|
Size: 2661
Comment:
|
Size: 4333
Comment:
|
| Deletions are marked like this. | Additions are marked like this. |
| Line 30: | Line 30: |
| 1. List steps for setup then procedure. 1. ... |
1. Unload the ring, disc, and spheres from the cart. 1. Position the cart at the stage right end of the lecture bench so that it is touching the bench (see pictures). 1. Place the ramp on top of the lecture bench so that it is in line with the cart and such that the bottom edge of the ramp is within about 2 inches of the cart. 1. Secure the bottom of the ramp to the bench using the C-clamp provided in the cart. 1. Use the provided weights to hold down the top end of the bench (see pictures). 1. Either roll each object down individually or all together to directly compare descent times. A stop watch can be used to quantitatively measure the times. |
| Line 39: | Line 43: |
| Discuss the physics behind the demonstration, explaining some of the various steps of the demonstration when appropriate. | For a system of N particles, the moment of inertia can be defined as I = Σ,,i,,m,,i,,*r,,i,,^2^ where i ranges from 1 to N. This is important when considering the rotational dynamics of a system. In our case, we are dealing with rigid bodies and can consider the mass distribution to be continuous and uniform in each object consisting of one material. In this case we can replace the discrete sum with an integral over the volume of the object: I = ρ*∫ r^2^ dV. This quantity is analogous to mass in translational motion. In our case, the moments of inertia for these three objects are * Hoop: I = M*R^2^ * Disc: I = (1/2)*M*R^2^ * Sphere: I = (2/5)*M*R^2^ where M is the total mass, R is the radius, and the axes of rotation for the hoop and disc is taken to be the axis of rotational symmetry. Each object begins to roll down the ramp (i.e. attains an angular acceleration) because there is a net torque on the objects, the acceleration being determined by α = τ,,net,,/I. This shows us that the greater the moment of inertia of an object, the smaller its angular acceleration will be. This is why each object reaches the bottom of the ramp at different times. |
| Line 47: | Line 56: |
| ||attachment: RingDiscSphere26-250.jpg||attachment:RingDiscSphere27-250.jpg|| | ||attachment:RingDiscSphere26-250.jpg||attachment:RingDiscSphere27-250.jpg|| |
[:PiraScheme#Mechanics: Table of Mechanics Demonstration] |
[:MEEquipmentList: List of Mechanics Equipment & Supplies] |
[:Demonstrations:Lecture Demonstrations] |
Ring, Disc, and Sphere, 1Q10.30
Topic and Concept:
Rotational Dynamics, [:RotationalDynamics#MomentOfInertia: 1Q10. Moment of Inertia]
Location:
[:MechanicsCabinet#MEFloorItems: ME South Wall]
attachment:RingDiscSphere19-400.jpg
Abstract:
A ring, disc, sphere, and weighted discs of the same diameter are rolled down an incline. Each object reaches the bottom at different times due to differing moments of inertia.
Equipment |
Location |
ID Number |
|
|
|
Cart w/ Ring, Disc, & Sphere |
[:MechanicsCabinet#MEFloorItems: Floor Item: ME South Wall] |
|
Inclined Plane |
[:MechanicsCabinet#MEFloorItems: Floor Item: ME South Wall] |
|
Ring, Disc, & Sphere Extras |
[:MechanicsCabinetBayB9: ME, Bay B9, Shelf #3] or in Cart |
|
Important Setup Notes:
- N/A
Setup and Procedure:
- Unload the ring, disc, and spheres from the cart.
- Position the cart at the stage right end of the lecture bench so that it is touching the bench (see pictures).
- Place the ramp on top of the lecture bench so that it is in line with the cart and such that the bottom edge of the ramp is within about 2 inches of the cart.
- Secure the bottom of the ramp to the bench using the C-clamp provided in the cart.
- Use the provided weights to hold down the top end of the bench (see pictures).
- Either roll each object down individually or all together to directly compare descent times. A stop watch can be used to quantitatively measure the times.
Cautions, Warnings, or Safety Concerns:
- N/A
Discussion:
For a system of N particles, the moment of inertia can be defined as I = Σimi*ri2 where i ranges from 1 to N. This is important when considering the rotational dynamics of a system. In our case, we are dealing with rigid bodies and can consider the mass distribution to be continuous and uniform in each object consisting of one material. In this case we can replace the discrete sum with an integral over the volume of the object: I = ρ*∫ r2 dV. This quantity is analogous to mass in translational motion. In our case, the moments of inertia for these three objects are
Hoop: I = M*R2
Disc: I = (1/2)*M*R2
Sphere: I = (2/5)*M*R2
where M is the total mass, R is the radius, and the axes of rotation for the hoop and disc is taken to be the axis of rotational symmetry. Each object begins to roll down the ramp (i.e. attains an angular acceleration) because there is a net torque on the objects, the acceleration being determined by α = τnet/I. This shows us that the greater the moment of inertia of an object, the smaller its angular acceleration will be. This is why each object reaches the bottom of the ramp at different times.
attachment:RingDiscSphere01-250.jpg |
attachment:RingDiscSphere02-250.jpg |
attachment:RingDiscSphere03-250.jpg |
attachment:RingDiscSphere04-250.jpg |
attachment:RingDiscSphere05-250.jpg |
attachment:RingDiscSphere06-250.jpg |
attachment:RingDiscSphere07-250.jpg |
attachment:RingDiscSphere08-250.jpg |
attachment:RingDiscSphere09-250.jpg |
attachment:RingDiscSphere10-250.jpg |
attachment:RingDiscSphere11-250.jpg |
attachment:RingDiscSphere12-250.jpg |
attachment:RingDiscSphere13-250.jpg |
attachment:RingDiscSphere14-250.jpg |
attachment:RingDiscSphere15-250.jpg |
attachment:RingDiscSphere16-250.jpg |
attachment:RingDiscSphere17-250.jpg |
attachment:RingDiscSphere18-250.jpg |
attachment:RingDiscSphere20-250.jpg |
attachment:RingDiscSphere21-250.jpg |
attachment:RingDiscSphere23-250.jpg |
attachment:RingDiscSphere24-250.jpg |
attachment:RingDiscSphere25-250.jpg |
|
attachment:RingDiscSphere26-250.jpg |
attachment:RingDiscSphere27-250.jpg |
Videos:
[https://www.youtube.com/user/LectureDemostrations/videos?view=1 Lecture Demonstration's Youtube Channel]
References:
[https://en.wikipedia.org/wiki/Moment_of_inertia Wikipedia - Moment of Inertia]
[:Instructional:Home]