Step 1 :The waiting times are uniformly distributed between 0 and 5 minutes. This means that the probability of any given waiting time within this range is the same. The total range of waiting times is 5 minutes.
Step 2 :The question asks for the probability that a randomly selected passenger has a waiting time greater than 2.25 minutes. This means we need to find the proportion of the total range that is greater than 2.25 minutes.
Step 3 :This can be calculated by subtracting 2.25 from the total range of 5 minutes, and then dividing by the total range.
Step 4 :\(total\_range = 5\)
Step 5 :\(waiting\_time = 2.25\)
Step 6 :\(probability = \frac{total\_range - waiting\_time}{total\_range}\)
Step 7 :\(probability = \frac{5 - 2.25}{5} = 0.55\)
Step 8 :The probability that a randomly selected passenger has a waiting time greater than 2.25 minutes is 0.55 or 55%. This is the proportion of the total range of waiting times that is greater than 2.25 minutes.
Step 9 :Final Answer: The probability that a randomly selected passenger has a waiting time greater than 2.25 minutes is \(\boxed{0.55}\) or \(\boxed{55\%}\).