Ch. 8: Rotational Equilibrium and Dynamics
Objectives
• Know the distinction between translational motion and rotational motion.
• Understand the concept of torque and be able to make related calculations.
Rolling Race
Roll various objects down a ramp: spheres, solid cylinders, hollow cylinders, and washers. Compare which objects are the fastest. Develop a hypothesis regarding what factor(s) affect the relative speeds of the different objects.
Masses and Motion
point masses (center of mass) can havetranslational motion
extended masses can haverotational motion
Each type of motion can be analyzed separately.
Torque
• torque: the ability of a force to rotate an object around an axis (t)
• t = F·d·sinq• vector quantity• clockwise (─)• counterclockwise (+)• St = t1 + t2 + t3 + …
F
q
d
Torque Problem
Jack (244 N) and Jill (215 N) are sitting at opposite ends of a horizontal teeter-totter. If Jack is sitting 1.75 m from the center and Jill is sitting 1.95 m from the center, what is the net torque? What is the net torque if the teeter-totter is oriented upward at a 15o angle toward Jill’s end?
Objectives
• Understand the concept of “center-of-mass.”• Be able to find the center of mass for an
irregularly-shaped object.• Understand the concept of “moment of inertia.”• Be able to compare the moment of inertia for
differently-shaped objects.• Understand the concept of rotational
equilibrium and make related calculations.
Center of Mass
center of mass: the point around which an object rotates if gravity is only force acting (see video)
Center of Mass
“Fosbury Flop”
An object will “topple” once its center isof mass is no longer supported by a pivot.
Finding the Center of Mass
• Follow the directions for the “Quick Lab” on page 284.
• Predict the location of the center of mass before you proceed.
• You don’t need to write anything—just for fun.
Moment of Inertia• moment of inertia (I):
the tendency of an object to resist changes in rotational motion
• related to mass distribution
• This is why hoops accelerate slowly and spheres quickly
• torque needed to rotate differs (try book)
Moment of Inertia
Moment of Inertia Questions
• Does an object have a particular moment of inertia? Explain.
• What shape/axis would have the largest moment of inertia theoretically?
• Why do bicycles have such large, yet thin tires?
Rotational Equilibrium
• Translational equilibrium: SF = 0(no linear acceleration)
• Rotational equilibrium: St = 0(no rotational acceleration)
• Any axis can be used—choose for simplicity.
Rotational Equilibrium
Buster (345 N) is sitting 1.65 m from the center of a teeter-totter. Mary (245 N) is sitting on the other side 1.35 m from the center. Where can little Kuhmar (only 196 N) sit to produce rotational equilibrium?
Objectives
• Understand the concepts of angular speed and angular acceleration.
• Be able to make angular speed and angular acceleration calculations.
Radians
• Angles can be measured in “radians.”• • 1 radian = 57.3o
• 2p rad = 360o
qr
s
Angular Speed
• speed = distance / time• angular speed = angular distance / time• or• measured in rad/s• What is the angular speed of a carousel with a period
of 8.5 seconds?
Angular to Tangential Speed
• tangential speed: • What is the tangential speed a child sitting 3.5 m
from the center of the carousel in the previous problem?
Angular Acceleration
• Angular acceleration is analogous to linear acceleration. It is a change in the rate of rotation.
• Tangential acceleration: • The angular speed of a camshaft increases from 145
rad/s to 528 rad/s in 0.75 s. What is a? What is tangential acceleration of the shaft (r =0.052 m) at the end?
Objectives
• Understand and use Newton’s second law for rotation.
• Understand and apply the concept of angular momentum.
• Understand and apply the concept of rotational KE.
Second Law for Rotation
• Translational 2nd Law: • Rotational 2nd Law: • What is the angular acceleration of a 0.35 kg solid
sphere with radius 0.27 m if a 4.2 N net force is applied tangential to the surface?
Angular Momentum
• Translational momentum: • Rotational (angular momentum): • Conservation of Angular Momentum: • Why do skaters spin faster when they pull their arms
inward? Demo!• Remember electron spin? Electrons really don’t spin,
but they have quantized angular momentum.
Conservation Problem
A 0.11 kg mouse rides the edge of a Lazy Susan that has a mass of 1.3 kg and a radius of 0.25 m. If the angular speed is initially 3.0 rad/s, what is the angular speed after the mouse moves to a point 0.15 m from the center?
Rotational Kinetic Energy
• Translational KE: • Rotational KE:
Rotational KE Problems
A 1.5 kg solid sphere with radius 12 cm begins rolling down an incline. What is the translational speed of the sphere after it has dropped a vertical distance of 2.4 meters?
Objectives
• Be able to identify simple machines.• Be able to explain how simple machines make
doing work “easier.”• Be able to calculate the ideal mechanica(# N)l
advantage (IMA), actual mechanical (AMA) advantage, input work (WI), output work (WO), and efficiency (e) of a simple machine.
Simple Machines
Simple machines generally make doing work easier by reducing applied force (but distance is increased).
4 kinds: lever, inclined plane, pulley, wheel and axle
input work: WA = FA·dA output work:
WO = FO·dO
If no friction: WA = WO
If friction is present: WA > WO
Simple Machines
OA ddIMA
AO FFAMA
mechanical advantage (MA): factor by whichinput force is multiplied by the machine
efficiency: ratio of output work to input work (indicates amount of friction in machine)
100WWeA
O
“ideal” “actual”