If a wheel turns around 6.00 complete rotations, what would the angular displacement of that wheel be in radians?
what is 2PI*6
To find the angular displacement in radians, we need to know the relationship between complete rotations and radians.
One complete rotation is equal to 2π radians.
So, if the wheel turns around 6.00 complete rotations, we can calculate the angular displacement in radians by multiplying the number of rotations by 2π.
Angular displacement = 6.00 rotations * 2π radians/rotation
= 12π radians
Therefore, the angular displacement of that wheel would be 12π radians.
To calculate the angular displacement in radians, you need to know the number of complete rotations the wheel makes. In this case, the wheel turns around 6.00 complete rotations.
To convert rotations to radians, we need to use the conversion factor of 1 rotation is equal to 2π radians.
So, the angular displacement in radians can be calculated as follows:
Angular Displacement (in radians) = Number of rotations × 2π
Angular Displacement = 6.00 × 2π
Angular Displacement = 12π radians
Therefore, the angular displacement of the wheel would be 12π radians.