by:

$P( ext{Substance C}) = \frac{235}{300} = \frac{47}{60}$

Given that Harry's blood contains substance A, we will consider the patients who have A. This includes:

• Only A: 30 patients
• A and C but not B: 100 patients
• A and B and C: 10 patients
• A and B but not C: 3 patients

Total patients with substance A = 30 + 100 + 10 + 3 = 143.

Out of these, the number of patients with all 3 substances is 10. Thus, the probability is:

$P(A \text{ and } B \text{ and } C | A) = \frac{10}{143}$

Universal blood donors are those who contain none of substances A, B, or C. We can calculate this by first determining the total number of patients with any of the substances:

Total patients with A, B, or C = 300 - (100 + 100 + 30 + 25 + 12 + 10 + 3) = 20.

Therefore, the probability is:

$P( ext{Universal donor}) = \frac{20}{300} = \frac{1}{15}$