A tire is rotating 600 times per minute. Through how many degrees does a point on the edge of the tire move in 1 minute?
One rotation goes through 360°
so 600 rotations go through ..... ?
Where is the answer?
To find out how many degrees a point on the edge of the tire moves in 1 minute, we need to consider the circumference of the tire.
The circumference of a circle is calculated using the formula:
Circumference = 2 * π * r,
where r is the radius of the circle.
Since the tire's edge moves along the circumference, in one rotation it completes the circumference of the tire.
However, we are given that the tire is rotating 600 times per minute. So, to find out the total distance traveled by a point on the edge in 1 minute, we need to multiply the circumference by the number of rotations per minute:
Total Distance = Circumference * Number of Rotations
Since we want to find the distance in degrees, we need to convert the distance in terms of the number of rotations to degrees.
1 revolution = 360 degrees.
So, multiplying the total distance by 360 will give us the answer in degrees.
Let's calculate it step by step:
Step 1: Find the circumference
We are not given the radius of the tire, so we need that information to proceed. Once you have the radius, you can find the circumference using the formula mentioned above.
Step 2: Find the total distance traveled in 1 minute
Multiply the circumference by the number of rotations per minute to get the total distance traveled in 1 minute.
Step 3: Convert the total distance to degrees
Multiply the total distance by 360 to convert it from rotations to degrees.
Following these steps will allow you to find how many degrees a point on the edge of the tire moves in 1 minute.