1. 1 5.2 Uniform Circular Motion A force,, is directed toward the center of the circle This force is associated with an acceleration, a c Applying Newton’s Second Law along the radial direction gives Fig 5.8

2. 2 Uniform Circular Motion, cont A force causing a centripetal acceleration acts toward the center of the circle It causes a change in the direction of the velocity vector If the force vanishes, the object would move in a straight-line path tangent to the circle Fig 5.9

3. 3 Centripetal Force The force causing the centripetal acceleration is sometimes called the centripetal force This is not a new force, it is a new role for a force It is a force acting in the role of a force that causes a circular motion

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6. 6 Conical Pendulum The object is in equilibrium in the vertical direction and undergoes uniform circular motion in the horizontal direction v is independent of m Fig 5.11

7. 7 Banked Curve These are designed with friction equaling zero There is a component of the normal force that supplies the centripetal force Fig 5.11

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13. 13 Horizontal (Flat) Curve The force of static friction supplies the centripetal force The maximum speed at which the car can negotiate the curve is Note, this does not depend on the mass of the car

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19. 19 Fig 5.13

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24. 24 Loop-the-Loop This is an example of a vertical circle At the bottom of the loop (b), the upward force experienced by the object is greater than its weight Fig 5.14

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28. 28 Loop-the-Loop, Part 2 At the top of the circle (c), the force exerted on the object is less than its weight Fig 5.14

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30. 30 Non-Uniform Circular Motion The acceleration and force have tangential components produces the centripetal acceleration produces the tangential acceleration  Fig 5.15

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32. 32 Vertical Circle with Non- Uniform Speed The gravitational force exerts a tangential force on the object Look at the components of F g The tension at any point can be found Fig 5.17

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36. 36 Top and Bottom of Circle The tension at the bottom is a maximum The tension at the top is a minimum If T top = 0, then Fig 5.17

37. 37 5.4 Motion with Resistive Forces Motion can be through a medium Either a liquid or a gas The medium exerts a resistive force,, on an object moving through the medium The magnitude of depends on the medium The direction of is opposite the direction of motion of the object relative to the medium nearly always increases with increasing speed

38. 38 Motion with Resistive Forces, cont The magnitude of can depend on the speed in complex ways We will discuss only two is proportional to v Good approximation for slow motions or small objects is proportional to v 2 Good approximation for large objects

39. 39 R Proportional To v The resistive force can be expressed as b depends on the property of the medium, and on the shape and dimensions of the object The negative sign indicates is in the opposite direction to

40. 40 R Proportional To v, Example Analyzing the motion results in Fig 5.18(a)

41. 41 R Proportional To v, Example, cont Initially, v = 0 and dv/dt = g As t increases, R increases and a decreases The acceleration approaches 0 when R  mg At this point, v approaches the terminal speed of the object

42. 42 Terminal Speed To find the terminal speed, let a = 0 Solving the differential equation gives  is the time constant and  = m/b Fig 5.18(b)

43. 43 For objects moving at high speeds through air, such as airplanes, sky divers and baseballs, the resistive force is approximately proportional to the square of the speed R = 1/2 D  Av 2 D is a dimensionless empirical quantity that is called the drag coefficient  is the density of air A is the cross-sectional area of the object v is the speed of the object R Proportional To v 2

44. 44 R Proportional To v 2, example Analysis of an object falling through air accounting for air resistance Fig 5.19

45. 45 R Proportional To v 2, Terminal Speed The terminal speed will occur when the acceleration goes to zero Solving the equation gives Fig 5.19

46. 46 Some Terminal Speeds

47. 47 Exercises of chapter 5 8, 13, 21, 26, 27, 29, 32, 39, 46, 55, 58

48. Exercise 32 Consider an object on which the net force is a resistive force proportional to the square of its speed. For example, assume that the resistive force acting on a speed skater is, where k is a constant and m is the skater’s mass. The skater crosses the finish line of a straight-line race with speed v 0 and then slows down by coasting on his skates. Show that the skater’s speed at any time t after crossing the finish line is 48