Rotational Kinematics and Inertia Circular Motion l l
- Slides: 12
Rotational Kinematics and Inertia
Circular Motion l l l Angular displacement D = 2 - 1 èHow far it has rotated èUnits radians 2 p = 1 revolution Angular velocity = D /Dt èHow fast it is rotating èUnits radians/second 2 p = 1 revolution Angular acceleration is the change in angular velocity divided by the change in time. α = D /Dt èHow much is it speeding up or slowing down èUnits radians/second 2 27
Period, Frequency l Frequency èNumber of revolutions per sec l Period =1/frequency T = 1/f = 2 p / èTime to complete 1 revolution
Circular to Linear (Why use Radians) l Displacement Ds = r D ( in radians) l Speed |v| = Ds/Dt = r D /Dt = r èDirection of v is tangent to circle l Acceleration |a| = rα 29
Angular Acceleration If the speed of a roller coaster car is 15 m/s at the top of a 20 m loop, and 25 m/s at the bottom. What is the cars average angular acceleration if it takes 1. 6 seconds to go from the top to the bottom? 41
Comparison to 1 -D kinematics Angular Linear And for a point at a distance R from the rotation axis: x = R v = R a = R
Example: cd player l The CD in your disk player spins at about 20 radians/second. If it accelerates uniformly from rest with angular acceleration of 15 rad/s 2, how many revolutions does the disk make before it is at the proper speed? 48
Example: 48 x cd-rom l A 48 x cd-rom spins at about 9600 rpm. If it takes 1. 5 sec. to get up to speed, what is the angular acceleration? How many revolutions does the disk make before it is at the proper speed? 48
Rotational Inertia, I l Tells how difficult it is get object spinning. Just like mass tells you how difficult it is to get object moving. èFnet= m a èτnet = I α l I = S m i ri 2 Linear Motion Rotational Motion (units kg m 2) l Note! Rotational Inertia depends on what you are spinning about (basically the ri in the equation). 13
Inertia Rods Two batons have equal mass and length. Which will be “easier” to spin A) Mass on ends B) Same C) Mass in center I = S m r 2 Further mass is from axis of rotation, greater moment of inertia (harder to spin) 21
Example: baseball bat
Rotational Inertia Table l For objects with finite number of masses, use I = S m r 2. For “continuous” objects, use table below. 33
- Aplusphysics kinematics-horizontal kinematics
- Rotational equilibrium example problems
- Second condition of equilibrium
- Angular velocity and inertia
- Rotational inertia and torque
- Rotational motion equations
- Angular quantities
- Rotational kinematics
- Rotational kinematics
- Rotational kinematics equations
- Kinetic angular energy
- Units for rotational inertia
- Inertia