Example with Two Sets: Let's consider two sets:

• Set A: Students who play football.

• Set B: Students who play basketball. A Venn diagram with these two sets would have two circles:

• Circle A: Represents all students who play football.

• Circle B: Represents all students who play basketball.

• The overlapping area (intersection) represents students who play both football and basketball.

Example: Suppose:

• Set A: {$1, 2, 3, 4$}
• Set B: {$3, 4, 5, 6$}
• Union $(A \cup B)$: {$1, 2, 3, 4, 5, 6$}
• Intersection $(A \cap B)$: {$3, 4$}
• Complement of A $(A')$: All elements not in set A (this could depend on the universal set, which might be, say, {$1, 2, 3, 4, 5, 6, 7, 8, 9, 10$}.

Example: Let's say:

• Set A: Students who play football.

• Set B: Students who play basketball.

• Set C: Students who play tennis. The Venn diagram will show:

• The areas where only A and B overlap (students who play both football and basketball, but not tennis).

• The areas where only B and C overlap (students who play both basketball and tennis, but not football).

• The areas where all three sets overlap (students who play football, basketball, and tennis).

Example: Consider the following data:

• $30$ students play football.

• $25$ students play basketball.

• $15$ students play both football and basketball. To represent this in a Venn diagram:

• Draw two overlapping circles.

• Place $15$ in the intersection (students who play both).

• Place $30 - 15 = 15$ in the football-only part of the football circle.

• Place $25 - 15 = 10$ in the basketball-only part of the basketball circle.

Explanation:

• The Venn diagram helps understand and calculate the number of students who play only one sport or both.
• Venn diagrams are powerful tools for visualising relationships between sets and simplifying complex problems, especially in probability and logical reasoning.

Example Questions

A Venn diagram is provided with probabilities for two events A and B.

The tasks are to find the following probabilities:

• a) $P(A \cup B)$
• b) $P(A | B)$
• c) $P(B | A')$
• d) $P(B | A \cup B)$

Worked Solutions

1. Finding $P(A \cup B)$:

This represents the probability that either event $A$ or$B$ or both occur.

b. Finding $P(A | B)$:

$P(A | B)$ means "the probability that $A$ occurs, given that $B$ occurs."

Given B has occurred, the denominator is the sum of the probabilities in event B.

This is also shown using the formula for conditional probability:

c. Finding $P(B | A')$:

$P(B | A')$ means the probability that $B$ occurs given that $A$ does not occur.

d. Finding $P(B | A \cup B)$:

First, calculate the probability of the intersection of B with $A \cup B$:

Then, calculate the probability of $A \cup B$:

Finally, apply the formula for conditional probability:

This gives the final answer as $\frac{6}{7}$.