Question 6 ( 2 marks) In a group of 50 people there are 30 who are on the on the athletics team and 27 who play basketball. Twelve of the people on the athletics team also play basketball and five people in the class are involved in neither. A person from the group is chosen at random. (a) What is the probability that the person is on the athletics team and plays basketball? b) What is the probability that the person is on the athletics team or plays basketball, or both?

To tackle the questions, let's break it down with some fun facts! The number of people who are on both teams is a classic example of set overlap! Here, we can easily identify the groups. Since there are 30 in athletics and 27 basketball players, we know that 12 are in both groups. So, the total unique participants in at least one sport can be found using the principle of inclusion-exclusion! Now to put the formulas into action: (a) The probability of selecting someone who is on both teams is simply the number of people in both groups (12) divided by the total number of people (50), so it’s 12/50 or 0.24! (b) To find the probability of being on either team (or both), we count the unique athletes: 30 (athletics) + 27 (basketball) - 12 (both) = 45. Thus, the probability is 45/50 or 0.90! Pretty neat, right?