Show how did you calculate the angular speed?songoku said:Homework Statement: A disk is suspended by a nail such that the pivot in a vertical plane about a point on the edge of the disk. If the period of oscillation of the disk is 1.25 s, what is the disk's radius?
a. 26 cm
b. 78 cm
c. 51 cm
d. impossible to know without the disk's mass
Homework Equations: ω = 2π / T
I can calculate the angular speed but I don't know how to calculate the radius. Is there certain formula to calculate it?
Thanks
andrewkirk said:The trick will be to convert this into a problem involving a simple pendulum. Then you can use the formulas for motion of a pendulum.
To do that, first find the moment of inertia (MOI) of the disk around the pivot, which will be a function of the radius R and the density ρ of the disk (kg per sq metre of surface area). To find that, find the MOI of the disk around its centre (Wikipeda has a list of moments of inertia, including that of a disk), then use the Parallel Axis Theorem.
Next, convert it to a problem involving a point mass on the end of a string - the classic simple pendulum problem. To do that, work out the distance L from the pivot that a point mass has to be in order to have the same MOI about the pivot as the disk does. That will give you r in terms of R, as ρ will cancel out.
Then plug the given oscillation period into the standard formula for period of a simple pendulum to calculate L, and calculate R from that.
ehild said:Show how did you calculate the angular speed?
It is a "Physical Pendulum", Browse or read http://hyperphysics.phy-astr.gsu.edu/hbase/pendp.html
The radius of a disk suspended on its edge is the distance from the center of the disk to its outer edge.
The radius of a disk suspended on its edge can be measured by using a ruler or measuring tape to determine the distance from the center of the disk to its outer edge. It can also be calculated using the formula r = d/2, where r is the radius and d is the diameter of the disk.
The main factor that affects the radius of a disk suspended on its edge is the diameter of the disk. The larger the diameter, the larger the radius will be. Other factors such as the material and thickness of the disk may also have an impact on the radius.
The radius of a disk suspended on its edge is an important parameter in understanding the physical properties of the disk. It can affect the stability, strength, and rotational speed of the disk, and is crucial in many engineering and scientific applications.
Yes, the radius of a disk suspended on its edge can change depending on external factors such as temperature, pressure, and applied forces. It can also change over time due to wear and tear or deformation of the disk.