The birthday paradox and its implications.

The detailed explanation of the geometric probability formula.

The concept of waiting and how probabilities can help predict outcomes.

The importance of cumulative distributions.

The probability of multiple successes in a row.

The probability of the first success on a specific trial.

The average number of trials needed for success.

The probability of failure on the first trial.

0.95%

95%

4.07%

5%

It calculates the probability of success on the first trial.

It provides the probability of success within a certain number of trials.

It determines the average number of trials needed for success.

It predicts the probability of failure over multiple trials.

50%

0.04%

100%

18%

The probability of two people sharing a birthday is very low.

The probability of two people sharing a birthday is higher than expected.

The probability of everyone having a unique birthday is 100%.

The probability of sharing a birthday decreases with more people.

They help estimate the likelihood of events.

They guarantee outcomes.

They are only useful in gambling.

They eliminate uncertainty.