Here's the question again that I am trying to get help with because I can't figure it out and I got one answer, but I really couldn't understand it. Help please!

A ferris wheel makes one rotation in 15 minutes. Find your car's location and the angle of rotation after: 3 mins., 5 mins., 9 mins., 12 mins. The diameter of the wheel is 328 ft. and the height, with the base, is 369 ft.

You have to know where your car started...

What do you mean location? Knowing the angle determines the location.

angle= w*t=2PI/15min *time

To find your car's location and the angle of rotation at different times, we need to understand the motion of the ferris wheel and how it relates to time.

First, let's figure out the circumference of the ferris wheel, which will help us determine the angle of rotation. The formula for the circumference of a circle is C = πd, where C is the circumference and d is the diameter. In this case, the diameter is given as 328 ft, so we can calculate the circumference as follows:

C = π * 328 = 1029.9 ft (approx.)

Now, let's determine the number of rotations that the ferris wheel makes in 15 minutes. We know that it makes one rotation in 15 minutes, so to find the number of rotations in a given time, we can divide the given time by 15. For example, to find the number of rotations in 3 minutes:

Number of rotations = 3 minutes / 15 minutes = 0.2 rotations

Now that we know the number of rotations, we can calculate the angle of rotation in degrees. Since one full rotation is 360 degrees, we can multiply the number of rotations by 360 to find the angle of rotation. For example:

Angle of rotation = 0.2 rotations * 360 degrees = 72 degrees

To find the location of your car, we need to determine the distance traveled on the circumference of the ferris wheel. We can find this distance by multiplying the number of rotations by the circumference. For example:

Distance traveled = 0.2 rotations * 1029.9 ft = 205.98 ft (approx.)

Repeat these steps for each given time (5 mins, 9 mins, and 12 mins) to find the corresponding angle of rotation and distance traveled.

I hope this explanation helps you understand how to solve the problem.