0.3 Ch. 3: probability topics

(Optional Topic) A Venn diagram is a tool that helps to simplify probability problems. Introduce a Venn diagram using an example. Example: Suppose 40% of the students at ABC College belong to a club and 50% of the student body work part time. Five percent of the student body works part time and belongs to a club.

Have the students work in groups to draw an appropriate Venn diagram after you have shown them what a Venn diagram basically looks like. The diagram should consist of a rectangle with two overlapping circles. One rectangle represents the students who belong to a club (40%) and the other circle represents those students who work part time (50%). The overlapping part are those students who belong to a club and who work part time (5%).

Find the following:

• $\text{P(student works part time but does not belong to a club)}$
• $\text{P(student belongs to a club given that the student works part time)}$
• $\text{P(student does not belong to a club)}$
• $\text{P(works part time given that the student belongs to a club)}$
• $\text{P(student belongs to a club or the student works part time)}$

Find the following:

• $\text{P(a child is 9 - 11 years old)}$
• $\text{P(a child prefers regular soccer camp)}$
• $\text{P(a child is 9 - 11 years old and prefers regular soccer camp)}$
• $\text{P(a child is 9 - 11 years old or prefers regular soccer camp)}$
• $\text{P(a child is over 14 given that the child prefers micro soccer camp)}$
• $\text{P(a child prefers micro soccer camp given that the child is over 14)}$

Find the following:

• $\text{P(RR)}$
• $\text{P(RG or GR)}$
• $\text{P(at most one G in two draws)}$
• $\text{P(G on the 2nd draw|R on the 1st draw)}$ . The size of the sample space has been reduced to $12+36=481$ .
• $\text{P(no R on the 1st draw)}$