This is what my teacher gave us I guess he want us to figture out the question.

cost/mile 0.08 normal distribution
means=.08
standard deviation=0.2
Car life 5 uniform distribution( minmun=2, max=8

annual milage =900 triangular distribution(min=3700
most likely =9000
max=14500

annual cost= 3600

Based on the information provided, it seems like there is a question related to calculating the annual cost of owning and operating a car. Let's break down the information given and figure out how to answer the question.

1. Cost per Mile: The cost per mile is given as 0.08 with a normal distribution. This means that the cost per mile follows a bell-shaped curve, with a mean of 0.08 and a standard deviation of 0.2. To calculate the average cost per mile, you can use the mean value of 0.08.

2. Car Life: The car's life is described by a uniform distribution with a minimum value of 2 and a maximum value of 8. This means that the car's life expectancy can be any value between 2 and 8. However, it is not clear how the car's life relates to the annual cost calculation. We will assume that it represents the number of years the car is expected to last.

3. Annual Mileage: The annual mileage is described by a triangular distribution, with a minimum value of 3700, a most likely value of 9000, and a maximum value of 14500. This means that the annual mileage can take any value within this range, but values closer to 9000 are more likely.

4. Annual Cost: The annual cost is given as 3600, but it is not clear how this value is calculated based on the previous information. Without further information, it is difficult to determine the exact calculation for the annual cost.

To fully answer the question, we need more information about how the annual cost is calculated and how the car's life expectancy relates to the cost. Without these details, we can only analyze the given information up to this point.