The chances of two people in London having the same number of hairs.

The probability of winning a lottery.

The likelihood of two people sharing the same birthday.

The chances of flipping a coin and getting heads.

To teach students about historical mathematicians.

To help students develop basic numeracy and estimation skills.

To focus on algebra and geometry.

To prepare students for advanced calculus.

Using a computer simulation.

Using a mathematical formula.

Using a ruler to estimate hairs per square centimeter.

Using a microscope to count each hair.

Between 200,000 and 300,000

Between 50,000 and 150,000

Between 1,000 and 5,000

Between 10,000 and 20,000

The Pigeonhole Principle

The Law of Large Numbers

The Birthday Paradox

The Principle of Least Action

It shows that everyone has a unique number of hairs.

It suggests that hair count is irrelevant.

It proves that at least two people will have the same number of hairs.

It indicates that hair count is infinite.

0%

50%

100%

25%