1 / 15

Rotational Motion

Chapter. Rotational Motion. 8. In this chapter you will:. Learn how to describe and measure rotational motion. Learn how torque changes rotational velocity. Define center of mass and the conditions for equilibrium. Chapter. Table of Contents. 8. Chapter 8: Rotational Motion.

debbiet
Télécharger la présentation

Rotational Motion

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Chapter Rotational Motion 8 In this chapter you will: • Learn how to describe and measure rotational motion. • Learn how torque changes rotational velocity. • Define center of mass and the conditions for equilibrium.

  2. Chapter Table of Contents 8 Chapter 8: Rotational Motion Section 8.1: Describing Rotational Motion Section 8.2: Rotational Dynamics Section 8.3: Equilibrium Assignments: Read Chapter 8. Study Guide 8 due before the Chapter Test. HW 8.A: p.223: 72-77. HW 8.B: p.224: 81,82,84. p.225: 91,97. HW 8.C: Handout

  3. Section Describing Rotational Motion 8.1 In this section you will: • Describe angular displacement. • Calculate angular velocity. • Calculate angular acceleration. • Solve problems involving rotational motion.

  4. Section Describing Rotational Motion 8.1 Length = d Describing Rotational Motion • A fraction of one revolution can be measured in grads, degrees, or radians. • A grad is 1/400 of a revolution. • A degree is 1/360 of a revolution. • The radianis defined as ½ π of a revolution. The abbreviation of radian is ‘rad’. The distance around the circle is 2π • One complete revolution is equal to 2πradians, so 360 degrees = 2 π radians

  5. Section 8.1 Angular Displacement • The Greek letter theta, θ, is used to represent the angle of revolution. • The counterclockwise rotation is designated as positive, while clockwise is negative. • As an object rotates, the change in the angle is calledangular displacement. • For rotation through an angle, θ, a point at a distance, r, from the center moves a distance given byd = r 

  6. Section Describing Rotational Motion 8.1 Angular Velocity • Velocity is displacement divided by the time taken to make the displacement. • The angular velocityof an object is angular displacement divided by the time required to make the displacement. • The angular velocity of an object is given by:  =  t • Here angular velocity is represented by the Greek letter omega, ω. • The angular velocity is equal to the angular displacement divided by the time required to make the rotation. • Angular velocity is measured in rad/s.

  7. Section Describing Rotational Motion 8.1 Angular Velocity • For Earth, ωE = (2πrad)/(24.0 h)(3600 s/h) = 7.27×10─5 rad/s. • In the same way that counterclockwise rotation produces positive angular displacement, it also results in positive angular velocity. • If an object’s angular velocity is ω, then the linear velocity of a point a distance, r, from the axis of rotation is given by v = r ω. • The speed at which an object on Earth’s equator moves as a result of Earth’s rotation is given by v =r ω = (6.38×106 m) (7.27×10─5rad/s) = 464 m/s. • Earth is an example of a rotating, rigid object. Even though different points on Earth rotate different distances in each revolution, all points rotate through the same angle.

  8. Section Describing Rotational Motion 8.1 Angular Acceleration • Angular accelerationis defined as the change in angular velocity divided by the time required to make that change. • The angular acceleration, α, is represented by the following equation: α =  t • Angular acceleration is measured in rad/s2. • If the change in angular velocity is positive, then the angular acceleration also is positive. • The linear acceleration of a point at a distance, r, from the axis of an object with angular acceleration, α, is given by a = r α .

  9. Section Describing Rotational Motion 8.1 Angular Acceleration • A summary of linear and angular relationships. p.200: Practice Problems: 1,2. Section Review: 5,7-10. HW 8.A: p.223: 72-77.

  10. Section Section Check 8.1 Question 1 What is the angular velocity of the minute hand of a clock?

  11. Section Section Check 8.1 Answer 1 Answer:B Reason:Angular velocity is equal to the angular displacement divided by the time required to complete one rotation. In one minute, the minute hand of a clock completes one rotation. Therefore, = 2π rad. Therefore,

  12. Section Section Check 8.1 Question 2 When a machine is switched on, the angular velocity of the motor increases by 10 rad/s for the first 10 seconds before it starts rotating with full speed. What is the angular acceleration of the machine in the first 10 seconds? • π rad/s2 • 1 rad/s2 • 100π rad/s2 • 100 rad/s2

  13. Section Section Check 8.1 Answer 2 Answer:B Reason:Angular acceleration is equal to the change in angular velocity divided by the time required to make that change.

  14. Section Section Check 8.1 Question 3 When a fan performing 10 revolutions per second is switched off, it comes to rest after 10 seconds. Calculate the average angular acceleration of the fan after it was switched off. • 1 rad/s2 • 2π rad/s2 • π rad/s2 • 10 rad/s2

  15. Section Section Check 8.1 Answer 3 Answer:B Reason:Angular displacement of any rotating object in one revolution is 2π rad. Since the fan is performing 10 revolution per second, its angular velocity = 2π×10 = 20π rad/s.Angular acceleration is equal to the change in angular velocity divided by the time required to make that change.

More Related