12 Rotational Motion Rotating objects tend to keep rotating while non- rotating objects tend to remain non-rotating.

Slides:

Advertisements

Similar presentations

In the absence of an external force, the momentum of an object remains unchanged—conservation of momentum. In this chapter we extend the law of momentum.

Advertisements

Rotational Mechanics Ch. 11.

Lecture 15 Rotational Dynamics.

Chapter 7 Rotational Motion.

ConcepTest 8.9 Moment of Inertia

Ch 9. Rotational Dynamics In pure translational motion, all points on an object travel on parallel paths. The most general motion is a combination of translation.

Torque Not just a crappy movie with Ice Cube

Physics Montwood High School R. Casao

Rotational Motion October 31, 2005 and November 2, 2005.

Chapter 8 Rotational Motion.

Torque A torque (due to a force) causes angular acceleration. Torque = (force) x (moment arm) Moment arm is the perpendicular distance between the axis.

Rotational Motion.

Translational vs. rotational motion  Translational Motion  What we talked about in earlier units  Motion of the center of mass  Rotational Motion 

Rotational Inertia and Angular Momentum. Inertia The resistance of an object to change its state of motion Depends on mass (the bigger the mass, the bigger.

Rotational Mechanics.

Rotational Mechanics Center of Gravity The point located at the object’s average position of weight.

11 Rotational Mechanics An object will remain in rotational equilibrium if its center of mass is above the area of support.

Chapter 11 Rotational Mechanics Rotational Inertia n An object rotating about an axis tends to remain rotating unless interfered with by some external.

Physics 106: Mechanics Lecture 03

Using the “Clicker” If you have a clicker now, and did not do this last time, please enter your ID in your clicker. First, turn on your clicker by sliding.

Angular Kinetics Explaining the Causes of Angular Motion

ROTATIONAL MOTION.

\Rotational Motion. Rotational Inertia and Newton’s Second Law  In linear motion, net force and mass determine the acceleration of an object.  For rotational.

Cheyanne Rimer, Jeremy Massari, William Ortiz, Jordan Cooper, and Duncan Godsey Rotational Mechanics.

Circular M o ti o n Review Questi o n What is the tangential speed of a passenger on a Ferris wheel that has a radius of 10 m and rotates once in 30 s?

8.4. Newton’s Second Law for Rotational Motion

Chapter 7 Rotational Motion.

AP Rotational Dynamics Lessons 91 and 94.  Matter tends to resist changes in motion ◦ Resistance to a change in velocity is inertia ◦ Resistance to a.

ROTATIONAL INERTIA & ANGULAR MOMENTUM. Inertia (linear quantity) Symbol Definition Limitations Depends on  m (mass)  An object at rest tends to stay.

Newton’s Laws of Motion Applicable to Angular Motion Dr. Ajay Kumar Professor School of Physical Education DAVV Indore.

Rotational Dynamics Chapter 8 Section 3.

The center of gravity of an object is the point at which its weight can be considered to be located.

A car of mass 1000 kg moves with a speed of 60 m/s on a circular track of radius 110 m. What is the magnitude of its angular momentum (in kg·m 2 /s) relative.

Chapter 11 Rotational Mechanics. Recall: If you want an object to move, you apply a FORCE.

Angular Momentum 1)What determines how fast an object rotates? 2)Is Angular Momentum conserved?

Welcome back to Physics 215

L-11 Rotational Inertia and Conservation of rotational momentum Why does a wheel keep spinning? Why is a bicycle stable when it is moving, but falls over.

9.4. Newton’s Second Law for Rotational Motion A model airplane on a guideline has a mass m and is flying on a circle of radius r (top view). A net tangential.

Chapter 9 Rotational Dynamics.

Circular Motion, Center of Gravity, & Rotational Mechanics

Angular Momentum.

Exam is Wednesday at 7:00 pm Remember extra office hours

Rotational Dynamics The action of forces and torques on rigid object: Which object would be best to put a screw into a very dense, hard wood? A B= either.

By: Amy Rykaczewski and Lorraine Sacro.  An object rotating about an axis tends to keep rotating about that axis.  “A resistance to change of motion”

L-11 Rotational Momentum Why is a bicycle stable (it doesn’t fall over) only when it is moving?

Cutnell/Johnson Physics 8th edition Reading Quiz Questions

Physics Chapter 8 – Rotational Motion Part 1.

Rotational Mechanics. Torque When you want an object to turn or rotate, you apply a torque. Torques produce rotation.

Rotating objects tend to keep rotating while non-rotating objects tend to remain non- rotating.

Rotational Inertia Chapter Notes. Rotational Inertia Newton’s 1 st law (law of inertia) states that an object in motion remains in motion, and.

Chapter 11 Angular Momentum; General Rotation 10-9 Rotational Kinetic Energy 11-2 Vector Cross Product; Torque as a Vector 11-3Angular Momentum of a Particle.

Rotational Dynamics The Action of Forces and Torques on Rigid Objects

Rotational Equilibrium and Dynamics Rotation and Inertia.

CP Physics Chapter 8 Rotational Dynamics. Torque --Torque is the quantity that measures the ability of a force to rotate an object around some axis.

ROTATIONAL DYNAMICS. ROTATIONAL DYNAMICS AND MOMENT OF INERTIA  A Force applied to an object can cause it to rotate.  Lets assume the F is applied at.

Elizabeth, Colby, Ashley, Brittany. State and Explain Concepts  Torque is the tendency of a force to cause rotation about an axis.  Lever arm is he.

© 2010 Pearson Education, Inc. PowerPoint ® Lectures for College Physics: A Strategic Approach, Second Edition Chapter 7 Rotational Motion.

Causes of Rotation Sum the Torques.

CONCEPTUAL PHYSICS Rotational Mechanics.

Rotational Motion Rotational Inertia – inertia is how an object resists changing its motion so rotational inertia is how much an object resists changing.

Unit 7 - Rotational Mechanics

Rotational Mechanics.

Rotational Motion AP Physics.

Makenna Cooper, Lukas Binau, Savannah Sharp, Alexis Lundy

Torque A torque (due to a force) causes angular acceleration.

Angular motion Principles 6 & 7.

Torque & Angular Acceleration AH Physics

Remember Newton’s 2nd Law?

Rotational Equilibrium and Dynamics

Think of it as rotational _________________.

Presentation transcript:

12 Rotational Motion Rotating objects tend to keep rotating while non- rotating objects tend to remain non-rotating.

12 Rotational Motion Newton’s first law, the law of inertia, applies to rotating objects. An object rotating about an internal axis tends to keep rotating about that axis. Rotating objects tend to keep rotating, while non- rotating objects tend to remain non-rotating. The resistance of an object to changes in its rotational motion is called rotational inertia (sometimes moment of inertia) Rotational Inertia

12 Rotational Motion Just as it takes a force to change the linear state of motion of an object, a torque is required to change the rotational state of motion of an object. In the absence of a net torque, a rotating object keeps rotating, while a non-rotating object stays non-rotating Rotational Inertia

12 Rotational Motion Rotational Inertia and Mass Like inertia in the linear sense, rotational inertia depends on mass, but unlike inertia, rotational inertia depends on the distribution of the mass. The greater the distance between an object’s mass concentration and the axis of rotation, the greater the rotational inertia Rotational Inertia

12 Rotational Motion Rotational inertia depends on the distance of mass from the axis of rotation Rotational Inertia

12 Rotational Motion By holding a long pole, the tightrope walker increases his rotational inertia Rotational Inertia

12 Rotational Motion A long baseball bat held near its thinner end has more rotational inertia than a short bat of the same mass. Once moving, it has a greater tendency to keep moving, but it is harder to bring it up to speed. Baseball players sometimes “choke up” on a bat to reduce its rotational inertia, which makes it easier to bring up to speed. A bat held at its end, or a long bat, doesn’t swing as readily Rotational Inertia

12 Rotational Motion For similar mass distributions, short legs have less rotational inertia than long legs Rotational Inertia

12 Rotational Motion You bend your legs when you run to reduce their rotational inertia. Bent legs are easier to swing back and forth Rotational Inertia

12 Rotational Motion Formulas for Rotational Inertia When all the mass m of an object is concentrated at the same distance r from a rotational axis, then the rotational inertia is I = mr 2. When the mass is more spread out, the rotational inertia is less and the formula is different Rotational Inertia

12 Rotational Motion Rotational inertias of various objects are different. (It is not important for you to learn these values, but you can see how they vary with the shape and axis.) 12.1 Rotational Inertia

12 Rotational Motion The three principal axes of rotation in the human body are the longitudinal axis, the transverse axis, and the medial axis Rotational Inertia and Gymnastics

12 Rotational Motion The human body has three principal axes of rotation Rotational Inertia and Gymnastics

12 Rotational Motion Longitudinal Axis Rotational inertia is least about the longitudinal axis, which is the vertical head-to-toe axis, because most of the mass is concentrated along this axis. A rotation of your body about your longitudinal axis is the easiest rotation to perform. Rotational inertia is increased by simply extending a leg or the arms Rotational Inertia and Gymnastics

12 Rotational Motion An ice skater rotates around her longitudinal axis when going into a spin. a.The skater has the least amount of rotational inertia when her arms are tucked in Rotational Inertia and Gymnastics

12 Rotational Motion An ice skater rotates around her longitudinal axis when going into a spin. a.The skater has the least amount of rotational inertia when her arms are tucked in. b.The rotational inertia when both arms are extended is about three times more than in the tucked position Rotational Inertia and Gymnastics

12 Rotational Motion c and d. With your leg and arms extended, you can vary your spin rate by as much as six times Rotational Inertia and Gymnastics

12 Rotational Motion Transverse Axis You rotate about your transverse axis when you perform a somersault or a flip Rotational Inertia and Gymnastics

12 Rotational Motion A flip involves rotation about the transverse axis. a.Rotational inertia is least in the tuck position Rotational Inertia and Gymnastics

12 Rotational Motion A flip involves rotation about the transverse axis. a.Rotational inertia is least in the tuck position. b.Rotational inertia is 1.5 times greater Rotational Inertia and Gymnastics

12 Rotational Motion A flip involves rotation about the transverse axis. a.Rotational inertia is least in the tuck position. b.Rotational inertia is 1.5 times greater. c.Rotational inertia is 3 times greater Rotational Inertia and Gymnastics

12 Rotational Motion A flip involves rotation about the transverse axis. a.Rotational inertia is least in the tuck position. b.Rotational inertia is 1.5 times greater. c.Rotational inertia is 3 times greater. d.Rotational inertia is 5 times greater than in the tuck position Rotational Inertia and Gymnastics

12 Rotational Motion Rotational inertia is greater when the axis is through the hands, such as when doing a somersault on the floor or swinging from a horizontal bar with your body fully extended Rotational Inertia and Gymnastics

12 Rotational Motion The rotational inertia of a body is with respect to the rotational axis. a.The gymnast has the greatest rotational inertia when she pivots about the bar Rotational Inertia and Gymnastics

12 Rotational Motion The rotational inertia of a body is with respect to the rotational axis. a.The gymnast has the greatest rotational inertia when she pivots about the bar. b.The axis of rotation changes from the bar to a line through her center of gravity when she somersaults in the tuck position Rotational Inertia and Gymnastics

12 Rotational Motion Medial Axis The third axis of rotation for the human body is the front-to- back axis, or medial axis. This is a less common axis of rotation and is used in executing a cartwheel Rotational Inertia and Gymnastics

12 Rotational Motion Objects of the same shape but different sizes accelerate equally when rolled down an incline Rotational Inertia and Rolling

12 Rotational Motion Which will roll down an incline with greater acceleration, a hollow cylinder or a solid cylinder of the same mass and radius? The answer is the cylinder with the smaller rotational inertia because the cylinder with the greater rotational inertia requires more time to get rolling Rotational Inertia and Rolling

12 Rotational Motion Inertia of any kind is a measure of “laziness.” The cylinder with its mass concentrated farthest from the axis of rotation—the hollow cylinder—has the greater rotational inertia. The solid cylinder will roll with greater acceleration Rotational Inertia and Rolling

12 Rotational Motion Any solid cylinder will roll down an incline with more acceleration than any hollow cylinder, regardless of mass or radius. A hollow cylinder has more “laziness per mass” than a solid cylinder Rotational Inertia and Rolling

12 Rotational Motion A solid cylinder rolls down an incline faster than a hollow one, whether or not they have the same mass or diameter Rotational Inertia and Rolling

12 Rotational Motion Rotational Inertia and Torque Rotational Inertia is the rotational equivalent of mass. We can rewrite Newton’s 2 nd law for rotation as = Iα

12 Rotational Motion Example

12 Rotational Motion Example

12 Rotational Motion Example A 1.10 kg bucket is tied to a rope of negligible mass. The rope is wrapped around a pole that is mounted horizontally on frictionless bearings. The cylindrical pole has a diameter of 0.34 m and a mass of 2.60 kg. When the bucket is released from rest, how long will it take to fall to the bottom of the 17.0 well? Rotational inertia for a solid cylinder rotating about its center is I = ½ mr 2