 In Chap. 6 we studied the equilibrium of point- objects (mass m) with the application of Newton’s Laws  Therefore, no linear (translational) acceleration,

Slides:

Advertisements

Similar presentations

Chapter 9 Objectives Calculate the torque created by a force.

Advertisements

Physics 111: Mechanics Lecture 12

Torque Torque is defined as the tendency to produce a change in rotational motion.

Torque Looking back Looking ahead Newton’s second law.

Chapter 9 Rotational Dynamics.

ROTATIONAL MOTION. What can force applied on an object do? Enduring Understanding 3.F: A force exerted on an object can cause a torque on that object.

Chapter 9 Torque.

Foundations of Physics

A ladder with length L weighing 400 N rests against a vertical frictionless wall as shown below. The center of gravity of the ladder is at the center of.

Force vs. Torque Forces cause accelerations

Rotational Equilibrium and Rotational Dynamics

Chapter 9: Torque and Rotation

Rotational Equilibrium and Rotational Dynamics

Chapter 9 Rotational Dynamics.

 orque  orque  orque  orque  orque  orque  orque  orque  orque Chapter 10 Rotational Motion 10-4 Torque 10-5 Rotational Dynamics; Torque and Rotational.

Angular Momentum (of a particle) O The angular momentum of a particle, about the reference point O, is defined as the vector product of the position, relative.

Force applied at a distance causing a rotating effect

Rotational Dynamics Chapter 9.

Chapter 4 : statics 4-1 Torque Torque, , is the tendency of a force to rotate an object about some axis is an action that causes objects to rotate. Torque.

Physics 106: Mechanics Lecture 07

Chapter Eight Rotational Dynamics Rotational Dynamics.

Chapter 8 Rotational Equilibrium and Rotational Dynamics.

Chapter-9 Rotational Dynamics. Translational and Rotational Motion.

Chapter 8: Torque and Angular Momentum

 Torque: the ability of a force to cause a body to rotate about a particular axis.  Torque is also written as: Fl = Flsin = F l  Torque= force x.

Equilibrium of a Rigid Body

Rotation Rotational Variables Angular Vectors Linear and Angular Variables Rotational Kinetic Energy Rotational Inertia Parallel Axis Theorem Newton’s.

Chapter 9: Rotational Dynamics

Torque Chap 8 Units: m N 2.

Chapter 8 Torque and Rotation  8.2 Torque and Stability  6.5 Center of Mass  8.3 Rotational Inertia Dorsey, Adapted from CPO Science DE Physics.

Chapter 8 Rotational Dynamics and Static Equilibrium

Cutnell & Johnson, Wiley Publishing, Physics 5 th Ed. Copywrited by Holt, Rinehart, & Winston.

Torqued An investigation of rotational motion. Think Linearly Linear motion: we interpret – position as a point on a number line – velocity as the rate.

Chapter 11: Rotational Dynamics  As we did for linear (or translational) motion, we studied kinematics (motion without regard to the cause) and then dynamics.

Torque DO NOW: Serway Read Pages 306 – 308 Do Example page 309 Define and Utilize : Moment.

8.2 Rotational Dynamics How do you get a ruler to spin on the end of a pencil? Apply a force perpendicular to the ruler. The ruler is the lever arm How.

ROTATIONAL MOTION. What can force applied on an object do? Enduring Understanding 3.F: A force exerted on an object can cause a torque on that object.

Physics 106 Lesson #2 Static Equilibrium Dr. Andrew Tomasch 2405 Randall Lab

Physics CHAPTER 8 ROTATIONAL MOTION. The Radian  The radian is a unit of angular measure  The radian can be defined as the arc length s along a circle.

Torque. Center of Gravity The point at which all the weight is considered to be concentrated The point at which an object can be lifted w/o producing.

1 Rotation of a Rigid Body Readings: Chapter How can we characterize the acceleration during rotation? - translational acceleration and - angular.

Chapter 9 Rotational Dynamics

Two-Dimensional Rotational Dynamics 8.01 W09D2 Young and Freedman: 1.10 (Vector Product), , 10.4, ;

Chapter 11 – Rotational Dynamics & Static Equilibrium.

Chapter 12 Lecture 21: Static Equilibrium and Elasticity: I HW8 (problems):11.7, 11.25, 11.39, 11.58, 12.5, 12.24, 12.35, Due on Friday, April 1.

Today: (Ch. 8)  Rotational Motion.

Ying Yi PhD Chapter 9 Rotational Dynamics 1 PHYS HCC.

Chapter 8 Lecture Pearson Physics Rotational Motion and Equilibrium Prepared by Chris Chiaverina © 2014 Pearson Education, Inc.

Monday, Apr. 14, 2008 PHYS , Spring 2008 Dr. Jaehoon Yu 1 PHYS 1441 – Section 002 Lecture #21 Monday, Apr. 14, 2008 Dr. Jaehoon Yu Rolling Motion.

Pgs Chapter 8 Rotational Equilibrium and Dynamics.

Cutnell & Johnson, Wiley Publishing, Physics 5 th Ed. Copywrited by Holt, Rinehart, & Winston.

UNIT 6 Rotational Motion & Angular Momentum Rotational Dynamics, Inertia and Newton’s 2 nd Law for Rotation.

1 Rotational Dynamics The Action of Forces and Torques on Rigid Objects Chapter 9 Lesson 2 (a) Translation (b) Combined translation and rotation.

TORQUE A torque is an action that causes objects to rotate. Torque is not the same thing as force. For rotational motion, the torque is what is most directly.

Mechanics Lecture 17, Slide 1 Physics 211 Lecture 17 Today’s Concepts: a) Torque Due to Gravity b) Static Equilibrium Next Monday 1:30-2:20pm, here: Hour.

Chapter 9 Rotational Dynamics.

Chapter 8: Rotational Equilibrium and Rotational Dynamics

PHY 131 Chapter 8-Part 1.

Rotational Dynamics Chapter 9.

Foundations of Physics

Rotational Dynamics.

Objectives Calculate the torque created by a force.

Devil physics The baddest class on campus Pre-IB Physics

Rigid Body in Equilibrium

9.1 Torque Key Question: How does force create rotation?

Rotational Statics i.e. “Torque”

Presentation transcript:

 In Chap. 6 we studied the equilibrium of point- objects (mass m) with the application of Newton’s Laws  Therefore, no linear (translational) acceleration, a=0 Static Equilibrium

 For rigid bodies (non-point-like objects), we can apply another condition which describes the lack of rotational motion  If the net of all the applied torques is zero, we have no rotational (angular) acceleration,  =0 (don’t need to know moment of inertia)  We can now use these three relations to solve problems for rigid bodies in equilibrium (a=0,  =0) Example Problem The wheels, axle, and handles of a wheelbarrow weigh 60.0 N. The load chamber and its contents

weigh 525 N. It is well known that the wheelbarrow is much easier to use if the center of gravity of the load is placed directly over the axle. Verify this fact by calculating the vertical lifting load required to support the wheelbarrow for the two situations shown. FLFL L1L1 L2L2 L3L3 FwFw FDFD FLFL L2L2 L3L3 FwFw FDFD L 1 = m, L 2 = m, L 3 = m

 First, draw a FBD labeling forces and lengths from the axis of rotation L1L1 L2L2 FwFw L3L3 FDFD FLFL axis Choose a direction for the rotation, CCW being positive is the convention a)

L2L2 FwFw FDFD FLFL axis  Apply to case with load over wheel  Torque due to dirt is zero, since lever arm is zero b)

 Who? What is carrying the balance of the load?  Consider sum of forces in y-direction FwFw FDFD FLFL FNFN a) b) We did not consider the Normal Force when calculating the torques since its lever arm is zero

Center of Gravity FDFD  The point at which the weight of a rigid body can be considered to act when determining the torque due to its weight  Consider a uniform rod of length L. Its center of gravity (cg) corresponds to its geometric center, L/2.  Each particle which makes up the rod creates a torque about cg, but the sum of all torques due L L/2cg

to each particle is zero  So, we treat the weight of an extended object as if it acts at one point  Consider a collection of point-particles on a massless rod  The sum of the torques m1gm1g m2gm2g m3gm3g x3x3 x2x2 x1x1  Mg x cg